0 2 2 1 0 7 9c289971-7752-4ad3-8a4a-deedfe2bc3d8 Shaded 0 255;191;191;191 255;191;191;191 638440181684034983 XHG.Ω.GHX 0 -1320 -5504 1 0 0 2 Heteroptera, Version=0.7.3.0, Culture=neutral, PublicKeyToken=null 0.7.3.0 Amin Bahrami [Studio Helioripple] 08bdcae0-d034-48dd-a145-24a9fcf3d3ff Heteroptera 0.7.3.4 Pufferfish, Version=3.0.0.0, Culture=neutral, PublicKeyToken=null 3.0.0.0 Michael Pryor 1c9de8a1-315f-4c56-af06-8f69fee80a7a Pufferfish 3.0.0.0 274 fb6aba99-fead-4e42-b5d8-c6de5ff90ea6 DotNET VB Script (LEGACY) A VB.NET scriptable component true 3d61b0e4-4de6-412e-930f-fc95867b87c2 DotNET VB Script (LEGACY) Turtle 0 Dim i As Integer Dim dir As New On3dVector(1, 0, 0) Dim pos As New On3dVector(0, 0, 0) Dim axis As New On3dVector(0, 0, 1) Dim pnts As New List(Of On3dVector) pnts.Add(pos) For i = 0 To Forward.Count() - 1 Dim P As New On3dVector dir.Rotate(Left(i), axis) P = dir * Forward(i) + pnts(i) pnts.Add(P) Next Points = pnts 860 84 104 44 915 106 1 1 2 Script Variable Forward Script Variable Left 84fa917c-1ed8-4db3-8be1-7bdc4a6495a2 84fa917c-1ed8-4db3-8be1-7bdc4a6495a2 true true Forward Left true true 2 Print, Reflect and Error streams Output parameter Points 3ede854e-c753-40eb-84cb-b48008f14fd4 8ec86459-bf01-4409-baee-174d0d2b13d0 true true Output Points false false 1 false Script Variable Forward ce317ead-faeb-4407-80c1-d99efd640ebc Forward Forward true 1 true d5996e27-1db2-4cfd-81c0-ba62a76266d3 1 8e991e99-5fb8-41e1-928d-1bba8fb9f7d7 862 86 41 20 882.5 96 1 false Script Variable Left ee93da26-6275-4bd5-8137-86f21f15ac46 Left Left true 1 true bcb37e0b-3c8a-405f-aa6f-dcd2e5bb07ca 1 8e991e99-5fb8-41e1-928d-1bba8fb9f7d7 862 106 41 20 882.5 116 Print, Reflect and Error streams ffa7a548-a363-4ed3-b06f-1f56c34b92d9 Output Output false 0 927 86 35 20 944.5 96 Output parameter Points 78c464d7-84e4-4bf0-aadc-869f9b4fda82 Points Points false 0 927 106 35 20 944.5 116 e64c5fb1-845c-4ab1-8911-5f338516ba67 Series Create a series of numbers. true 2ca7e1d3-965f-482b-aadc-124aff6b6aea Series Series 359 214 89 64 403 246 First number in the series fadaf414-149e-4983-b3fa-5803240091b4 Start Start false c0501684-bc40-4a82-a718-a4182ddcafd0 1 361 216 30 20 376 226 1 1 {0} 0 Step size for each successive number 7b0495e3-bd4a-4b58-987a-df7e75e23d99 Step Step false c0501684-bc40-4a82-a718-a4182ddcafd0 1 361 236 30 20 376 246 1 1 {0} 1 Number of values in the series c2336e9e-62db-4e7c-b386-10dbce7ec153 Count Count false 262c30fe-27e2-4d85-ab9e-97c61e273cba 1 361 256 30 20 376 266 1 1 {0} 500 1 Series of numbers e19fe4db-d765-4b53-a8f1-aad962d839f5 Series Series false 0 415 216 31 60 430.5 246 dd8134c0-109b-4012-92be-51d843edfff7 Duplicate Data Duplicate data a predefined number of times. true ecdd9484-1dc5-4373-813b-a0843dff0f24 Duplicate Data Duplicate Data 350 57 102 64 413 89 1 Data to duplicate fac6ec86-8adb-4f3b-adb3-49e59eac8176 Data Data false 845d88dc-f057-493a-b7e5-8c521e783992 1 352 59 49 20 376.5 69 Number of duplicates a205ae38-8b3f-4825-ab5c-32284131d818 Number Number false 262c30fe-27e2-4d85-ab9e-97c61e273cba 1 352 79 49 20 376.5 89 1 1 {0} 500 Retain list order 1f01019d-89a2-486c-88ba-d6fb26bd72a9 Order Order false 0 352 99 49 20 376.5 109 1 1 {0} true 1 Duplicated data be464ca1-422c-476c-b2a6-f6710f1fc6f5 Data Data false 0 425 59 25 60 437.5 89 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers f1fbb0e1-fe5e-40d2-841e-732012e40657 Digit Scroller . false 0 12 . 11 1024.0 -178 205 250 20 -177.0572 205.4425 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers 7fbc35ee-c93d-4288-b414-b6d63a02edf6 Digit Scroller ЯR false 0 12 ЯR 1 0.11963403409 -173 107 250 20 -172.3578 107.1254 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers 2fc63193-0d11-4984-80d9-de58980f5096 Digit Scroller ° false 0 12 ° 2 0.0005104413 -175 150 250 20 -174.4397 150.3848 a4cd2751-414d-42ec-8916-476ebf62d7fe Radians Convert an angle specified in degrees to radians true b8e372a5-0ec1-405a-8c3e-4d4db388b39d Radians Radians 214 268 108 28 269 282 Angle in degrees 70416b1f-5eb7-4580-afa9-2c0961044fb4 Degrees Degrees false f18af49f-2c36-475e-9666-3bd16c62f28a 1 216 270 41 24 236.5 282 Angle in radians c0501684-bc40-4a82-a718-a4182ddcafd0 Radians Radians false 0 281 270 39 24 300.5 282 fbac3e32-f100-4292-8692-77240a42fd1a Point Contains a collection of three-dimensional points true c88c0b93-14b6-40b3-a27f-00ff79f7b13c Point Point false 78c464d7-84e4-4bf0-aadc-869f9b4fda82 1 767 290 50 24 792.0005 302.1751 dd8134c0-109b-4012-92be-51d843edfff7 Duplicate Data Duplicate data a predefined number of times. true 10029d4c-14e7-48f1-bbcb-e6dcd175c7fe Duplicate Data Duplicate Data 395 300 102 64 458 332 1 Data to duplicate 15eb2d85-2b0a-49bd-a09b-191727194d7f Data Data false c0501684-bc40-4a82-a718-a4182ddcafd0 1 397 302 49 20 421.5 312 Number of duplicates ce1c8b30-0bc8-4d6f-ae83-f9eb16815340 Number Number false 262c30fe-27e2-4d85-ab9e-97c61e273cba 1 397 322 49 20 421.5 332 1 1 {0} 500 Retain list order a041d52d-da4b-4226-9e1c-264d3a823b22 Order Order false 0 397 342 49 20 421.5 352 1 1 {0} true 1 Duplicated data 397a31a1-ec30-45a1-8e15-b2f48d006bb7 Data Data false 0 470 302 25 60 482.5 332 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 262c30fe-27e2-4d85-ab9e-97c61e273cba Relay false f9f71a55-f522-4a2a-a443-1fc9358ef7f9 1 215 177 40 16 235 185 be52336f-a2e1-43b1-b5f5-178ba489508a Circle Fit Fit a circle to a collection of points. true b4af4abe-d4a8-4b3c-bee6-4c3f34202ce9 Circle Fit Circle Fit 332 475 104 64 377 507 1 Points to fit db0a3289-864c-4f55-99cb-5e0f98a661e3 Points Points false c88c0b93-14b6-40b3-a27f-00ff79f7b13c 1 334 477 31 60 349.5 507 Resulting circle 05372bd4-17e2-415c-9486-b313b5739964 Circle Circle false 0 389 477 45 20 411.5 487 Circle radius 0623a205-c072-466d-92db-0da0f552f93b Radius Radius false 0 389 497 45 20 411.5 507 Maximum distance between circle and points 833b7ba2-ecb4-4e06-bc96-ae20ee32797a Deviation Deviation false 0 389 517 45 20 411.5 527 9df5e896-552d-4c8c-b9ca-4fc147ffa022 Expression Evaluate an expression cos((4*atan(1))/N) true 4367604e-a116-40f7-8d8d-988b5d3de819 Expression Expression 483 437 215 28 581 451 1 ba80fd98-91a1-4958-b6a7-a94e40e52bdb 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Expression variable 7ecdea7f-0f93-40d6-8931-a086334ae2d1 Variable Variable x N true 262c30fe-27e2-4d85-ab9e-97c61e273cba 1 485 439 11 24 490.5 451 Result of expression c7cec9be-11ae-4598-8068-2121d1ade51b Result Result false 0 665 439 31 24 680.5 451 4d2a06bd-4b0f-4c65-9ee0-4220e4c01703 Scale Scale an object uniformly in all directions. true 03e5b781-f7eb-42f3-abd8-cc10f3b05609 Scale Scale 506 582 126 64 568 614 Base geometry 6907e204-b264-49bd-a5f1-2db17048b9df Geometry Geometry true 05372bd4-17e2-415c-9486-b313b5739964 1 508 584 48 20 532 594 Center of scaling be76ebca-fa99-4f87-8033-b15b1fe639df Center Center false 0cd7c1cb-6524-4abc-b02f-8000b02c2e4a 1 508 604 48 20 532 614 1 1 {0} 0 0 0 Scaling factor b0afd88c-aeb5-40db-842c-94af85a4a1a5 Factor Factor false c7cec9be-11ae-4598-8068-2121d1ade51b 1 508 624 48 20 532 634 1 1 {0} 0.5 Scaled geometry 345752d3-26cb-450b-bbc5-24b071eecb78 Geometry Geometry false 0 580 584 50 30 605 599 Transformation data 1fcd789f-dea0-49e3-a218-f22153dc209a Transform Transform false 0 580 614 50 30 605 629 2e205f24-9279-47b2-b414-d06dcd0b21a7 Area Solve area properties for breps, meshes and planar closed curves. true 85df7bc1-c6a1-40db-8c89-352a1e7599c4 Area Area 320 592 118 44 382 614 Brep, mesh or planar closed curve for area computation bf640742-a279-4f17-bb07-9d1b84caaab4 Geometry Geometry false 05372bd4-17e2-415c-9486-b313b5739964 1 322 594 48 40 346 614 Area of geometry 3c2545f6-aac8-42fc-aefd-5e99034a2bac Area Area false 0 394 594 42 20 415 604 Area centroid of geometry 0cd7c1cb-6524-4abc-b02f-8000b02c2e4a Centroid Centroid false 0 394 614 42 20 415 624 ce46b74e-00c9-43c4-805a-193b69ea4a11 Multiplication Mathematical multiplication true 7f713906-b4f7-457d-b43d-f57d3d074da3 Multiplication Multiplication 631 494 70 44 656 516 2 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 First item for multiplication 0a2032cc-6c9a-4eca-a40f-88736807e6ee A A true c7cec9be-11ae-4598-8068-2121d1ade51b 1 633 496 11 20 638.5 506 Second item for multiplication 608f7e5e-b2e4-4880-9963-416c99f1afb4 B B true 0623a205-c072-466d-92db-0da0f552f93b 1 633 516 11 20 638.5 526 Result of multiplication b74f0585-4293-489c-9893-889377fac93a Result Result false 0 668 496 31 40 683.5 516 9df5e896-552d-4c8c-b9ca-4fc147ffa022 Expression Evaluate an expression .5*L*(1/SIN(π/N)) true f501d46e-90e6-461c-bb9e-83beabda9ca6 Expression Expression 571 336 207 44 665 358 2 ba80fd98-91a1-4958-b6a7-a94e40e52bdb ba80fd98-91a1-4958-b6a7-a94e40e52bdb 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Expression variable 4172d6f8-0262-47fa-b2fa-b487930372f8 Variable x L true 7fbc35ee-c93d-4288-b414-b6d63a02edf6 1 573 338 11 20 578.5 348 Expression variable 893d2f38-c3ff-432d-9562-99fe91034cc4 Variable N N true 262c30fe-27e2-4d85-ab9e-97c61e273cba 1 573 358 11 20 578.5 368 Result of expression 871baec3-457c-4734-ae89-c9dc38a72254 Result Result false 0 745 338 31 40 760.5 358 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values e186075d-d2c2-449d-87c8-80fdeafbef90 Panel Panel false 0 871baec3-457c-4734-ae89-c9dc38a72254 1 Double click to edit panel content… 856 337 160 100 0 0 0 856.2946 337.3611 255;255;255;255 true true true false false true 9df5e896-552d-4c8c-b9ca-4fc147ffa022 Expression Evaluate an expression R/(.5*(1/SIN(π/N))) true cd4acd9d-cbdc-4d38-97c4-be071e6d8e96 Expression Expression 234 -17 224 44 336 5 2 ba80fd98-91a1-4958-b6a7-a94e40e52bdb ba80fd98-91a1-4958-b6a7-a94e40e52bdb 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Expression variable 47b5aec6-b919-47fa-aa50-c4074fdd094f Variable L R true 23d9f3a2-1454-4364-a19c-8801a4aa8e4a 1 236 -15 11 20 241.5 -5 Expression variable e620dac2-b443-461d-8820-8f57e0929fbd Variable N N true 262c30fe-27e2-4d85-ab9e-97c61e273cba 1 236 5 11 20 241.5 15 Result of expression 845d88dc-f057-493a-b7e5-8c521e783992 Result Result false 0 425 -15 31 40 440.5 5 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 79214b28-9042-4fce-9bff-aefa3c8afdce Division Division 21 274 90 44 66 296 Item to divide (dividend) cd12f72c-b624-4a1d-b4e0-3e7090b7a7ef A A false 0 23 276 31 20 38.5 286 1 1 {0} Grasshopper.Kernel.Types.GH_String false 360 Item to divide with (divisor) 39527ecc-cc31-4e87-a0f0-71398918b3ef B B false f1fbb0e1-fe5e-40d2-841e-732012e40657 1 23 296 31 20 38.5 306 The result of the Division c60648d6-21f7-4608-9114-2716dc67c91f Result Result false 0 78 276 31 40 93.5 296 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values bc8d16e7-6518-4d54-9e28-8feae351da64 Panel Panel false 0 0623a205-c072-466d-92db-0da0f552f93b 1 Double click to edit panel content… 526 -153 160 100 0 0 0 526.2639 -152.3152 255;255;255;255 true true true false false true 6ec97ea8-c559-47a2-8d0f-ce80c794d1f4 Reverse List Reverse the order of a list. true 7f113fc2-d918-4a84-a319-cc5320e0abe4 Reverse List Reverse List 434 152 66 28 467 166 1 Base list ac476c41-08df-4926-99e5-227c0b7793d9 List List false e19fe4db-d765-4b53-a8f1-aad962d839f5 1 436 154 19 24 445.5 166 1 Reversed list a706ad0d-f779-4309-8a67-f57c406db026 List List false 0 479 154 19 24 488.5 166 4fdfe351-6c07-47ce-9fb9-be027fb62186 Shift List Offset all items in a list. true a0b095f5-462d-41a1-9833-aceddde83e84 Shift List Shift List 513 237 90 64 570 269 1 List to shift 2811c1b6-447e-4ff8-bebe-171f2beebd93 List List false a706ad0d-f779-4309-8a67-f57c406db026 1 515 239 43 20 536.5 249 Shift offset 66337458-366e-433a-85b9-70a9c5af71e4 Shift Shift false 0 515 259 43 20 536.5 269 1 1 {0} 1 Wrap values 7d577852-39b8-4caf-bb55-52666b680297 Wrap Wrap false 0 515 279 43 20 536.5 289 1 1 {0} false 1 Shifted list c63cd484-0b02-471a-bd03-c1ddd82ac8e2 List List false 0 582 239 19 60 591.5 269 a3371040-e552-4bc8-b0ff-10a840258e88 Negative Compute the negative of a value. true 8bcc8ae8-e318-42a5-9758-a25fe9ea46a2 Negative Negative 633 248 88 28 676 262 Input value 79828215-32cc-45c1-a351-78dceaf8a991 Value Value false e19fe4db-d765-4b53-a8f1-aad962d839f5 1 635 250 29 24 649.5 262 Output value f8ca467e-c13d-4d81-8b30-5bc5193e7bbb Result Result false 0 688 250 31 24 703.5 262 3cadddef-1e2b-4c09-9390-0e8f78f7609f Merge Merge a bunch of data streams true 9a46c0d6-1b86-4536-84b4-88cc87aa997c Merge Merge 578 117 122 84 639 159 4 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 2 Data stream 1 b5578463-fe15-4eb8-ac35-f137bf5743f4 1 false Data 1 D1 true a706ad0d-f779-4309-8a67-f57c406db026 1 580 119 47 20 611.5 129 2 Data stream 2 ae7d37b7-f367-48cc-8f9a-45ba6583d329 1 false Data 2 D2 true 0 580 139 47 20 611.5 149 1 1 {0} Grasshopper.Kernel.Types.GH_String false 0 2 Data stream 3 d1b0650a-6115-4b34-95b2-d759d434da03 1 false Data 3 D3 true f8ca467e-c13d-4d81-8b30-5bc5193e7bbb 1 580 159 47 20 611.5 169 2 Data stream 4 d9d34c99-475c-4a79-b95a-a25471df3fb7 false Data 4 D4 true 0 580 179 47 20 611.5 189 2 Result of merge bcb37e0b-3c8a-405f-aa6f-dcd2e5bb07ca 1 Result Result false 0 651 119 47 80 666.5 159 6ec97ea8-c559-47a2-8d0f-ce80c794d1f4 Reverse List Reverse the order of a list. true 66885faa-16ff-4dcc-883a-2cc9528f684e Reverse List Reverse List 511 -21 66 28 544 -7 1 Base list 4b0852c3-fa4d-4bc2-ae8d-7e187a5a9b96 List List false be464ca1-422c-476c-b2a6-f6710f1fc6f5 1 513 -19 19 24 522.5 -7 1 Reversed list a79dc447-c143-4e69-af36-d93bb673c4f4 List List false 0 556 -19 19 24 565.5 -7 4fdfe351-6c07-47ce-9fb9-be027fb62186 Shift List Offset all items in a list. true 601251d7-c744-4070-836a-acb30bc91624 Shift List Shift List 528 37 90 64 585 69 1 List to shift a9c71af4-63fe-4c31-9f1c-0b3d6f0a24af List List false be464ca1-422c-476c-b2a6-f6710f1fc6f5 1 530 39 43 20 551.5 49 Shift offset da00b811-78b0-4f79-9f82-4acecc2ebdeb Shift Shift false 0 530 59 43 20 551.5 69 1 1 {0} 1 Wrap values d359d1bb-b59d-4333-a939-bda455edf8f2 Wrap Wrap false 0 530 79 43 20 551.5 89 1 1 {0} false 1 Shifted list 69cf53a4-2337-4e09-8a6b-013e270433d8 List List false 0 597 39 19 60 606.5 69 3cadddef-1e2b-4c09-9390-0e8f78f7609f Merge Merge a bunch of data streams true 7e129286-32cc-4d60-9d6d-04c9446f6282 Merge Merge 675 -29 122 84 736 13 4 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 2 Data stream 1 40957671-acb8-405a-9dda-8d9bd7232911 1 false Data 1 D1 true a79dc447-c143-4e69-af36-d93bb673c4f4 1 677 -27 47 20 708.5 -17 2 Data stream 2 b530795a-c051-456a-86c1-7a0b4ece28be 1 false Data 2 D2 true 0 677 -7 47 20 708.5 3 2 Data stream 3 5ef29980-07e3-443d-8b13-3534b6d2daa8 1 false Data 3 D3 true be464ca1-422c-476c-b2a6-f6710f1fc6f5 1 677 13 47 20 708.5 23 2 Data stream 4 08749507-1829-4296-8479-604964a24385 false Data 4 D4 true 0 677 33 47 20 708.5 43 2 Result of merge d5996e27-1db2-4cfd-81c0-ba62a76266d3 1 Result Result false 0 748 -27 47 80 763.5 13 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 21c33c2f-9fca-4a36-986e-1011355096ea Panel Panel false 0 bcb37e0b-3c8a-405f-aa6f-dcd2e5bb07ca 1 Double click to edit panel content… 1020 -57 160 479 0 0 0 1020.859 -56.40537 255;255;255;255 true true true false false true 59daf374-bc21-4a5e-8282-5504fb7ae9ae List Item 0 Retrieve a specific item from a list. true 20d638e5-5eab-4294-9eb2-e332f163c51f List Item List Item 752 493 95 64 809 525 3 8ec86459-bf01-4409-baee-174d0d2b13d0 2e3ab970-8545-46bb-836c-1c11e5610bce cb95db89-6165-43b6-9c41-5702bc5bf137 1 8ec86459-bf01-4409-baee-174d0d2b13d0 1 Base list dca67d8b-109c-4519-8679-2f289d90be84 List List false c88c0b93-14b6-40b3-a27f-00ff79f7b13c 1 754 495 43 20 775.5 505 Item index 2873bc33-81bd-45b7-9091-864600654a23 Index Index false 0 754 515 43 20 775.5 525 1 1 {0} -1 Wrap index to list bounds 2b291a54-118f-4855-9d9b-c247bbb61a58 Wrap Wrap false 0 754 535 43 20 775.5 545 1 1 {0} true Item at {i'} 733e62a8-108b-451e-a02f-fefecafbcf4e false Item Item false 0 821 495 24 60 833 525 9abae6b7-fa1d-448c-9209-4a8155345841 Deconstruct Deconstruct a point into its component parts. true 1c65cddb-9bca-4abc-a88b-4eebe341e2b8 Deconstruct Deconstruct 865 499 120 64 906 531 Input point e43ffa74-15cc-4939-91c8-a9bbfb57563e Point Point false 733e62a8-108b-451e-a02f-fefecafbcf4e 1 867 501 27 60 880.5 531 Point {x} component c48f2a86-4388-4b9b-a155-5f9d30e70ed5 X component X component false 0 918 501 65 20 950.5 511 Point {y} component c2694786-f0d6-43b4-a7b8-e3a0d5b6af9f Y component Y component false 0 918 521 65 20 950.5 531 Point {z} component 20ab697b-7ea5-45b0-9a27-0c47130264ef Z component Z component false 0 918 541 65 20 950.5 551 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values e4a3a123-a46a-4ffe-9866-096c857bfd95 Panel false 0 fe9b2349-403b-4c80-bf8e-3415f7e9017a 1 Double click to edit panel content… -110 -81 116 20 0 0 0 -109.6386 -80.95573 255;255;255;255 false false true false false true 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 1706b589-82a3-484e-8bb3-c9784fb4ea88 Panel false 0 12a00da0-f03d-412c-99e3-24174bf36562 1 Double click to edit panel content… -109 0 118 20 0 0 0 -108.8092 0.6788788 255;255;255;255 false false true false false true 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true b241a6a3-6e71-4ff3-95dd-95c013252b2b Division Division 1117 499 70 44 1142 521 Item to divide (dividend) 93b650fe-9575-4d53-a3ea-1bb3acc7ac2f A A false c48f2a86-4388-4b9b-a155-5f9d30e70ed5 1 1119 501 11 20 1124.5 511 Item to divide with (divisor) b5d9a2c7-a217-4fe1-86b3-eb50e420e921 B B false c2694786-f0d6-43b4-a7b8-e3a0d5b6af9f 1 1119 521 11 20 1124.5 531 The result of the Division 118e674e-db63-4847-b023-71a1ecd9c236 Result Result false 0 1154 501 31 40 1169.5 521 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values eefae472-b11a-4e30-a3af-f2edf06a8f62 Panel false 0 07b602e6-3f30-4265-8f7b-014173103908 1 Double click to edit panel content… -110 -40 116 20 0 0 0 -109.8456 -39.18073 255;255;255;255 false false true false false true fb6aba99-fead-4e42-b5d8-c6de5ff90ea6 DotNET VB Script (LEGACY) A VB.NET scriptable component true ef7b22da-b20f-421c-87e5-2e9f24448f61 true DotNET VB Script (LEGACY) Turtle 0 Dim i As Integer Dim dir As New On3dVector(1, 0, 0) Dim pos As New On3dVector(0, 0, 0) Dim axis As New On3dVector(0, 0, 1) Dim pnts As New List(Of On3dVector) pnts.Add(pos) For i = 0 To Forward.Count() - 1 Dim P As New On3dVector dir.Rotate(Left(i), axis) P = dir * Forward(i) + pnts(i) pnts.Add(P) Next Points = pnts 1751 8294 104 44 1806 8316 1 1 2 Script Variable Forward Script Variable Left 84fa917c-1ed8-4db3-8be1-7bdc4a6495a2 84fa917c-1ed8-4db3-8be1-7bdc4a6495a2 true true Forward Left true true 2 Print, Reflect and Error streams Output parameter Points 3ede854e-c753-40eb-84cb-b48008f14fd4 8ec86459-bf01-4409-baee-174d0d2b13d0 true true Output Points false false 1 false Script Variable Forward fd045b5b-1058-41aa-b97b-59bfbe37a445 true Forward Forward true 1 true 7e67df61-227f-4e08-8fea-e7dad9589772 1 8e991e99-5fb8-41e1-928d-1bba8fb9f7d7 1753 8296 41 20 1773.5 8306 1 false Script Variable Left e27890c1-ddf5-43e8-aa7c-855130530b9f true Left Left true 1 true 23600005-afd8-49b3-9cdc-f94db3ed139f 1 8e991e99-5fb8-41e1-928d-1bba8fb9f7d7 1753 8316 41 20 1773.5 8326 Print, Reflect and Error streams 59490336-0317-48ab-8fa9-f2f20609911c true Output Output false 0 1818 8296 35 20 1835.5 8306 Output parameter Points 6840a0ad-a870-47ab-bde6-1fa3333a7543 true Points Points false 0 1818 8316 35 20 1835.5 8326 fbac3e32-f100-4292-8692-77240a42fd1a Point Contains a collection of three-dimensional points true 5c241406-61cd-4678-b6c8-910e404014a9 Point Point false 6840a0ad-a870-47ab-bde6-1fa3333a7543 1 1848 8214 50 24 1873.7 8226.781 2b2a4145-3dff-41d4-a8de-1ea9d29eef33 Interpolate Create an interpolated curve through a set of points. true 63398084-0450-4259-9328-14f137aafbf6 Interpolate Interpolate 1439 7976 197 84 1584 8018 1 Interpolation points 0079b3b3-5e0d-4669-8059-717b19e83522 Vertices Vertices false 5c241406-61cd-4678-b6c8-910e404014a9 1 1441 7978 131 20 1506.5 7988 Curve degree f131594d-f681-40b3-ae43-d4d2fb1d04c5 Degree Degree false 0 1441 7998 131 20 1506.5 8008 1 1 {0} 1 Periodic curve 167576c0-ddfd-4da2-a2b8-bc93ee9de310 Periodic Periodic false 0 1441 8018 131 20 1506.5 8028 1 1 {0} false Knot spacing (0=uniform, 1=chord, 2=sqrtchord) abb2709c-5d24-446c-be6b-d0277ec8791d KnotStyle KnotStyle false 0 1441 8038 131 20 1506.5 8048 1 1 {0} 1 Resulting nurbs curve 1f58aef3-68df-4afa-abcb-766ccf636dd2 Curve Curve false 0 1596 7978 38 26 1615 7991.333 Curve length 95a44c5f-50e2-48d0-a7c6-c7c016870137 Length Length false 0 1596 8004 38 27 1615 8018 Curve domain e0a12ce0-d875-401f-91ce-0007c6b27dc0 Domain Domain false 0 1596 8031 38 27 1615 8044.667 0d2ccfb3-9d41-4759-9452-da6a522c3eaa Pi Returns a factor of Pi. true effc9ff2-741c-4863-855b-3a155ab1d9a1 Pi Pi 1034 8181 112 28 1097 8195 Factor to be multiplied by Pi d17006a4-ce99-41fe-8ecd-7966c23c3d7a Factor Factor false 0 1036 8183 49 24 1060.5 8195 1 1 {0} 2 Output value b5428967-7bc3-4973-a90b-95ea5e112e93 Output Output false 0 1109 8183 35 24 1126.5 8195 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 19e600ed-4d93-474e-9270-60871e3ea572 Division Division 1241 8202 70 44 1266 8224 Item to divide (dividend) 09773635-d7f3-4dee-bcc5-d34fb2031ac1 A A false b5428967-7bc3-4973-a90b-95ea5e112e93 1 1243 8204 11 20 1248.5 8214 Item to divide with (divisor) e52a2212-3eda-4183-af6c-93c16d4cb773 B B false 2d3182bc-0ec5-416a-a889-562bebb78f4d 1 1243 8224 11 20 1248.5 8234 The result of the Division f5876fb4-0209-47b9-89c8-779610d79b15 Result Result false 0 1278 8204 31 40 1293.5 8224 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers feacff2e-50e3-4537-ac1b-4450d7a3cae4 Digit Scroller Digit Scroller false 0 12 Digit Scroller 11 63.0 506 8513 250 20 506.2305 8513.215 dd8134c0-109b-4012-92be-51d843edfff7 Duplicate Data Duplicate data a predefined number of times. true 95efbcb9-4866-4cc7-8946-58ac406c0650 Duplicate Data Duplicate Data 1595 8256 102 64 1658 8288 1 Data to duplicate 3714f2eb-dd48-4a34-a0aa-888903093857 Data Data false f5876fb4-0209-47b9-89c8-779610d79b15 1 1597 8258 49 20 1621.5 8268 Number of duplicates 7e939ba2-797c-4137-b8a8-d430da27e930 Number Number false 2d3182bc-0ec5-416a-a889-562bebb78f4d 1 1597 8278 49 20 1621.5 8288 1 1 {0} 2 Retain list order 95b2b7dd-614a-42ae-bf10-1aff9572036e Order Order false 0 1597 8298 49 20 1621.5 8308 1 1 {0} true 1 Duplicated data 7e67df61-227f-4e08-8fea-e7dad9589772 Data Data false 0 1670 8258 25 60 1682.5 8288 2b69bf71-4e69-43aa-b7be-4f6ce7e45bef Quick Graph 1 Display a set of y-values as a graph b37d3ce8-3c7b-462a-ad59-ec77ca864ff9 Quick Graph Quick Graph false 0 23600005-afd8-49b3-9cdc-f94db3ed139f 1 2104 8257 150 150 2104.25 8257.683 -1 e64c5fb1-845c-4ab1-8911-5f338516ba67 Series Create a series of numbers. true a159a761-225a-47bc-bd40-22ea126c629b Series Series 1579 8345 122 64 1656 8377 First number in the series bd1dd0f1-5f6e-4438-9280-e9898072b190 Start Start false 0 1581 8347 63 20 1620.5 8357 1 1 {0} 0 Step size for each successive number f00e9eae-ae27-417b-8d69-e7ba1904dc47 Step Step false 422f40c8-6c25-44c9-bedb-da6dc0b54fd9 1 1581 8367 63 20 1620.5 8377 1 1 {0} 1 Number of values in the series 9f5b0947-9738-43af-8617-f16229f943ba X+1 Count Count false 2d3182bc-0ec5-416a-a889-562bebb78f4d 1 1581 8387 63 20 1620.5 8397 1 1 {0} 10 1 Series of numbers a3febab5-0271-4176-b12a-837fcb0b83d6 Series Series false 0 1668 8347 31 60 1683.5 8377 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true d3b99e99-94b2-4d3b-a5b9-6791f7fbcf1f Division Division 1055 8433 70 44 1080 8455 Item to divide (dividend) 437989cf-f5bc-4a29-8bf3-2053b6564069 A A false 087687ee-5b85-4a79-9b21-7b21c6a77520 1 1057 8435 11 20 1062.5 8445 1 1 {0} Grasshopper.Kernel.Types.GH_String false Pi Item to divide with (divisor) 6702514d-d709-4347-b6df-b5df7b7df591 B B false 2d3182bc-0ec5-416a-a889-562bebb78f4d 1 1057 8455 11 20 1062.5 8465 The result of the Division 30e03bf5-47ab-4743-8ca6-661654fa103d Result Result false 0 1092 8435 31 40 1107.5 8455 e64c5fb1-845c-4ab1-8911-5f338516ba67 Series Create a series of numbers. true b02bc189-98fc-45be-8330-ec7401fd8524 Series Series 1109 8603 106 64 1170 8635 First number in the series f92f6d5f-73bb-41d2-8dc8-3a376687a5a9 Start Start false 0 1111 8605 47 20 1134.5 8615 1 1 {0} 0 Step size for each successive number 13e63881-4ca1-4f87-83da-29e52a136cb6 Step Step false 30e03bf5-47ab-4743-8ca6-661654fa103d 1 1111 8625 47 20 1134.5 8635 1 1 {0} 1 Number of values in the series 9c323bdd-446a-4b22-8a2f-aca538e02cef Count Count false 2d3182bc-0ec5-416a-a889-562bebb78f4d 1 1111 8645 47 20 1134.5 8655 1 1 {0} 16 1 Series of numbers 9ba20636-1b4f-4f30-88d1-ccd070ba1f32 Series Series false 0 1182 8605 31 60 1197.5 8635 78fed580-851b-46fe-af2f-6519a9d378e0 Power Raise a value to a power. true 7f12f249-7659-48dc-8774-d8dcb4014948 Power Power 1195 8375 85 44 1235 8397 The item to be raised 05c526ea-ba6f-4b1f-b463-e5886b50b151 A A false 9ba20636-1b4f-4f30-88d1-ccd070ba1f32 1 1197 8377 26 20 1210 8387 The exponent 0da0f993-8b6b-4b81-85c8-6b46088bc636 B B false 0 1197 8397 26 20 1210 8407 1 1 {0} Grasshopper.Kernel.Types.GH_String false 2 A raised to the B power 3cd244e7-2aba-4f95-8566-03dc0fea7a2d Result Result false 0 1247 8377 31 40 1262.5 8397 dd17d442-3776-40b3-ad5b-5e188b56bd4c Relative Differences Compute relative differences for a list of data true 29bec5af-d71f-4b18-b185-c780701e9c65 Relative Differences Relative Differences 1306 8356 116 28 1353 8370 1 List of data to operate on (numbers or points or vectors allowed) 8a3e4a46-60b5-4cd7-b23c-80e2d63b0311 Values Values false 3cd244e7-2aba-4f95-8566-03dc0fea7a2d 1 1308 8358 33 24 1324.5 8370 1 Differences between consecutive items 6ecfdbf0-d6ed-416d-ae60-dc1cd2f30b14 Differenced Differenced false 0 1365 8358 55 24 1392.5 8370 59daf374-bc21-4a5e-8282-5504fb7ae9ae List Item 0 Retrieve a specific item from a list. true d496411c-0e08-4f19-8c68-12df038a1cec List Item List Item 1464 8354 77 64 1521 8386 3 8ec86459-bf01-4409-baee-174d0d2b13d0 2e3ab970-8545-46bb-836c-1c11e5610bce cb95db89-6165-43b6-9c41-5702bc5bf137 1 8ec86459-bf01-4409-baee-174d0d2b13d0 1 Base list 2bc8b542-a3b1-49f2-8e63-0ddfd4da1235 List List false 6ecfdbf0-d6ed-416d-ae60-dc1cd2f30b14 1 1466 8356 43 20 1487.5 8366 Item index 80fd802f-ac9a-453e-8304-f69ee4cc0bad Index Index false 0 1466 8376 43 20 1487.5 8386 1 1 {0} 1 Wrap index to list bounds 132fbf1d-fa65-4a75-b78b-358d4a9f1143 Wrap Wrap false 0 1466 8396 43 20 1487.5 8406 1 1 {0} true Item at {i'} 422f40c8-6c25-44c9-bedb-da6dc0b54fd9 false Item i false 0 1533 8356 6 60 1536 8386 0d2ccfb3-9d41-4759-9452-da6a522c3eaa Pi Returns a factor of Pi. true f8fd5bf9-b1ba-477c-ac09-f12dbb0d08b7 Pi Pi 885 8396 95 28 931 8410 Factor to be multiplied by Pi 754ee990-be8c-4cb0-a171-80cebfb39821 Factor Factor false 5ce031d5-550e-4710-ac8a-f97d9d9ec811 1 887 8398 32 24 903 8410 1 1 {0} 2 Output value 087687ee-5b85-4a79-9b21-7b21c6a77520 Output Output false 0 943 8398 35 24 960.5 8410 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers 6227facb-1359-4bc9-8a73-12332e396c9c Digit Scroller Digit Scroller false 0 12 Digit Scroller 11 8.0 454 8377 250 20 454.3884 8377.877 f44b92b0-3b5b-493a-86f4-fd7408c3daf3 Bounds Create a numeric domain which encompasses a list of numbers. true fa6f6ed3-8022-4333-9e94-6c5db08fe4eb Bounds Bounds 1472 8569 110 28 1530 8583 1 Numbers to include in Bounds 6fee80bf-b69e-4deb-8ded-13a85bc7ece7 Numbers Numbers false a3febab5-0271-4176-b12a-837fcb0b83d6 1 1474 8571 44 24 1496 8583 Numeric Domain between the lowest and highest numbers in {N} 6f69003f-1e11-417d-8dce-8be904a546f9 Domain Domain false 0 1542 8571 38 24 1561 8583 825ea536-aebb-41e9-af32-8baeb2ecb590 Deconstruct Domain Deconstruct a numeric domain into its component parts. true 41f87425-df39-4e1f-bc61-a8f5c18e33a3 Deconstruct Domain Deconstruct Domain 1625 8541 92 44 1677 8563 Base domain 21c2532b-843d-4f8b-ad74-ecdefdba10c2 Domain Domain false 6f69003f-1e11-417d-8dce-8be904a546f9 1 1627 8543 38 40 1646 8563 Start of domain 65ed304d-edc4-4a09-945e-c299554c1818 Start Start false 0 1689 8543 26 20 1702 8553 End of domain 089c5e76-4804-4fcf-8f98-119c1fd40e7b End End false 0 1689 8563 26 20 1702 8573 9df5e896-552d-4c8c-b9ca-4fc147ffa022 Expression Evaluate an expression 2/M-acos(cos(x*M/(4)^N))/pi/M*2 true c19c7708-89b4-4d41-a5f6-2a51bc0d8618 Expression Expression 1766 8422 299 64 1919 8454 3 ba80fd98-91a1-4958-b6a7-a94e40e52bdb ba80fd98-91a1-4958-b6a7-a94e40e52bdb ba80fd98-91a1-4958-b6a7-a94e40e52bdb 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Expression variable 4f73ab90-d9c2-4189-96c3-f7ceb3560707 Variable X X true a3febab5-0271-4176-b12a-837fcb0b83d6 1 1768 8424 13 20 1774.5 8434 Expression variable 65f88199-8270-4b57-b0a1-ab7b5996f9f3 Variable M M true 089c5e76-4804-4fcf-8f98-119c1fd40e7b 1 1768 8444 13 20 1774.5 8454 Expression variable bc07ff13-3e3a-4bd7-af78-bb649c9e89ee Variable N N true e7e40e74-e4a9-4cfa-8865-866414e101d5 1 1768 8464 13 20 1774.5 8474 Result of expression 23600005-afd8-49b3-9cdc-f94db3ed139f Result false 0 2057 8424 6 60 2060 8454 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values a87d0fb1-539b-41ce-a26a-b4dcf5b1b5fd Panel false 1 23600005-afd8-49b3-9cdc-f94db3ed139f 1 Double click to edit panel content… 2109 8442 160 427 0 0 0 2109.659 8442.332 255;255;255;255 true true true false false true 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 97020dcf-606f-47a4-ab0d-e1e8f271fb8d Panel false 0 a3febab5-0271-4176-b12a-837fcb0b83d6 1 Double click to edit panel content… 1798 8514 160 427 0 0 0 1798.659 8514.332 255;255;255;255 true true true false false true 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 1c950b7d-6e97-42a7-be91-b200f898b18f Panel false 0 0 acos(cos(x*M/(4)/1))/pi/M*2 1/M-cos(x*M/4)/M*1 1/M-cos(x*M/(4)^N)/M acos(cos(x*M/(4)^N))/pi/M*2 2/M-acos(cos(x*M/(4)^N))/pi/M*2 2285 8562 160 100 0 0 0 2285.659 8562.332 255;255;255;255 true true true false false true 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers e7e40e74-e4a9-4cfa-8865-866414e101d5 Digit Scroller Digit Scroller false 0 12 Digit Scroller 11 3.0 509 8636 250 20 509.7244 8636.291 ce46b74e-00c9-43c4-805a-193b69ea4a11 Multiplication Mathematical multiplication true 7589060f-5d73-4d28-9ae2-cdee4613db19 Multiplication Multiplication 818 8479 70 44 843 8501 2 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 First item for multiplication f1e2ab25-8f12-4966-beaf-aabe3350f631 A A true feacff2e-50e3-4537-ac1b-4450d7a3cae4 1 820 8481 11 20 825.5 8491 Second item for multiplication 5457775d-df24-4b87-9fa0-0f9070a5b613 B B true 1fc3214e-bc6b-438b-a612-257a7963060a 1 820 8501 11 20 825.5 8511 Result of multiplication d0fd4455-ef6a-40ab-bf66-a1a06d0f359b Result Result false 0 855 8481 31 40 870.5 8501 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 2d3182bc-0ec5-416a-a889-562bebb78f4d Relay false d0fd4455-ef6a-40ab-bf66-a1a06d0f359b 1 907 8499 40 16 927 8507 ce46b74e-00c9-43c4-805a-193b69ea4a11 Multiplication Mathematical multiplication true 3739f329-0285-4b2e-ac4c-a8d100233f51 Multiplication Multiplication 773 8335 70 44 798 8357 2 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 First item for multiplication b748839d-75e4-4877-b212-7eddb6662943 A A true 6227facb-1359-4bc9-8a73-12332e396c9c 1 775 8337 11 20 780.5 8347 Second item for multiplication 3541e88a-f4fd-4d36-87a1-cc0f6cdb1331 B B true 1fc3214e-bc6b-438b-a612-257a7963060a 1 775 8357 11 20 780.5 8367 Result of multiplication 5ce031d5-550e-4710-ac8a-f97d9d9ec811 Result Result false 0 810 8337 31 40 825.5 8357 78fed580-851b-46fe-af2f-6519a9d378e0 Power Raise a value to a power. true f775f8ef-72f5-4450-9f33-f67c7addf15e Power Power 684 8432 85 44 724 8454 The item to be raised 6ff9cadb-ce5e-4bbe-a18e-4c62289ec994 A A false 0 686 8434 26 20 699 8444 1 1 {0} Grasshopper.Kernel.Types.GH_String false 2 The exponent 6241507d-85d7-495b-8812-bb17ccd1f133 B B false 390d4b65-0f4c-4379-bea3-25ff8980556d 1 686 8454 26 20 699 8464 A raised to the B power 1fc3214e-bc6b-438b-a612-257a7963060a Result Result false 0 736 8434 31 40 751.5 8454 9c007a04-d0d9-48e4-9da3-9ba142bc4d46 Subtraction Mathematical subtraction true ac482cf8-8042-478c-a153-b403db159440 Subtraction Subtraction 593 8555 85 44 633 8577 2 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 First operand for subtraction 16deb2d3-84bc-41f7-a6a0-152e9348f5f1 A A true e7e40e74-e4a9-4cfa-8865-866414e101d5 1 595 8557 26 20 608 8567 Second operand for subtraction 9ea16d4f-3008-444c-b245-36c78633a93b B B true 0 595 8577 26 20 608 8587 1 1 {0} Grasshopper.Kernel.Types.GH_String false 1 Result of subtraction 390d4b65-0f4c-4379-bea3-25ff8980556d Result Result false 0 645 8557 31 40 660.5 8577 c552a431-af5b-46a9-a8a4-0fcbc27ef596 Group 1 255;255;255;255 A group of Grasshopper objects e4a3a123-a46a-4ffe-9866-096c857bfd95 1706b589-82a3-484e-8bb3-c9784fb4ea88 eefae472-b11a-4e30-a3af-f2edf06a8f62 3 a7e16223-7e7f-47a9-a6a4-1798355eced1 Group 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 08f95884-61d8-41f8-9981-a49261f89170 Division Division 134 220 49 44 163 242 Item to divide (dividend) 15f59732-d55b-4064-bfcf-d92a0d4a7554 A false f1fbb0e1-fe5e-40d2-841e-732012e40657 1 136 222 15 20 143.5 232 Item to divide with (divisor) 13d0d6f9-cb1f-40ca-910c-0316229f403f B false 0 136 242 15 20 143.5 252 1 1 {0} Grasshopper.Kernel.Types.GH_Integer 2 The result of the Division f9f71a55-f522-4a2a-a443-1fc9358ef7f9 Result false 0 175 222 6 40 178 242 2b2a4145-3dff-41d4-a8de-1ea9d29eef33 Interpolate Create an interpolated curve through a set of points. true 8efc9f10-8cb0-403b-8685-a3d111daf33a Interpolate Interpolate 546 -273 225 84 719 -231 1 Interpolation points 8a719936-af83-4cbf-b0ed-2084e2c21b39 Vertices Vertices false 7f737f09-6227-4105-9ed2-0609a54e83ce 1 548 -271 159 20 627.5 -261 Curve degree 83765e12-d3f7-43b5-8493-73ab54796ff6 Degree Degree false 0 548 -251 159 20 627.5 -241 1 1 {0} 3 Periodic curve 099b5b20-3e92-4e05-8202-860af9f51fd3 Periodic Periodic false 0 548 -231 159 20 627.5 -221 1 1 {0} false Knot spacing (0=uniform, 1=chord, 2=sqrtchord) 96546139-2197-41d8-a62f-50f7801e11f7 KnotStyle KnotStyle false 0 548 -211 159 20 627.5 -201 1 1 {0} 2 Resulting nurbs curve fe2c7fd3-a20d-49fe-8b1d-09361e90e45d Curve Curve false 0 731 -271 38 26 750 -257.6667 Curve length a2c92f41-aee7-4cf7-a313-7c3e8badc964 Length Length false 0 731 -245 38 27 750 -231 Curve domain a05c8f68-8b87-484d-9af1-b77025d32b4f Domain Domain false 0 731 -218 38 27 750 -204.3333 f31d8d7a-7536-4ac8-9c96-fde6ecda4d0a DIFERENCE CURWATURE SHAPED GRAPH 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8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 d5967b9f-e8ee-436b-a8ad-29fdcecf32d5 17 b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b Second item for multiplication 806c65ee-b8de-4133-87d0-9b4c6414ae56 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 -85 47 20 1301.5 -75 Second item for multiplication 599673ec-baa6-4810-ab0d-b293bbd9bb44 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 -65 47 20 1301.5 -55 Second item for multiplication fe56a2bc-596d-45fb-9cb3-e28b207d7009 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 -45 47 20 1301.5 -35 Second item for multiplication 2f8549e0-84db-49b3-9fd7-857b8fbfa7c7 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 -25 47 20 1301.5 -15 Second item for multiplication f6ee1b2e-83fe-4987-9449-6c078a80bfaa true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 -5 47 20 1301.5 5 Second item for multiplication ab6c7f05-12aa-4d56-b76d-a62f99dc474e true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 15 47 20 1301.5 25 Second item for multiplication ceed626a-062d-410b-b4f0-75cd654a34e3 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 35 47 20 1301.5 45 Second item for multiplication df6b3153-980c-4183-bc57-d1b62bfa6f4a true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 55 47 20 1301.5 65 Second item for multiplication e284a31c-8ac1-4f31-8a46-c0be553a3b44 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 75 47 20 1301.5 85 Second item for multiplication b6a15caf-2993-4a1f-b467-f63b1154d573 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 95 47 20 1301.5 105 Second item for multiplication c8dc7fba-2802-414c-937c-0ee49475db9a true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 115 47 20 1301.5 125 Second item for multiplication 5782dff4-9e08-4705-8226-1768e292ab2e true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 135 47 20 1301.5 145 Second item for multiplication d965eb26-5b84-469b-934f-8d2e6540c7d1 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 155 47 20 1301.5 165 Second item for multiplication 95251c39-6e20-4161-97ad-92420e60dcc4 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 175 47 20 1301.5 185 Second item for multiplication a15a1581-bcad-4009-b8f8-bed52caa28d9 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 195 47 20 1301.5 205 Second item for multiplication befb5a7c-a7ef-40cf-b5c7-cf2bb32a8ea5 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 215 47 20 1301.5 225 Second item for multiplication b2bd482a-2fe6-41d1-8580-03fe3bbce4c3 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1278 235 47 20 1301.5 245 Rotation angle (in degrees) 6e52f4cc-ea4e-4f66-b842-f541e2736850 true Angle Angle true 0 1278 255 47 20 1301.5 265 1 1 {0} 0 Contains a collection of generic curves 2a5be90d-6a4d-49c0-913c-d70e26179b8b true Curve Curve true 877d17fb-a865-4477-84eb-510ff1f13db3 1 1278 275 47 20 1301.5 285 1 1 {0} Grasshopper.Kernel.Types.GH_String false 256 Contains a collection of generic curves true 2e2b4494-018b-4b3d-9bbb-fc30e0fbb0b7 true Curve Curve true 7428efec-7c04-44c5-9681-0bb0a240649a 1 1278 295 47 20 1301.5 305 2 A wire relay object e3c3b7f6-afca-405a-b0d9-09d8922ada04 true Relay Relay false 0 1349 -85 28 23 1363 -73.23529 2 A wire relay object 9ef3de6a-acfc-4d39-ab7d-19ba384fa423 true Relay Relay false 0 1349 -62 28 24 1363 -49.70588 2 A wire relay object bb37e36f-b619-47cd-acf1-af337ee168cb true Relay Relay false 0 1349 -38 28 23 1363 -26.17647 2 A wire relay object 53d8da27-6143-4850-b0c3-4f1386b53720 true Relay Relay false 0 1349 -15 28 24 1363 -2.647052 2 A wire relay object 3eb6dcf6-830f-4fec-9aa7-1b584e652d50 true Relay Relay false 0 1349 9 28 23 1363 20.88236 2 A wire relay object bb3d4e0b-5b1f-4e69-b754-6fe5a8bc47a8 true Relay Relay false 0 1349 32 28 24 1363 44.41177 2 A wire relay object 0f29d6b5-557d-476d-9fcd-1e35aafe35d6 true Relay Relay false 0 1349 56 28 23 1363 67.94119 2 A wire relay object 162f3737-68e0-43d9-9000-edca353ab239 true Relay Relay false 0 1349 79 28 24 1363 91.47061 2 A wire relay object 971a627c-1390-4c0a-853b-fb1abcf48166 true Relay Relay false 0 1349 103 28 23 1363 115 2 A wire relay object c40aa5fa-e68d-4bb2-abe6-a2e720c42943 true Relay Relay false 0 1349 126 28 24 1363 138.5294 2 A wire relay object 6c12a62b-5fa4-4cb8-880b-d3fa7400b8e5 true Relay Relay false 0 1349 150 28 23 1363 162.0589 2 A wire relay object f8dd3c7e-c3df-45d9-8cb9-a5f3d4eaa8f6 true Relay Relay false 0 1349 173 28 24 1363 185.5883 2 A wire relay object f08a4db8-220e-46bf-93e7-68d63cc48dda true Relay Relay false 0 1349 197 28 23 1363 209.1177 2 A wire relay object 4ec05b12-4c8a-486f-8714-ddc1a05d9a38 true Relay Relay false 0 1349 220 28 24 1363 232.6471 2 A wire relay object 84ab60b5-0405-4c03-8a94-29477c44ce75 true Relay Relay false 0 1349 244 28 23 1363 256.1765 2 A wire relay object f6a14f25-35ed-44f6-8764-6a7f6d50d3d1 true Relay Relay false 0 1349 267 28 24 1363 279.706 2 A wire relay object 1327e01f-51fb-4c31-b529-4416006b1a3e true Relay Relay false 0 1349 291 28 24 1363 303.2354 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers 4cc7e1dc-1b86-4199-baab-1a972e890666 Digit Scroller Digit Scroller false 0 12 Digit Scroller 2 0.5000000000 976 -140 250 20 976.9166 -139.8604 f31d8d7a-7536-4ac8-9c96-fde6ecda4d0a DIFERENCE CURWATURE LINEAR GRAPH 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true iVBORw0KGgoAAAANSUhEUgAAABgAAAAYCAYAAADgdz34AAAABGdBTUEAALGPC/xhBQAAAAlwSFlzAAAOwgAADsIBFShKgAAAAJhJREFUSEvdk4EKgCAMRPfF9gn9WX9Wq5MtEmdKbQQ9GClud4cY/Q6WbwgQ13LnKh5mAsKEle8MeCLm1C9pb2I2QHxNtKC2RLNVeiYjTWyDIxkEZPuKykDTj6QboTZwTA8KA+/0oDRwTg9OgwhxUBh4Xo2SDaLSg5waBrJ3J//uL66mG4zxNGX9BMzezmuDR4UQKg5CxQ2IduVGkrvn0vkHAAAAAElFTkSuQmCC 888bc43d-bf25-48c3-aa36-9d17285125d3 true DIFERENCE CURWATURE LINEAR GRAPH DIFERENCE CURWATURE LINEAR GRAPH false 20 05f34f0f-4f8e-4462-82aa-5e30fb909cb5 0bdbe3fa-89dd-406d-8c80-6cf3cb28ec67 19201f27-e961-4cd6-a1da-dbd604d23fd7 19a6753b-a9d0-4f37-861b-7022988355e1 240848bf-eb4d-46d2-8106-6ebbac5ab881 2410d7ff-a8b9-400f-890a-b069943f1167 2cdfbce2-6ecc-4836-aa8e-0f85b8a74976 47a31173-f0f1-44a2-a201-5dd8d33b6071 4cc97740-caa8-4b16-a424-4ec69e765379 51f9a605-042d-48b5-a72d-840602c3318e 5feab2b9-bbc8-4117-abda-c735008c5e50 6c1cd4cb-f26d-4baf-a9d0-c412a73f153e 827a1037-9bab-4f09-a804-99da30648e96 876ffa66-c4c5-4e61-8635-2e6563eb9e15 aeb0c3ab-df35-499c-a9ea-aaefe2199a0a c5b9232a-b0ce-47aa-8983-9a32708608c6 cf57d458-4d9e-44c4-85c3-316fb4603137 d0af14ea-590d-4f8b-80a0-c1bfc02e22c3 d364e931-f072-4723-9456-b543274ed03f f24ce9b2-701f-48ec-9ed2-cb2f2bd4896c 9492d9b1-8423-4285-a424-c395dc7f8b36 17704c02-f561-4245-bc67-2eaf7cd1e000 f9b9305d-1e20-4067-946a-b44d88604308 45329fda-4528-406d-a823-54e35ac6ff74 34281050-3848-44ac-894c-a3119ffa069f 88ea5216-22ee-43b9-bf4a-bf732fa4678f e294df03-baaa-4b12-b92f-e97f42ff34ec 357ceb68-e651-4e13-b8c4-6a838be2149a 98a7b290-1680-4c8f-91d6-4080e52ada8f b4c2ea06-2f42-44c4-9b4a-584b407a7f6a ad15254d-f361-46c9-90d6-b5db1b60e3d2 80bcd5c0-5458-4110-bc35-aad5d5e50148 9096d595-00e9-44ef-bf8b-df7cba4ba2ea 9d9970f3-5ab6-40b5-b0f2-d257ffef222d 054cb35f-8548-43e7-8129-2bbf3a113dd2 e9837f44-fe89-4576-a1ba-d864d9176564 7979dd58-784d-428c-ab41-1f9a01cb3b5b d134b7cd-fb62-4a2b-a901-fec5a2d783e9 693656d3-ab20-45a4-a99a-8ca5a8f9ac36 3c10a1a1-09f5-411d-ae06-13d21b0f7cd7 1495 -116 110 404 1591 86 20 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 2e3ab970-8545-46bb-836c-1c11e5610bce d5967b9f-e8ee-436b-a8ad-29fdcecf32d5 0 Vector {y} component 240848bf-eb4d-46d2-8106-6ebbac5ab881 true Y component Y component true 0 1497 -114 82 20 1538 -104 1 1 {0} 8 Second item for multiplication 19201f27-e961-4cd6-a1da-dbd604d23fd7 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1497 -94 82 20 1538 -84 Vector {y} component 827a1037-9bab-4f09-a804-99da30648e96 true Y component Y component true 0 1497 -74 82 20 1538 -64 1 1 {0} 7 Second item for multiplication 19a6753b-a9d0-4f37-861b-7022988355e1 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1497 -54 82 20 1538 -44 Vector {y} component 47a31173-f0f1-44a2-a201-5dd8d33b6071 true Y component Y component true 0 1497 -34 82 20 1538 -24 1 1 {0} 6 Second item for multiplication 51f9a605-042d-48b5-a72d-840602c3318e true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1497 -14 82 20 1538 -4 Vector {y} component f24ce9b2-701f-48ec-9ed2-cb2f2bd4896c true Y component Y component true 0 1497 6 82 20 1538 16 1 1 {0} 5 Second item for multiplication c5b9232a-b0ce-47aa-8983-9a32708608c6 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1497 26 82 20 1538 36 Vector {y} component 2410d7ff-a8b9-400f-890a-b069943f1167 true Y component Y component true 0 1497 46 82 20 1538 56 1 1 {0} 4 Second item for multiplication 876ffa66-c4c5-4e61-8635-2e6563eb9e15 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1497 66 82 20 1538 76 Vector {y} component 0bdbe3fa-89dd-406d-8c80-6cf3cb28ec67 true Y component Y component true 0 1497 86 82 20 1538 96 1 1 {0} 3 Second item for multiplication 5feab2b9-bbc8-4117-abda-c735008c5e50 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1497 106 82 20 1538 116 Vector {y} component 6c1cd4cb-f26d-4baf-a9d0-c412a73f153e true Y component Y component true 0 1497 126 82 20 1538 136 1 1 {0} 2 Second item for multiplication 2cdfbce2-6ecc-4836-aa8e-0f85b8a74976 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1497 146 82 20 1538 156 Vector {y} component d0af14ea-590d-4f8b-80a0-c1bfc02e22c3 true Y component Y component true 0 1497 166 82 20 1538 176 1 1 {0} 1 Second item for multiplication 05f34f0f-4f8e-4462-82aa-5e30fb909cb5 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1497 186 82 20 1538 196 Vector {y} component cf57d458-4d9e-44c4-85c3-316fb4603137 true Y component Y component true 0 1497 206 82 20 1538 216 1 1 {0} 0 Second item for multiplication 4cc97740-caa8-4b16-a424-4ec69e765379 true B B true 4cc7e1dc-1b86-4199-baab-1a972e890666 1 1497 226 82 20 1538 236 Number of segments aeb0c3ab-df35-499c-a9ea-aaefe2199a0a true Count Count true 877d17fb-a865-4477-84eb-510ff1f13db3 1 1497 246 82 20 1538 256 1 1 {0} 10 Contains a collection of generic curves true d364e931-f072-4723-9456-b543274ed03f true Curve Curve true 7428efec-7c04-44c5-9681-0bb0a240649a 1 1497 266 82 20 1538 276 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 7428efec-7c04-44c5-9681-0bb0a240649a Relay false fe2c7fd3-a20d-49fe-8b1d-09361e90e45d 1 1201 307 40 16 1221 315 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 877d17fb-a865-4477-84eb-510ff1f13db3 Relay false f1fbb0e1-fe5e-40d2-841e-732012e40657 1 1188 261 40 16 1208 269 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values f18af49f-2c36-475e-9666-3bd16c62f28a Panel false 0 0 0.000510441291375068915 -347 121 160 84 0 0 0 -346.612 121.1601 2 255;255;255;255 true true true false false true b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 74e72892-1a4b-4eae-af9f-1aa7c27d779a Relay false c48f2a86-4388-4b9b-a155-5f9d30e70ed5 1 -385 -117 40 16 -365 -109 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 1b67eee0-1eda-4d33-a2d9-8cf379c87ae7 Relay false 118e674e-db63-4847-b023-71a1ecd9c236 1 -387 -15 40 16 -367 -7 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 1e05010e-b50b-4830-b2e7-d7ec43b1b1bc Relay false c2694786-f0d6-43b4-a7b8-e3a0d5b6af9f 1 -389 35 40 16 -369 43 758d91a0-4aec-47f8-9671-16739a8a2c5d Format Format some data using placeholders and formatting tags true 0dc3cf42-8c57-4e88-9c7f-ebfcdb8df114 Format Format -331 -153 130 64 -239 -121 3 3ede854e-c753-40eb-84cb-b48008f14fd4 7fa15783-70da-485c-98c0-a099e6988c3e 8ec86459-bf01-4409-baee-174d0d2b13d0 1 3ede854e-c753-40eb-84cb-b48008f14fd4 Text format 029c7b0e-8214-4576-bbd2-fe0901352c09 Format Format false 0 -329 -151 78 20 -290 -141 1 1 {0} false {0:R} Formatting culture c10e2589-2e0e-44f2-8c2f-494f97d8cd98 Culture Culture false 0 -329 -131 78 20 -290 -121 1 1 {0} 127 Data to insert at {0} placeholders db915e2c-2049-44b0-86a7-8e0a05caa8bd false Data 0 0 true 74e72892-1a4b-4eae-af9f-1aa7c27d779a 1 -329 -111 78 20 -290 -101 Formatted text fe9b2349-403b-4c80-bf8e-3415f7e9017a Text Text false 0 -227 -151 24 60 -215 -121 758d91a0-4aec-47f8-9671-16739a8a2c5d Format Format some data using placeholders and formatting tags true 83c699a3-3a60-468e-8e09-9fc0126b99bc Format Format -331 -69 130 64 -239 -37 3 3ede854e-c753-40eb-84cb-b48008f14fd4 7fa15783-70da-485c-98c0-a099e6988c3e 8ec86459-bf01-4409-baee-174d0d2b13d0 1 3ede854e-c753-40eb-84cb-b48008f14fd4 Text format 4410e18b-8b01-4918-9a82-49048c3b2a4b Format Format false 0 -329 -67 78 20 -290 -57 1 1 {0} false {0:R} Formatting culture 98b62a3d-1fb9-4cc6-9c2d-503672ff8b96 Culture Culture false 0 -329 -47 78 20 -290 -37 1 1 {0} 127 Data to insert at {0} placeholders ec3f478e-2b31-42f3-88b4-9cffd1577e1a false Data 0 0 true 1b67eee0-1eda-4d33-a2d9-8cf379c87ae7 1 -329 -27 78 20 -290 -17 Formatted text 07b602e6-3f30-4265-8f7b-014173103908 Text Text false 0 -227 -67 24 60 -215 -37 758d91a0-4aec-47f8-9671-16739a8a2c5d Format Format some data using placeholders and formatting tags true 19a54d3c-b7b7-4d53-b8d0-f7fa93338ec6 Format Format -330 14 130 64 -238 46 3 3ede854e-c753-40eb-84cb-b48008f14fd4 7fa15783-70da-485c-98c0-a099e6988c3e 8ec86459-bf01-4409-baee-174d0d2b13d0 1 3ede854e-c753-40eb-84cb-b48008f14fd4 Text format 8f443e65-05a0-4035-8bc2-c3635e897552 Format Format false 0 -328 16 78 20 -289 26 1 1 {0} false {0:R} Formatting culture 9bb27c66-c1cf-4073-9393-c8ac657e997a Culture Culture false 0 -328 36 78 20 -289 46 1 1 {0} 127 Data to insert at {0} placeholders 8dc78f70-6c2b-4abe-80fc-fec3aea4db06 false Data 0 0 true 1e05010e-b50b-4830-b2e7-d7ec43b1b1bc 1 -328 56 78 20 -289 66 Formatted text 12a00da0-f03d-412c-99e3-24174bf36562 Text Text false 0 -226 16 24 60 -214 46 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 23d9f3a2-1454-4364-a19c-8801a4aa8e4a Relay false 7fbc35ee-c93d-4288-b414-b6d63a02edf6 1 57 55 40 16 77 63 290f418a-65ee-406a-a9d0-35699815b512 Scale NU Scale an object with non-uniform factors. true 8d1f6b3d-13f3-465f-b3c7-56564b00752c Scale NU Scale NU 153 -193 226 121 315 -132 Base geometry f948e3b2-cfd7-4eef-86a5-50f9dad72123 Geometry Geometry true c88c0b93-14b6-40b3-a27f-00ff79f7b13c 1 155 -191 148 20 237 -181 Base plane 432aecca-5eaa-44b6-b0f2-18b882cfca7b Plane Plane false 0 155 -171 148 37 237 -152.5 1 1 {0} 0 0 0 1 0 0 0 1 0 Scaling factor in {x} direction 5f5ed2c5-b1d2-4d06-b26c-f3b52b48dfce 1/X Scale X Scale X false c48f2a86-4388-4b9b-a155-5f9d30e70ed5 1 155 -134 148 20 237 -124 1 1 {0} 1 Scaling factor in {y} direction 511a0238-63d0-430f-a55c-66dc2b094d0c 1/X Scale Y Scale Y false c2694786-f0d6-43b4-a7b8-e3a0d5b6af9f 1 155 -114 148 20 237 -104 1 1 {0} 1 Scaling factor in {z} direction d91b01d3-f368-46c1-aeaf-e0c7339bfdc7 Scale Z Scale Z false 0 155 -94 148 20 237 -84 1 1 {0} 1 Scaled geometry 7f737f09-6227-4105-9ed2-0609a54e83ce Geometry Geometry false 0 327 -191 50 58 352 -161.75 Transformation data 67e926b8-0b7a-485b-9f8b-0577bd48e6c3 Transform Transform false 0 327 -133 50 59 352 -103.25 fb6aba99-fead-4e42-b5d8-c6de5ff90ea6 DotNET VB Script (LEGACY) A VB.NET scriptable component true 193810d5-127a-4ef2-93a2-2df5119cf6ec DotNET VB Script (LEGACY) Turtle 0 Dim i As Integer Dim dir As New On3dVector(1, 0, 0) Dim pos As New On3dVector(0, 0, 0) Dim axis As New On3dVector(0, 0, 1) Dim pnts As New List(Of On3dVector) pnts.Add(pos) For i = 0 To Forward.Count() - 1 Dim P As New On3dVector dir.Rotate(Left(i), axis) P = dir * Forward(i) + pnts(i) pnts.Add(P) Next Points = pnts 960 1569 104 44 1015 1591 1 1 2 Script Variable Forward Script Variable Left 84fa917c-1ed8-4db3-8be1-7bdc4a6495a2 84fa917c-1ed8-4db3-8be1-7bdc4a6495a2 true true Forward Left true true 2 Print, Reflect and Error streams Output parameter Points 3ede854e-c753-40eb-84cb-b48008f14fd4 8ec86459-bf01-4409-baee-174d0d2b13d0 true true Output Points false false 1 false Script Variable Forward 23d5f74b-2615-4df2-98d7-e702968086f3 Forward Forward true 1 true 147ceb0a-e550-4da4-96ca-8ca546338041 1 8e991e99-5fb8-41e1-928d-1bba8fb9f7d7 962 1571 41 20 982.5 1581 1 false Script Variable Left cd494ec9-299f-4eff-af9f-62e91ff30a17 Left Left true 1 true 3e0631e2-acee-4952-b380-ca85b2802769 1 8e991e99-5fb8-41e1-928d-1bba8fb9f7d7 962 1591 41 20 982.5 1601 Print, Reflect and Error streams f1122156-86f9-4e0a-96ef-9a9fde4cd825 Output Output false 0 1027 1571 35 20 1044.5 1581 Output parameter Points 35165a66-0f4a-41c4-96bb-4865345e7d7e Points Points false 0 1027 1591 35 20 1044.5 1601 e64c5fb1-845c-4ab1-8911-5f338516ba67 Series Create a series of numbers. true 3ccd8fbe-c80d-419d-bf32-d57c2bb4d8e6 Series Series 393 1730 89 64 437 1762 First number in the series 977bf3e7-0d24-45a9-a6b8-e3d9f6e04438 Start Start false 073ee4e1-f1c0-4fe9-b5fa-b550be09f47e 1 395 1732 30 20 410 1742 1 1 {0} 0 Step size for each successive number 254feffa-5877-4f43-9c51-74b6cb770fe8 Step Step false 073ee4e1-f1c0-4fe9-b5fa-b550be09f47e 1 395 1752 30 20 410 1762 1 1 {0} 1 Number of values in the series 16a91bf3-6653-476a-a5ad-6b5eea6b39c7 Count Count false b62d6a8f-bc00-44f0-b8d4-dcc23bcad9a7 1 395 1772 30 20 410 1782 1 1 {0} 500 1 Series of numbers 13c1bcbb-6f8e-4b2c-aa4f-73a4dccf97a7 Series Series false 0 449 1732 31 60 464.5 1762 dd8134c0-109b-4012-92be-51d843edfff7 Duplicate Data Duplicate data a predefined number of times. true 6c965c03-c748-47af-9b8c-55ba80a7c206 Duplicate Data Duplicate Data 384 1573 102 64 447 1605 1 Data to duplicate 371f3cbb-f7cb-4b93-85fa-2553b97d0873 Data Data false ff15de5e-5cfc-4151-a598-a645878d2f45 1 386 1575 49 20 410.5 1585 Number of duplicates c21c1053-7352-4746-afd1-3a086e340bbc Number Number false b62d6a8f-bc00-44f0-b8d4-dcc23bcad9a7 1 386 1595 49 20 410.5 1605 1 1 {0} 500 Retain list order d4b874be-26df-49b4-b504-a68703706422 Order Order false 0 386 1615 49 20 410.5 1625 1 1 {0} true 1 Duplicated data a8d4b2ce-0382-4b07-ad56-e45e8d6691c4 Data Data false 0 459 1575 25 60 471.5 1605 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers ce7a6538-1307-4799-aa09-c6d0b388aa6b Digit Scroller . false 0 12 . 11 1024.0 -143 1722 250 20 -142.1696 1722.402 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers db90c791-fd03-47f7-9d9f-fce64245413a Digit Scroller ЯR false 0 12 ЯR 1 0.12177142743 -138 1624 250 20 -137.4702 1624.085 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers 80528f19-96fa-43a4-9544-823f9ed395d3 Digit Scroller ° false 0 12 ° 2 0.0003959052 -140 1667 250 20 -139.5521 1667.344 a4cd2751-414d-42ec-8916-476ebf62d7fe Radians Convert an angle specified in degrees to radians true 9393d860-fd26-4ce8-8516-240665f8d209 Radians Radians 238 1631 108 28 293 1645 Angle in degrees 23aa7fad-d7c7-468b-8fe7-cb92d958d0af Degrees Degrees false 256fa74d-8451-4366-b97f-fb31ceb7790f 1 240 1633 41 24 260.5 1645 Angle in radians 073ee4e1-f1c0-4fe9-b5fa-b550be09f47e Radians Radians false 0 305 1633 39 24 324.5 1645 fbac3e32-f100-4292-8692-77240a42fd1a Point Contains a collection of three-dimensional points true 4be4d01e-f1cd-4466-afb7-4c701c8415b6 Point Point false 35165a66-0f4a-41c4-96bb-4865345e7d7e 1 888 1718 50 24 913.2098 1730.519 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object b62d6a8f-bc00-44f0-b8d4-dcc23bcad9a7 Relay false 5078d0e9-110e-4e9f-a4a7-8a5d53101b3e 1 249 1693 40 16 269 1701 be52336f-a2e1-43b1-b5f5-178ba489508a Circle Fit Fit a circle to a collection of points. true 1e1c32a1-ce8d-4957-8d6b-20e1e7f00d58 Circle Fit Circle Fit 366 1991 104 64 411 2023 1 Points to fit f1050762-10a2-43ca-8bff-809dcce2a36f Points Points false 4be4d01e-f1cd-4466-afb7-4c701c8415b6 1 368 1993 31 60 383.5 2023 Resulting circle 0e3da8fe-67d3-42b3-ba8d-a7dfea586d42 Circle Circle false 0 423 1993 45 20 445.5 2003 Circle radius 1bfdc1a4-f5f2-4440-8ac4-89a785d20c79 Radius Radius false 0 423 2013 45 20 445.5 2023 Maximum distance between circle and points 27b55d9b-ea60-4f36-964a-16c736644482 Deviation Deviation false 0 423 2033 45 20 445.5 2043 9df5e896-552d-4c8c-b9ca-4fc147ffa022 Expression Evaluate an expression cos((4*atan(1))/N) true 74efbc8f-3410-4e24-aada-2bcab8a679bf Expression Expression 517 1953 215 28 615 1967 1 ba80fd98-91a1-4958-b6a7-a94e40e52bdb 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Expression variable 4f02194f-7531-4362-9ec9-d41464997f0f Variable N N true b62d6a8f-bc00-44f0-b8d4-dcc23bcad9a7 1 519 1955 11 24 524.5 1967 Result of expression e71a1b21-deda-4ee0-8783-f40fbe34bf91 Result Result false 0 699 1955 31 24 714.5 1967 4d2a06bd-4b0f-4c65-9ee0-4220e4c01703 Scale Scale an object uniformly in all directions. true 0868edf0-bef8-44ba-bfff-f419e7d67d07 Scale Scale 540 2098 126 64 602 2130 Base geometry 2eb8844c-6be8-465d-9f45-fe8cda686713 Geometry Geometry true 0e3da8fe-67d3-42b3-ba8d-a7dfea586d42 1 542 2100 48 20 566 2110 Center of scaling 460a9868-24fc-4fc4-b670-679bab81e8e1 Center Center false e7ec9ac1-1a14-4f10-af2d-92b279404e69 1 542 2120 48 20 566 2130 1 1 {0} 0 0 0 Scaling factor 875d2dba-b4e5-42c5-b511-4c5d1b9a78c8 Factor Factor false e71a1b21-deda-4ee0-8783-f40fbe34bf91 1 542 2140 48 20 566 2150 1 1 {0} 0.5 Scaled geometry ab3f2f73-b91a-4c6d-8374-0389102171db Geometry Geometry false 0 614 2100 50 30 639 2115 Transformation data b2e95054-06fc-4de7-a108-3a97edfda004 Transform Transform false 0 614 2130 50 30 639 2145 2e205f24-9279-47b2-b414-d06dcd0b21a7 Area Solve area properties for breps, meshes and planar closed curves. true e0c086dd-125a-4893-b52d-269284ba8332 Area Area 354 2108 118 44 416 2130 Brep, mesh or planar closed curve for area computation f782124a-d5de-4023-a7a5-af4b9cf9feb9 Geometry Geometry false 0e3da8fe-67d3-42b3-ba8d-a7dfea586d42 1 356 2110 48 40 380 2130 Area of geometry 0c7ff78f-224e-4115-9e24-ae9d1967091c Area Area false 0 428 2110 42 20 449 2120 Area centroid of geometry e7ec9ac1-1a14-4f10-af2d-92b279404e69 Centroid Centroid false 0 428 2130 42 20 449 2140 ce46b74e-00c9-43c4-805a-193b69ea4a11 Multiplication Mathematical multiplication true 461fc3ce-2791-4cc9-8c3e-25389656f03d Multiplication Multiplication 665 2010 70 44 690 2032 2 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 First item for multiplication a247e566-2790-42d7-8a97-f5d9300932cc A A true e71a1b21-deda-4ee0-8783-f40fbe34bf91 1 667 2012 11 20 672.5 2022 Second item for multiplication 8c992c09-9162-4193-ada2-ca180f2bff01 B B true 1bfdc1a4-f5f2-4440-8ac4-89a785d20c79 1 667 2032 11 20 672.5 2042 Result of multiplication 5e47cae8-ad95-4b4c-a1af-feec999bc560 Result Result false 0 702 2012 31 40 717.5 2032 9df5e896-552d-4c8c-b9ca-4fc147ffa022 Expression Evaluate an expression .5*L*(1/SIN(π/N)) true eea9f1d0-8fd2-4314-9989-8302e677101f Expression Expression 605 1852 207 44 699 1874 2 ba80fd98-91a1-4958-b6a7-a94e40e52bdb ba80fd98-91a1-4958-b6a7-a94e40e52bdb 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Expression variable 37cc8cad-4cf7-4da7-ae8b-baaa7447ca62 Variable L L true db90c791-fd03-47f7-9d9f-fce64245413a 1 607 1854 11 20 612.5 1864 Expression variable 1bea666f-7b30-4858-b2fb-d70e9f75df7a Variable N N true b62d6a8f-bc00-44f0-b8d4-dcc23bcad9a7 1 607 1874 11 20 612.5 1884 Result of expression 3c9661e6-e5b9-4a08-afce-8c2037330161 Result Result false 0 779 1854 31 40 794.5 1874 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 646f35d6-4eb6-4dd5-8cac-4f8f0c9b5977 Panel false 0 3c9661e6-e5b9-4a08-afce-8c2037330161 1 Double click to edit panel content… 891 1854 160 100 0 0 0 891.1822 1854.321 255;255;255;255 true true true false false true 9df5e896-552d-4c8c-b9ca-4fc147ffa022 Expression Evaluate an expression R/(.5*(1/SIN(π/N))) true 215d4120-1cff-48de-94bd-f7b73ce01e75 Expression Expression 284 1493 224 44 386 1515 2 ba80fd98-91a1-4958-b6a7-a94e40e52bdb ba80fd98-91a1-4958-b6a7-a94e40e52bdb 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Expression variable 8039b10c-7cc8-4915-bdb9-ff99c2f805d2 Variable R R true 375085a7-85bd-47e7-800b-36aa5972104d 1 286 1495 11 20 291.5 1505 Expression variable fb427817-9f0f-447d-860a-e480261c5a5f Variable N N true b62d6a8f-bc00-44f0-b8d4-dcc23bcad9a7 1 286 1515 11 20 291.5 1525 Result of expression ff15de5e-5cfc-4151-a598-a645878d2f45 Result Result false 0 475 1495 31 40 490.5 1515 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 7de561f6-268d-461f-a4c8-eda519d78324 Division Division 55 1790 90 44 100 1812 Item to divide (dividend) 4b3622ac-b6f6-4c84-aaa1-2e40b4eb5e9a A A false 0 57 1792 31 20 72.5 1802 1 1 {0} Grasshopper.Kernel.Types.GH_String false 360 Item to divide with (divisor) 164f2f15-bca1-48ba-aacd-831d6c5118cf B B false ce7a6538-1307-4799-aa09-c6d0b388aa6b 1 57 1812 31 20 72.5 1822 The result of the Division b62c1df8-8506-432d-a6e8-a67f16f863f9 Result Result false 0 112 1792 31 40 127.5 1812 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 755afd66-a8b6-4eda-b11d-813843840b3a Panel false 0 1bfdc1a4-f5f2-4440-8ac4-89a785d20c79 1 Double click to edit panel content… 549 1446 160 20 0 0 0 549.2184 1446.83 255;255;255;255 false false true false false true 6ec97ea8-c559-47a2-8d0f-ce80c794d1f4 Reverse List Reverse the order of a list. true b2fe30d5-a712-4905-b391-821ae44f7d1f Reverse List Reverse List 468 1668 66 28 501 1682 1 Base list fb6b39e9-a6af-4a51-9455-a92fd1fa3dfd List List false 13c1bcbb-6f8e-4b2c-aa4f-73a4dccf97a7 1 470 1670 19 24 479.5 1682 1 Reversed list 8646f974-91ff-408b-aa4d-7fb4f8df1cf2 List List false 0 513 1670 19 24 522.5 1682 a3371040-e552-4bc8-b0ff-10a840258e88 Negative Compute the negative of a value. true 85d22e58-6d1c-4fc5-a0e6-db45a35dbf06 Negative Negative 667 1764 88 28 710 1778 Input value b9f327a5-f681-4bab-906c-b34f3e2c24e1 Value Value false 13c1bcbb-6f8e-4b2c-aa4f-73a4dccf97a7 1 669 1766 29 24 683.5 1778 Output value 3ebf92f1-2275-4471-867c-81168d14be25 Result Result false 0 722 1766 31 24 737.5 1778 3cadddef-1e2b-4c09-9390-0e8f78f7609f Merge Merge a bunch of data streams true 0e44c07d-1872-4e2f-ab76-00ed6aed824c Merge Merge 612 1633 122 84 673 1675 4 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 2 Data stream 1 8054d771-018f-4a32-b4e5-5bd79d5d438e 1 false Data 1 D1 true 8646f974-91ff-408b-aa4d-7fb4f8df1cf2 1 614 1635 47 20 645.5 1645 2 Data stream 2 05fec144-1dbd-44c0-997c-ab726c498b6d 1 false Data 2 D2 true 0 614 1655 47 20 645.5 1665 1 1 {0} Grasshopper.Kernel.Types.GH_String false 0 2 Data stream 3 38e4e3db-338c-43c8-9e0d-578f9c881434 1 false Data 3 D3 true 3ebf92f1-2275-4471-867c-81168d14be25 1 614 1675 47 20 645.5 1685 2 Data stream 4 b01c5f53-5323-449b-9e7d-3debe1530274 false Data 4 D4 true 0 614 1695 47 20 645.5 1705 2 Result of merge e6883f83-7321-4869-ba03-b28db7c15488 1 Result Result false 0 685 1635 47 80 700.5 1675 6ec97ea8-c559-47a2-8d0f-ce80c794d1f4 Reverse List Reverse the order of a list. true 927c4f5f-09d0-4e2a-86de-669a0fb6834f Reverse List Reverse List 545 1495 66 28 578 1509 1 Base list 2b065ff5-2682-48cb-9eed-eb80e4d5eea3 List List false a8d4b2ce-0382-4b07-ad56-e45e8d6691c4 1 547 1497 19 24 556.5 1509 1 Reversed list 80f75b67-ab0d-49db-88ed-3c55aff68d37 List List false 0 590 1497 19 24 599.5 1509 3cadddef-1e2b-4c09-9390-0e8f78f7609f Merge Merge a bunch of data streams true b2031a4b-8015-4f12-8f56-d042d761e9b2 Merge Merge 711 1489 122 84 772 1531 4 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 2 Data stream 1 f150b0c2-a9d8-48af-85e6-4a08fc493011 1 false Data 1 D1 true 80f75b67-ab0d-49db-88ed-3c55aff68d37 1 713 1491 47 20 744.5 1501 2 Data stream 2 311df633-43a1-4c6d-9575-509e524f8766 1 false Data 2 D2 true 0 713 1511 47 20 744.5 1521 2 Data stream 3 e88f8a6d-a05a-49e3-a7f7-a253f1d7e828 1 false Data 3 D3 true a8d4b2ce-0382-4b07-ad56-e45e8d6691c4 1 713 1531 47 20 744.5 1541 2 Data stream 4 3dcf6632-4c2c-4051-a3e9-ff6ef825e6a7 false Data 4 D4 true 0 713 1551 47 20 744.5 1561 2 Result of merge 147ceb0a-e550-4da4-96ca-8ca546338041 1 Result Result false 0 784 1491 47 80 799.5 1531 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values e7210d73-6cfe-4de7-8448-9777503ce93c Panel false 0 e6883f83-7321-4869-ba03-b28db7c15488 1 Double click to edit panel content… 1159 1460 160 479 0 0 0 1159.163 1460.554 255;255;255;255 true true true false false true 59daf374-bc21-4a5e-8282-5504fb7ae9ae List Item 0 Retrieve a specific item from a list. true 30cfd029-92c7-4238-a408-6929948027aa List Item List Item 786 2009 77 64 843 2041 3 8ec86459-bf01-4409-baee-174d0d2b13d0 2e3ab970-8545-46bb-836c-1c11e5610bce cb95db89-6165-43b6-9c41-5702bc5bf137 1 8ec86459-bf01-4409-baee-174d0d2b13d0 1 Base list b6d36df5-0130-4255-b205-5c8692927ee7 List List false 4be4d01e-f1cd-4466-afb7-4c701c8415b6 1 788 2011 43 20 809.5 2021 Item index a40829e0-25d6-4fd6-b645-d96b8a696078 Index Index false 0 788 2031 43 20 809.5 2041 1 1 {0} -1 Wrap index to list bounds a032919e-88c9-48f0-b24a-51aa539e52cc Wrap Wrap false 0 788 2051 43 20 809.5 2061 1 1 {0} true Item at {i'} 231ec3f5-b0c1-43a7-a9fc-ec5669fc1001 false Item i false 0 855 2011 6 60 858 2041 9abae6b7-fa1d-448c-9209-4a8155345841 Deconstruct Deconstruct a point into its component parts. true b9c21b7f-29c8-4753-b2b5-0e8b3c9b4034 Deconstruct Deconstruct 899 2015 120 64 940 2047 Input point 4a29e212-b848-4130-bf63-69e5f1c898ca Point Point false 231ec3f5-b0c1-43a7-a9fc-ec5669fc1001 1 901 2017 27 60 914.5 2047 Point {x} component 9f667c48-eb1e-47a4-8db2-61666d1ea383 X component X component false 0 952 2017 65 20 984.5 2027 Point {y} component 79b1faa2-503e-498d-9a62-75f1113025b9 Y component Y component false 0 952 2037 65 20 984.5 2047 Point {z} component af4c6c2a-e29e-4d24-8c7f-4df53b899191 Z component Z component false 0 952 2057 65 20 984.5 2067 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values fe052eae-c14b-40dd-a64e-a9605baa3660 Panel false 0 b0ca4533-8708-49c9-abb0-994600403593 1 Double click to edit panel content… -75 1436 116 20 0 0 0 -74.75103 1436.004 255;255;255;255 false false true false false true 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 15a9d74b-afeb-4d95-a1bb-fa7477735b92 Panel false 0 a6d6d315-6584-4d1c-9c7a-258d37fd4a9a 1 Double click to edit panel content… -74 1517 118 20 0 0 0 -73.92162 1517.638 255;255;255;255 false false true false false true 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 5cc4f794-4ed4-4a4c-8c41-7786c46d0031 Division Division 1151 2015 70 44 1176 2037 Item to divide (dividend) 5a96fddc-d35b-496a-8a2b-dc4281e0294f A A false 9f667c48-eb1e-47a4-8db2-61666d1ea383 1 1153 2017 11 20 1158.5 2027 Item to divide with (divisor) 81aba054-a3f4-41cb-bf02-15a2fcc92ee7 B B false 79b1faa2-503e-498d-9a62-75f1113025b9 1 1153 2037 11 20 1158.5 2047 The result of the Division 3e1b6d63-9b79-46a8-8d27-80596e7d8b16 Result Result false 0 1188 2017 31 40 1203.5 2037 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 9a773977-be13-458b-81ce-8e026fc440d3 Panel false 0 413475f9-4f88-4628-8645-62eae4dd9722 1 Double click to edit panel content… -75 1477 116 20 0 0 0 -74.95802 1477.779 255;255;255;255 false false true false false true c552a431-af5b-46a9-a8a4-0fcbc27ef596 Group 1 255;255;255;255 A group of Grasshopper objects fe052eae-c14b-40dd-a64e-a9605baa3660 15a9d74b-afeb-4d95-a1bb-fa7477735b92 9a773977-be13-458b-81ce-8e026fc440d3 3 084c7217-4011-493b-8830-63953c7ba928 Group 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 3c066c4e-f82e-4ce0-8965-2fc103a164f1 Division Division 168 1736 49 44 197 1758 Item to divide (dividend) 48454173-6e78-4a1a-90f9-71b265a676a7 A false ce7a6538-1307-4799-aa09-c6d0b388aa6b 1 170 1738 15 20 177.5 1748 Item to divide with (divisor) bd85d2d7-9186-4c60-8c8e-c3db7225fed6 B false 0 170 1758 15 20 177.5 1768 1 1 {0} Grasshopper.Kernel.Types.GH_Integer 2 The result of the Division 5078d0e9-110e-4e9f-a4a7-8a5d53101b3e Result false 0 209 1738 6 40 212 1758 2b2a4145-3dff-41d4-a8de-1ea9d29eef33 Interpolate Create an interpolated curve through a set of points. true 5bd76574-5d5a-44cd-ba49-5798321dd60e Interpolate Interpolate 783 1332 225 84 956 1374 1 Interpolation points 1309ce84-0810-4236-b802-033306a3ffa7 Vertices Vertices false a35486f2-4dac-4ca8-ba16-9b13976474ec 1 785 1334 159 20 864.5 1344 Curve degree ff1b1037-4bac-4f05-b1d6-ed7e744d8455 Degree Degree false 0 785 1354 159 20 864.5 1364 1 1 {0} 3 Periodic curve c55a5646-4ba9-4464-af9b-8c798d388029 Periodic Periodic false 0 785 1374 159 20 864.5 1384 1 1 {0} false Knot spacing (0=uniform, 1=chord, 2=sqrtchord) 33a680a9-7b32-4f98-99cc-5298b63afb44 KnotStyle KnotStyle false 0 785 1394 159 20 864.5 1404 1 1 {0} 2 Resulting nurbs curve ffc7114c-425e-4e46-9780-4f5439b2a045 Curve Curve false 0 968 1334 38 26 987 1347.333 Curve length 2b05c6b7-328d-44fa-bf99-ff7ef38fd7f7 Length Length false 0 968 1360 38 27 987 1374 Curve domain f5a94324-cae2-422a-9504-bc1edac874d6 Domain Domain false 0 968 1387 38 27 987 1400.667 f31d8d7a-7536-4ac8-9c96-fde6ecda4d0a DIFERENCE CURWATURE SHAPED GRAPH 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8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 d5967b9f-e8ee-436b-a8ad-29fdcecf32d5 17 b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b b6236720-8d88-4289-93c3-ac4c99f9b97b Second item for multiplication 61c94a5f-b514-47c9-92a0-139978a51dd4 true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1408 47 20 1469.5 1418 Second item for multiplication a90416e9-5e32-4045-9607-50c791a8677a true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1428 47 20 1469.5 1438 Second item for multiplication 5cea064f-6531-45db-86c9-02cf6ea8c994 true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1448 47 20 1469.5 1458 Second item for multiplication 11426add-2dad-4504-a229-f384e437c631 true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1468 47 20 1469.5 1478 Second item for multiplication f80e638e-6497-41ea-ac05-21b35434865c true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1488 47 20 1469.5 1498 Second item for multiplication 7a04a069-f807-4718-8d13-7f0f8da45782 true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1508 47 20 1469.5 1518 Second item for multiplication b79fc36c-baff-4074-ba1c-7c3e26c598a5 true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1528 47 20 1469.5 1538 Second item for multiplication e693c8d5-0cfb-4d7b-8c03-ffef28614bbf true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1548 47 20 1469.5 1558 Second item for multiplication d822a4a3-62e1-41b6-bd94-a583fc00c4c0 true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1568 47 20 1469.5 1578 Second item for multiplication 2c104d71-3268-4080-991f-2140f3080675 true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1588 47 20 1469.5 1598 Second item for multiplication 83120356-2358-4a65-bce7-37c29ead52a8 true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1608 47 20 1469.5 1618 Second item for multiplication 5524a6eb-ec21-4259-9620-fa93f7ba2dd1 true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1628 47 20 1469.5 1638 Second item for multiplication 3a85fc51-6d5e-4555-965e-c47db2a072c7 true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1648 47 20 1469.5 1658 Second item for multiplication 7fbcf0ef-f454-4ef9-86b0-8101eea0d23c true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1668 47 20 1469.5 1678 Second item for multiplication 12645ff0-d3ae-4dc0-b2a5-8da9d45fab94 true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1688 47 20 1469.5 1698 Second item for multiplication f1bca0d8-e2a3-4ef1-b20f-8d05e83df880 true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1708 47 20 1469.5 1718 Second item for multiplication d4a86874-2cf0-4b31-b7bb-8c7a64ae5e7b true B B true f6f14880-afdd-423b-afa5-2122f025986b 1 1446 1728 47 20 1469.5 1738 Rotation angle (in degrees) 8659f01b-c78f-46b8-9eaf-29709ed0a33b true Angle Angle true 0 1446 1748 47 20 1469.5 1758 1 1 {0} 0 Contains a collection of generic curves d3b685ff-4a01-4f1c-8451-d6c384158081 true Curve Curve true e2df2e1d-44d3-46a6-865e-cf271d98e1ba 1 1446 1768 47 20 1469.5 1778 1 1 {0} Grasshopper.Kernel.Types.GH_String false 256 Contains a collection of generic curves true c9aec53c-3f22-480e-b045-ec9e1c2f1461 true Curve Curve true 5d1cff17-fdb4-4fdc-8366-b759fcf7a3ba 1 1446 1788 47 20 1469.5 1798 2 A wire relay object 1b9b32b3-e98d-400a-b04a-b8a3506fe77a true Relay Relay false 0 1517 1408 28 23 1531 1419.765 2 A wire relay object 88326248-5e84-49e9-991f-f69c5ce76ffa true Relay Relay false 0 1517 1431 28 24 1531 1443.294 2 A wire relay object c974d321-6663-4f14-b910-114ab3f151d2 true Relay Relay false 0 1517 1455 28 23 1531 1466.823 2 A wire relay object 9e655fb0-3ebd-45f4-821b-a4410c510d1a true Relay Relay false 0 1517 1478 28 24 1531 1490.353 2 A wire relay object 79063066-5dc0-4aad-b30f-37377464d8ad true Relay Relay false 0 1517 1502 28 23 1531 1513.882 2 A wire relay object 13fa3828-fd39-410e-8b31-5743271817f9 true Relay Relay false 0 1517 1525 28 24 1531 1537.412 2 A wire relay object fa22da94-54ab-4228-8fec-9daf748619da true Relay Relay false 0 1517 1549 28 23 1531 1560.941 2 A wire relay object 881d4b81-c60b-4b8b-8dce-2c40a6a7de3c true Relay Relay false 0 1517 1572 28 24 1531 1584.471 2 A wire relay object 8d481224-cbdc-4fa9-90a5-b7c7d290f9ca true Relay Relay false 0 1517 1596 28 23 1531 1608 2 A wire relay object 0f8c31d7-f100-4fc9-b99e-8708b1064c87 true Relay Relay false 0 1517 1619 28 24 1531 1631.529 2 A wire relay object 54161844-030f-441b-ae36-6c8e6fd9361b true Relay Relay false 0 1517 1643 28 23 1531 1655.059 2 A wire relay object 7546bc4b-23bd-446d-b103-122a40b7decd true Relay Relay false 0 1517 1666 28 24 1531 1678.588 2 A wire relay object bd991454-448e-439e-be40-a2e9bda8dc8e true Relay Relay false 0 1517 1690 28 23 1531 1702.118 2 A wire relay object a24fbf38-b1b9-4511-9bc8-bfe921f44089 true Relay Relay false 0 1517 1713 28 24 1531 1725.647 2 A wire relay object a6730e96-7e8d-4fc3-b6c7-7e677cc49cb1 true Relay Relay false 0 1517 1737 28 23 1531 1749.177 2 A wire relay object d15cd278-895a-4f56-ab56-168db09bd1eb true Relay Relay false 0 1517 1760 28 24 1531 1772.706 2 A wire relay object 9eb3a9f5-048d-48f2-ad5a-3c4fe73de0e4 true Relay Relay false 0 1517 1784 28 24 1531 1796.235 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers f6f14880-afdd-423b-afa5-2122f025986b Digit Scroller Digit Scroller false 0 12 Digit Scroller 2 0.0625000000 1035 1399 250 20 1035.916 1399.719 f31d8d7a-7536-4ac8-9c96-fde6ecda4d0a DIFERENCE CURWATURE LINEAR GRAPH 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true iVBORw0KGgoAAAANSUhEUgAAABgAAAAYCAYAAADgdz34AAAABGdBTUEAALGPC/xhBQAAAAlwSFlzAAAOwQAADsEBuJFr7QAAAJhJREFUSEvdk4EKgCAMRPfF9gn9WX9Wq5MtEmdKbQQ9GClud4cY/Q6WbwgQ13LnKh5mAsKEle8MeCLm1C9pb2I2QHxNtKC2RLNVeiYjTWyDIxkEZPuKykDTj6QboTZwTA8KA+/0oDRwTg9OgwhxUBh4Xo2SDaLSg5waBrJ3J//uL66mG4zxNGX9BMzezmuDR4UQKg5CxQ2IduVGkrvn0vkHAAAAAElFTkSuQmCC 3640aa4f-62eb-4d63-8052-a0e09732f02d true DIFERENCE CURWATURE LINEAR GRAPH DIFERENCE CURWATURE LINEAR GRAPH false 20 106c5295-4ab4-4aa6-aa77-17b1cabe660e 17ab48d2-bcb8-4439-9ae7-4711deb61155 1d618bec-21b8-4413-b9d0-b0ca022e064d 26784ca3-df66-4613-b760-ac9c1e2d63e1 3a66ce4a-5df0-4133-b5cb-55a024af3eb7 40b9031e-c91b-4327-8c44-ba17ee3528fc 63c4f63f-3b9c-4c9e-839e-410d31706448 6536ba36-0f3e-4855-9e12-fd57d967ea8a 6ecb5ad5-e259-4659-a211-088cf8e4b477 74ca0538-baa6-4806-a992-faf5fad6d48e 78cc69e8-a743-4023-b94a-9a8aa828d39c 82d3c096-76ee-44d4-8798-24f756494b5e 8548dc1b-91e3-4cc0-b43b-091e2316c9d3 8cd4f22b-f743-4148-bcb0-88afd63f304c 8e61e44e-6641-409a-9e86-3d6a5f8855d8 94ec5cf6-ef20-4c96-b553-c34d022171bb 9c9f7ec6-458c-4c08-989a-a545ac4b25c5 abbd5fd2-67ff-46d9-a817-2364a4a2ccb6 c5391385-d15b-49a5-ac81-81d3ed1c0180 ee3af77c-4fd8-4c52-a97e-5a973605dc48 e294df03-baaa-4b12-b92f-e97f42ff34ec 45329fda-4528-406d-a823-54e35ac6ff74 f9b9305d-1e20-4067-946a-b44d88604308 357ceb68-e651-4e13-b8c4-6a838be2149a 34281050-3848-44ac-894c-a3119ffa069f 9096d595-00e9-44ef-bf8b-df7cba4ba2ea 9d9970f3-5ab6-40b5-b0f2-d257ffef222d b4c2ea06-2f42-44c4-9b4a-584b407a7f6a 7979dd58-784d-428c-ab41-1f9a01cb3b5b ad15254d-f361-46c9-90d6-b5db1b60e3d2 e9837f44-fe89-4576-a1ba-d864d9176564 88ea5216-22ee-43b9-bf4a-bf732fa4678f 3c10a1a1-09f5-411d-ae06-13d21b0f7cd7 9492d9b1-8423-4285-a424-c395dc7f8b36 d134b7cd-fb62-4a2b-a901-fec5a2d783e9 98a7b290-1680-4c8f-91d6-4080e52ada8f 693656d3-ab20-45a4-a99a-8ca5a8f9ac36 80bcd5c0-5458-4110-bc35-aad5d5e50148 054cb35f-8548-43e7-8129-2bbf3a113dd2 17704c02-f561-4245-bc67-2eaf7cd1e000 1581 1459 110 404 1677 1661 20 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 2e3ab970-8545-46bb-836c-1c11e5610bce d5967b9f-e8ee-436b-a8ad-29fdcecf32d5 0 Vector {y} component 3a66ce4a-5df0-4133-b5cb-55a024af3eb7 true Y component Y component true 0 1583 1461 82 20 1624 1471 1 1 {0} 8 Second item for multiplication 1d618bec-21b8-4413-b9d0-b0ca022e064d true B B true 0 1583 1481 82 20 1624 1491 Vector {y} component 40b9031e-c91b-4327-8c44-ba17ee3528fc true Y component Y component true 0 1583 1501 82 20 1624 1511 1 1 {0} 7 Second item for multiplication 17ab48d2-bcb8-4439-9ae7-4711deb61155 true B B true 0 1583 1521 82 20 1624 1531 Vector {y} component 26784ca3-df66-4613-b760-ac9c1e2d63e1 true Y component Y component true 0 1583 1541 82 20 1624 1551 1 1 {0} 6 Second item for multiplication 6536ba36-0f3e-4855-9e12-fd57d967ea8a true B B true 0 1583 1561 82 20 1624 1571 Vector {y} component 8548dc1b-91e3-4cc0-b43b-091e2316c9d3 true Y component Y component true 0 1583 1581 82 20 1624 1591 1 1 {0} 5 Second item for multiplication 78cc69e8-a743-4023-b94a-9a8aa828d39c true B B true 0 1583 1601 82 20 1624 1611 Vector {y} component 82d3c096-76ee-44d4-8798-24f756494b5e true Y component Y component true 0 1583 1621 82 20 1624 1631 1 1 {0} 4 Second item for multiplication 63c4f63f-3b9c-4c9e-839e-410d31706448 true B B true 0 1583 1641 82 20 1624 1651 Vector {y} component ee3af77c-4fd8-4c52-a97e-5a973605dc48 true Y component Y component true 0 1583 1661 82 20 1624 1671 1 1 {0} 3 Second item for multiplication 74ca0538-baa6-4806-a992-faf5fad6d48e true B B true 0 1583 1681 82 20 1624 1691 Vector {y} component abbd5fd2-67ff-46d9-a817-2364a4a2ccb6 true Y component Y component true 0 1583 1701 82 20 1624 1711 1 1 {0} 2 Second item for multiplication 106c5295-4ab4-4aa6-aa77-17b1cabe660e true B B true 0 1583 1721 82 20 1624 1731 Vector {y} component 8e61e44e-6641-409a-9e86-3d6a5f8855d8 true Y component Y component true 0 1583 1741 82 20 1624 1751 1 1 {0} 1 Second item for multiplication 8cd4f22b-f743-4148-bcb0-88afd63f304c true B B true 0 1583 1761 82 20 1624 1771 Vector {y} component 6ecb5ad5-e259-4659-a211-088cf8e4b477 true Y component Y component true 0 1583 1781 82 20 1624 1791 1 1 {0} 0 Second item for multiplication 94ec5cf6-ef20-4c96-b553-c34d022171bb true B B true 0 1583 1801 82 20 1624 1811 Number of segments c5391385-d15b-49a5-ac81-81d3ed1c0180 true Count Count true e2df2e1d-44d3-46a6-865e-cf271d98e1ba 1 1583 1821 82 20 1624 1831 1 1 {0} 10 Contains a collection of generic curves true 9c9f7ec6-458c-4c08-989a-a545ac4b25c5 true Curve Curve true 5d1cff17-fdb4-4fdc-8366-b759fcf7a3ba 1 1583 1841 82 20 1624 1851 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 5d1cff17-fdb4-4fdc-8366-b759fcf7a3ba Relay false ffc7114c-425e-4e46-9780-4f5439b2a045 1 1354 1843 40 16 1374 1851 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object e2df2e1d-44d3-46a6-865e-cf271d98e1ba Relay false ce7a6538-1307-4799-aa09-c6d0b388aa6b 1 1343 1787 40 16 1363 1795 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 256fa74d-8451-4366-b97f-fb31ceb7790f Panel false 0 0 0.0003959052400654102 -312 1638 160 84 0 0 0 -311.7244 1638.12 2 255;255;255;255 true true true false false true b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object b8db01a5-a165-45a8-b68c-2fc89acd8cfd Relay false 9f667c48-eb1e-47a4-8db2-61666d1ea383 1 -351 1399 40 16 -331 1407 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 2d69de74-3ac4-4786-bdb1-2f69d7dda67c Relay false 3e1b6d63-9b79-46a8-8d27-80596e7d8b16 1 -353 1501 40 16 -333 1509 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 46d30a93-1bfb-4b58-b472-667a267525d3 Relay false 79b1faa2-503e-498d-9a62-75f1113025b9 1 -355 1551 40 16 -335 1559 758d91a0-4aec-47f8-9671-16739a8a2c5d Format Format some data using placeholders and formatting tags true cb493613-0e2e-4e2b-81d7-7ea202151906 Format Format -297 1363 130 64 -205 1395 3 3ede854e-c753-40eb-84cb-b48008f14fd4 7fa15783-70da-485c-98c0-a099e6988c3e 8ec86459-bf01-4409-baee-174d0d2b13d0 1 3ede854e-c753-40eb-84cb-b48008f14fd4 Text format 2eb68e74-837d-4e46-8c99-02a982f20cf7 Format Format false 0 -295 1365 78 20 -256 1375 1 1 {0} false {0:R} Formatting culture 5252966c-5c4f-4a9b-b762-3c659429c056 Culture Culture false 0 -295 1385 78 20 -256 1395 1 1 {0} 127 Data to insert at {0} placeholders 52f1eacc-39cf-4144-9ece-79646d8595e5 false Data 0 0 true b8db01a5-a165-45a8-b68c-2fc89acd8cfd 1 -295 1405 78 20 -256 1415 Formatted text b0ca4533-8708-49c9-abb0-994600403593 Text Text false 0 -193 1365 24 60 -181 1395 758d91a0-4aec-47f8-9671-16739a8a2c5d Format Format some data using placeholders and formatting tags true d43e0888-6c1f-49e3-be0f-bb7d829fb494 Format Format -297 1447 130 64 -205 1479 3 3ede854e-c753-40eb-84cb-b48008f14fd4 7fa15783-70da-485c-98c0-a099e6988c3e 8ec86459-bf01-4409-baee-174d0d2b13d0 1 3ede854e-c753-40eb-84cb-b48008f14fd4 Text format a864facc-351f-4484-977c-3999f7848a52 Format Format false 0 -295 1449 78 20 -256 1459 1 1 {0} false {0:R} Formatting culture c8912e3a-4df0-4d47-a0f1-a88a53ededd0 Culture Culture false 0 -295 1469 78 20 -256 1479 1 1 {0} 127 Data to insert at {0} placeholders 497bd5e0-b27c-4940-9b99-25379961ed41 false Data 0 0 true 2d69de74-3ac4-4786-bdb1-2f69d7dda67c 1 -295 1489 78 20 -256 1499 Formatted text 413475f9-4f88-4628-8645-62eae4dd9722 Text Text false 0 -193 1449 24 60 -181 1479 758d91a0-4aec-47f8-9671-16739a8a2c5d Format Format some data using placeholders and formatting tags true fffead86-943d-46b8-8937-a2232dae7463 Format Format -296 1530 130 64 -204 1562 3 3ede854e-c753-40eb-84cb-b48008f14fd4 7fa15783-70da-485c-98c0-a099e6988c3e 8ec86459-bf01-4409-baee-174d0d2b13d0 1 3ede854e-c753-40eb-84cb-b48008f14fd4 Text format ffb10974-89f5-42f1-8068-026964edf4b7 Format Format false 0 -294 1532 78 20 -255 1542 1 1 {0} false {0:R} Formatting culture 47e6c6fb-dd94-42a0-aadb-40c2cb7a1ef5 Culture Culture false 0 -294 1552 78 20 -255 1562 1 1 {0} 127 Data to insert at {0} placeholders d4ed8801-7d28-4eb4-88d3-57878affb737 false Data 0 0 true 46d30a93-1bfb-4b58-b472-667a267525d3 1 -294 1572 78 20 -255 1582 Formatted text a6d6d315-6584-4d1c-9c7a-258d37fd4a9a Text Text false 0 -192 1532 24 60 -180 1562 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 375085a7-85bd-47e7-800b-36aa5972104d Relay false db90c791-fd03-47f7-9d9f-fce64245413a 1 91 1571 40 16 111 1579 290f418a-65ee-406a-a9d0-35699815b512 Scale NU Scale an object with non-uniform factors. true 8fda1e13-53c9-4af2-94b7-c8a6b46ddc04 Scale NU Scale NU 291 1328 226 121 453 1389 Base geometry 67f67125-e32e-46ec-968c-e49e99f471e9 Geometry Geometry true 4be4d01e-f1cd-4466-afb7-4c701c8415b6 1 293 1330 148 20 375 1340 Base plane c052d3d4-ce54-4870-82d8-00e7ad59458d Plane Plane false 0 293 1350 148 37 375 1368.5 1 1 {0} 0 0 0 1 0 0 0 1 0 Scaling factor in {x} direction da1a007e-69ac-4e7f-aac5-a78ca7c560ae 1/X Scale X Scale X false 9f667c48-eb1e-47a4-8db2-61666d1ea383 1 293 1387 148 20 375 1397 1 1 {0} 1 Scaling factor in {y} direction a5a32c25-5253-47ff-b408-cb47a62cd982 1/X Scale Y Scale Y false 79b1faa2-503e-498d-9a62-75f1113025b9 1 293 1407 148 20 375 1417 1 1 {0} 1 Scaling factor in {z} direction f4001ed1-1bec-47f1-b6cf-ad32e8932b74 Scale Z Scale Z false 0 293 1427 148 20 375 1437 1 1 {0} 1 Scaled geometry a35486f2-4dac-4ca8-ba16-9b13976474ec Geometry Geometry false 0 465 1330 50 58 490 1359.25 Transformation data 32b7bf48-2611-46ca-9a94-15871f5f8af5 Transform Transform false 0 465 1388 50 59 490 1417.75 310f9597-267e-4471-a7d7-048725557528 08bdcae0-d034-48dd-a145-24a9fcf3d3ff GraphMapper+ External Graph mapper You can Right click on the Heteromapper's icon and choose "AutoDomain" mode to define Output domain based on input domain interval; otherwise it'll be set to 0-1 in "Normalized" mode. true be4e0dac-54d0-43df-a9f9-d245692a9442 GraphMapper+ GraphMapper+ true 781 1162 114 104 842 1214 External curve as a graph 32131412-40a4-4796-8cb5-0049955e4cd6 Curve Curve false 7f6b440a-d60d-4007-bfa5-8cdf447f299c 1 783 1164 47 20 806.5 1174 Optional Rectangle boundary. If omitted the curve's would be landed 10504c35-4cb1-4ccf-ab0d-97db809c54d2 Boundary Boundary true 5c358a28-dd5e-43a3-b441-5bc768492329 1 783 1184 47 20 806.5 1194 1 List of input numbers 71789790-5c60-4473-a7f4-dc3bc01f717d Numbers Numbers false 3120c589-9577-4cd1-8824-fe288c8306d2 1 783 1204 47 20 806.5 1214 1 9 {0} 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9 (Optional) Input Domain if omitted, it would be 0-1 in "Normalize" mode by default or be the interval of the input list in case of selecting "AutoDomain" mode b335bfa0-fb3b-468a-b09b-708cf5b1776f Input Input true 3fbe06f6-6671-4795-ad59-b3606b8a1575 1 783 1224 47 20 806.5 1234 (Optional) Output Domain if omitted, it would be 0-1 in "Normalize" mode by default or be the interval of the input list in case of selecting "AutoDomain" mode d8d4e7df-a90c-4325-9726-4dfc7089cb9f Output Output true 3fbe06f6-6671-4795-ad59-b3606b8a1575 1 783 1244 47 20 806.5 1254 1 Output Numbers d0fd8b08-647a-44b7-8722-3f9265acdd47 Number Number false 0 854 1164 39 100 873.5 1214 11bbd48b-bb0a-4f1b-8167-fa297590390d End Points Extract the end points of a curve. true cb1ce8fd-0f41-450f-9d53-79f7515bfb72 End Points End Points 180 953 84 44 224 975 Curve to evaluate 94e0bad3-b417-489a-8c29-b38c0b7f7de1 Curve Curve false 7f6b440a-d60d-4007-bfa5-8cdf447f299c 1 182 955 30 40 197 975 Curve start point b22df60e-f09e-49d7-a1e0-8f2b44f65ead Start Start false 0 236 955 26 20 249 965 Curve end point aea14296-171a-4771-9a84-390715b4afe5 End End false 0 236 975 26 20 249 985 575660b1-8c79-4b8d-9222-7ab4a6ddb359 Rectangle 2Pt Create a rectangle from a base plane and two points true 7609d6ff-b013-41c3-b0e6-1f1ea2ecfa4d Rectangle 2Pt Rectangle 2Pt 374 1011 198 101 510 1062 Rectangle base plane 04b12ec4-09ce-4bce-9c5e-563bb5c6f518 Plane Plane false 0 376 1013 122 37 437 1031.5 1 1 {0} 0 0 0 1 0 0 0 1 0 First corner point. e4032d1f-5563-407f-8d59-63c24b553fdf Point A Point A false b22df60e-f09e-49d7-a1e0-8f2b44f65ead 1 376 1050 122 20 437 1060 1 1 {0} 0 0 0 Second corner point. 1598ee77-7a85-4dc4-b49d-da6593b2f937 Point B Point B false aea14296-171a-4771-9a84-390715b4afe5 1 376 1070 122 20 437 1080 1 1 {0} 10 5 0 Rectangle corner fillet radius c86be701-5245-4b5e-b8c7-736354a2aa02 Radius Radius false 0 376 1090 122 20 437 1100 1 1 {0} 0 Rectangle defined by P, A and B 5c358a28-dd5e-43a3-b441-5bc768492329 Rectangle Rectangle false 0 522 1013 48 48 546 1037.25 Length of rectangle curve fa4073c9-fd23-420d-853c-3a12ebaa1776 Length Length false 0 522 1061 48 49 546 1085.75 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 45977af4-69a0-4e08-8746-e247c5098c77 Relay false e6883f83-7321-4869-ba03-b28db7c15488 1 781 1644 40 16 801 1652 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 3e0631e2-acee-4952-b380-ca85b2802769 Relay false 2e337179-3366-41e1-91ce-b34ea88fe906 1 883 1636 40 16 903 1644 f44b92b0-3b5b-493a-86f4-fd7408c3daf3 Bounds Create a numeric domain which encompasses a list of numbers. true 334df1fa-36cc-47a9-837d-60ac1be4a50d Bounds Bounds 620 1261 110 28 678 1275 1 Numbers to include in Bounds 37c1ef27-099c-4ee3-95bb-58ae35c8919d Numbers Numbers false 3120c589-9577-4cd1-8824-fe288c8306d2 1 622 1263 44 24 644 1275 Numeric Domain between the lowest and highest numbers in {N} 3fbe06f6-6671-4795-ad59-b3606b8a1575 Domain Domain false 0 690 1263 38 24 709 1275 ce46b74e-00c9-43c4-805a-193b69ea4a11 Multiplication Mathematical multiplication true b8dc634e-a51c-4f2c-81bc-3d5445f2b76d Multiplication Multiplication 452 1146 65 44 472 1168 2 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 First item for multiplication e5ee8871-037b-4ec7-bea4-30847970cc8b A true 45977af4-69a0-4e08-8746-e247c5098c77 1 454 1148 6 20 457 1158 Second item for multiplication 2d435093-1ce4-49b9-ba6e-e3467082b029 B true ac864993-ecc7-4645-ae0f-6a08f6579f35 1 454 1168 6 20 457 1178 1 1 {0} Grasshopper.Kernel.Types.GH_Integer 65536 Result of multiplication b716b10c-3aa5-40ed-997d-6e57c2ed9dd8 Result Result false 0 484 1148 31 40 499.5 1168 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 749a1d6b-ce44-4374-b73f-e79001f96855 Division Division 959 1226 40 44 979 1248 Item to divide (dividend) dd92453a-f264-451b-82c3-8fcf92690c14 A false d0fd8b08-647a-44b7-8722-3f9265acdd47 1 961 1228 6 20 964 1238 Item to divide with (divisor) 034550cc-e2fc-4b88-bf69-428042f4b309 B false ac864993-ecc7-4645-ae0f-6a08f6579f35 1 961 1248 6 20 964 1258 1 1 {0} Grasshopper.Kernel.Types.GH_Integer 65536 The result of the Division 2e337179-3366-41e1-91ce-b34ea88fe906 Result false 0 991 1228 6 40 994 1248 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 3120c589-9577-4cd1-8824-fe288c8306d2 Relay false b716b10c-3aa5-40ed-997d-6e57c2ed9dd8 1 540 1176 40 16 560 1184 cae9fe53-6d63-44ed-9d6d-13180fbf6f89 1c9de8a1-315f-4c56-af06-8f69fee80a7a Curve Graph Mapper Remap values with a custom graph using input curves. true b1b3cfd0-fdbe-4d56-bd37-08900a0112c6 true Curve Graph Mapper Curve Graph Mapper 745 819 181 224 840 931 1 One or multiple graph curves to graph map values with ac290670-5842-4a15-aa53-834d345d7f27 true Curves Curves false 7f6b440a-d60d-4007-bfa5-8cdf447f299c 1 747 821 81 27 787.5 834.75 Rectangle which defines the boundary of the graph, graph curves should be atleast partially inside this boundary 83b94a39-1f18-4e8d-99e0-2385db6d3c47 true Rectangle Rectangle false 5c358a28-dd5e-43a3-b441-5bc768492329 1 747 848 81 28 787.5 862.25 1 Values to graph map. Values are plotted along the X Axis, intersected with the graph curves, then mapped to the Y Axis 909ffa9a-b5d6-46dd-a885-b7464e5e7d73 true Values Values false 3120c589-9577-4cd1-8824-fe288c8306d2 1 747 876 81 27 787.5 889.75 Domain of the graphs X Axis, where the values get plotted (if omitted the input value lists domain bounds is used) 776f816b-cff2-40a1-aa86-2920a323ac4e true X Axis X Axis true 3fbe06f6-6671-4795-ad59-b3606b8a1575 1 747 903 81 28 787.5 917.25 Domain of the graphs Y Axis, where the values get mapped to (if omitted the input value lists domain bounds is used) 385402d6-4b0c-476f-bd64-6dd764131ae5 true Y Axis Y Axis true 3fbe06f6-6671-4795-ad59-b3606b8a1575 1 747 931 81 27 787.5 944.75 Flip the graphs X Axis from the bottom of the graph to the top of the graph 86ecd77a-d369-44ad-971d-fabd4c06ee62 true Flip Flip false 0 747 958 81 28 787.5 972.25 1 1 {0} false Resize the graph by snapping it to the extents of the graph curves, in the plane of the boundary rectangle 98212030-c666-417d-a30f-04baeb41e9f2 true Snap Snap false 0 747 986 81 27 787.5 999.75 1 1 {0} false Size of the graph labels 48463b98-be10-4297-b07d-3846425e8839 true Text Size Text Size false 0 747 1013 81 28 787.5 1027.25 1 1 {0} 0.0625 1 Resulting graph mapped values, mapped on the Y Axis e6565b4b-cef3-477d-8812-bc8b999f9b4d true Mapped Mapped false 0 852 821 72 20 888 831 1 The graph curves inside the boundary of the graph 43464001-9d23-4753-82d1-602f8071c817 true Graph Curves Graph Curves false 0 852 841 72 20 888 851 1 The points on the graph curves where the X Axis input values intersected true d9ac758b-cc34-4638-94d5-5cf5361b3e1f true Graph Points Graph Points false 0 852 861 72 20 888 871 1 The lines from the X Axis input values to the graph curves true 445f9076-c008-41b1-97ef-60af947fc621 true Value Lines Value Lines false 0 852 881 72 20 888 891 1 The points plotted on the X Axis which represent the input values true aa497984-6e75-4d21-b4bb-b5ae576c4479 true Value Points Value Points false 0 852 901 72 20 888 911 1 The lines from the graph curves to the Y Axis graph mapped values true 1b6aa626-e209-48f0-a15f-ab7dc9645ef4 true Mapped Lines Mapped Lines false 0 852 921 72 20 888 931 1 The points mapped on the Y Axis which represent the graph mapped values true 5067a63b-73bd-4f7f-963b-3a7b4c4dfd4a true Mapped Points Mapped Points false 0 852 941 72 20 888 951 The graph boundary background as a surface 5b3dfa57-e204-4444-9e92-0611bf00405a true Boundary Boundary false 0 852 961 72 20 888 971 1 The graph labels as curve outlines 59e9cbda-c078-408f-b017-57e4f5e3ce1f true Labels Labels false 0 852 981 72 20 888 991 1 True for input values outside of the X Axis domain bounds False for input values inside of the X Axis domain bounds 82eee386-327f-4901-8478-a464457293ac true Out Of Bounds Out Of Bounds false 0 852 1001 72 20 888 1011 1 True for input values on the X Axis which intersect a graph curve False for input values on the X Axis which do not intersect a graph curve 72a6c943-24f0-4165-aee6-1e12264947eb true Intersected Intersected false 0 852 1021 72 20 888 1031 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 7f6b440a-d60d-4007-bfa5-8cdf447f299c Relay false 2a58a381-2731-4ecb-9622-86d5b7e6f397 1 278 884 40 16 298 892 4d2a06bd-4b0f-4c65-9ee0-4220e4c01703 Scale Scale an object uniformly in all directions. true 3bc19fd1-a14f-4afe-8c79-98d06f72efe6 Scale Scale 24 837 201 64 161 869 Base geometry 91fac79f-9c37-49f8-9da4-3c31c7380fd6 Geometry Geometry true 6ed1c523-bb4c-4547-8b1e-fef80e576ef5 1 26 839 123 20 87.5 849 Center of scaling bb906599-6948-4240-be61-b8f2db1129f8 Center Center false 0 26 859 123 20 87.5 869 1 1 {0} 0 0 0 Scaling factor 69b2eb88-56be-4742-85ab-abc16a75d511 Factor Factor false ac864993-ecc7-4645-ae0f-6a08f6579f35 1 26 879 123 20 87.5 889 1 1 {0} 65536 Scaled geometry 2a58a381-2731-4ecb-9622-86d5b7e6f397 Geometry Geometry false 0 173 839 50 30 198 854 Transformation data 2d174878-52b5-45af-9e48-245182783d6b Transform Transform false 0 173 869 50 30 198 884 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 6ed1c523-bb4c-4547-8b1e-fef80e576ef5 Relay false fe2c7fd3-a20d-49fe-8b1d-09361e90e45d 1 -65 851 40 16 -45 859 fb6aba99-fead-4e42-b5d8-c6de5ff90ea6 DotNET VB Script (LEGACY) A VB.NET scriptable component true eea9ee61-f5d5-4cd8-9392-512823c0542f DotNET VB Script (LEGACY) Turtle 0 Dim i As Integer Dim dir As New On3dVector(1, 0, 0) Dim pos As New On3dVector(0, 0, 0) Dim axis As New On3dVector(0, 0, 1) Dim pnts As New List(Of On3dVector) pnts.Add(pos) For i = 0 To Forward.Count() - 1 Dim P As New On3dVector dir.Rotate(Left(i), axis) P = dir * Forward(i) + pnts(i) pnts.Add(P) Next Points = pnts 1072 3339 104 44 1127 3361 1 1 2 Script Variable Forward Script Variable Left 84fa917c-1ed8-4db3-8be1-7bdc4a6495a2 84fa917c-1ed8-4db3-8be1-7bdc4a6495a2 true true Forward Left true true 2 Print, Reflect and Error streams Output parameter Points 3ede854e-c753-40eb-84cb-b48008f14fd4 8ec86459-bf01-4409-baee-174d0d2b13d0 true true Output Points false false 1 false Script Variable Forward 67372680-60ae-44bc-846c-4865450df977 Forward Forward true 1 true c3ae31b2-8e2f-4176-a84e-b43814396e6c 1 8e991e99-5fb8-41e1-928d-1bba8fb9f7d7 1074 3341 41 20 1094.5 3351 1 false Script Variable Left 78e99550-605c-4e97-9f4b-9c8279389f48 Left Left true 1 true 9d55f829-b54c-4866-9ced-6f44b43868eb 1 8e991e99-5fb8-41e1-928d-1bba8fb9f7d7 1074 3361 41 20 1094.5 3371 Print, Reflect and Error streams 6db48831-5b42-4e0d-961a-891b10ec40c3 Output Output false 0 1139 3341 35 20 1156.5 3351 Output parameter Points 9b42fff0-cfd4-4077-bd34-da7089713006 Points Points false 0 1139 3361 35 20 1156.5 3371 e64c5fb1-845c-4ab1-8911-5f338516ba67 Series Create a series of numbers. true 2c82a4ea-3f85-4c1a-b5b5-2017900737e6 Series Series 505 3500 89 64 549 3532 First number in the series 7d70527c-3b5e-4035-9c97-3a4e66a71ebb Start Start false 8e6ac10d-2238-4545-8ff2-442c876cd85c 1 507 3502 30 20 522 3512 1 1 {0} 0 Step size for each successive number ea1865d1-db8f-4aab-9811-0b5402206762 Step Step false 8e6ac10d-2238-4545-8ff2-442c876cd85c 1 507 3522 30 20 522 3532 1 1 {0} 1 Number of values in the series d8a497e7-23e5-4d55-a9ef-4b474147df58 Count Count false dc0b9699-7043-422e-b460-d535b9da419e 1 507 3542 30 20 522 3552 1 1 {0} 500 1 Series of numbers e552844e-beed-45c9-8a78-a5fe409f581c Series Series false 0 561 3502 31 60 576.5 3532 dd8134c0-109b-4012-92be-51d843edfff7 Duplicate Data Duplicate data a predefined number of times. true 5f38726a-35c0-4b76-901e-23bf35d464c4 Duplicate Data Duplicate Data 496 3343 102 64 559 3375 1 Data to duplicate 47caabbf-b255-4c5a-a4a5-150c750eda62 Data Data false 9ea38a50-4760-46d2-8f7b-283ff9e5b2d3 1 498 3345 49 20 522.5 3355 Number of duplicates 531ac858-39f2-4fd7-9685-bece6d955799 Number Number false dc0b9699-7043-422e-b460-d535b9da419e 1 498 3365 49 20 522.5 3375 1 1 {0} 500 Retain list order d7a02fc3-4ca1-4ecc-a967-35c15da0554c Order Order false 0 498 3385 49 20 522.5 3395 1 1 {0} true 1 Duplicated data 64514e59-9473-4a0c-b0b8-55f5423b430c Data Data false 0 571 3345 25 60 583.5 3375 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers 7e1bc525-0327-427c-afd4-d8b6c2743acb Digit Scroller . false 0 12 . 11 1024.0 -29 3493 250 20 -28.90819 3493.851 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers c923a52e-eef5-4213-b91c-a99d00b79828 Digit Scroller ЯR false 0 12 ЯR 1 0.12220574352 -25 3395 250 20 -24.20879 3395.534 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers 1db31240-f2f8-4f56-bfd1-c8e86a7d0108 Digit Scroller ° false 0 12 ° 2 0.0003860762 -27 3438 250 20 -26.29068 3438.793 a4cd2751-414d-42ec-8916-476ebf62d7fe Radians Convert an angle specified in degrees to radians true cbe7bd82-cc9b-4870-9ac3-7aa5aa5a6971 Radians Radians 350 3401 108 28 405 3415 Angle in degrees ee7f3a8f-51dd-4ce6-864b-7f1c762117af Degrees Degrees false 9698bc3a-1ed1-4414-86f0-6444e8ead760 1 352 3403 41 24 372.5 3415 Angle in radians 8e6ac10d-2238-4545-8ff2-442c876cd85c Radians Radians false 0 417 3403 39 24 436.5 3415 fbac3e32-f100-4292-8692-77240a42fd1a Point Contains a collection of three-dimensional points true 9f5a4e05-ce5c-4e86-a807-564e2bdd48c7 Point Point false 9b42fff0-cfd4-4077-bd34-da7089713006 1 1001 3489 50 24 1026.471 3501.968 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object dc0b9699-7043-422e-b460-d535b9da419e Relay false 6c7782b5-3c6b-4ea4-b368-9f8596fbb31c 1 361 3463 40 16 381 3471 be52336f-a2e1-43b1-b5f5-178ba489508a Circle Fit Fit a circle to a collection of points. true c73e22cb-aead-46dc-b16c-0dcc22b7dd4e Circle Fit Circle Fit 478 3761 104 64 523 3793 1 Points to fit 81f3a1ec-91eb-4bf4-8fbc-1c370465acd8 Points Points false 9f5a4e05-ce5c-4e86-a807-564e2bdd48c7 1 480 3763 31 60 495.5 3793 Resulting circle d68e2f69-3f6f-44fd-a42e-8171647fc776 Circle Circle false 0 535 3763 45 20 557.5 3773 Circle radius b567df3e-11d3-4b09-9333-ce91f4c3ae0e Radius Radius false 0 535 3783 45 20 557.5 3793 Maximum distance between circle and points fcc5255c-a398-4ece-83e3-96e14b9c2ac5 Deviation Deviation false 0 535 3803 45 20 557.5 3813 9df5e896-552d-4c8c-b9ca-4fc147ffa022 Expression Evaluate an expression cos((4*atan(1))/N) true 2ddf6b0f-02b5-436b-b276-241adb75be4c Expression Expression 629 3723 215 28 727 3737 1 ba80fd98-91a1-4958-b6a7-a94e40e52bdb 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Expression variable e51b1d7a-a1af-48c3-b8da-e133a59540cd Variable N N true dc0b9699-7043-422e-b460-d535b9da419e 1 631 3725 11 24 636.5 3737 Result of expression 77e75b08-4e4d-4be7-8856-42f71b66f28c Result Result false 0 811 3725 31 24 826.5 3737 4d2a06bd-4b0f-4c65-9ee0-4220e4c01703 Scale Scale an object uniformly in all directions. true 054f5a8d-f78d-4a7e-bf5d-2645ef426ad8 Scale Scale 652 3868 126 64 714 3900 Base geometry 510ed7b4-b3c9-4474-a386-993821af754c Geometry Geometry true d68e2f69-3f6f-44fd-a42e-8171647fc776 1 654 3870 48 20 678 3880 Center of scaling a003e2da-4e0b-4f3c-a084-b732e78b89c7 Center Center false 51a42e21-ee34-499b-9dd4-f81a4b690590 1 654 3890 48 20 678 3900 1 1 {0} 0 0 0 Scaling factor c760a2a1-3ff7-4898-bb85-58cdae47edae Factor Factor false 77e75b08-4e4d-4be7-8856-42f71b66f28c 1 654 3910 48 20 678 3920 1 1 {0} 0.5 Scaled geometry b6b1bef2-1523-4956-aa25-2dac5bdbc61f Geometry Geometry false 0 726 3870 50 30 751 3885 Transformation data 0a98dc6e-bb85-421b-b00c-7339b7acc660 Transform Transform false 0 726 3900 50 30 751 3915 2e205f24-9279-47b2-b414-d06dcd0b21a7 Area Solve area properties for breps, meshes and planar closed curves. true 973ba117-2844-42fc-a837-d3bfa8e69ed9 Area Area 466 3878 118 44 528 3900 Brep, mesh or planar closed curve for area computation 7e8b3833-ef63-446a-81e2-35e1cf71bbc8 Geometry Geometry false d68e2f69-3f6f-44fd-a42e-8171647fc776 1 468 3880 48 40 492 3900 Area of geometry 264a3238-71d4-4fb9-8de9-6d5e8107f02a Area Area false 0 540 3880 42 20 561 3890 Area centroid of geometry 51a42e21-ee34-499b-9dd4-f81a4b690590 Centroid Centroid false 0 540 3900 42 20 561 3910 ce46b74e-00c9-43c4-805a-193b69ea4a11 Multiplication Mathematical multiplication true 526de354-79e7-4025-9017-d96eec6fcc44 Multiplication Multiplication 777 3780 70 44 802 3802 2 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 First item for multiplication ef3e20b7-31e9-4b59-8b5b-7d48b7a00581 A A true 77e75b08-4e4d-4be7-8856-42f71b66f28c 1 779 3782 11 20 784.5 3792 Second item for multiplication 5603b472-3d82-4ad9-acb6-fece068c3098 B B true b567df3e-11d3-4b09-9333-ce91f4c3ae0e 1 779 3802 11 20 784.5 3812 Result of multiplication 7d8353fa-9341-4524-9a9a-18e418cd2bfe Result Result false 0 814 3782 31 40 829.5 3802 9df5e896-552d-4c8c-b9ca-4fc147ffa022 Expression Evaluate an expression .5*L*(1/SIN(π/N)) true b941c138-f5e5-41ec-98ba-14636530b46f Expression Expression 717 3622 207 44 811 3644 2 ba80fd98-91a1-4958-b6a7-a94e40e52bdb ba80fd98-91a1-4958-b6a7-a94e40e52bdb 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Expression variable 23a00873-cd15-4b34-a2b3-f668298f3f20 Variable L L true c923a52e-eef5-4213-b91c-a99d00b79828 1 719 3624 11 20 724.5 3634 Expression variable 16aedcd7-2496-4d7f-b685-3ba86767c62a Variable N N true dc0b9699-7043-422e-b460-d535b9da419e 1 719 3644 11 20 724.5 3654 Result of expression d4f062e1-e870-4204-80e2-9d78907879ab Result Result false 0 891 3624 31 40 906.5 3644 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 5b56d761-0e39-48f1-8db0-ceb1b6b1aeda Panel false 0 d4f062e1-e870-4204-80e2-9d78907879ab 1 Double click to edit panel content… 1004 3625 160 100 0 0 0 1004.444 3625.77 255;255;255;255 true true true false false true 9df5e896-552d-4c8c-b9ca-4fc147ffa022 Expression Evaluate an expression R/(.5*(1/SIN(π/N))) true a4424e3c-d856-4aa7-8832-ff6f7d317feb Expression Expression 396 3263 224 44 498 3285 2 ba80fd98-91a1-4958-b6a7-a94e40e52bdb ba80fd98-91a1-4958-b6a7-a94e40e52bdb 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Expression variable 553f3aa9-172c-4f13-bac7-0b9e210f60e2 Variable R R true 63179a12-0556-4bc1-9bf4-ef312b611dad 1 398 3265 11 20 403.5 3275 Expression variable 7e057535-e619-4c03-b33d-f4bf1bce78b1 Variable N N true dc0b9699-7043-422e-b460-d535b9da419e 1 398 3285 11 20 403.5 3295 Result of expression 9ea38a50-4760-46d2-8f7b-283ff9e5b2d3 Result Result false 0 587 3265 31 40 602.5 3285 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 0359459d-9d9a-47a0-a6e5-8671853cc66b Division Division 167 3560 90 44 212 3582 Item to divide (dividend) d54c5aed-abbf-4257-a6d5-64ab24a130c9 A A false 0 169 3562 31 20 184.5 3572 1 1 {0} Grasshopper.Kernel.Types.GH_String false 360 Item to divide with (divisor) 15406d66-d0dd-43ec-ac83-8190d55c283f B B false 7e1bc525-0327-427c-afd4-d8b6c2743acb 1 169 3582 31 20 184.5 3592 The result of the Division 6f7bf996-752f-4e29-aa85-34d7d23fb47b Result Result false 0 224 3562 31 40 239.5 3582 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values d8700d74-83cb-4bb5-a874-5836156b8585 Panel false 0 b567df3e-11d3-4b09-9333-ce91f4c3ae0e 1 Double click to edit panel content… 662 3218 160 20 0 0 0 662.4798 3218.279 255;255;255;255 false false true false false true 6ec97ea8-c559-47a2-8d0f-ce80c794d1f4 Reverse List Reverse the order of a list. true 448f2eea-d58f-4b03-a15c-131db29d4d6f Reverse List Reverse List 580 3438 66 28 613 3452 1 Base list d2a92c6b-d29e-4752-8ae9-4c89e9f387c2 List List false e552844e-beed-45c9-8a78-a5fe409f581c 1 582 3440 19 24 591.5 3452 1 Reversed list f8f66c7a-48a1-42fb-8fb5-b9e101750e10 List List false 0 625 3440 19 24 634.5 3452 a3371040-e552-4bc8-b0ff-10a840258e88 Negative Compute the negative of a value. true 3374828d-ef30-480b-8c7e-4d3363908193 Negative Negative 779 3534 88 28 822 3548 Input value 8842f592-ebd1-425b-9235-1eed26cbab14 Value Value false e552844e-beed-45c9-8a78-a5fe409f581c 1 781 3536 29 24 795.5 3548 Output value a06377cb-f650-4240-8f06-3e0aa8cea794 Result Result false 0 834 3536 31 24 849.5 3548 3cadddef-1e2b-4c09-9390-0e8f78f7609f Merge Merge a bunch of data streams true 11841893-58e5-4d69-81f8-6ef5876ad579 Merge Merge 724 3403 122 84 785 3445 4 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 2 Data stream 1 ff8d9a28-a359-43d7-9813-26784092c0d5 1 false Data 1 D1 true f8f66c7a-48a1-42fb-8fb5-b9e101750e10 1 726 3405 47 20 757.5 3415 2 Data stream 2 f5037f9c-4fd3-4870-b046-58bf9cbf663b 1 false Data 2 D2 true 0 726 3425 47 20 757.5 3435 1 1 {0} Grasshopper.Kernel.Types.GH_String false 0 2 Data stream 3 34ffa90f-4d0d-41d7-9e2a-9e6914e1d97e 1 false Data 3 D3 true a06377cb-f650-4240-8f06-3e0aa8cea794 1 726 3445 47 20 757.5 3455 2 Data stream 4 7be9445a-1cc8-42fd-9a91-44e035932117 false Data 4 D4 true 0 726 3465 47 20 757.5 3475 2 Result of merge 7abea44d-07c7-4298-8d09-060192324a84 1 Result Result false 0 797 3405 47 80 812.5 3445 6ec97ea8-c559-47a2-8d0f-ce80c794d1f4 Reverse List Reverse the order of a list. true fefb94c4-e829-4cb6-954e-9fa966bb6e09 Reverse List Reverse List 657 3265 66 28 690 3279 1 Base list 3083f7cb-d6f6-4012-9c1d-6b21de28228f List List false 64514e59-9473-4a0c-b0b8-55f5423b430c 1 659 3267 19 24 668.5 3279 1 Reversed list 293dcebf-c8ef-4af0-bea0-78ac8cc2435f List List false 0 702 3267 19 24 711.5 3279 3cadddef-1e2b-4c09-9390-0e8f78f7609f Merge Merge a bunch of data streams true ec279539-9319-45ff-a5ca-90e3b3f745f6 Merge Merge 823 3259 122 84 884 3301 4 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 2 Data stream 1 50bb2f13-a19d-42f5-a248-813f6021a844 1 false Data 1 D1 true 293dcebf-c8ef-4af0-bea0-78ac8cc2435f 1 825 3261 47 20 856.5 3271 2 Data stream 2 f6e7d53a-62d8-430d-aa79-f90e2662521e 1 false Data 2 D2 true 0 825 3281 47 20 856.5 3291 2 Data stream 3 c45addba-d44c-468f-916c-7c0e75d7548d 1 false Data 3 D3 true 64514e59-9473-4a0c-b0b8-55f5423b430c 1 825 3301 47 20 856.5 3311 2 Data stream 4 121717d7-f0b5-4ab5-8c2a-e6daf79e2ce3 false Data 4 D4 true 0 825 3321 47 20 856.5 3331 2 Result of merge c3ae31b2-8e2f-4176-a84e-b43814396e6c 1 Result Result false 0 896 3261 47 80 911.5 3301 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 032109e0-083d-4876-a194-d48d70db4a82 Panel false 0 7abea44d-07c7-4298-8d09-060192324a84 1 Double click to edit panel content… 1272 3232 160 479 0 0 0 1272.424 3232.003 255;255;255;255 true true true false false true 59daf374-bc21-4a5e-8282-5504fb7ae9ae List Item 0 Retrieve a specific item from a list. true fcba47ce-cf17-4a9f-b444-fdfd3b58f104 List Item List Item 898 3779 77 64 955 3811 3 8ec86459-bf01-4409-baee-174d0d2b13d0 2e3ab970-8545-46bb-836c-1c11e5610bce cb95db89-6165-43b6-9c41-5702bc5bf137 1 8ec86459-bf01-4409-baee-174d0d2b13d0 1 Base list 904b0e7d-06c2-4fb7-ace6-0d5e3e73309a List List false 9f5a4e05-ce5c-4e86-a807-564e2bdd48c7 1 900 3781 43 20 921.5 3791 Item index 4b4c9ab4-7ff7-493c-804f-f2ee6521d579 Index Index false 0 900 3801 43 20 921.5 3811 1 1 {0} -1 Wrap index to list bounds 401ceedd-2460-47a7-adfe-3fe8bfdcab75 Wrap Wrap false 0 900 3821 43 20 921.5 3831 1 1 {0} true Item at {i'} 76288414-d3b9-4565-bf15-03a6b907c596 false Item i false 0 967 3781 6 60 970 3811 9abae6b7-fa1d-448c-9209-4a8155345841 Deconstruct Deconstruct a point into its component parts. true f6189714-2503-4c33-b10d-828b9753dd63 Deconstruct Deconstruct 1011 3785 120 64 1052 3817 Input point 1734f987-ef44-4c85-93f8-de26f37b00dd Point Point false 76288414-d3b9-4565-bf15-03a6b907c596 1 1013 3787 27 60 1026.5 3817 Point {x} component 7876afcf-7775-45c8-8a25-88d8b7e1f9c2 X component X component false 0 1064 3787 65 20 1096.5 3797 Point {y} component 5abe47df-fbe4-4b97-bd03-0ec1b1f6b2d8 Y component Y component false 0 1064 3807 65 20 1096.5 3817 Point {z} component fce43a6b-020c-45af-be79-091fc7373c5b Z component Z component false 0 1064 3827 65 20 1096.5 3837 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 04e8baad-2bd4-4512-8434-d1b3544659d7 Panel false 0 ba156c5f-31a5-4478-a04c-85f4b5333b7c 1 Double click to edit panel content… 38 3207 116 20 0 0 0 38.51038 3207.453 255;255;255;255 false false true false false true 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values f650f2dc-1a4e-481b-af1a-49af3711d7cf Panel false 0 dd0736c2-159a-42d1-af5f-93e121faa9f7 1 Double click to edit panel content… 39 3289 118 20 0 0 0 39.33979 3289.087 255;255;255;255 false false true false false true 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 32a6c3f8-891b-465c-a59b-971de8e4b598 Division Division 1263 3785 70 44 1288 3807 Item to divide (dividend) 5b959b6e-3da7-428d-97ea-89b9c83a5673 A A false 7876afcf-7775-45c8-8a25-88d8b7e1f9c2 1 1265 3787 11 20 1270.5 3797 Item to divide with (divisor) 3b155943-e856-4f6a-861e-2a442c5af7de B B false 5abe47df-fbe4-4b97-bd03-0ec1b1f6b2d8 1 1265 3807 11 20 1270.5 3817 The result of the Division b887e715-85b8-4d63-bcef-54f50d862634 Result Result false 0 1300 3787 31 40 1315.5 3807 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 4cbbc23a-5f94-4439-9417-57501beec295 Panel false 0 35a11262-770e-4498-9d6e-28b546897ca0 1 Double click to edit panel content… 38 3249 116 20 0 0 0 38.30339 3249.228 255;255;255;255 false false true false false true c552a431-af5b-46a9-a8a4-0fcbc27ef596 Group 1 255;255;255;255 A group of Grasshopper objects 04e8baad-2bd4-4512-8434-d1b3544659d7 f650f2dc-1a4e-481b-af1a-49af3711d7cf 4cbbc23a-5f94-4439-9417-57501beec295 3 eccb3198-eb6b-4c8a-a3d9-fbc052dd7486 Group 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true dd203f61-0028-42eb-bd28-7f6f48340bc8 Division Division 280 3506 49 44 309 3528 Item to divide (dividend) 64037327-91f1-4a5c-a020-c21cdc1c56aa A false 7e1bc525-0327-427c-afd4-d8b6c2743acb 1 282 3508 15 20 289.5 3518 Item to divide with (divisor) 1b254420-5fe8-4023-9282-f9415e798a17 B false 0 282 3528 15 20 289.5 3538 1 1 {0} Grasshopper.Kernel.Types.GH_Integer 2 The result of the Division 6c7782b5-3c6b-4ea4-b368-9f8596fbb31c Result false 0 321 3508 6 40 324 3528 2b2a4145-3dff-41d4-a8de-1ea9d29eef33 Interpolate Create an interpolated curve through a set of points. true 4c63dec2-1390-4291-b6d5-8371589a05f4 Interpolate Interpolate 895 3102 225 84 1068 3144 1 Interpolation points 204c7f61-dafe-4ead-8116-4d615c72795d Vertices Vertices false 9868f335-6dc4-451f-8094-d3711f42121a 1 897 3104 159 20 976.5 3114 Curve degree a70ef5d1-c3cb-46d6-9d33-77e1a52d1292 Degree Degree false 0 897 3124 159 20 976.5 3134 1 1 {0} 3 Periodic curve 4d30c792-d92a-4102-8b00-2557c4b3ae9a Periodic Periodic false 0 897 3144 159 20 976.5 3154 1 1 {0} false Knot spacing (0=uniform, 1=chord, 2=sqrtchord) 31ad9203-8d68-486d-b831-33a8a2d37811 KnotStyle KnotStyle false 0 897 3164 159 20 976.5 3174 1 1 {0} 2 Resulting nurbs curve 650d961c-ef6f-4573-ade0-97f698f6a536 Curve Curve false 0 1080 3104 38 26 1099 3117.333 Curve length ccb103da-accf-4a47-99e7-b07e82093feb Length Length false 0 1080 3130 38 27 1099 3144 Curve domain a1b7ba6e-684d-4c4f-b4dd-917607d871fa Domain Domain false 0 1080 3157 38 27 1099 3170.667 f31d8d7a-7536-4ac8-9c96-fde6ecda4d0a DIFERENCE CURWATURE SHAPED GRAPH 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true B B true 00ea1faf-8f43-4db0-a493-cd9e04efce41 1 1564 3284 47 20 1587.5 3294 Second item for multiplication e6adadf4-be79-42f5-b3c1-7fc3b6b0cd49 true B B true 00ea1faf-8f43-4db0-a493-cd9e04efce41 1 1564 3304 47 20 1587.5 3314 Second item for multiplication c8de52bd-b70c-4863-84a1-797c4bdb334b true B B true 00ea1faf-8f43-4db0-a493-cd9e04efce41 1 1564 3324 47 20 1587.5 3334 Second item for multiplication c8100f49-2687-4e17-8c09-44290a64e5d2 true B B true 00ea1faf-8f43-4db0-a493-cd9e04efce41 1 1564 3344 47 20 1587.5 3354 Second item for multiplication af2d2cb2-cbd1-4763-ab55-47294a5f0eb4 true B B true 00ea1faf-8f43-4db0-a493-cd9e04efce41 1 1564 3364 47 20 1587.5 3374 Second item for multiplication 62dd3e82-b9dd-4a0d-8238-0d84ad1ad8c4 true B B true 00ea1faf-8f43-4db0-a493-cd9e04efce41 1 1564 3384 47 20 1587.5 3394 Second item for multiplication 407bf4a9-858a-4660-9705-8e8f33050563 true B B true 00ea1faf-8f43-4db0-a493-cd9e04efce41 1 1564 3404 47 20 1587.5 3414 Second item for multiplication 3ec98c82-8319-4c33-b41b-a024084f3a31 true B B true 00ea1faf-8f43-4db0-a493-cd9e04efce41 1 1564 3424 47 20 1587.5 3434 Second item for multiplication 8ccbf885-f178-4841-9249-66f8ea932254 true B B true 00ea1faf-8f43-4db0-a493-cd9e04efce41 1 1564 3444 47 20 1587.5 3454 Second item for multiplication a59ab02d-69c2-4571-bb5d-457becd6a4ce true B B true 00ea1faf-8f43-4db0-a493-cd9e04efce41 1 1564 3464 47 20 1587.5 3474 Second item for multiplication 44da1bc7-88be-456e-b69f-45137693f9fc true B B true 00ea1faf-8f43-4db0-a493-cd9e04efce41 1 1564 3484 47 20 1587.5 3494 Second item for multiplication 2b037c5f-58a9-4cb5-8e6d-67c8f9df143d true B B true 00ea1faf-8f43-4db0-a493-cd9e04efce41 1 1564 3504 47 20 1587.5 3514 Second item for multiplication d72e8780-913f-4c19-ade0-67c1bc74babd true B B true 00ea1faf-8f43-4db0-a493-cd9e04efce41 1 1564 3524 47 20 1587.5 3534 Rotation angle (in degrees) e458e107-80a1-4187-9513-8822082224d1 true Angle Angle true 0 1564 3544 47 20 1587.5 3554 1 1 {0} 0 Contains a collection of generic curves 7847ebb2-91c9-46ab-9994-605a8fcfd224 true Curve Curve true f654ad66-626e-4a53-b0fb-b97bf8db47c6 1 1564 3564 47 20 1587.5 3574 1 1 {0} Grasshopper.Kernel.Types.GH_String false 256 Contains a collection of generic curves true e18d388f-be39-4181-8c9a-b9b6699fd507 true Curve Curve true accfc6c7-d434-41c2-8fa9-df26450c2afb 1 1564 3584 47 20 1587.5 3594 2 A wire relay object 8ee99086-b8f9-43ee-9bd6-fec9ccd7fd67 true Relay Relay false 0 1635 3204 28 23 1649 3215.765 2 A wire relay object 3d530c4d-e834-47c8-bcae-1b4fa53e44af true Relay Relay false 0 1635 3227 28 24 1649 3239.294 2 A wire relay object 651fba8e-310a-4fb0-99f4-57c6a81c0def true Relay Relay false 0 1635 3251 28 23 1649 3262.823 2 A wire relay object 05a8c343-ff27-42ad-afcf-fa1ff667cbe7 true Relay Relay false 0 1635 3274 28 24 1649 3286.353 2 A wire relay object 3d6b44d1-1154-4b09-a0d5-a25ea070c226 true Relay Relay false 0 1635 3298 28 23 1649 3309.882 2 A wire relay object 0f64163b-c63e-4c64-8cbb-8773b580d59b true Relay Relay false 0 1635 3321 28 24 1649 3333.412 2 A wire relay object 83fbba3d-44b7-4802-923b-8e59a8614a3a true Relay Relay false 0 1635 3345 28 23 1649 3356.941 2 A wire relay object 6daf543e-8b47-452f-927f-1fb8d01a3f6e true Relay Relay false 0 1635 3368 28 24 1649 3380.47 2 A wire relay object 4eec2e88-5e20-4514-909f-8ce5a6c4aeb4 true Relay Relay false 0 1635 3392 28 23 1649 3404 2 A wire relay object 1cfb2837-6c50-4ee5-aa8f-99081347aba7 true Relay Relay false 0 1635 3415 28 24 1649 3427.529 2 A wire relay object 566f2ed4-6b95-49f9-ad73-6761a75a717b true Relay Relay false 0 1635 3439 28 23 1649 3451.059 2 A wire relay object 57c8a8a1-8116-4ccc-933d-b8e54b24f260 true Relay Relay false 0 1635 3462 28 24 1649 3474.588 2 A wire relay object f0683443-95a2-4914-b42d-62d543c955d4 true Relay Relay false 0 1635 3486 28 23 1649 3498.118 2 A wire relay object 48a0e7d2-c487-494e-9796-eb3b184479ec true Relay Relay false 0 1635 3509 28 24 1649 3521.647 2 A wire relay object ea5bacce-ee91-4be8-a5d8-d159ac821594 true Relay Relay false 0 1635 3533 28 23 1649 3545.177 2 A wire relay object d6a5a595-fddc-4f1e-93a0-1d97caef0559 true Relay Relay false 0 1635 3556 28 24 1649 3568.706 2 A wire relay object 60a7fdec-17c1-4d75-b76a-594839ade29b true Relay Relay false 0 1635 3580 28 24 1649 3592.235 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers 00ea1faf-8f43-4db0-a493-cd9e04efce41 Digit Scroller Digit Scroller false 0 12 Digit Scroller 2 0.0625000000 1149 3171 250 20 1149.177 3171.168 f31d8d7a-7536-4ac8-9c96-fde6ecda4d0a DIFERENCE CURWATURE LINEAR GRAPH 7J0JIFTr+8dHZW1DSKWaEpGS9r1mBmMbS6i0NxiMGBpLtKpkV1QiVFRaqCwhO3Uj3TYtSrt2ad91b8vvnHFGZ87MOXGdMaf7u/7/26/mnTnOfJ/3fd73fd7n8xw5Iy8nP08Wx/cH8CNFIpGkgf96eHv4ubI5i/1ZXB+2FwdssgFeBpvBH1nwLfzPmbKYziwu+BZpqFmB32RmBL4sD7w0/tGLhNVhhy0SvnCaXI2Wf5a14bL82azlYLsC0C5j5wZcxbkn9LIly8fNPtCbBTZ3hn5xd6jNyovryfQAW4YAr6ampv7gf8qO5cFy8mU589vYbPYPFSOWC5vD9gW+hQ3Xy5vF9WWzfPiXBf/rYsT05f0eOeAfx+57RsSG3pLrasTyceKyvX2hLw/eIqmLFdOTxf/Xy84Opib6+g/ydjTuCgf+fBCfCfx5Pz77fnwu7y+8f+amgX/GbuL9GXM/Nq7lnTUJVuDftwaDV9gOfuRB8r6Wv9/ftvX+triWt92PP9Rytea3NV+kMf4Y+PqOdQK/mv9Z6Jag1kOCt7fz5++NSOS9OQrr74npLReE/oRewfwU7+/QN+L9RtgNHGq5N+g++bf98z281ubvCP1S3neHVOVdAdKH/1lhJZsVhtRu/kV8Q0B2ga4mYD5IXp5l9fVNTB3kbYEeBg4FH/4wAX+681819PJrHkCd+UMA6GzuQGeE+k8n6GUZeybXlcV75wDgnzu1SaRp6kDPmufl5ckfQUrzzs+Qng10Z4FfJQ++IvRr5G2dvBnMQC8/X/h7FUy4Xn7eQm/uZmJKZbAduUwuNASkoJElLfBW8BXZ5vcF8u4Z+rgi1ceH5enoEUj38/CADwWqjZ+LC4vrwvZxG06e3ewxpo3RNwD/bzjZ0M/D14/LmsZh+flymR7DyTZ+jh5sJwtWoL3XUhZnGge4Wk/+pWf/9DfglWWhq8hQ/XzdvLj8l7tbsp3cmCwPsg030IvbycyZ72VSG3ZqLB41m5Eps5n9vUFhhcCIVfh5m7Iov0fpp7OwdgTN1yKTNPBH1+bXBMQCX5dpfh3UqBOkXxeTWT9936h9tpXzMw/RD+7refbkmo/bBe5KmmcreUMvji+TzWn2ozrQVWRoXlzItfINI2Po5eHlx+V7OPB/RfmqAVSyK3hdspcL2YTL9PFx8/IGfB/Zq/lbdTIz4vUe4L/vi4+kHJ3eaBl6ICNBxc7PGGiSgpq4uUqOIf0qLfbrXHHWrP/4CmjqBDX1O7Y4uX4myzQrKnvt4Z5TLYCmzlCTbC/1fBdFRauSs38rcLyDaUBTF6hp+rUGqz4ZKYy069dDi292bgSapKGmCJpRhHyciem2XQ1bV/uHbwOaZPh36NrrVRnzuvX6u/H+pyimTUCTLNSU/3j5yUqZKqtQxwdVod+jugBNclBThifjwBelWMuCer1nCnnpVKBJHmp6OfjD2WmrZxpvMr52lq3gugxoUoCatFmD4lXmhNMLIpfIkvSylgJNXaEm/x5yZwpi9Rnrbs8+bKrfWAI0dYOadm16eNO7+2XjOPtJ7BDNyVFAU3eoSSMyrMtovVvWB+pfr74xLe4G0NQDanoR5Pp5SXqa6XGZeiM3mVgpoKkn1MQ2P0l2sXpO2bJv/PfnqpTXQJMi1NRFWlVXaZg/I+vTY7MjoV8nA01KUNNxl5GnAujTTffO6uG6RlrhA9CkDDXFfZ//0iyAaZFzcnuj8uR71kBTL6hpmWb83ZO0k4yNWwavyYhd1hloUuFfcEf/69eTp1LDqPOUbHa6TgGaVKGmzQrdz5ByjlgdZyeuiS9rLAOa1KCm4fsGRfRebme8P+A+9f71pL+Apt5Q063M2Cvap2XMs4Z225htOUgaaFKHmhYNVrGsJy03CbOq1Bk91vko0NQHajL1cddc2vMRLfaHlGNyv1J9oKkv1ETK2OTkM8+PXvbJ6tSc0Ze0gKZ+UNPlxJxlL2avMI5ihuraGMqUA00a/Jvf2yOHmapJ2XBp3qgCr+GxQFN/qOn2INveEZdDTY+9s8jRv1QOGmUA1HT6RMJnWo8e9Pyzo2znZpWvB5oGQk1/viyP+fa3rFm6vd6zoSE5/YAmMtREfR52arF3luWm6r6Wi8obwuXMjBYLeJBBoGc24/j4MjlOLBM/doszUzJQ/bTX6Lt56pgtL2Ne3aoX4TbkrNhOS+EvkxSovr5ctqOfb7OHh1w330VJ4eaiBnagiyrtveRI6vwwq6Kzn8JsdQPtYC6Kvl+vXPbVS+u8F511GlhfqmAu6ii7Rt58Vj+T9U/u9FxNsfgAc1EZh30mnLQwo4f0lmbQqyepwFyU8ZqKFEpYk/mmhckc2vN8PZiLurRAVqN42W7DvClqH0fPldaEuajyOZ5X53/0MwsZ1SeAHqx1CuaiAkIrV24aNp6SOqIsTU5zVgjMRbH3rylhjb1slhZDmjRDvyIZ5qLUf4wiXXCVNolU6nM0YSKlBOaibJwtDrwI9KBkHNcOjRzT9QjMRdkP1dO48qTUMlHOkxO65ZItzEVNyXk/aNK1WquU0lWaNaMHH4G5KM1A92Fh96LN42t2VNmnDl4Ac1EnI/6IuxrJtYpcfeLm/jU3FsBcFGOnrHpAX5b1oZOsG5Wf1KfCXNTDtPFvBz8ZQE3l7nR4KVu+AuairDa8G2QWV2xWGGs5R+GM2ieYi0oq+vbg0I40Wr6nzKbE9Hf6MBc15jKLMW2mvElwflqY1qq+u2Auinsj/mCR8iTrtA8n/p474sgjmIuat46TPzwyySqB5piY8+OdLMxFGXlr2eYr2JnHXahr2Gg1SQfmoqhN3zjqc3SNd12LemLAVRssNF7V0cbr8JIHs/MXbTDKrLTf821KbQ0O47UTbuNVuwPHq4h1A3+8ilg38MeriHUDf7yKWDfwx+vKGx69nu80MyoILrffd0b76n9Liv+WFK1YUiBnZdiSItiwc0GGphc144qxxqUTqYqwJcXieV/qF1KHGB91mMwICtwnBVtSDNceq37aUp2ewjq5wPMqtQS2pLgyezybnLHP+FBiVNrBL4fHw5YUi48xpE03PjVcp6tXPllp2mUhZzMQzdkgl+04OJvOuDkbtQ50NiI8Ct/ZiPAofGcjwqPwnY0Ij8J3NiI8Ct/ZyAWqa70qzLWKOOuZsav28QOYs8loOhy7sPALI4ZG/Thp9ZpQmLMR4Yf4zkaEH+I7GxF+iO9sRPghvrMR4Yf4zkaEH+I7m+Q7hya73/9Mj9zuNOi5+4qvMGeDHF5CnbcnWudFThA4dN4uaJ1X/6njoK/cJottc6/WjTyYriLwu7oZsf3ZziyyoR/XnyXYh0HDgmYS1Tt1oY8xyU7gB8lsjq8XmbXMj+lB9mBxXH3dyD4sVzD+6SNjynZ2ZnFagi0i5UB2YfRbFFJFoBWhUEvMiQYYxZn3kib475jjlaS6tEoS6QGNRAqiSduw/b18+Wt6kkE+0Lqvsqs3k8v0XMzmePvxAhuykLai5OjJ++1kQANn3t2I/JI31u8pXpjYn55eOKG+dk7YdUGbi/520MvWvN/WHPLlhbhk7AAX4sTiuwBPm1CXUd03WGyrsbk55evGmK7NzUJBrVbqEwToUw3q84ZKIqVQEfrIAa0BaQL6SEH6dELRR9nKz9MRdF4uLf1CpER7utG/hswYZrYzwcZjzq3aMQiJwK8jQiLey7+SCDmB4iCRDqZEQBfqYQMG2Xx8ge9rxPRltowBkqiAowyNC8jhRoINY+E3dbFh+rrxv3nnlQaru5j5sjxJpJ8HEzIcntT8D4Hvg1sKvLQMhqV623l7sH1brERm+pKXsjlLRZur9Ovr8uH9zzMyC5d/KlHabyBoLgvwc8Lman5ZyFyi7CHC6WHZI2wflj0mSsYeso5eXh4sZosDJHVrtoaXny/CschQnZxYPj7wy4v0NaDDA0O3ZG8vNtpA+hj8rddrqyVWiVti2aY+9L8FLCNjw/ugkGn4r+Ntm5o8yJ0soImwzYdcnjsRkEWq7bIMtmdyXAHDkv2BudCLy+u5zq1QqsFM4VKXz1tMQkZZZK3jHPxDQCk56KLCWv1sEYdaOphqAZ5FQK1ObVdL0wb8PMsX8Mn+TA8/VqvlWvrkflPDjcmm2XMz113Vvj0Gcb7Av6qwYPA2cUjGG/yokgGDH1omSZNQlklnkpiMb5N6m6zfP0C2UXNlmWBHYACrIrKdEUN4iSSNIjHNkMti+oJLJA/ws5BHJTuD5yssZ7JjIBlQl+vbLPZwsi/UfZkcZ2gJpb+6VWsn5Bpf9H0Ld2B+Sys1dgBWRQZ7AY1LRK2ZwgCNDfYIrZmwZhpF3g3ANBD57dK/+t/rbxVuknL+5PHa8pRcwSnGDvy08BTT/DLevcwUUIAMKmAgqpclAH2wZo9EphgFQy9gl8nmQKf4Y0joP8hFG5aB1HkG4vdLHWc2t/k0V1ekobwfVSX0YPUxTZd7qZX4TPkvAUPJG/E/LGQsWJM4DBa0B8tgBpIxmEzzHCVorDczsIz1q3VbV56xmh2HSPts7qH1/HPOO1pxfY7mqCnLjARXBAzeB4VXBNDr4rBMfSqWZWJSJb165h/6g5YRWrPJkNDn1m4MmL8XaQvkdk3AFl3AjwtZovlVvO2gkwu5tCxg1eyNdOo1x3gjBJo4+b3vXzNxIiNgYpw4CzKwJs6CdJHBhvZNnE/qPFgrB84w2Vxh8eWmoSylPRMnYiuN3Fy0cysNOoODGVjOwCHj/3devUTLef92vInFsduuvk6H5+0lyLwqh2kwoEcTZl7l//ycX5HzKtZg++W8OobmmyS3NNNqDyUoK+XV89D2zauIkaZ2p++9H0Fb6XH5FP/E21um4jDS3NKxDKcuIcN1yLQ7Rer29Mf2TrSsK5FSatKlFhKddnkeD3XaBQYQNO3yO6fQtGt1nH7hDOmUYdC8PlPYjeZKAt+mh6Wfhy/b24PtxARvXXjyRevv/SwBW7E8gU85MT3IngJXadWsijwhwrotIbkR7a2UU/E4INgBQM4oGti1EXLyvNWByu4t8Qd+rwZl4IVIzUBHIGBLnlfgvWzmzB+Lc52rN0mVyxsVvept2V2vVw2/XQqlvas1r9sKjQa55tfRL9x8P7zbJZGwzx3609lcH18yGxhOZBcvLsJeIu1TM0Bea3y3AZZx3TbFfVk431XAPlJUIZMALyG7vxTCSyGP3NrppUiAOQ+C5jQQFcq9CpjT4UAlTCSpX4g0wI7l5AUsDtui0kD9jxT7i92NNuy9F219oUhOUCWasEq0X6oUk3MgIUhtMyP2GiXo8bCbm3FQSQ5TpYL9lVAfbOlLWP5T3ZblAwgDntG0QiDkzCQ47TVfSnjag17H25825EE9pgnQgox0AB55PKUgfyqH5k+3N3zcOWJWFKPwT+sTJj9SBgtGNo0DvLksHx8hX4q10FMzBmOrvK0Mh8xquQDsWvx3KtGtbS2p9jqDVxpMtl09eLi1bqt8LfLwHO2WhYOxP9taG2ItqCQFxQISjzckkeqR3a0ekFgxVoSP5R9Ki/CxUiJ8bMK3oKLUWAez/AOHrCiP9W51hA/t9VMLsj+Ty2Y6eog+v1X/UCJ1bgTVNOVNr7L7p9ZWCqo9G/oo2VrYOVh3tAutAKzlHQs5hwqktbYV8KzVFueg8tM5/OzIIlWak5F4gX77g0nayT5b6MP9ElvlGKTIuPuEJccgCSooIiQwPcaTAPIJ8mg+IbGgfm7ooyazooK8ouyl9xmCm2gbJoflIegO+FcSpaEOlewNfoI3Bzn5+fh6eZI5Xr7g2QswO/myAnyhsxiRuiKzYUTcinDGiChVnbheHh62oGfn+6/mnzczEH0SaUm0Pik3y4fFtQdun/9rtYy8/MCR4ATMIEvBpAiWM9sX+u7ATAzuLB4E7UfYkU/OCe1ZCitJOomAHWcbkoJCDRUsmVxXNofBchHoFF2bX7Zlu7oJ0kHNr9t7ecNfFewMKcaFlV3IiZU9eSIKInKy/LsSlbTFZS434ziznWAokTz4Irjdgb3EW9OCoayfztzOm+XEZnoYejn//Cyw9/PlspieLf/uMofL9P7pMJq7qgJaVyW7auaHRYfTtv5xmLHjS+FKwf5hy/JgBgp2VTmSyBNDtN7bi0pezuayyFzwSlAWmsiOiszNEnEjrRr/iN6I7P/t9JAJwAJpSVIluFwgkYKQ7qEJmM/ISXz30JXwmiOnD5w0R+a+4qC5XAyW5tWb+Zp3Q9O8zamYXfmadwRKJpzNyN8eishm5Kdiishm5KdiIg0rlGEILrBEdglksiMOGYbd0WyyrJytx7ZKNzxeZu3x9NH81wK/q+tMP3AaAITzdhOeLNuQszDEiO3jDQ4EJtmHxVuKBI7gJy8A/w/YCPgNIrVAZnei3p+QIgKNQsNF3s6L62sN71UiBtE/XNq1XA05H4JLuxRgEKkZgv8JDqJao4LKZE5KZXc+Bw7MT6wAgcs1m7IHmilLWfvTOd/OMqKHVx4z4CovFAw3g9mITJBlFQ4oyaBYbUrLJsjXjcXLFuVdADQfP3mU6QuaFJwSXdgsZ7I3fxOh36pNEJITQLlj4QB5S1Nrd5nAjjvLE1D+L1EHOeAeNGtpm7JGlVqyRlmQRiK/4IjsNRN2nr1kfshypsmKuWPP4Jg3iqQl2ung6wCFYkCFTGlgIh5CITBMl+IhMm8UTSGtn2lKwO6subc4e3kCHe+XqpHsv/lM+VuRsWm4WvLVl7Wqgt2i5brC3eJn06/U69ojPq4sT9c8Wlv1xga3N7o4qAf0IAz1Ktwr2xQSV+Ul9P2UDhhoK31Xi5QrXm5i1bGcsYbrFumv6Bx54yxiewFeR7iTNb+M984tLA/qRVNFnVKcy60kvfEQThfE0qF3y1CHsgOxlBgW0dmYrqdOT1h7e/qeo97ZbfcnYlHExgNLEaDfCKUEtlIRJzbXyQOzb3h7mh+vNnpLLS/Xpc0zNptPEEUUl2Ip4u3OX0qCEMbvCkYgSbcOACOC3LDAiCAX/MGIjytKNkjZ3mBs2BX7ddcCSg1xJzgwy3yJG1aWeYWrWMCIojSLJd2fK5mGPbY8sfLwoi04ghFIAg8HiciuWBIBXejfDkYEhe3wcJT6bpX8doQtpcufFyQMRtSzsOxBYf0fgRFrrz238h1Hp6Yl7FbUnLD+q8TBCJ47Qc1bB9yJpMAI27ph7l80Aq0KJnGepD+3v0IIMILnWVDVAjyLxMAI5GaAMGAEb/CjSgYMfmiZpEhCWSbtXrm99lXDUsODR3S/Xbg4ulbE9Cw6riNK36HQO8GAjZOXh0dziho4/wGdhsVlOzWvm1q3OkLO7rKWTG9vNseVrxT4dXBcTCAx9nbOlGRwMWFTCabMCJ9QnS/Iq/ROsOYbRwnNOI46IZqJXcooeQ5D1NPP3lAT+Lo9jcDMBx9frp+TL5nKdWp9Du4UWxbwFVj+zVEbR6YPi+ztweSwhpO5TGe2X/ORFTDQPVr242A8h0Nmcp1aF7VBFmPAvG8hgyHf0IblbQUXUPycqOVtELC8rfBu0/JWA/jdZGA7adi8hwKXuT9vTOT3zkqZ/tXXlk1Pnr1huOUf2wTja51FfVfei7/qmsgtGg6LuBRQqBRRCWoGx3lCtSkU0Y/W0od4XaVZt+a9p0ihKAvUjD8VbzRLHcziTj/XtEbQn/KuZgNeTdifwtrw9qfkfEgXB1H+1BTwtiRuG0MTts3jqVWa7NnQ9FFWu7PR3qu+B/IinpxAnK3zriQi6ab5dXFosWQZlhbIPvKroASZCncoOsB/oLNhcnx0IXlEimL/ZP3G2EuVRuVzyI929qtWFnT4vEsKO/zml8UhCdkbS5IgL75HV0bz6CO3rA7sP/k7PXbWuEhS0tx4wY5vDYwfa39gdeIg7Mw7o+jay9DLE5AfGHjg4AM/HNA6J40si4N2K8Jj8GdbaykJcNu4CUyJpYnILyIBwmZFt8k1d+VlADUv4kR+uZMm97dz1miaZeSMv6j6pkYwUVV6Nvg54X7T/PKvvDGyjk9707YBbRRBbRpEZfNcbdambbnSzak/GOoY/i1zM6nU3+hIQtOzfswnyyWa35eSBwnQJEqAIXk8AaBx1QttXBHmsB55qo7TYT3SYngc1m/GPKzfxNdcBU3z3zCnElnUS8w5lQYBWDmVNsv/5TmVVTLD+h3P7WKe73l4/TPfrUV45lTi7IXBnErFAKycSsBa4smpNLC/uHM+c7JF+PIpOnJRr9Va5YzFlFPJkwA1pxKQAPIJqmg+gUA5lcgqfeLPqURaUjI5lXVAZ5XbCNhxkrhyKsOvFlSad95I7JxKfjKMGlpXJc6SAVEzEqclA7L/47BkcAjBWjKoh/DdQ2/Ca46cPnDSHLmHx0HzGl8szW18+Zqro2letj9q+sFvmeZ5FVPtq4t9BLfQMs1HlIKiY51pjkQN8bp4eAE+kuPaHEcnNx/IiXbNyHJtom5JeP8Bvf4rG4yu3a4y0liLscN8o1yW/bHS9q4MABvEMKHEHeS0KPc5r1L9/BJJH3n+nJNiKFB36IPWHdoc8OcPQbEH/JGlbnEM7iPhYBz6hOkRlD5x62NeJf3xYf647ItmiDbnOrf4wg7IdUbaQig1GfytIq2ILJvamtRkaVFpLPwuDenYD03Hi/2fP/u0xdIy+Oj2wSOWfBTMhe5i6SUqwQftZGSYPTA0fTzAHaiOJ/BJXXAj2qwOmenhBTg3JnTS2roYG/LRDsL3Jgylg6+2sh++AWP1RUA//CqKjQbjaopFbYqrdeeF111ZXsCelBso8isV9ln616beRYalWe8X7DC7O1Hw5NgE+qjwyXFLy692dsiu186xWg8mXoIaUUSFbXnHdEVty+rh9xHe/pfXGUQfgl0dMii9Vs4qoWbv0GON/QTPjGUsvUQy8vzXf+XQ9M8HcOi2BhZBKvbSXRmk3TiIpIgpUkUh8Yp+8H+GUNoUH+3VMsidsbu6zjuD/lqs69YJGg6lQ2ZkX2l3V8cjVMrry6aizFSXy+vLbTqhatbCBXzkHK8/OwOGFe3JzJNUFmk9ZkQH3n9rvqbXd8E00ZarCKeJ/mwSS+AYUw2g00KzhwYJZfbI0C+cPejSZ8NtVzzq3txprEPEqJoTih3mzms9E6HdUuEKSkd24Xp5klcGBK5YDayRPL29OGACTevmD+Tzf9DuTjhe+bOtlWo2AYMcjFmSehqKOD4ngQUQjwvNJXzeXmQEDLqFlQGw7y3yW5pRlv2wo+cxIp1LclVVv8Qom3F8WVygpwjHfTuNcBDkexx+XluY74E3/sqjnjpTE7c15JhF4qtlWXU+B/q106OCPAkYVCTtEdU5nYGp2buAONuGN+VtmQFbLBv4K8seuUPKDnxVRMnzJ5v1mjI9SdB2c7FsN7cNtnO4ExhoGRBFy6AOTJQ6O6W9CRKg7ciYtgOGAmFs17ZM1xbbrfiV7T4M6KPGLl/F2J36REqFMzhC0HbzsGw3D8t27S0HAiYZH8cyjgGhjNOmpYkiZB3sNCPk4k9wZdl8CeGVJfQ67rNwLuTo5ESBTepAq2lB29Yk3SERMOqyZeikZH2X0zY+eOXb3cLDfd9ItN4pqEDNcSwFHI7z1yH9SSjrkOzFjCcLgrPNw5UWj9moViRYuUnGjgU+07T1+9h+LWsQH94nwQ0/FJBr3cID+XRBUbcjLHDz6609bwIkA6ET0mVR+Xrg5tUgr001p/s218tq/p5kkCJ0Y0HfX+R3VHjXm6s+65PxzuIdecsj8j5KsPq0DTjj5KPl8deBM04ecZzamxltqYg5xM6X5U32Ya9g8c7xWEwnN7KPHy+cz/ZnQeYSaaBXI/zWfjd1MdlWu15FLaDwi2D0BLyscPSE96o4zBOUh2UeA8Kah58mj2aeAT8hJSgn/tcjZ4OZmwVbe7XxsZH2e0gOFxGP7mwXsIR8QGk7l3Kg5epzsSwXkytpy/GBJaGVAsrhF9q8qWSH9PUijYfc6Pwyr/4X7l4s+3qeMwTxT6H8ZDAhDBht0Hw6gIQyn+p+661+lNzZOI/25m/WAFfB5zF1ZQDWJjcvB1qfadnfksX0AaFacHRAvCev0IEHcLXWTavIJ/Oi3pXwmhrW2EodA8BHOWUBOp4UlXXpDaaAZYnc0behz8nzAsagAKL72pf05DkLelrk640KHLnOVzAbrgv4lUQVZfX5tZvAGf10A6RyA6VKEJX+o3GcJxUqwiZyn/XTrYKlKXlelSFSI9WGv5/MtjNnxMa/9dxH8e6LHI9SQuOxg9e3ivmQOKJOu3iwNiAONB4Hoo1HAiUGIacY3BODhHqrXFj2iIN3V1plOOYdoEWrdJNMYlABYMeAYy3xUjEkBoXm51cuWnYMj8QgknBiEAnfYmtktK46qNPG+UPzrllEOT6jup3nCGYndLdk+viQqc6AHYRSW0Hhu6B1WWCNAUbByZ7g55nQ53/OHy2OolXzCPJZ7Ri3KNSVBZvbcEDklgP0nU+iThrBPJWC7PbOJQNhSf0+zbV84Vrpi44E7NiZfnDaZJNM2ibL+FPViFN03hWFl6LNL/9qjkE65nbOMWCIwAGUsI5KEq5j63ycJ2GbokW9YUV94UqJFArpgySa8z8xH9IiTFQQTwecUnLazUb3ZkDjCriOL+AjyFzelxE9KezcVDDkzcAMo9IRXeaN/fbqviCyaANdoVkO4aWw0BvEIRjQPTAEc8vmz8GD0BxbmzNOlPmCd0DGCTJVAlZdD3kKBquuh4xTwarrIdfasAcdI1cAsAcdIz0r7EHH+i+3hUdsD7fY/kP5S88hFxbDHnS88tnMt6OitI0Oksa8ki4KDYE96FhxwIEzhRYfqBvrj6ZPXXF7LOxBx+NjZlFClV5b75TPXMacUtgf9qDjS5m14VtLzzOS4jU673a8/EMo/wYsfCiyI//5sjzm29+yZun2es+GhuT0w6E04GC0DkX00oDIx6B3aGnAf0gotFxNVGnASJTSgH3oBZWn2ZG/Lg2oiWbK3/U5T6W9lxxJnR9mVXT2U5itbqCdGJ/z5P0K6zlP3i/F8Jyn4xc3hux3zLDYM6xIQ+Fk1d72hKjF/5ynJa+wnj6j+Or/9zlPl6fdjPkycafpNsXTDLpq97cEec5TxUssgwE9mnApX2J6ztN20tTJhgoO9FRl/8ba00tP4vqcJ8ULbl2vGKqYHx4xasehEbJbcRhpZEzD1byQdEhbjM95OmA2NSa770zrPaxuKUvcr+6S6HOeeB4P9TlPwACCpt0hJJRp9zdkaOn79cplX720znvRWaeB9aVKzAyt6U0shrbuxr+cob2WVD0vTu2JZaly3PZLNx59xpOhNV5TkUIJazLftDCZQ3uer4cDQzvxJhZDC1hLPAxtjs2L1M59DpomrXH+likbsV+SDC1PAlSGFpAA8glaaD6BQKHyo+waefNZ/UzWP7nTczXF4gO+ofLTFzo1IBlapCUl91yS+gfifC7JRqPCyk51D4jN0PJD5dpoXZUwPGfGYZ8JJy3M6CG9pRn06kkqIm7kn/CcyP6PA8+p8wiL52x4yHcPQwmvOXL6wEnzgNDKlZuGjaekjihLk9OcFYIHQ1uHpXlMHV9zHTTNiR7ourRAVqN42W7DvClqH0fPldbs0EDXP1xGoAW6bICFgs4zlEBXkUVBZbL2s18HunQJP3xORvwRdzWSaxW5+sTN/WtuLCBupSD1GqzhU3eRP3yGoWlOu9r7jv+EY5Qj8xepR84uFVzRqIBf1RdMBTRiu7iwuCxAJxGprmhZOSP59c+4/Ms4/7wMb9Xz84AVpJtatccpn+N5df5HP7OQUX0C6MFap359w0KmEvmuVopefRzY99SCNcFEZe7YACapu9re01YqAyYKuF4CVyBMXh05sg6UPwZWLGyuigv+raXEsIeH13KWs+hIV42nxp8jGxYbBiVpx6/T65KGyE3neTMRuenNr/+qbydTpE9evTDZ9ED0pc9Vpu9etrNvFwAyTwRl7iIqsWXscZ7M7S1crQUzP9mR5bucxeLw8vtZTn687sE79Rep5fOwG5+HpT+xTjshZ3nnZp5gYZCuP6/rLOzV4Y14b3Le5EGyLRAlm0oeTzbIJegR3g0jlxutccMitjiInoo0HR7FV65hFl+5xpd8OOElZ+9fU8Iae9ksLYY0aYZ+RTI+kiPnUxwkf3MJS/KsS3zJR6BJTujn2SF7PuzEHWkh2Ik7cmqEnbjbOFsceBHoQck4rh0aOabrkdY/z079xyjSBVdpk0ilPkcTJlJKcDi01kezydkemu9HjfeyDHn32kL/ylpjwdwpWxawAndika38PDzaANyM4H+OA34OnC3ZHGDpznZunl6Xs8FcYV83wA6tXoMg1cS4T+EcL4HmVvb4g2Cu/BWwEKeoHC8wx8TgSntXHWpmvGRYYLkB3Iwvb3kGKiZSAC2Lc0vXKhuYrJuSYtntmksjIrULvJCI1C7ey7/yFcj+3V5fAbLToHLBoo5kYsAn61xBrTHRSuX6tSjHFehqYNcSKd+EgeW1qj1u0I5cL++6sKCiWvDpQlAH8RT5mAfBVrzXD6BaBphq1V/u0AMs/o3K2Qd6s+A6aMIcqL4Fi8theeiD7/HRNzFdDELqriwuAuQAf9q7ZFTjLc1BwwKXIDM5gc2mFmll5JK4PYOknXatzoVGgUjWxiaXNwraRIKqI5Pooa7vLFKKMwWb09IP5FulO29/oDa/SPAsrY1UEg5SGGBKAXRxaKIaSUKZqKyO0y+cIZ0yDJrXZwq70VxJ4Pv04AV4vT3YTkzRichoq7R+lsAwYIHlPpyYHmRPgau0al6yH6qnceVJqWWinCcndMslW6zbEtIb0d5aAgF8YkEjIGeUqJkJPBB/80zEOSA/bCDiHJCXMYA4B0Qe5/HbpVDaO+KcsH8z0wr2/uaMaAH5RNon7WVvn4EzxpnlLpIfPacuXUPAPlJU4ZgStaMPCkngk0QboYNCodEBljynNFbCRJL6hUgD7MDncji3SaX6kvUuOtEDLWMdey64MemyYN6YFE1YJdovVcq+sWWbZvBG2r4hf8TdXhvZ3ifIgCq9eYalUsqzNh2nqsPSxX8tEDJrRaL54uDzd3k9BqwRL5Q775HHUwrypwZo/pTIheKm5LwfNOlarVVK6SrNmtGDjwjfW7sLxcl9wCoU5/Ae70Jxf8TH7Vo5Wt8i8dNV66+5Nhm4F4pDZgLhUAOt6T1WDbSD78VSKG6ewtpte+uzDNMmrVk4osJNB9dCcee6W0XP+B5tFlnsafzuj7izOIjkgCmS3HviZQ3yf8RVKI78l9P792P0zErdn5TFPhlyot1dHQ+EmteXUUujAX1ZPIXiYt88oB1S5lDiXs9dt6j38sMEKRTngKkG0Gmh2WMUCWX2IHahOM1A92Fh96LN42t2VNmnDl6Adnc4FYpTfIdVKE7xrZgKxZX137ap6f4Mo8h9Lht2WKlmSqRQHLXpG0d9jq7xrmtRTwy4aoNxKDZGeodVzyrrLYHSecVUKG6XpdNyw+Is4+B+u2qXXU0NFVOhuPPHx15y/FvP/JDU98o91zc8w8F2S95i2U6RSLYTqguDT6G4Po1J24dMu2pcFlSySOWUhiqBCsVVvMGswPiGOMYRS6E45OJP4oXieI4OtUxa2FvcC8X9WKH2XPt+vdXu76OsvC4985B4oTjFt1gKJLzhr0NGk1DWIb8rqLfr3vAZ3W4FGucHjCkfGXGrqxhBvW6qVRigXpRKFf6gntxFX7re6R3mUUnx04uLTQXLIxMO1OsCCoSKD91Wqfq/BfUK139bOWLeHfM0+5SXPx6oCT4gTnKgXq4KlsGiJGMwSYB6WxpU7xu43DLfNPjyvkfGkTNxBfWU6AVayRuLKUc7Obqf7DXzIw4jzRnTcFMlZLgOAfXSRve/8XlEd1oyzcHtHHOYYAW2jgb1eB4PFdQDBhA07Y4hoUy7vyGop74k68ALU5ZV4dvpfT3ciqXRbhknUM9DvgoD1BsrX/XvBvWqI/o+oKVxLcuSC2be3DxCHk9Qr2aqbOSTgp7Wx/O6PjtcY7ISB1DPGbQWKqgHWEs8oN75tLhnV0mTGEkquScSBpkYShLU40mACuoBEkA+YSyaTyAQqJeer0HdwNxtnGI24ttKkwwX8T/sEmlJyYF6Wd2rxAjquZgUVuYc6V71W4B649C6KmFyf+8NnWW7WvqL6foGnQ1l/fVscKJekP0fh+Rfmx5VGMm/Bj347mE84TVHTh84aT577a0NNprLaRHDdaVO3hzMwUHzLDkszWPk+JpPQNOc6KDe0UNyvk+YjSZ7H1gXKuTv+NahoN4/XEaggXpgRao6xSrRoF4ivaDy+1XFql+CehPRTPnbQWO7zx4fcmMIxzpCr3yRNGfJaglAYy9kqjCgsVwZocgXMaCxIl2dsUp9Q+g7j/h1G3b05kREnLp90Fi/LfWOR/fWMLYMp/5pyJiUhAM09giUGRUaA2SWIDSWfkjuz9kLR1pmK1TF0Pt/Fnz+pmShMZ5sqNAYIBvkEiahuQTCzKjIqQ8fgglpOhwmVF9ZrAnVXpYv+WTCS/486Vw010jfIkQ2OtZ89reZ+Ej+jjKgq1niBfOcm08DbqfMy8JBcoo0luRkab7kU9Ak/10ApbeXR38ifx5FPXrfIKssyHMrxn3iByhNBH0IKqBUL93eGa4tgJKG1GfN2/2VaMUrdrwuyghAUGvtApSQvR0HQMkAVA4VuZETXBvAMzvEBSg9WfPy71RbjmXa5vdRIyKquYQClOqlsdQqkO7QwP3vDCghl18SBpR4owCVypFDLN1+lYHQNkBp5OlwhTHuVmaHJy06cOz16xQJA0q8Lo4qRUHLRDWVhDJRERRQCtg22rFrbj5j/8MpW+4vCqV3EKA0sVcVBqBUryzi/OP/E1AKemY9hxt1xPJIPzXuLeYRIxwAJZwPSED0xqBXFQZ6I9erSsyAUtPQbkVZIbOsDy64yyisqwnGAVDqfG/bg/QiZYvCkc/W0n6MfYGDSkC3xlCpQLlNx0htA5SQp/USB5R4PQYVUAKUgvzpNDR/SmRAKXnD0BXDtm+nBvXR9byx9dlNMQBKCb2rMAAlSm+RaVuouYG/BpSmPj65wVjhJiN71PWYp/NkNuEOKCEzIHBgb2JAjVDZG7feqIv49gBKB6caa1/xozPyyxJTXvUyd8YVUCJP/KQzv9sHs2M+w+QuDfrDAweRKJgiqfcmXrYU/0dcgNJHeyd1zpt0ernlscPvhn5sIASgxOvLqEgO0JfFAyjtz/KoGsMqopReGt4vueiAF0EAJQqmGkCnhWaP6SSU2YPYgNJQucxxn17cY2w86f7m7OibTmIGlLapVWEASipqIsNE7QeUhqpe9luduMAy+NV9nbE1BUkSAZTmK4TadZd7a7rfzlrp/d9/bsQBcokC5UTlKJzVCJTGKCZA6VOXP8aF9XehbrHvZNL3z1U+YgKUKmpLghzsFakl49Jrax9LmeJgu6mYtlMhkO1IFPEASqumjPRX1fxkfTx+Id0jZu1IAgFKL1SxjHNKlUDGEQeghFz8SRxQ4jk6VDzHRq1ta5JWAEo34ueFaKg9pOyWoZJHx/knSBxQUsFUoE6Vvw6ZQUJZh7S55uHAlt4r/pqHSAoJVvMQmS4Nq3mIzC6D1TxE5rPBnjKIDErBnjKITAOCPWUQmUUCe8og8tQZ9pRB5HkR7CmDyGM62FMGkZFSoKkr1ITc7wNN3aAm5FIOaOpOEn2cCjT1gJoM/6rxZwbSzXfNq9z2o8gXfBxjT6ip88DwMfu221tFKfpWX8rxfAc0KUJNzx6dK+stlW0UpG9kmhrYeSjQpAQ17V00gaxx+gbj+OWBjDHPBy8HmpShpvJXnauNPp4zi+g+/o6UlfkcoKkX1PRmiwerSYpLiT8wcGNq3c44oEkFalK0G6Y3bedT481l0lmHTscOB5pUoaaeX33OvqLFW6cOm71IcXqjBdCkBjUtbXiZKztvu+m6coeDN7sVzweaepNEL8SE6mGqk1DqYa7oGW+aOCGeEqZbVjB1/tF9ONTDpKCNV8Kc8CM7D05pijgXr+I967gL1hF/Qhe+j6Siaf67QpzfbtQvu7FghuXG+Wbd12g2LRB937hAnFEGWBBnNwMxQJxhDvIZYVwuIzKsT//VoxUuExviDDbAQssWGPz/QpzRD6vTXRMaLA8klPW4MIAtiBpLDuIci2mwbpIxmCQgzvmD52bueHvUIn9Kt7JtSnWZuEKcQb2/b1ReWEnZneOvrBr2zAmHkfZoJJbhSkYSZ5OGO8TJftnfp/LUPGpY2dG4Ype3QRKFOHkeDxXiBAYQNO3SSCjT7m8IccrN1I69u9HVcm/AzdzYPzxKxQxxkrSxIM5qrX85xNmrxxbW+Wtz6Aeu6dVc61uMeLZl+yDOeX0uHLzmXEHZuqzu6N3YqaE4QJxNWlgQJ2At8UCcp1c7nt3obWOya6zCARfHg88lCXHyJECFOAEJIJ9giOYTCARxMoN7rNrA2MDYv+Od3vq3z76IH+JEWlJyEKfvMHFCnPuMCitNfYb9HhCnEVpXJcxOPaFQJ2zl3RSzJOXgkHXDch/gtFNH9n8cduoqelg79Q/D+O7BmPCaI6cPnDRfdrJivLK8qXlE4oxp8uf921tEF9Q8RgtLc+8Wl0xH05zoEOc4n/X+oUU7zbP0XeJ3Sp3tWIjzHy4j0CBO8GmLKSNQIM4bFgWVA3eP+DXEaYJmyt8O4qQw594/kGFmdYTTxeIT6e3WX98w7hCnxxAsiHPsEIJCnPssNb8kHlUxPPTiakn8ll47cIU4tw7fMdQuZx8tvOF6jt7yDB8cIE7nIVgQJyCzBCHOw3etE5Z0mU3faOlv5jp0kWCOkmQhTp5sqBAnIBvkEkzRXAJhZlTk1IcPUYg0HQ4T6tchWBPq7RbJzQgveUSPXs/tLo+x2H9DcbHr6Lc38JH8TURSTrr7QcaeuhLOwdRF5XgUohiMWYhiMF9yczTJfxeIc1Boqp+W81CT4pMp+55mz5zUIRBnriYWxLlAsyMhTvPJedqaE92sUhdutRkVlY44dWwXxIns7ThAnIc1sbDEYM0OhziLIg7bWT1YTCt5rFo778ltQSxb0hDnAky1xmr+B3G2EuJELr8kDHHyRgEquQiMAjFCnMNkQ6dtuUQ1PDyhIS45beETCUOcCzClALo4NFFZkFAmKoJCnAN29f46YF+kZeYSl05OOnMGY90WjhBniT4WxOms/x/ECdmnU0L12FmNn41yT4ZfP/J2aw8cIE6cD0hAPDFXHwtPjNIXN8TpcZKxTs/WxnTriwmGhRN0BMtJ/zOI01JL9Qjz/Rl6zLW8W/2WPLyMg0rOmCpN1RcjxIk8rZc4xMnrMagQJ6AU5E8ZaP6UyBDnX/ZaFhUsF+uSx8xJzxJfGgvfW7shTo0xWBDnqdF4Q5wBl0Kqmc6LGEGDy/Zrsz6p4Q5xIjMgcOATVcZg8YkvRosF4uxxaf9+W927RolRQ7/26voUUXm3nRDnrm/H79xf/8q4aJn9Tr2Lk+/gIBLQVTBESh5NvGwp/o+4IM6ZK+vfW/uup+xdMmq8fwT1PiEgTl5fRsUWgb4sHogzy5/pQHfdZLql760gDRUjwd4sOYiT12lR1QA6LTR7WJJQZg9iQ5yvV1RszWpIMNy33sK7ej9jjJghTvXRWBBnwigxQZxe5Tf7LX3iaJ1uXb9yS3CPPIlAnB9mfTkRGh5kuU752dmAp4X9cAABFUdjsWYNowiUxigmiNNuhekqjtIs82CtxvEG104L5i3gB3F2Ynj3Zn40ppW46meuulQv0rG00XYVo7Bsl0Ag28mJCeJUc8vYvCTUz/xIVeW1J/v2C3pGyUKc3pjGMSWQccQCcSIXfxKHOHmODhVhvDoKd4izr2nwQDtVL7NNI1nLgH2V4JNWJAFxJozCUmDBKP46xIqEsg5pM8Q5oKX3ih/iRFJIMIgTmS4NgziR2WUwiBOZzwaDOJFBKRjEiUwDgkGcyCwSGMSJPHWGQZzI8yIYxIk8poNBnMhIKQziRO73YRAncikHgziRx6kwiLNPjqJ22Isqw7AzU8Mq7pb6wCDOWb3P5Q75Fmicbb54/p68u3NhEOcI3eLYmDsDKaVLpPJmjFI+DIM4d7zpknTlrw9Wxwa+22QX564CgzgdDNRyC90eWe/Uckyxj7KvhUGcMQ7Z1pVjulmXch+s3Orp2BcGcc47LcU5OzOLkTPi8KJliwcEwCDOIY7VismZDZQD1RoG1+t6xMAgTuRqS4jUBJFOkUN/ovfy9LPdz5jH1266tTTkw04cSE1rtEFJmGN8ZA/BKRcR5yp+4Dk+GfMcn9Ryjm+DpvnvSmo+7G5w3YHlZ7LpVh7z0dg/NcVIagYzsEjNLgwxkJpzsr+uCj/+0qj8/ZcuFUrJL4lNaq5iYPFj9oz/X1KzYZnnuyGDF9KP6G6s2HClTyVBSM3hmAbrIhmDSYLUZKikJNT2LzQKn38xYJzu5sO4kppjZj9cuHXeDcN4yxFR6ybpZeMw0m5bYBku14I4OzHcSU3pcrnPb8PYxuWNSonqzLBBEiU1eR4PldQEBhA07c4koUy7vyGpucMz4bOUqrVF/All0tll+/eKmdTUoWGRmm+o/3JS0/LmscKKi2uMdtz5sUHj6UTEw03bR2rmHxu6RJrxh2luty9Z6tXfKnAgNck0LFITsJZ4SM1Dubpf6qfPtS4YMfgpxdu6WpKkJk8CVFITkADyCbZoPoFApOYMc997Dfs9qLm2wZvqj24ZJn5SE2lJyZCaNoWVpIN0cZKaCRaFlX/so/8epKYdWlclzE6d3DmS8X1SNiXM+9r252qNDTjt1JH9H4eduqkJ1k5dx4TvHuwJrzly+sBJ85dOUVPlC10tS3dusa71+vQMB829qVia27S45FlomhOd1JSbEkr5nK5ATRwlPe3U6k7jOpTU/IfLCCxSs8YMhdQ8b15QqXLO7Nek5mw0U/52pObWrj4P7zcoGR6WdfG/NvCWhQRIzQ8zsEjNkhkEJTX77tJaqqCTSY+eyLHqe88/EVdS0/Ez5yh1iT0j9dt8kweuZe3N4gVJzRczsEhNQGYJkppaKsmuR68EUYKnyFUM3TWSTSBSkycbKqkJyAa5hDloLoEwMypy6sMHG0SaDocJdRUFa0JdQOFL7kB4ya85T1/WQ0fNqrjfuHHHhxYp4yP594KQsMVDJhmmds2KN8zyHYfHunE65rpxOl/yuWiS/y6kZo8c6T92J3ygpyocNJD58+HmDiE1KTOwSM2G6R1JapoY7PuUWb/H/Ni5oDJGTa7gc93aR2oiezsOpObEGVjsoeKMDic1deqVJjZdC7aIMkzs73H7gjuhSM2G6VhqVUz/j9RsJamJXH5JmNTkjQJUPFFxhjhJzZAtJgtCmibRomp3DVNdsE2QxOl4UpPXxVGlqGiZqOaRUCYqgpKai7lymxklW803zSKnXUsbiXlbOJKaH8yxSM1k8/9ITcg+gWtlSYu9K82P7K4Y+uSM9m4cSE2cD0hABvGFORaDeMpc3KRm0NZbBiPWllmlHqzZZ5bEFnwY9T8jNd9779iZPy+PkvXu8pwfrwePwEGlZEyVfM3FSGoiT+slTmryegwqqQkoBfnT+Wj+lMikpnyZbWH/BV5Gm5uysx+5+n0SA6lpb41Fan61wpvUPLUq0GP73nCrOKleroMiDh3FndREZkDgACEyrLEgxCHWYiE1XQc79+j18qN5UN0qtU/3QhRxJTX7adldXBVx2TTzzbBbrxhWI3EQCegqGCJdtSJethT/R1yk5ntSgeGV66+MQ/vRV5SdfTqs3V0dDzaR15dR2USgL4uH1JyYvOQbLTXSvOQdqfJAl+9WBCE1eZ0WVQ2g00KzxwISyuxBbFKz8HN0stliBdMdL+1o9Nsne4qZ1LSxwiI1ayzFRGq+Yz8ztOq7knJ0y/pOe68FDpIIqamR5ZgWbn6CuumOvM3quIr+ONB+plZYQBlZQh61I0nN77IpFvoRo00zTPUTjbdNPCsmUlPNtjHs1eBCw3Lzcp+R+1w342C7Jkss2wFDgTC2UxQTqXnFrrMVxeuNcXBSd7kx2p/6EojUPIhpnCACGUcspCZy8SdxUpPn6FA5xW5WuJOaJj6zVZ7cPEcpC+2X4Dp+5EKJk5o1llgKbLPkr0MWklDWIYQmNZEUEozURKZLw0hNZHYZjNRE5rPBSE1kUApGaiLTgGCkJjKLBEZqIk+dYaQm8rwIRmoij+lgpCYyUgojNZH7fRipiVzKwUhN5HEqjNRcHFKdNLVTf+PIj1ImD84FXoGRmtp3UxuYhRMty/UvRt99NWEPjNT0O5sUPSvoreXhoV2d09Jkg2GkZkbVe+3ykPGM/Y2pS1JrTQpgpOYdqSdF7iNuUcMDNq3Y9nr8KBipmZmZMsOuxMN8faaCyc3ij3QYqWlbNII6XPGsZWhFsEaMf/8HMFIz5sf9Xs/OMQwj7l2NO/Ok0BhGaiJXW60nNbNGjdfy+LLCNO/lC+6jOxpnRQyUtpKai9AGJWGO8ZE9BKdcRJxL9YHn+BXTsM7xU6bxHeFiNM1/V1IT+WBcMZGaBcB0oqOMRmo25ACLIyWhbRrWgrB1pKbHU+vUoLyFFklU3VurXg4/1R5Ss53T7UFAAbIyGiDWBD5MSokoKGZE5nFVUhOpIvryIIWlP36IpPv4yyF8UMzht+Qd+g11M932OX1i4beQuQRAMUGD1ShhGeygZAwmMriYNUPwf4VRTCxj/RLF/PDJqadnUBGtpNPyKX8sM30q0ZUraJkgTMs4SMgyHcJaDlr5fCyrxME4Xe2Ee5pM3RmJsZZhOZBLE8laGjQ7dWjiXEL6l02cg39M2v5hd65p6V8X5Ted/fpYjCUOStywShxMdRNDiYOvI5Nkuo4PMNy5dcxVS9UpX4ld4iDXDQu8jnIjyryK9iO+edU/Tu10VuEjkwSqZvzcQw+2EGBe5ZUyxzTYVMkYTBIlDrISSJeGLDM1ijtkpqE495AeriUOdv51U6N/kZzZvgJHzuQRg9qb7wwaTgXTcC9c/8XT7oQ9TVM2O8ykZxdWZyT1fzxGYtMuWOKA5/FQSxwAAwiadpkklGn3NyxxcN9kW5bd2Qn0BINHz9KmnnQWc4mDIYuwShy8WPgvL3FQvSX202S5WqOQ+hia5bMJQ/EscbCz+62Lfnufm6U/LF1+ZLO2Dg4lDjQWYZU4AKwlnhIHS84M19Le706LeaZnH3nL2kWSJQ54EqCWOAAkgHyCI5pPIFCJg+p4oyEfFTpRco6dNt7wfJ2++EscIC0puRIH+xzFWeKgzKyw8nyq4+9R4sAJrasSJsSdOWnczcOh26xji9ykNumsGY5TiBvZ/3EIcS9xwgpxU5z47sGZ8Jojpw+cNC96W35t6SEuNXOojd/IUM/VOGieuxBL820tLpmFpjnRSxxIv1EdZHAqkhZGujoiRDmkL+r9iaPEwT9cRrRcTUSJg3MslBIHH0wLKgeeYf26xIELmil/uxIHxbTRdUrTuLT0PvFep6vltCVQ4uDNfKwSBwXzCVriYH3I7A89B1SbpjxsyLrwqJ8SItOlfSUOvH4k7NO8omO+JaCKMj61tr1gB1jioGE+VokDQGYJljjQfNh3zOE19qYpcw2aws5umk6gEgc82VBLHACyQS7BFc0lEGZGRU59+PD2SNPhMKEGLMCaUB0W8CV3I7zkZsW6KUOiJxju2dr9xKtgZj4+kv9ZWTvbesVdRhpVR8+7fs5WHCQ3mocl+ZB5fMnZaJL/LiUO/HaMs5xyk2qWtIgWfyhk7awOKXEwdT5WiYNH8zqyxEE9dbm8gkq88ZFURQf/ktFGOJY4QPZ2HEocjJ2PBe13m9/hJQ56J92tLB6dbJj5YUr8rsJZtYQqcfBoHpZaJfP+K3HQyhIHyOWXhEsc8EYBKtffbb44SxyULFqgymX2YWyuXxMzYcZ0RGGkDi9xwOviqFKUtExU7iSUiYqgJQ5GrzlnbHOj3jSXm02LaeqzsYNKHNS5YJU4CHL5r8QBZJ+Dd8zWv6h9aRospf4qrqRbVxxKHOB8QALC+zUuWPD+QRdxlziI0pzcmxyVbba3uF9tT/uGmTiUODBau+FZ+Hd/49SiOucbvVnOOKgUhKmSg4sYSxwgT+slXuKA12NQSxwASkH+dCmaPyVyiYPUvIsWwdV6ZkWTt8YoXHy4SgwlDkyXYpU4eOOOd4kD27CQFXWr/GjHiyf11wnWXYR7iQNkBgQO9D5lKRa9r75ULCUOKGaZZcNNjKy3msROTi3298S1xMGfxv10xmRNohcM9c3xYkRE4SAS0FUwRKp2J162FP9HXCUOJq+fO92U5ETP7Nq4wSVaK50QJQ54fRkV6gf6snhKHAwcPqhqwKwM+nb7wwvOPZfRIEiJA16nRVUD6LTQ7OFBQpk9iF3iIHrX4ZVLH1uZxOa9Jx86sclHzCUOGO5YJQ7OscVU4mCcafoIvdJEi0LbuojEcSrZEilxEGimc8EmeLP1xgs9XCkf5LNwwOSN3LFIbA0JedSOLHEQoPam8QbN0Thv7J2+evcz0sRU4iA1VXHqR/n+1KMyvS7367nqOg62+8DGsh0wFAhjOxUxlTiIU322wndOFn173d+qA0wVGglU4mAfpnFWEcg4YilxgFz8SbzEAc/RoQL+cu64lzhYOMnH8tPJM5RyrUeBvV9wDCRe4uAcG0uBGDZ/HeJJQlmHtLnEgUZL7xV/iQMkhQQrcYBMl4aVOEBml8FKHCDz2WAlDpBBKViJA2QaEKzEATKLBFbiAHnqDCtxgDwvgpU4QB7TwUocICOlsBIHyP0+rMQBcikHK3GAPE6FlTgweWGhG7xrMnWrn+7yzYuOnYeVOBhx1q6/555so+JpTgO+bR+iDitxsJB91MpaaZJ1qsMf6WmDqiJgJQ7+uK+W4fgl1KS0NNhittOihbASB5rydnJ6AyJNc65fVWUpk8xgJQ5sSIseWe+eZ5lupXRx/G5HRViJA+S6SahYAVjwQOQg5vYhB8S8HmkRvGtOeuczKgNxKFbAQRtehDmQR9oap6xCnKvVgifyJXOxTuST5/Jdmhea5r8rc5l76qTa9NcfTbJTDjWdsnvRT4zMJW09FnPZab0YmMuLdt66+ZpsqyhLWm+18AeOxGYup6/HIsGGrf//ZS6L3zkkz14ibbLuwP7L0Qn7pAjCXKphGqyTZAwmCebyzV7W+YsVb81yqJ2XXPlb2g9X5lLWaLPsjSZf46SYlVUq35do4zDSXq3DMtzNdcTZU+HOXJ5+6Tr8rft82lG1r5ozG3tnSJS55Hk8VOYSGEDQtOtNQpl2f0Pmci95WNOFwhzrrX/fUv/2YFaQmJnLqBVYzKX9in85c7ltzcl1p5njqXlVlERyifF3PJnLSSm1JRrLOhklpCQN3bVT0R0H5jJ4BRZzCVhLPMylzO3Xjdbvs2kHnsnMfLBw7wJJMpc8CVCZS0ACyCcsQ/MJBGIuafeusKNy7hivnyCfp/tGmSviVnBmLpGWlBxzWbJGnMxlpVlh5YLiNb8Hc8lF66qE2al3y381e2pnG8M4ZbvhMzYOjsNpp47s/3g8kXEt5hMZ1/Ldgw/hNUdOHzhpnid1+Uoq5xZ13eiuJrLyMhwcNK8JxNI8K5CvuS+a5kRnLjeMW9wl3CrROtR/fdylcA3DDmUu/+EyAou5fBeEwlz+ZVpQafs26NfMpR+aKX875nIVe8bEtZ5F9M0v7rEfdX5m+Osbxp257BaAxVxeXU5Q5tL18OFRFmdZFqUpRf5JDzJzcGUuv4/zdtid/J2xeWJ8Q8SnhzdxYC67BGAxl4DMEmQu8xyse1/dqE/Ze2taH9oFxwICMZc82VCZS0A2yCX4o7kEwsyoyKkPHwAQaTocJtRtAVgTqm8AX/LlhJdcc+LIHI3qcOMy9+kUu74Z2/GR/IbyOrtBM/eYlH09XUJJnhaAR60Of8xaHf58yQPQJP9dmMvtOY0nznX3oSUcOhRRMPOBMsZ94sdcOizHYi5J7Z7h2sJcVk9+2LQ6INMksUB2yMfsQYij1nYxl8jejgNzabMciyLUWd7hzKX954jtX0u/maenfc4qYGcKFviWNHNJwlSrzv8/5rKVzCVy+SVh5pI3ClBBQ53l4mQuObfmT89Tfm25feSgT+v6N16RMHNJwpSirmWiCiShTFQEZS6DmrxLr3VpMix9Mzvl4aHLyli3hSNzyV2HxVzS1/3HXEL2mVx43bh/fKr5uvVBDONiKX8cmEucD0hAmpCzDosmnLdO3MzllVmh1z9O0jWPkftiYDr+nWDQ7p8xlzKNJ3NpI08ZJZk7WFBWrMVDJTqmSqPXiZG5RJ7WS5y55PUYVOYSUArypyvQ/CmhmUuLHXEjF8sbJsvFTDMYs+6Z8L21m7nM34DFXEZswJu59Lj6eFCP0FeU8L8vZJkUzD6IO3OJzIDAASfM2YCFE+7aIBbmUttrJzfWea/RsS2HlP6mPh6NK3O5xb/rFOvBG4yS9BnGqz2NHuMgUgSmSP4biJctxf8RF3OpnvO2MNIxhF647vknn+/7ura7q+NBGfL6MiplCPRl8TCXsvPqbvTsfsLqYPLhfR4yxX8RhLmMwFQD6LTQ7LGShDJ7EJu5bJqr1dVZ1808pNSCNW3WNEe0u8OJuRy7AYu5/CCcAowPc2kQSH0bvVSdtmEt3bSL78U6iTCXZtpcqx7y/ahZ8d1d3YOfHMSB2zPYgMlcSsijdiRzqfXn3+7RJ/+kRpEabBo3e70VE3Pp9nzVuJlPelkVnHLfEPlAJREH28lh2u6DhHKHRdlOXUzMZaouqXrN0y+UHQesKbMOxlkQiLmsX48JxBLIOGJhLpGLP4kzlzxHh0ocKrdxTdIK5nJ6oWHj4Cfl9P3jw/oFni+skThz+WE9lgLXWjKlV5FQ1iGEfqw0kkKCMZfIdGkYc4nMLoMxl8h8NhhziQxKwZhLZBoQjLlEZpHAmEvkqTOMuUSeF8GYS+QxHYy5REZK4cwlYr8PYy6RSzkYc4k8ToUxl/Rhq2o31toabzvqEOy+6PR8GHOp5BNW5359skX5O9VR+ztdPwxjLt9bbYk8O2wofV3XjEenEl5cgzGXpff3r/4Qs968bJJW5gJrhfcw5vLw4AnHemp9M8oOj8zTC9VWgjGX5r0UT1rHz7Lav9b02PJnu6/DmEt/9QHyrOMvraJMQq69XdVVHfZY6Ut/XD54fkIQ5Wj/nbIr3qn/BXusNHK11frHSh+SXrLmo2uAWYl6lyPL4/bE40BqrkYblIQ5xkf2EJxyEXEuugee49f5YZ3jF/jxHeEaNM1/V1LT30kqNWvvHsv0R2506roHNaLvGxdS0y0Gi9TUiREDqWk+qmnatcZNptuiE16V9XxdRWxS0zkGix+zifn/JTUNKkcvce6ebbFz3VLqIbc+kwhCak7FNJiOZAwmCVKzPGPxix1XtWi5x8dX7vfQ3di+hS1ipN3dOrR2fJU1I/tO6OSgJYWD8Hg6JqbhSBIyXIeQmleMVUe6pOy1WJeYNlB9yN1qiZKaPI+HSmoCAwiadteSUKbd35DU1Mp8YDJpRqNREWv8ViU1qaliJjV1IrFIzW6R/3JSM3DizkyX852NSu8GFoYdUT6OJ6mpuJv83Ds0kFoy7KbZzOKq4TiQmkMisUhNwFriITXVHUY8c/IztCi9r+L4TuuevCRJTZ4EqKQmIAHkE4LQfAKBSM3pMyb2khuWaXF4TI+snndzj4u4FZxJTaQlJUdqukWLk9SMNC2sPO8a/XuQmuvQuiphduoD7GuTXI8GU/NfKS1PHz57IU47dWT/x4MajMbaqVdE893DesJrjpw+cNK84pTK96Tx8Wb5+Ss1w9cu3YOD5n9GYGleFMHXfAOa5kQnNTu91ja8cv+9SXBY6dej0efpHUpq/sNlBBqpaQosFL5uQiE1T5gUVPr/venXpGYwmil/O1Lz0jkfXbNjzvR9B47kN3xX9f/1DeNOaqpHYJGaX8MJSmpyfBeP/DH5u2GYfpacfwF3LK6kZqDsTdmkT5om265Q+jIuHbfEgdRUicAiNQGZJUhqqt9/qfH3qC8m2VWFPWbFlZgSiNTkyYZKagKyQS5hI5pLIMyMipz68MEGkabDYUJdgDmhMlom1BDCS17senOQ49FH1B3h8r221mTtwEfyD9f3bYl5cMA0/8C3kBr31wk4SE4Lx5J8dEsvD0WT/HchNaMG5N6T/XbfPH+Z26vtl74ndQipWRaORWpuafcM1xZSU8lo3FPWsG0WKXUnXs+5fUowmNE+UhPZ23EgNYvCsdjD/eEdTmo62SQp3Dgx3GTPLfLpH97bBOszSJrU3IKp1prw/0jNVpKayOWXhElN3ihAxRP3h4uT1JQbcy5sS0qdcf4EZWvW89tuEiY1t2BKsaZlogojoUxUBCU1DS82aXudmWe9Y9w5RyWtD506iNRcvxmL1Jy9+T9SE7JPVZZ6Utz9DSbJg+6tMclTEXwq3T8jNXE+IAEZxDWbsRhE983iJjV17TWdbWk+RvF3vMsWLqMIlrT7Z6Tmzd2jjXWMPSkHNe0fzqv64YuDSrMxVaJtFiOpiTytlzipyesxqKQmoBTkT8PR/CmRSc3vuZPTX606Qc9etqnnumtlVDGQmtWxWKRmcizepKbFcvseI7RXWOYkl4yYmXBeMEEBD1ITmQGBA4R4KhYLQsyKFQupuSd1jt3r81csdlqvodeE1ggmErSX1BwcF8f6WBtkltKb5PT4xrBLOIiUjClSWCzxsqX4P+IiNTeOKLbpY+9ukpHjo11W8wen3V0dDzaR15dR2USgL4uH1DyvqppS6HeDuvnrdvexiz8JelnJkZrJmGoAnRaaPSJIKLMHsUnNvJRtlv7BB+ip13f1mBm276uYSU16LBapKSM8l+BDana9F1l5Z/oxi9iYim3q0+8MkwipucJj8BF/dx3jMoUTV+cu/qKBA+1Hi8UCyvQl5FE7ktS8ZbSZ8vykvsX2dyMd9V9H9xUTqRlXuz3mGem1UXnkvVVFFnsacbBdX0zbyRDIdhpiIjWDOhffyjy0mxIf/+MZaXyNYAhKsqTmuxgs49wlUH6wWEhN5OJP4qQmz9GhcopD2rgmaQWpOTqMuavTrt1m4e8D558/2ilB4qSmDKYCDS2Z0pEklHUIoUlNJIUEIzWR6dIwUhOZXQYjNZH5bDBSExmUgpGayDQgGKmJzCKBkZrIU2cYqYk8L4KRmshjOhipiYyUwkhN5H4fRmoil3IwUhN5nAojNW/c4fq8jp9odND9b2pZWed4GKk5xvHsg4L8Y7TtjcMvjpk55hCM1DxundLN8QzdKGvR/v1Pv+RrwEhNt7TBqTX+7tYx8wLnv9/j9BBGamaMuVusqENhxFO1Ag4odkuHkZqjV17hXDmXSikfEd+YsrReE0Zq1hzobp4esIGxNeNLN/3YczYwUnNyj7pJ4W/dzOIPG51+QLUcCSM1kaut1pOa0UUxabuPjTJMNn54sdZpfZyIgdJWUjMKbVAS5hgf2UNwykXEuVQfeI7/PQzrHP9VGN8RRqNpLm8X77/fz90o82UTawL50DuBr9oT2ltZAn9w2UwP4V2ZLIrUffm7Mg7Z2pvFMWGQPaFrtG4nlr/3uNvN3gxKiltud5mFel6YtyVkC+Qb2pA1lVBWCSgE7MlqhA5IAEGbSiqRezKs1V//5pkB9Pi+bs3pe34+LLKTG5PDYYk+rk8xrulupXHOLFjZasjq8if9Bb64rFHzFYS+cEsD3pMtmM0QBkoSJGr5dxDogRPLKiWx/JN2AqRtmXM/f/78oy28JVnQMD7eLCc/DyaX7MZ2dfMAE/BF2maY93ybCutE6qHvi3pusj8mmN0jZwddRDhA1dIiDus0lGJZJ6GUANYBZoAfbdk0DTT2ZPv4gBmETgJm4rsQ0UdRl5a++v5ir2XaPbW9NYfPzxE0TvMVRUSAf7aIwzimmMYBvInkjQPaB26czr8wzgSqJ/greTYBY43AR1kcp0CyjoG+AXka2cubucyPNZw8ivevn+8QPaI2z7l6l3POk57/8NJRvb9t8gWza+xh1xfOrhFoFYfxDpZgGc9BMsYTue2tnwG3YJdfWHDaTwv6uLE5gRxg6QSYDzAXx4sDmg74m4fXcl4j+E8DsMmTGdD8gugSd/qf9/W9Z2id0Dc1zGpjcDGisoCbKI4WelkclpPDtFxBsaQtB34IzGtoU7BCuflUmM1xxXaEtupGTIOVm0y3fQku6uY3f4mgI0RdM/1swT2ElAutIcB1arXQsiqX5wihdeomEso6tU+XlXYniz9Yl8tlPtYev1IQD+ph2Iwi2nBZ/mzWcmG8GQ2xGEoFM/59YDgjewXsmIrs3XxBn55mHCcPP2eWGceWxYG2/+iL18Mjsitd53pTkocebSxRPrcf616Fc3sE23vMBv7w9uL60tkevs2/WNQWCxUrB0ZDUzmgfYKoI+uJwJLWtFxoScvfVoncQ/FP28AcSkieVq3oJ6/Vc1p3rAc9d2j05PqB9k/bf7qH2F3pvDPor8W6bp2g4VA6ZEb2lXburtTBtRWonMgzWrCCS4Kgcr8K46vaw5YwZC9/FpfLdhbtTp+cpX6u+UQyi5GPHjrG3YfU/iGM0ArpI3DQyhRTq6aO3SXwSVxZaMsFvglc7NxJufNDjgWt+Pgv0gxoP6R5cxtyVpXjbwz4bwX/txt82SP4iZYQx2Y0N9bmuGML9NcBcUfkphsWd0S6NKEAEvhtRfZl/ZfbwiO2h1ts/6H8peeQC4txCCDFoKlL0GAGY6esekBflvWhk6wblZ/Up3ZYMKPpM1Yww+GTuIMZ07tNk6UFGNHzxxe6zJAfPJwAwYyGz5jb5c8E2JG9efOmA4IZf6h9zLul52N1IPrvxkdpVCYhghmmmNZp+kQA63RIMKPTeJeq3XvPmhVbv313UnNRCCGCGQc/Ye6HiWAckiSDGRcjH5dOtsw03Fi/0ebLwV10QgUz5DCNV/BR0ltiAgUzFspYzFOYk0lLu/fqafiWkfESDma4fcSynLrELSfWYIZfVVJ+1ZqRhnspfntnqiy4R4hgBm8NgRrMABwhtE6NJf0LghkP08a/HfxkADWVu9PhpWz5CgkHMxq+YAUzJn7pmGDGBkO9vGmvMq0iUgaQPFb17IZ7MIP8l9P792P0zErdn5TFPhlyAocNet0XrA162BdxBTO+DGuc5aNea7jLK4g5fEHhQNyDGUgfgYNWEzG1amj6vwpmbEFzY4QOZiA33bBgBtKltT6YYbXh3SCzuGKzwljLOQpn1D7hEMzYiqYuQYMZnQeGj9m33d4qStG3+lKOJ/Zt4RnMCOpThRHMyFIXypbHOZjxWDV5m3L9BOP1p+7Iv/9xaQIBghkBoCSoS0ObPhJJzBXckTU0NHRAMCNmrT39U0NPSqTX4MpYrV4hhAhm6GBah0QE63RIMKNmvt/ZyuGdGQc9VuQxLh+1J0Qwo04dyziAN5G8cUiSDGZsPTalP5VEsTxk3/WErYfBE0IFM8IwjbdEMsYjZjBjdUoUZ+ecw8bRk1Yvv372j28SDmZMxLScosQtJ9ZgxpbKWyPqDNNN04/89bXguz6dEMEM3hoCNZgBOEJonbqN9C8IZjx7dK6st1S2UZC+kWlqYOehEg5mrOpbhRHMGNIXtU4YrsGMm9c8X7zaoUk7wO3b9P7zoI+4BzM+2jupc96k08stjx1+N/RjAw4bdN++aPQ8uEFn9G1TiYE2BDNsFDLfy6bMoBWqhZ621Lezwz2YgfQROGg1BFOrrx27DpV0MCMOzY0ROpiB3HTDghlIl9b6YMbeRRPIGqdvMI5fHsgY83zwchyCGdvR1CVoMKNPjqJ22Isqw7AzU8Mq7pb6dFgwo9s4rGDG1LHiDmZMs6je3n3hRMbOIQkRw++t+EiAYEaXcVhLw9tjCbAjq6+v74BgxvzPmh9LzxfQY/+4p7dbblQ0IYIZuWOxrBNFBOt0SDBj6KAjMtPG5ZqF7/MdObJTbwYhghnOmMaZSgTjkCQZzDg5eDS7snYgpWC/j+KA4uRuhApmqGAa78UYSW+JCRTMqKue9PLRlQaTsJc3rbtFflOXcDDj1BgsyyVL3HJiDWb8dYxzcctwjmXasohsSmrkcUIEM3hrCNRgBuAIoXVqPOlfEMyY1ftc7pBvgcbZ5ovn78m7O1fCwYxu47GCGbnjOiaYYZztuNH3q7PhsUmb5F+91Wx/vUTkBn3myvr31r7rKXuXjBrvH0G9j8MGvct4rA367XHiCmZcrWBuPTTsnWV86aDXL54yzuMezED6CBy0yh2HpVXUuP+rYEYCmhsjdDADuemGBTOQLq31wYwRusWxMXcGUkqXSOXNGKV8GIdgxg40dQkazFgcUp00tVN/48iPUiYPzgVe6bBgxsSZWMEMNxtxBzNO9aB1S2drGO092lmugLPNnADBDIOZWEtDuZkE2JHduHGjA4IZ6rl7Fp77qGRRMjno+cqtzomECGbU22BZp8CGANbpkGBGcYX7i+KVD40KVvrPne8QmUGIYEYMpnHciGAckiSDGY9pFZXbPb4abpv6Ykm/zrpKhApmUDCNpy4Z4xEzmGEelGeqkyJnuiNcsWds7dD3Eg5mvLHGsly1taQtJ9ZghuGMgSe0jXdRihUuq0aXDyAGZsJbQ6AGMwBHCK1TE0n/gmCG9t3UBmbhRMty/YvRd19N2CPhYIaBLVYwo25mxwQzHl+6tfqlnCtje8IF1pju74fiHsx4TyowvHL9lXFoP/qKsrNPh+GwQdexxdqgk2zFFczov+Be7r5De0yCp/prqVxfjX/NDKSPwAPJmYmlVVbH7hIkHcxIQnNjhA5mIDfdsGAG0qW1PpjhdzYpelbQW8vDQ7s6p6XJBuMQzEhGU5egwYz8ZO3bo9JsDTfcun52qXNftw4LZkz1xApmeHiIO5hh7/igs93mztScqT2cxgTbLCFAMGOsJ9bSsJsnAXZkly5d6oBgRnr8pLWKsb2NonYc8LMrkc4lRDDjkQeWdUo8CGCdDglmTHSZw114hEaJevLnTrnRSVxCBDO2YRrHgwjGIUkymCE3rHGa3AySReSUkZGGvXTvECqYYYRpPA3JGI+YwYzRA2KWuo8eS9khtar6quqLaAkHMz4sxbLcuaWStpxYgxkjT7y+skSql3HYjgpT+2z9U4QIZvDWEKjBDMARQuvUnaR/QTAjnPb1KXtQJ/Njrg5baSNjT0g4mDGWgxXMuO3ZMcGMdbG3XmygP7UuS16qW7LO+zTuwYzJ6+dONyU50TO7Nm5widZKx2GDPpyDtUHvwhFXMGNqyV8TH88PsN6jdGFGpkMdC/dgBtJH4KDVbU8srXI7dpcg6WDGLjQ3RuhgBnLTDQtmIF1a64MZJi8sdIN3TaZu9dNdvnnRsfM4BDN2o6lL0GAGfdiq2o21tsbbjjoEuy86Pb/DghlHg7GCGfRgcQcz+ps8X9Dlpi1jw6Wzh4vj994kQDAjPRhrabg9mAA7sjNnznRAMIO5zGnMnR4+Zse09R8wNxXTCRHMWI9pHQ4RrNMhwYysWwxZZ7NnZjkL7IpvLcjvRIhgxjxM49CJYBySJIMZ647+r70zgYeqe+P4oIRK2qRNk8qrSOsr7WZsg5khW7TaJpSdpF2FKBURKjshhGxZCilSWrVQadOmnVYp9b93zMjcmXvj7c7c+/q/fd7386l7zHXv73nOc57znO85Q9E6dS9ILTtomOjmYUPzcFXMmI5oPFlsjIfPYobjjrEi2yT3ae1ymJNhNXa3I8bFDAlEy33egbXl+FrMMPaLH9+cN0T3kGJx4OKx9+bhopjBzCFgixlAIGTlqbGEHlDMGOjuX7e6do5e6fuh05KEa9MxLmYo+SIVMwi+gilmDCZsuL3mjal++rWD4/923aSJejFDJru5cLeVn1bhtlef3X8k9kWDzPBFmqAP8eVXMcOPPLNx/uxSmvfrx9PsXuZsR72YAY0RKGhFQNTqtWBHS6yLGXFwYQzXxQzopLtTMQMa0rpezPhA37+7etJfWtv6pj05G/H6FgrFjHg4dXFazIB+R7LAihmiIUjFjOj9/C5mnDt9mDFeX5gSuq3KKmHA8204KGYIhyClhm/342BGVl5eLoBihtGgC9efzounBPlffiw63EIMF8WMO/uRrFOJB+sIpJgxfd6YlrkP32v6n3ojpLT90hRcFDOyEY0TjQfjELAsZmwSX+j5XnOfTtHYwZKn958/hKtixi5E43liYzx8FjP6/J1xc5JKMz00itLsR5b8G+NihhWi5eiYW46vxYxJ+ZsWXjUgaCSKq/y8rREUhItiBjOHgC1mAIGQlacmEHpAMWOGVXVDQX4OOeyl0pUZi2YcxbiYsT0EqZhhGiKYYsYp72D50YNk9HPNRku0WC2IRL2Y4Tu52GC48WrttGx3+ZKrZ5xQmKBvCUGaoK8O4VcxQ2344fs6Lnd1/I+qMHa3Pv+KejEDGiNQ0MoUUStyyP9VMSMRLozhupgBnXR3KmZAQ1rXixkn9GP7WZ3X0shakZT0/Gv+KBSKGUfg1D1/2JLaNnuY9vYk2T4vx20s4ew3VEBTopEGlbuK0Rumy5LZVQyiA/hZd4atI+C9RBvGKuCfNkSr9UTgfd08iC7O9k4eSkTg3W3BdksnG6IDw8nWw055c5di404dc4vFfiVaux5dsElP2def93Nz93d2Sxe7KdgRY6OBbnqSDKZHkG7qDwzEFtFcgwFSSJNiPkAnDXi+nXXzdvFJ0cc0849q/kx/FzgXkhyCn+aRHDIv//bQZ5+2we/oFvRD+4PtKe5a3/4wjlHAE9VAgabyimMRwGjpH41J7iih7gx0f3snwBnBn5tBgP/TnTKIDNN+bLdVsLF3A3oX0D6R95er19+qUDat04+9/r5CqtEqk8OO4hrsD3PZslMT2qklaDAPRINZYGMwUU/gjdsn2dzGalrIy1jCv+lsfZnGao8rPO0Tn2O61GHESY30KfIjco0zOM9sEKUyP8hlHPb13/U084EZ5K0HxtPDV+SHzV7jIoFCT6MiGk4VI8Pxml83LezWTK0ftdNowdNUC78r9Q21HqaX6/TU4IrFMU5csReV13S5/SraHUghlxXxskgEggt0SLiaw+xArGE3iQAz7IY1foqabBJILbygf1r7Z6wcx9tIaHoB0wRmwsU9L4PzdWlNT0uHtawFBEbHDTrdi/2TA7X0DWkkYwW5jVPnGG6WU9Kf2KURV1T4x0q64S6tjIVNw2MNz0XDPTKXGTq1dVHiqwUVhA0HAYlV1IGcEurqDwFXX3Gwsr8B6F8MIH1ne3ovljwSOmBw4PLkPszLOjbs/hnR5l0UF2ymk598lK72VPFuX32mq3J9Tqz9+q8PmttU7RUqFdcoejuM1l9x8NX238d8HAIrIsHOBX9pQfS0BCYeVg685zNW3/a1eFjHap34mGDw6sc6zi9nkjBlfZSoz6W2kD6XxwtBAtPczUNS0iI09ZNrV43bcKJK5Q8DUxlgLU/QWlOBDlEGtVZoAdNaLHE7REIKBkPayzZg9v3LkXmq1P/LFcaG4H7q21qeF5Qtcl7BGb/bb8OtEBH1mGCRw5KgTI2HBJQcpgSsmJAMFxMOFTw03/mkRaeoIK/o+JpHnEdY9zawdGI4cE904MKBAonoAn6iU52G6OQMvAYz1fZgeHkQwXjBcOd97gpF7uhM8Srt7NGDzuyudDnD41G4ZyC8VLV2c3ZwMLQErkOHB4hPQi0J55NiJu4MN2Pg8dm/doKG81qwJ1g7AM8DVlgYNvYerHe3BtQCxpMG7ySIHdmTXa4xtrCCUHQYsKOpOsF7p7oEzdLN1t6JyljF4RR92y8bgqtena+Lt183dnbpfJXTGaZpF1Z4Fx6uHMAU0cDNGZhXeti3P1Uf9lPxmqW6Wa7TcbKxt27/UWa3FgcvgsNzp0s0sN7pwJqYtwdzcC3N3tJB3dnm12eBXMUDmKg5dvy712I3S5dfAaPdVVPgXJVoOy7ff08AOeRMOvXg18KNnP5hyHCwXM/pquz6mCjJGngDd7Y+cN47mERcB2TARDfwTqxpN09Hdbiz5XaRrBE1pGFgHrFWTYrHg3Sp/0PPFIH4/x9GyAggdSNGssq53tDw0AKMZ1KR7PBwFPeaQ4cPlDSPrtWWkswNpQSMyOxzIeXyMBQ0H3EQSXOJjpCcCqe5a6m9oj09Vf1Eib7D8ydL33G8at9Fa8GQow10HDuYChSn8nDj3XgNe3cXUHRLIANmDnvrJ7cHZ6Il8B/RFvwNPE0RcTPn6bdFZynxNnskpD7ZbYV9Pi6DcDRymUbcyNnNQ79z9YyHwf5hGtFxN2jsBRIFehRgMGl18H9Og9loFVRMpEVV9jdiOAAGY9gAsZDhxXG7dlOmwZmSfGPYPc9ZOWrHlq6Q2W16inN0HQJ6rQe4fA5SIQywTslw5y56wa2JTFF3dgSSm/a+w7yNza/bMEdgsBzmzjStDZCsdinfNlAXGT8q8QgtasCDcvctMfK/f2AuI/P8qS72n6oTFQS7CMAcjWQeObgBOBmNgF0G6aLjk6idRAHHbnA0BKcwQHas0D6rdCcC6jELZcy/tdcIgE4BLkIxbHhXXca9P9h22dZWe19T9IfqKb69ObNCU2bP4p7Vs67/LkzZnbH+oia1kJKvu/LL31PNmv4wTIEAlQ0ocy8yj8xx5gmmzFxT6T7d03lCJ/MTrRge6xgMJzA5cmdYr2W6hz0wpeedCW7KjAk7VZRM239tjuXeCetUOSPMr/vacEeYzo1oJ9xNeSzZlvGSbUgeUzZWSEiHCwm4GVGhQ19XRlQe6TbEU6GmQ2FATY9AGlAjOyQ/hnvJrc6OYhCMI9V8osguc5rNtqIj+fbYq59kZILUoi1vU0KDT79FQfL94UiSbw9nS54BJ3m15LgP01ScaX7v3+kpX9/KicT3N2QAmYc1g0hf6+DAY8SDW+aZzP6cE/g5MDLbOwEpi71NeyhfZ+9hR3T2sGO4dX28WzEnpvLlRDN6JmnxnciyW6IIz8llGc7mbmAvkqBDt/Ba6FcA1G0I/9MRThoslrqDQxvwMB7MVABUjKcA4sKLlEzFMunehlJrb9Fzizhdknkj7kWf9su/80uot/+pX4K7n0DlfHiVooPA3U/hsAv9XVRuZIdybhyuBroWT/kkt8TTnXfLUVI/m1zTkX+ZxAnGsRwELC9zq8jZivZYBarVEI6k1uVwgRbu2Q8qZrzehdFZh3GdFruV9RhuTgwHZfBn3JW1KSt1nDwYtgw3CJMF/vnT9ESamQaChgVuQbR0Wt9uap5WhqZff9JJ/tCuVbmsXtBE4mFXg1xmL+DQhr24CCeEDJ2pLZgRMzMytuvb8JTizeNZGZblY6hR+heTU1YYenJKwXwrbinaL/NDCqaLw0pxuWOgyiTADFT0E1qXzxPOqnsvGT7X/qUu52KcJLOw5eJgbw0WE524Ryq4jGAkDegGDEfgU9aWDkRHjrt0aVxqrTH7EjyVSI2pJ7jWHpbfgvRY3GgaZ3sX5ZQCIsZVcCocyGtkAhcCE6N4rH+wp6g81j+YK6WQ9Q/oMga7XQimXRDrI6O17N2AWAB6P3Ow5LQXT/uMTRyj/01SSXdbDWGI6XO7uxz2ESJxl6JIgl4gIQDmvBjFWiDh6h03wK+2iKrsJJLQb0SSNWIAkzebbqmUsVM8LDTnu/6RO2JL3vXLn8+pEplbJfJvVVo+tfArUdZWLXR1Ls3fQl0MBZUSEVUKiurWMpLMr2WkLggEXa3v0lIS+zrq/G8ey2NaSGDyD9HCIY+pFCueZsHF0yujX734vJ9G88kIk5ts8WkN54o5zdmT0fV8fxJz64ADWJtRcAQ+ORFcZW6fXhEtHZydbImWrNpM1zarRb9a5aY+ylQ9WW75wZXzXtpyPxv3aj54tavlAcCXZGIB/b7zCqAEcKtoDE9sC86X+pMt3RkdkDPvrcd2Cw9c6mdNOrV20V43ycO+f0zrQvsblID4w/72EPyO01g4ApUIbraN7RatO4jtI8zFbaYz8BTKlbrHtfSdCjnWU7x0xjOdFM6eRnPmOZCyr/9uplOxeMMI05px5IT6wMXnRWZpoCAS4CoIItXF4I+WYv8Zr9YtCGdwRye3QXb1O1uDxuY2pGrmtdba3A6cuOaPXf1P42VsHsuXKbzMVJfL9OVupeLtWgCDq2O7P4NlDN47F3yL9mmKm9D9A/VHGSeshSB+HXfhRvx+NfFDDabTwqoBOC1r9DhOgBk90pQLTcde+6Ieet2hruneyzoIgML0PqKZ+RLuMUQURlL5DjS43XeJq9ycHYkbvdZv2Ey0dnZ0cXYCp99dGz+CpRg/68UXUKP33Gg+q/+yFu7puGGkX21dVLMF6ORhoJoD1HkgwARwPwj3WCJGgI+TQ1iPsNGr03vzfMvvmffM3S730SserOB84eYYjUHgHNwN8BRuqEt4shlnad7s1725S/OdG38XUW+3rL0ulqdO9x032FRpSO2ffhdJIyDnflDOeF7OaQMMzVswiqg8McbS7oyAHZZd/zvLTh96bM+uCEu1JGEj84lulzjP3uhrjmQ7827YzkBKYSZFNV0jgJowMKZVNAYF261GtJ0pjmxHVOvODuoO2234ne3GnC06uWa6l3aEnIWu3j2vt5y2W4JkuyVItvvTOQNgHDKicZRxZJxu7uSUYlkHXLT0cFsLs6gDTf4gC7/MW/BY+G2/jvoonMsKdGJksC4GsYcM0OoR072cpD9LBASgfeyyLBHZD3Npcasfiimt+Gb6Z0A7CgqYIiqg2pGHZBNg8pBub/+S7fBe/m//gu5C6rT9C4pLA03CBN50GdAkwmqC8mxAUy8C76IU0NSb1QTFgIAmUVYTlCIBmvoQeANXQJMYgfd6EdAkzmqCLtMBTRKsJmilFGjqy/5dkPk+0NSP1QRN5YCm/gTey6lAkySr6S8p8pd1ChM1juYUNL6d+/4a0DSA1VQV1XArRzFLPUL9kmmkNKMFaJJiNT34cG3o1UF62hHSBgnht7/UA00DWU2rogyHBBwdTtm3IPLjki0FsUDTIFaTas6W6ieE9eo74mqqxmY3HgGaBrOa7t6fNz333n2N9DG1zXr6ay4CTUNYTZbX9azNGUPV90g8lD0oM04GaBrKatp36cL0pzL3aYdO0sPzd5R8B5qkCbyzLa5dg8MIMLsGde/UnVjyZaS+35z52dcffYrn0VG6u2swB65T4mYZH+ohKLGIUjHEVy4715NOTrqjs6i4UgmFdXw64jr+go7lkVw4zXF67BS0Iwrs2CnTOKRjp97G8vvYqYkDFzi3+ClrRJj5RK5JHcfJK2Bz7JRhHNIhHgvicHB2TlFRkQCOnZp8mrH33SAiJabIaHzYYVHOpUSsjp2ahGgdaTxYRyDHThXeDl5gdXyDnv+Iqc/fut3nrP9ideyUMKJxgGiCvXEIWB47pTq1SuVc42j9cJ2FOvSLepwHLGJ97NSdWMQD3bAxHj6PnRp2USLpcf0Y9Zxs8XmR44UgWaLAj53KRrRcNOaWAz/Et2Onrt4tXqo2uVD7ZBbBM3OTLmdGh9WxU8wcAvbYKSAQsvLUPAJMnvpvOnYKOlXE+NipmjikY6eS4gRz7NRkPYK3EGkYPfSlrKvnTPmrqB87BV0+ROEopctxSEcpFcXx69ipb9MaehvuVNMNmPtg48ravNuoHzsFjREoaJWEqNV+weahWB87lQ8XxnB97BSP6he77ggNaV0/dgpaHEOhgHQCTl3TMcJrQo9LkQvjHN7N3SxG4awadBxl0V6Y7noxo1Do1ykYwDDhBkxMLD3AvzLcwBsQV1kyC+jtxJK9hzv7zCnWL2K1uxOtLZ2IVsBsc62Li4M9eGyVM9AIfL79lmudwI+C++idQD7AgTkSMS8qE9XtwKOBmJOgpfTlRBc2o8ncAuBsa+vA6NiABf6MxzpnoiO4MbtrxZaNLxY1TwuU10ghzHjbu2inH6Js3MUWyA90YyegzJmK9mIL1wJ4CjAyyZRXdAemGqjOlBHcq896IN77IXJ/zHsztlrdD/AcuRUqnEd89WbegwffzLz8u6iq8H7q6AmMWv2IUWanxi88fh2FTXxioEJmvKLqQxDw5FTod1UPOQ5/ZCU9oGYsweAgxlFng1wCE+K0M4SnpW8/9lQV0+UfUBW7ciRVAL/BzcysaWF3Ch8zdVYRjd3A6TPYizmtZe/eOS4wZ9tbwFk2782qoWKq+TMOD6NnzLUlKMqROSdkEvSOG3GTLJ3a+GG6qtNIpvM6jYnp+lg5OzswLDuFye5MzEYbgBuJwSGBXUu0XwWGd4QF1ZtDp/TWi8rUDAj8fLdu9+gCyEko4P24g1D7ZdRPbstjRRmeWJd3LjPKdGtBWd6YdY4dC8jqjjDxORGMMN9k+pFXY4ZEu9E4T/bvw7oxd/mb3cAPcZjBBlYcGYg4wr8R56/2UerXCN4ddQamnI8Nnn5KM+7l+Qixv304aXLxjp0b3FTgryZ+KMTs07AKAX2albcVEGDyNk3SJMWf82+QUu7LHq2JfjeDk31h4mkuziBByp2zicHo/PevBSj7X5+3YQ14HnZA3mlrR+w4GqP9LICupUtSssnnC/U+knwfZqTO21A/E/ZpuUmdTo1d5QQBfb0qAX0bAH1ToGmSFKCvQgVXmtTN7aRDfj0WCKW2a8Hz1TPPuyyIaTtCOSD6d67Q2BbOrzoXMwUPHeJ1YsSvlt+lUNDA+KdoGdh/QfXm8fJOJTDJrOxWCtWvvfvaMGzdGLzzS33/hJbiPFNS1INpY9ZQgxI4kyUN5ge5kyXWdX7s+KiqQHp/rwqsk6UOz+xGogQ+sr2zjb11e3/m/UVkkQyfLWvy9Q4PN7z7yaNKm9NX2Tfg9tWOFn4YQwHRGHVncZH+ELqzHqSs5+TsAQxfltZgZVph6nxgygry50rEafOt7ZzdbJSI0+e7u7p5MP/BO1vVObTIsCSjkOT95sYduRu+nJshxcFfYOSx3oG723Rq4oex/M8iGUsVG2NBeg6z7tKdbHXor2UEp7VuVu4IPejiI+Ngc5U2jSM+gx9d3zqn+k+myn9ojqwcViCXAcxxlQv6y6kwaavoXpbKiuQI2ZZE44tvN88N196h8/jLzVDDeEynvaAAERUsAep4CACGlm5louyhzNkRSKh4fy31dVJw+GtxzUTD7RYKnu6FkKGM+UEeQ1n7dX4IUHYWQYBUw7PsRLOQ8O+inVSCTNR2DnynHyWe6Wo5t3C0wGinqRcqEGinoCquzBJl2sl+iGrVZvt+Osl33obSZv0ciAPaiQhKArt2fPU8JkGfE9m4f/++AGgn+6Kv2o1L02iJEpS5xd+cTHBBO3mfR7LOVDxYRyC00yPZfb0+HzpIjr/tGtKyZMZbXNBOD6uQjANEE+yNQ8CSdvKubTudoVpL9dcNvqNav3U2rmgnNUTjNZ3DOtnFEe30bq5oc1z0Wv3IW2luC103vsSYdoo9h2Q5A8wtx1fa6XxK3VvTjHpq8bDSMWpOcxpxQTsxcwhY2gkIhKw8tYjQA2gnjVHjM8dK9tIsOmsVkvN24yuMaSfixQoE2smlGrZYiirtlGS+efT+2cqUbc8mCJ0c+MwAddoJOjdHgeCRApWDJXjKqrkKpSjRTrKPVHYaCqVopJvIqb2f8SoSddoJGiNQ0ArwIwStiNUCjblY007FcGEM17QTdNLdiXaChrSu007XMm8GhJy6RD0cPkokxqrmJwq000k4df+jnf4R7XS4qK3h6MEj5HxH0b2HUt8rC4x28v6ORDt5f+MH7eQp1nft63NjNHPzRnouHrg1BkXaidhq/eHDDEWdU6uflQQ/G38aBdrJ5TsSHEL8LhDaqZeMcNoTVyotaVCZcx+RO5WY005XvyGpAvgNbmZmWNFOyx69WtBW0KKXkZYsmmptjx/aaSqi6R624mK5j++0k2GrBs1H25W+u+kN5dTrow8wpp2YUQYWVwGijMBopxtiG0ZMUV9DPzRmYiGl/E4wDmgnZrCBFQcINoKjnZ5sFHntVZikEWx6++GP4c2iOKGdpiIqBPRpVt52itAjaKcZNQzq/EXi2j75R/wnbBoRzXfaqewnEu3k8kNwtJPHq14uq5rHqqWWa2RR7LfGok47QQMjCrRT1k8kZsHiJ8q0U+2AI4skd6vSExpmKJoUx2dgTjtJIb5/2Q+skyV+0U59Uz1aj40jkIPvB2/5YCh3EBe0E9BZEYxBxMYYmNNOZefqNU/mVqoVqVq9v3CjLg4ntNPVNiRjebfhoefwk3Ya98JRbVXFFlJo8SHpvwjjoV98IGjaiRnIYWknzZ9o004W+1/G1a8YpZfUb9yyvnpzjmNOOz38gUQ7AaEFZdrJX1NfIWDcNXpI+NxBls90J2JOO4khCZB6qI2daJYQ/l20k9vt8JSiQbP1j3w8/c188rEnAqOdLgohne30ncDvs52aWyfu825bpuNdbKvgWjL8DQ5op7NCSCdlRArh4ICaW7duCYB2sml6NjBb/zA51ML0zo35BeK4oJ08EK1DxYN1BEI7rZ+8fsdQk0TStgoTr3lVG6m4oJ3GIxoHiCbYG4eAJe20bzG5VY9QrR2/THLY9IlxV3BFO90gIBkvHRvj4ZN2cqhRF538Ikr/cGS06xNPEaxpJx9Eyy3D3HJ8pZ3sln4aOkUvSLskeEWTnWLWW1zQTswcApZ2AgIhK08tJfQA2mnJNqd8pd2H6RFkq0PZP9/3wZh2OiuMdLaTg7BgznZyJ3usb01UphydL/2tIffSSdRpJ+jcHAWC56Qw0nlFocL8OtvJ/p6R7sxhPqSiIJFrkfWSIqjTTtAYgYJWDohaaQj/X53tVAYXxnBNO0En3Z1oJ2hI6zrtpOEywTBfwkj3wOW6Rl/6bAUUaKfTcOr+Rzv9I9qp9K1Ilcanizq7+qvcE6LrLhYY7XRxZCUC7UQd2a0vyusi7aRdQZ5iHfyeVDi5sHQU6eA5FGmnT8bWMk5NqVqltJz09399+lOGFCxHnQUVgoVDIkdyjUD8oJ3Mvp25/OyxJzk8/EVuzpFhbZjTTh6IqgB+g5uZGVa0k+sDtYGnZbT0smdY3feKOZOAG9ppPKLpvo/AxHQCp53yvaVHt9SP1Nm+6eAV0o7paRjTTswoA4urAFFGYLSTxT6xj2Gb5DWjxywJKHikMAsHtJMHojhUiDh8pZ3uHS4/NavqEdXfK6uu1JashBPaaTyiQkCfZuVt5YQeQTs17XdgtAi5qYUnj/GNq4s6wHfayWF0JQLtdHYU7AQeddqp6YZyfM1EKa3gz+7Zl4bRpqFOO0EDIwq0kw2oHiyzMG90t1Ko39NOa1Z/nVVUbal24I3ceaWILUcwp52GIL7/61FYJ0v8op3Wyq8v83x/neT30chDROJvJ1zQTkBnRTBGJDbGwJx2MjWZSVW8G6lxVD5bcROtZTVOaCcPRGNRcdFz+Ek79TOr29Frhbza4fOJW3+U9B+KMe3EDORwtFOa8ujuZam/p53OzRgoJeqeqJZtvNLDd+aXCMxpp++jKhFoJyC0oEw7VQS0rHFoMyRnJ79RFJ1yZh3mtFMQkgCm5qPYieYZwr+LdpIymqQ4P+q55r6S3llHzwUrCYx2MhuDRDv5y/Kbdhp2nHqqSuEdLfmc3N4NAdc/44B2MhiDtHasMAYHyMaVK1cEQDutPV0dlrjYnJaecfXLCK+V+KCdCIjWqZPFgXUEQjtd/Hqj7W3haL0UkS9n3J6Z1eCCdsqSRTKOPx6MQ8CSdjqeR35yQ8NDI3iNyIKNFospuKKdLBCNp4qN8fBJO5n5tfZN2K5JP15MFm9xeNyCMe0khWi5xtFYW46vtFM/u0F/ranfoRE1tvySjuLCQ7ignZg5BCztBARCVp56ltADaKcB392r35LD9eMmma6QWvBSD2PayYCIRDu1jBEM7TR2hfApN+nx6id+9PPXurGuHHXaCTo3R4HgoRCRCB4ikV+0E7W4/+KRFiK6aZ8Dt4XmRDxCnXaCxggUtGoZg6TVVcHOErCmnSrgwhiuaSfopLsT7QQNaV2nndY0vsntsySMsq3ULOVOv+KlKNBOlXDq/kc7/SPa6WBTr8PXWz/Sc8a832t0YPUQgdFOZrOQaKc6FX7QTkefejpEf6app/seeZGr8WwFirTToo0PP+h7bFdLsJim4rmL9AgF2slgFhIcojBLILTTtIozE/vKSqsH+k+1eLhe5gfmtBMBURXAb3AzM8OKdprS/8q2v18nkPyr9sSHfLGXww3tlKWCZDp/bEwncNpJIj0zQ2Vmm77fgx0vcox6LcOYdmJGGVhcBYgyAqOdsmq2aU1gvNA8ltPa/86dzHAc0E4ERHGAYCM42qm5j6pdoN47zeI5elcdI8wu4YR2YvZpWIWAPs3K284RegTtZDZVOrfQ7ol+1ASrWONA45t8p51aVJFoJwNVwdFOM8RqTF1e+tLSDgklP+lb3Yg67QQNjCjQTk2qSMxClSrKtJPJ3cUyRyrG60YZRB3NWrr1Jua0Uyzi+3upYp0s8Yt2MmrVq1SYW0OJXcOY2dc+uAIXtJMBojEUsDEG5rTTK/MJdx9fCaXvcvLw7TXx8Qyc0E4ERGPVzcJDz+En7aS3SOze+IyxlKwrEyWfOb5Txph2YgZyWNqpSBVt2inYKzV7kEGCXnHz1AFFfs2OmNNO/mwBeNJOBqpo005FZRuv7aBL6ASsjGjTULohjTntNApJANOns9iJZhXh30U7BZkd16+Y0U//lFvDxhBHqxECo52ezEGinYbM4TftRDygqlUcvJmUGxmtn3V28w8c0E71c5DWjnPn4ADZOHfunABop8o9j1sGLZuin0V59kl1/3MKLminQETr2ODBOgKhnZKvmSiaaG3VjOodWLlMqX89LmineYjGGYIH4xCwpJ22HtKsdB8crh8i8SCn8Wv2FlzRTq9nIxnv7Gysk10c0U52F1/89cInRHv7osWer8Y6GWFMO0UiWs4Dc8vxlXaKr338MX3hKcpRvYxJokOm3MUF7cTMIWBpJyAQsvLU84QeQDstOSfkVL0oi5o9OX2F60pZL4xpp/q5SLSTz1zB0E6nqCn9xHs91N8j+Ub65CPz6ajTTtC5OQoEz425SARP+lx+0U6bRe2rtvWZopsZS5qifG6JBeq0EzRGoKCVD6JWy+b+X9FOF+DCGK5pJ+iku/PZTpCQ1nXaabxVlVRkZqNactWoqbV1kkEo0E7VcOr+Rzv9I9oprfKDfKmfCjXpZZxF3E3tAoHRTi5GSLRTkyE/aCfTxAFpV5IT6ZnirsP793EioUg7fSAUqF+vfau5c6TWhpLq55NQoJ3sjJDgEDUjgdBOJd/2iGf59tEqTuqzJPqR+wvMaScZRFUAv8HNzAwr2sll04aNha6B2ocdkg///Tk3ADe0U5UhkulisTGdwGmnKV7hl90jDSmn3p3WCEuijceYdmJGGVhcBYgyAqOd3r0YHL1imRP5UEyj7KRBg3VxQDvJIIoDBBvB0U6iJ3vnRmdM1DvhHZ5f3qB7DCe0E7NPwyoE9GlW3naR0CNop3tCz4pWT75LCvDauyH0nco0vtNOUiZItJOdseBop4A+iiN8dsVrhCkr+O1cK2eKOu0EDYwo0E5iJkjMwkNjlGmntTbvT821rqbsLc9el9ki54Y57VRgjPT+QcZYJ0v8op0sXr9Y4TwlUzvjr5mBK44/8sQF7WSHaAw1bIyBOe2kOGVQ0bIEG1JUZOMG5d5OyTihnWQQjdVkhIeew0/a6VbKeLGS2mpKplzIacsfL+kY007MQA5LO9UYo007xfTu11f1YpLakTEtgQfHXDyJOe0Ua4xEO9kZo007LWrdSEis2UwJU763WPbqp2TMaaeZSAKYthmxE81LhH8X7ZSZGbvQ6KSD7vZMCe07xZ+0BEY7fTdFop2UTPlNOznZHJy3YOp5cvKkhk3ZcZPW4IB2+miKtHZ80RQHyEZpaakAaCepMUtTNv9VTwuLXimndtxvOy5op0RE62zCg3UEQjv9EHpWoV65Q2/f7vV9pn03jMIF7WSMaBwlPBiHgCXtZE2IGa0zIpqSslTt+qpD5pK4op16IRqv3gTrZBdHtNOG6ALLqOof2vmVF2K/xE/5jjHtlGuCZLlAzC3HV9qJcNtpUk2mHdn/VYbiID9Fe1zQTswcApZ2AgIhK0+9TOgBtJNh0WSSklQ1bWeZz6ggz9ENGNNOHxcj0U6RiwVDO0mHiC68N2qyfoh8VR9CUKYJ6rQTdG6OAsHzejESwXN2Mb9oJwVDs/1jc5NpOW6XqpYIj3ZBnXaCxggUtIpE1Mpj8f8V7XQFLozhmnaCTro70U7QkNZ12ino56PBLy5S1Xc9uHHg/LNCTRRop6uoqdtPgOpusl+outWxSGvf6wf2T0ReqHdSN0+o5nqc013Stul9tfuIizoBTcKspnGqU7JHVQVolqxeoGY0Ii0MaBJhNYVlvzx9sb87OeLo0V0FixoGAU29WE23B20zGrsoXrvk+7mTapHzueG03nDm2j7prFK81CPN7ZvOSKmsSn2GgrmuwZnrPzjtH8Fpk6uNRjvGH9conm8t2xY2XkZgcJqPMxKc1suZH3Ca69P+FvOPuOqG51I/rt5s+QpFOG3OdvMFFIK1VmbflztW7ZmQigKctskZieUxdhYInLZS2kh248sIcr5YdHp6A7UYczhNCVEVwG9wM5HGCk4r1s7KKX4ZSouepbpw9d62ZtzAafVOSKbLdcLF6izf4bR7Ec3rr21coB2dRtts+f79fozhNGaUgaWLgCgjMDjtcpD4XTERa/IBQ5IeWb2AM7nDBk5TQhSnl7MA4bTZLuJ7c/aVq+3zXnWjfo6yOU7gNGafhlUI6NOsvK2G0CPgtOX2GXT9gbP148zOpB4ZW7mL73CakisSnObjIjg47XqWe/mQgGD1FG/zk4ekcjmTeTTgNGhgRAFOG++KhJh8d0EZTqvW6DdKbkmQXm7unkwvz1fDMIfTbrggvX+6C9bJEr/gtEPTzNc/Pa6tF2idlJdQtoLzu5exgtN8EI2xDBtjYA6n5elfTU7bFqedGTt93rnYvqo4gdNmIhqrHy56Dj/htPqkH8uTD7Wpxc5ImZS5NDf5T6bKKKBJzEAOC6e9dUEbTnudV3JVJOsNJTJ3SnXCtoIkzOG0ky5IcJqPC9pw2rTNUhcnbS0h+UkuTCBXqULm/RjAaQZIApgOd2EnmtcJ/y447cwj6TSrrzu1T53y0TO1XrFcYHCajDsSnEZx4zectkV+eWbg9zukXY6X8z8XLNyEAzhNyh1pqb/RDQeETUFBgQDgtO233likvDpPC+nzOf2VZCzn12thBaeVuSFZJwIP1hEInKajbBSyQURZw1+lbLwqXf0MLuA0F0TjUPBgHAKWcNqXG6tKvW40qgfMPPip94ovH3AFpxERjdfiinWyiyM47Z7oGtKty9H6cY/pqUSJQs6zYwQPp111RbJcCuaW4yuc9nzZRLEUS1FyxMOxySqie5P+nGxBAU5j5hCwcBoQCFl56g1CD4DTxokbiSnK7qZk194YyhhE0MEYTpPyQILTCtwFA6eRH7s+Wqyarldc9DHKbplVNupwGnRujgJwJeaBBFw9dOcXnNZ3Uj+S9uE6zTyRrHI7tZj7qMNp0BiBglYF7khaBbn/X8FpN+HCGK7hNOikuxM+BQ1pXYfTDAgrnujHLKGl0gdeUYmxkkKBdroFp+5/tNM/op1OPUra/DFou27J7AmZy/QlPgiMdrrhi0Q7hfryg3aqGPF8i7iICS1u3Z0F68TlJ6FIO8lkNxfutvLTKtz26rP7j8S+KNBOV32R4JCTvgKhncqlJV2OlvSi+n+c/mO4pO9QzGmnFERVAL/BzcwMK9ppkvDlH8tbC8n5j+eVKJxYX4Mb2skb0XQO2JhO4LRTlqubZ9RNMWr2h/C+9z/o0jCmnZhRBhZXAaKMwGinH6XhTxctv6ufX+z7ctOpPtE4oJ1SEMUJ9RUg7fSGsdpri0ke2d/rKymlz9eNOKGdvBEVAvo0K2+rJfQI2ildblbOgAltGscDducp7pQfyHfaKcUPiXYy9hMc7RSvNdUq4I0PJYYccqS6VksRddoJGhhRoJ0S/RCPovJDmXba+lpv6+1TqpSUV0sLjzrNwP4ork2I72/nh3WyxC/aSefj61miJ5brnlii5qSRKn4PF7STMaIx1LAxBua00xbHwRbVl5q009LMVEYuH/AFJ7STEqKxZHDRc/hJO92f0bh9VmGcbr4OvbowapgPxrQTM5DD0U4mAX5o006M64q1GcLrqAm9ex8Rcc8Wxpx2cmELwJN2MvZDm3a6Yb5sYdnqC9onDIYYWok9UcScdpqDJECqrB870awj/LtoJ93BUuX64Sb0pK2UnHUvYmoFRjtF70SinVR28pt2WmIoeUY9ajg5KHunPON9ThwOaKdDO5HWjv124gDZyMrKEgDtNMpHtk7W25Qa42kW3VYeUYEL2skN0Tor8GAdgdBOMY43+3ywdtRLkJ1oc9xRuxQXtJMuonFU8GAcApa0054FzbsSZ1tp+e+urDnXNjISV7STHKLxJLExHj5pp3FNCc0elYbkA3OVqsvET77HmHZq9UOy3DNcTFP4Rjs5LHXSf2BqrJn8cOqk+g0TXuKCdmLmELC0ExAIWXnqbUIPoJ08ZWTFGSfe0AO1/W41b+orgzHtNMIfiXZ6y53S8oV2si89/2Pnq7W0kr2Dtr1KHfUEddoJOjdHgeCR9kcieIT9+UU7XSQqlR4791p9f8ibOMobhfGo007QGIGCVm93Iml1R7CjJda00x24MIZr2gk66e5EO0FDWtdpp2tnalIuzfJWyxgd1WfDe5lWFGinu3Dq/kc7/SPaye6IXNxVz9X6QUvWL/0Qb/1YYLSTfCgS7fQshB+0U/8zdw+8DiygR+vHpwUd2RSEIu3kO7nYYLjxau20bHf5kqtnnFCgneRCkeAQyVCB0E4xF3rv8Hy9iB4V2av5uJOcJ+a0U2sIkiqA3+BmZoYV7TRiuN7CqP3G2oeXv71iGHDaATe0Uw2i6UqwMZ3AaaclwqFVAw4J0w+989sSot1MxZh2YkYZWFwFiDICo532BAzsR9kgr+sfEalLj7/wBQe0EzPYwIoDBBvB0U4XBrz+LFFRSMovSvWZ8dfWTJzQTjWICgF9mpW31RN6BO2UNuN+sZSCGjWcNMErWapfKt9pp9ZQJNopKVRwtBPp4O4HhRH7SQf6tjKmTZ5YjjrtBA2MKNBOn0ORmIWG7qVQv6edHlNvuvRNuUgLjfu8VWzZuzmY006XEd+/KBTrZIlftNOp0ySCzO5H6ruWNAyPOZ19ARe0UxKiMfZjYwzMaSd7VWrcgb/faAdUzPnydnb8apzQTlsQjbUaFz2Hn7STlThtyzKFe9Sg6WV3SzUXbsOYdmIGclja6W43s9Tf006ni48ITUuW0Du+bSzph1ipNua0UzlbAJ60U1Io2rSTyauF5wLu2+iUHli7WG1saRHmtFMgkgCpLqHsRPMe4d9FO03feN3p+sU4tdLJ4S9j1zwcJzDaqekAEu3kf4DftJPSY+ux8bG9dOKOb2/9uVpbAwe00+sDSGvHdQdwgGykpKQIgHY6uFepSWuWodo++b2epAUhp3BBO51FtE4WHqwjENqpz2HaWKXomTo+znJfrfcu3YAL2ikS0Tj+eDAOAUvaqb58acrPnbb0+I1Bz7ecG/8KV7STB6LxLLAxHj5pp4bomGMWqm/UYk/cDJMM13bDmHaiIlpOFXPL8ZV2+t5aZj9OI0gzWrL/ZOPBRedwQTsxcwhY2gkIhKw89T6hB9BOV5P766Z67aCGpH3tpxx80QBj2skhDIl2UgsTDO3kNkHuhEmSt258UMls8YnbnqJOO0Hn5igQPHZhSASPcRi/aKe5cy9u3trrpVbIsb9c24Tuu6JOO0FjBApaqSFqpRT2f0U7PYALY7imnaCT7k60EzSkdZ12miNZNzug2U4nPF3jXAOJNgUF2ukhnLr/0U7/iHZaFWU4JODocMq+BZEfl2wpiBUY7bQhHol2mhPPD9pJNezhZ33SFNqugOMFy8SOG6FIO93ZGjQ2tyFVM6+11uZ24MQ1KNBOnvFIcIhVvEBopya/1WI+B76o5ziUbrpSZj8Bc9qJjqgK4De4mZlhRTtpTLxal7l5JiXXOXGP2/Z1a3BDO8kjmm4QNqYTOO00f84KoqXsQp2QtSsXJcxgHMCYdmJGGVhcBYgyAqOdJk24OXLZICHtErJMfvkY8lcc0E50RHHmxAuQdrI8nH65aOwC6jEf3QlfGmuIOKGd5BEVAvo0K297ROgRtJNqzpbqJ4T16jviaqrGZjce4TvtRE9Aop1audMkvtFONXvTfJeucaIdCG0tWLZfRwp12gkaGFGgnXQTkJgFlQSUaSd/832kgcpraIezQ0c/CvkqhDntJIf4/pIJWCdL/KKdPk8pJ24epUFNaDRufvrgqQ8uaKfWeCRjPMNH+iNw2kn/x4onlD0DNNP0KdtOmB/ZiBPaqQbRWCWYTzP4TTud3ZttJDdMjRYvKm3k/nqYPca0EzOQw9JOUxLQpp0WKxhHiwQUax5vLG/wclvqizntJM0WgCft1NrNTPT3tFPU8/o+puaplLAPuU6TSbf+wpx2ehiPRDud7Ug0Gwj/Ltrp7v1503Pv3ddIH1PbrKe/5qLAaCeNRCTaqT6B37RT7prLsifLDquHfy+cuiSseQMOaCe1RKS1Y6VEHCAbcXFxAqCdqPJidZ80lukFyQ3u9eZQeDEuaCcZROv0woN1BEI7lddIvtO8oqEduWrFg4Sixx64oJ2aEpCMU4/NTANHtJNXIz3qXsNNjT2quSuXhw6k4op2qkI0Xi7m00Qc0U6+t3Iq6bL1Osnz/XQMtpnGY0w7xSJaLhBzy/GVdiIXry87p/xUe691iGdTxLxMXNBOzBwClnYCAiErT31M6AG0k+V1PWtzxlD1PRIPZQ/KjMP6bKeyRCTaKTRRMLTTqh+ZRcsX3iDtaBjzJP3k9mmo007QuTkKBM/JRCSCJyWRX7ST+sVP2hpNcbQdZk31J0b+1Rt12gkaI1DQKhRRK2/B5qFY005P4MIYrmkn6KS7E+0EDWldp532Xbow/anMfdqhk/Tw/B0l31GgnZ7CqUu0HZfvvyeAHHImnXrwayFn1bS3IcPBcj2nujDLQnBdeDCJuM7ejUF0A+/EEpD3HviWNieZxRM1o28FPpvqJi3H40G4X/r3Ee781QMhfjl6h966ZtW5J4/8w14bAfRLu3cV7eOyN7TXgstsCu8qWJI/w73kSyV2GvUXa6YkGekP/PDtgi9uJacOrUSQXGkoOxV6jnvJP5p8Pb0zwJu2bdCLaq/nhSNxK/nFqUiSp09lS96Ie8lHZVkdCdA9Tdp7T9xg84Gy0biVXIyGJHkjlS35C9xLvl5H4bKBzz5938uStmofxbNwK/l3OyTJ6+3Ykr/EveQ68m50SfGRpKzw/rarfZ6l4FbywO1Ikm/azpb8Fe4l3+Agd8xztYJmicTpG+Yrv47CreSJQUiShwaxJX+Ne8lvt6y9LpanTvcdN9hUaUjtJNxK3hSNJPnDaLbkb+Akn5FLJ89RNKeUZHrTdjVl1kIKIoDYbs4ORCbN6c69xtgbRmgVTS9gKmbdTguyVu5Zt2oHtphbB9Y4OQN/A+Y+rI0KXVt/dFFblLdnf5lGcsn4S8fLmpqRnphHCYejvYtKewOT6CwzIB0/S+aB/xPBreumFXzA/63m5y6ZJfdKM+yZUZz1SkYSivj/a2/bLxapRygnRB9q2IkGC/2hL7oACgWBCjWRgH9AFWppV4irpsqWqIvo31h1Th9irT3RQf+aDGI8yjxVXKMdke8sJa15qkqSdPtyqSYnGQDjKOzraFdcy/JYQhF51WOIQGvT4gouNqSbQo1YzABXSpkKcfY73gote7+y2WipiVbiI7f16TF+JZwr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true iVBORw0KGgoAAAANSUhEUgAAABgAAAAYCAYAAADgdz34AAAABGdBTUEAALGPC/xhBQAAAAlwSFlzAAAOwAAADsABataJCQAAAJhJREFUSEvdk4EKgCAMRPfF9gn9WX9Wq5MtEmdKbQQ9GClud4cY/Q6WbwgQ13LnKh5mAsKEle8MeCLm1C9pb2I2QHxNtKC2RLNVeiYjTWyDIxkEZPuKykDTj6QboTZwTA8KA+/0oDRwTg9OgwhxUBh4Xo2SDaLSg5waBrJ3J//uL66mG4zxNGX9BMzezmuDR4UQKg5CxQ2IduVGkrvn0vkHAAAAAElFTkSuQmCC 1ef12e12-a315-4adc-8a69-1049182100f2 true DIFERENCE CURWATURE LINEAR GRAPH DIFERENCE CURWATURE LINEAR GRAPH false 20 02fb770c-ba15-4f83-acf9-af1ba24e79cf 3a4d3006-5e80-4a31-a2c2-77bf1567014b 3ac17cbc-7b40-4166-9558-9be4e21d91a4 40ec6168-79d7-4abc-9d6e-d41627216763 4bd05acf-e732-4c02-8528-9002b488a087 4e45cde8-7f27-431d-b06c-7f9c5ed9e84a 5f77937c-77e2-465e-8b74-0cd1dca8659f 657928da-9388-4d25-ac8c-5461f78115ff 9bbc0f84-6983-4117-821c-ceb85636c1d3 a6f5321e-1fc7-4d0b-a809-2c998b9ba647 b9b3f377-4fa1-41de-a46e-8c5b7fdb8176 bcc4995d-3075-4627-86d3-17c54f203760 c2fa32ad-abc6-48b3-98de-eddebf34447c c6051a24-e2be-4566-a3f9-7c05b6c560d3 d1f9d08d-efb2-4192-a859-fc8b5bd7b96e d3b1c4de-65d2-4988-bd21-0fa96869795b dacca8b2-18e3-46ff-a12a-1c3dcbed30d4 df5ac2ce-c295-431f-846d-10a3ddd11fe8 eef837d9-6ad7-45c0-86d4-37d5df250d0a ff97abec-08b3-4858-8f83-c4185f48b077 9096d595-00e9-44ef-bf8b-df7cba4ba2ea 7979dd58-784d-428c-ab41-1f9a01cb3b5b e9837f44-fe89-4576-a1ba-d864d9176564 98a7b290-1680-4c8f-91d6-4080e52ada8f ad15254d-f361-46c9-90d6-b5db1b60e3d2 45329fda-4528-406d-a823-54e35ac6ff74 9492d9b1-8423-4285-a424-c395dc7f8b36 88ea5216-22ee-43b9-bf4a-bf732fa4678f 693656d3-ab20-45a4-a99a-8ca5a8f9ac36 f9b9305d-1e20-4067-946a-b44d88604308 3c10a1a1-09f5-411d-ae06-13d21b0f7cd7 b4c2ea06-2f42-44c4-9b4a-584b407a7f6a 9d9970f3-5ab6-40b5-b0f2-d257ffef222d 80bcd5c0-5458-4110-bc35-aad5d5e50148 054cb35f-8548-43e7-8129-2bbf3a113dd2 d134b7cd-fb62-4a2b-a901-fec5a2d783e9 357ceb68-e651-4e13-b8c4-6a838be2149a e294df03-baaa-4b12-b92f-e97f42ff34ec 34281050-3848-44ac-894c-a3119ffa069f 17704c02-f561-4245-bc67-2eaf7cd1e000 1693 3229 110 404 1789 3431 20 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 2e3ab970-8545-46bb-836c-1c11e5610bce d5967b9f-e8ee-436b-a8ad-29fdcecf32d5 0 Vector {y} component eef837d9-6ad7-45c0-86d4-37d5df250d0a true Y component Y component true 0 1695 3231 82 20 1736 3241 1 1 {0} 8 Second item for multiplication a6f5321e-1fc7-4d0b-a809-2c998b9ba647 true B B true 0 1695 3251 82 20 1736 3261 Vector {y} component 02fb770c-ba15-4f83-acf9-af1ba24e79cf true Y component Y component true 0 1695 3271 82 20 1736 3281 1 1 {0} 7 Second item for multiplication 4e45cde8-7f27-431d-b06c-7f9c5ed9e84a true B B true 0 1695 3291 82 20 1736 3301 Vector {y} component dacca8b2-18e3-46ff-a12a-1c3dcbed30d4 true Y component Y component true 0 1695 3311 82 20 1736 3321 1 1 {0} 6 Second item for multiplication bcc4995d-3075-4627-86d3-17c54f203760 true B B true 0 1695 3331 82 20 1736 3341 Vector {y} component b9b3f377-4fa1-41de-a46e-8c5b7fdb8176 true Y component Y component true 0 1695 3351 82 20 1736 3361 1 1 {0} 5 Second item for multiplication 3ac17cbc-7b40-4166-9558-9be4e21d91a4 true B B true 0 1695 3371 82 20 1736 3381 Vector {y} component 657928da-9388-4d25-ac8c-5461f78115ff true Y component Y component true 0 1695 3391 82 20 1736 3401 1 1 {0} 4 Second item for multiplication c2fa32ad-abc6-48b3-98de-eddebf34447c true B B true 0 1695 3411 82 20 1736 3421 Vector {y} component ff97abec-08b3-4858-8f83-c4185f48b077 true Y component Y component true 0 1695 3431 82 20 1736 3441 1 1 {0} 3 Second item for multiplication 4bd05acf-e732-4c02-8528-9002b488a087 true B B true 0 1695 3451 82 20 1736 3461 Vector {y} component c6051a24-e2be-4566-a3f9-7c05b6c560d3 true Y component Y component true 0 1695 3471 82 20 1736 3481 1 1 {0} 2 Second item for multiplication df5ac2ce-c295-431f-846d-10a3ddd11fe8 true B B true 0 1695 3491 82 20 1736 3501 Vector {y} component d3b1c4de-65d2-4988-bd21-0fa96869795b true Y component Y component true 0 1695 3511 82 20 1736 3521 1 1 {0} 1 Second item for multiplication 5f77937c-77e2-465e-8b74-0cd1dca8659f true B B true 0 1695 3531 82 20 1736 3541 Vector {y} component 3a4d3006-5e80-4a31-a2c2-77bf1567014b true Y component Y component true 0 1695 3551 82 20 1736 3561 1 1 {0} 0 Second item for multiplication 40ec6168-79d7-4abc-9d6e-d41627216763 true B B true 0 1695 3571 82 20 1736 3581 Number of segments d1f9d08d-efb2-4192-a859-fc8b5bd7b96e true Count Count true b8207e8f-d1d2-4ad2-b43b-73db4643f17e 1 1695 3591 82 20 1736 3601 1 1 {0} 10 Contains a collection of generic curves true 9bbc0f84-6983-4117-821c-ceb85636c1d3 true Curve Curve true accfc6c7-d434-41c2-8fa9-df26450c2afb 1 1695 3611 82 20 1736 3621 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object accfc6c7-d434-41c2-8fa9-df26450c2afb Relay false 650d961c-ef6f-4573-ade0-97f698f6a536 1 1466 3613 40 16 1486 3621 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object b8207e8f-d1d2-4ad2-b43b-73db4643f17e Relay false 7e1bc525-0327-427c-afd4-d8b6c2743acb 1 1444 3576 40 16 1464 3584 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 9698bc3a-1ed1-4414-86f0-6444e8ead760 Panel false 0 0 0.0003860762109180463019 -199 3409 160 84 0 0 0 -198.463 3409.569 2 255;255;255;255 true true true false false true b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object b0414c5e-b2a5-4397-9a26-3d16457e079d Relay false 7876afcf-7775-45c8-8a25-88d8b7e1f9c2 1 -239 3169 40 16 -219 3177 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 64dc2fad-67da-43a0-afa8-968d779d76bb Relay false b887e715-85b8-4d63-bcef-54f50d862634 1 -241 3271 40 16 -221 3279 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object ce270eae-dd35-42f1-a1e4-d2f99e5bc96c Relay false 5abe47df-fbe4-4b97-bd03-0ec1b1f6b2d8 1 -243 3321 40 16 -223 3329 758d91a0-4aec-47f8-9671-16739a8a2c5d Format Format some data using placeholders and formatting tags true b431a847-2dd3-434f-9b59-8a6329452c37 Format Format -185 3133 130 64 -93 3165 3 3ede854e-c753-40eb-84cb-b48008f14fd4 7fa15783-70da-485c-98c0-a099e6988c3e 8ec86459-bf01-4409-baee-174d0d2b13d0 1 3ede854e-c753-40eb-84cb-b48008f14fd4 Text format 189af6c2-3871-43ab-b4a2-828404c5bac2 Format Format false 0 -183 3135 78 20 -144 3145 1 1 {0} false {0:R} Formatting culture d97e0a39-4089-4172-9db8-c08197b8e7b4 Culture Culture false 0 -183 3155 78 20 -144 3165 1 1 {0} 127 Data to insert at {0} placeholders bfcdd9ea-5052-41e9-a97a-cd0fe30a0d83 false Data 0 0 true b0414c5e-b2a5-4397-9a26-3d16457e079d 1 -183 3175 78 20 -144 3185 Formatted text ba156c5f-31a5-4478-a04c-85f4b5333b7c Text Text false 0 -81 3135 24 60 -69 3165 758d91a0-4aec-47f8-9671-16739a8a2c5d Format Format some data using placeholders and formatting tags true 1e3ae344-cd92-406e-aebd-972deee07f0e Format Format -185 3217 130 64 -93 3249 3 3ede854e-c753-40eb-84cb-b48008f14fd4 7fa15783-70da-485c-98c0-a099e6988c3e 8ec86459-bf01-4409-baee-174d0d2b13d0 1 3ede854e-c753-40eb-84cb-b48008f14fd4 Text format c1c6a58e-c0c7-493c-8c2d-21b09a647d80 Format Format false 0 -183 3219 78 20 -144 3229 1 1 {0} false {0:R} Formatting culture 118c54c9-0071-4749-be06-f6920b3500fe Culture Culture false 0 -183 3239 78 20 -144 3249 1 1 {0} 127 Data to insert at {0} placeholders 896cb082-cf84-4e6b-8922-6cda5c56786c false Data 0 0 true 64dc2fad-67da-43a0-afa8-968d779d76bb 1 -183 3259 78 20 -144 3269 Formatted text 35a11262-770e-4498-9d6e-28b546897ca0 Text Text false 0 -81 3219 24 60 -69 3249 758d91a0-4aec-47f8-9671-16739a8a2c5d Format Format some data using placeholders and formatting tags true f2c03e9a-5b86-4789-997b-bb044bca2f3e Format Format -184 3300 130 64 -92 3332 3 3ede854e-c753-40eb-84cb-b48008f14fd4 7fa15783-70da-485c-98c0-a099e6988c3e 8ec86459-bf01-4409-baee-174d0d2b13d0 1 3ede854e-c753-40eb-84cb-b48008f14fd4 Text format bc32af76-1e3f-4774-bfb7-f91555ff91fb Format Format false 0 -182 3302 78 20 -143 3312 1 1 {0} false {0:R} Formatting culture f7c98017-af59-4278-ba02-63d1dad43791 Culture Culture false 0 -182 3322 78 20 -143 3332 1 1 {0} 127 Data to insert at {0} placeholders e773dc71-70c2-4170-b0f0-7457a89e3cb5 false Data 0 0 true ce270eae-dd35-42f1-a1e4-d2f99e5bc96c 1 -182 3342 78 20 -143 3352 Formatted text dd0736c2-159a-42d1-af5f-93e121faa9f7 Text Text false 0 -80 3302 24 60 -68 3332 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 63179a12-0556-4bc1-9bf4-ef312b611dad Relay false c923a52e-eef5-4213-b91c-a99d00b79828 1 203 3341 40 16 223 3349 290f418a-65ee-406a-a9d0-35699815b512 Scale NU Scale an object with non-uniform factors. true d25a347e-f2e0-4e4a-8983-14d071fa7194 Scale NU Scale NU 403 3098 226 121 565 3159 Base geometry 6c42c611-31df-46b6-a8ee-c7c7171400e4 Geometry Geometry true 9f5a4e05-ce5c-4e86-a807-564e2bdd48c7 1 405 3100 148 20 487 3110 Base plane f2be336e-646a-4422-ad9e-e4e57dab9a98 Plane Plane false 0 405 3120 148 37 487 3138.5 1 1 {0} 0 0 0 1 0 0 0 1 0 Scaling factor in {x} direction 98448143-b352-4739-bfc1-429bc2747dd2 1/X Scale X Scale X false 7876afcf-7775-45c8-8a25-88d8b7e1f9c2 1 405 3157 148 20 487 3167 1 1 {0} 1 Scaling factor in {y} direction 0a1bb1d6-8dd1-4ff5-9746-b9d1ed378ab9 1/X Scale Y Scale Y false 5abe47df-fbe4-4b97-bd03-0ec1b1f6b2d8 1 405 3177 148 20 487 3187 1 1 {0} 1 Scaling factor in {z} direction 56b223c4-49a9-4561-a1a4-af9c5fd7182a Scale Z Scale Z false 0 405 3197 148 20 487 3207 1 1 {0} 1 Scaled geometry 9868f335-6dc4-451f-8094-d3711f42121a Geometry Geometry false 0 577 3100 50 58 602 3129.25 Transformation data d3a424e3-115d-4433-a6ad-a72744f7056e Transform Transform false 0 577 3158 50 59 602 3187.75 310f9597-267e-4471-a7d7-048725557528 08bdcae0-d034-48dd-a145-24a9fcf3d3ff GraphMapper+ External Graph mapper You can Right click on the Heteromapper's icon and choose "AutoDomain" mode to define Output domain based on input domain interval; otherwise it'll be set to 0-1 in "Normalized" mode. true e6c0b86a-3030-446a-831b-92169490ee8b GraphMapper+ GraphMapper+ true 902 2886 114 104 963 2938 External curve as a graph 37bb3370-d544-4693-9286-1de205aa26be Curve Curve false 0517f2f3-0517-41f2-956d-3caa6df4c5ab 1 904 2888 47 20 927.5 2898 Optional Rectangle boundary. If omitted the curve's would be landed 64776ecc-bbe9-4ec5-a5d4-07eb396f92b6 Boundary Boundary true 3bfc7a24-36db-4b47-8c33-65ba8b072928 1 904 2908 47 20 927.5 2918 1 List of input numbers 68fa507c-c522-4467-80f3-fdcf8a652e23 Numbers Numbers false 8e13165d-ec24-43b2-ab6d-2081a50fd148 1 904 2928 47 20 927.5 2938 1 9 {0} 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9 (Optional) Input Domain if omitted, it would be 0-1 in "Normalize" mode by default or be the interval of the input list in case of selecting "AutoDomain" mode 6653a230-3ac7-44b2-a9f5-1fe99c263419 Input Input true 213585e8-4f3a-4f2c-9e91-8385c0f5293e 1 904 2948 47 20 927.5 2958 (Optional) Output Domain if omitted, it would be 0-1 in "Normalize" mode by default or be the interval of the input list in case of selecting "AutoDomain" mode f8e14406-9226-4342-a696-98d00dc96a74 Output Output true 213585e8-4f3a-4f2c-9e91-8385c0f5293e 1 904 2968 47 20 927.5 2978 1 Output Numbers b0d8da91-bdcc-44b1-93f8-f3dc5e923e83 Number Number false 0 975 2888 39 100 994.5 2938 11bbd48b-bb0a-4f1b-8167-fa297590390d End Points Extract the end points of a curve. true 6e0d144c-1a3d-40c0-9029-376abdea13ca End Points End Points 346 2785 84 44 390 2807 Curve to evaluate 9b920e58-086f-48e0-a7d3-9489d707f19a Curve Curve false 0517f2f3-0517-41f2-956d-3caa6df4c5ab 1 348 2787 30 40 363 2807 Curve start point 8b6f6b53-ff10-4744-b784-aacd1ff32a2b Start Start false 0 402 2787 26 20 415 2797 Curve end point 2eca5a00-e598-4c14-ac50-2590832a1ec9 End End false 0 402 2807 26 20 415 2817 575660b1-8c79-4b8d-9222-7ab4a6ddb359 Rectangle 2Pt Create a rectangle from a base plane and two points true edc8e274-6c3a-472a-bf0f-4e3da7df79d1 Rectangle 2Pt Rectangle 2Pt 481 2794 198 101 617 2845 Rectangle base plane 53e04fb8-ff9e-4b0e-a27f-df57d3dc5efa Plane Plane false 0 483 2796 122 37 544 2814.5 1 1 {0} 0 0 0 1 0 0 0 1 0 First corner point. 0c1cf429-1c6b-4c8d-9622-d10850298528 Point A Point A false 8b6f6b53-ff10-4744-b784-aacd1ff32a2b 1 483 2833 122 20 544 2843 1 1 {0} 0 0 0 Second corner point. d351db95-b5de-4672-a58c-f4c75d5d5420 Point B Point B false 2eca5a00-e598-4c14-ac50-2590832a1ec9 1 483 2853 122 20 544 2863 1 1 {0} 10 5 0 Rectangle corner fillet radius da9761e7-1237-4b20-81d5-09d6e9f1afdc Radius Radius false 0 483 2873 122 20 544 2883 1 1 {0} 0 Rectangle defined by P, A and B 3bfc7a24-36db-4b47-8c33-65ba8b072928 Rectangle Rectangle false 0 629 2796 48 48 653 2820.25 Length of rectangle curve cd1c3d89-ae86-4bf4-a2f2-dcc79f52e1ba Length Length false 0 629 2844 48 49 653 2868.75 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object e3c2f7fa-3c6d-4eda-a7bf-aa70f955e050 Relay false 7abea44d-07c7-4298-8d09-060192324a84 1 893 3414 40 16 913 3422 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 9d55f829-b54c-4866-9ced-6f44b43868eb Relay false 9d63dde1-2e33-4f8a-a3cb-303f50d0a8d3 1 995 3406 40 16 1015 3414 f44b92b0-3b5b-493a-86f4-fd7408c3daf3 Bounds Create a numeric domain which encompasses a list of numbers. true 2ba1bf59-61a7-488d-a5b3-a5ed82a48731 Bounds Bounds 732 3031 110 28 790 3045 1 Numbers to include in Bounds d467ba15-dacc-49e4-a358-5f8b21727a8e Numbers Numbers false 8e13165d-ec24-43b2-ab6d-2081a50fd148 1 734 3033 44 24 756 3045 Numeric Domain between the lowest and highest numbers in {N} 213585e8-4f3a-4f2c-9e91-8385c0f5293e Domain Domain false 0 802 3033 38 24 821 3045 ce46b74e-00c9-43c4-805a-193b69ea4a11 Multiplication Mathematical multiplication true 3a2cde3d-d6da-4bca-8862-90ed8bdd89e1 Multiplication Multiplication 550 2932 65 44 570 2954 2 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 First item for multiplication afaeef1a-7362-4d75-84da-28445edb71ce A true e3c2f7fa-3c6d-4eda-a7bf-aa70f955e050 1 552 2934 6 20 555 2944 Second item for multiplication 5e47cf8a-2eec-4f4d-83d9-a82abf38af83 B true ac864993-ecc7-4645-ae0f-6a08f6579f35 1 552 2954 6 20 555 2964 1 1 {0} Grasshopper.Kernel.Types.GH_Integer 65536 Result of multiplication 401b9053-c46d-4e8b-b861-4b450f5eb386 Result Result false 0 582 2934 31 40 597.5 2954 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 14ae5d36-3b7d-4915-90c0-7ff8f5596059 Division Division 1071 2996 40 44 1091 3018 Item to divide (dividend) 3b11c51c-7806-40a5-98b2-da1587f628a9 A false b0d8da91-bdcc-44b1-93f8-f3dc5e923e83 1 1073 2998 6 20 1076 3008 Item to divide with (divisor) e38fefc5-a2a7-43cd-9c0a-3d3bcfa80041 B false ac864993-ecc7-4645-ae0f-6a08f6579f35 1 1073 3018 6 20 1076 3028 1 1 {0} Grasshopper.Kernel.Types.GH_Integer 65536 The result of the Division 9d63dde1-2e33-4f8a-a3cb-303f50d0a8d3 Result false 0 1103 2998 6 40 1106 3018 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 8e13165d-ec24-43b2-ab6d-2081a50fd148 Relay false 401b9053-c46d-4e8b-b861-4b450f5eb386 1 652 2946 40 16 672 2954 cae9fe53-6d63-44ed-9d6d-13180fbf6f89 1c9de8a1-315f-4c56-af06-8f69fee80a7a Curve Graph Mapper Remap values with a custom graph using input curves. true 79911ab3-0bb2-423f-9b09-cc7daf554fae true Curve Graph Mapper Curve Graph Mapper 863 2524 181 224 958 2636 1 One or multiple graph curves to graph map values with 0bb544c8-bab7-4688-bbcb-3a8261f6d9df true Curves Curves false 0517f2f3-0517-41f2-956d-3caa6df4c5ab 1 865 2526 81 27 905.5 2539.75 Rectangle which defines the boundary of the graph, graph curves should be atleast partially inside this boundary 8f7ff6d9-d1ad-47c3-b95d-c907375d9086 true Rectangle Rectangle false 3bfc7a24-36db-4b47-8c33-65ba8b072928 1 865 2553 81 28 905.5 2567.25 1 Values to graph map. Values are plotted along the X Axis, intersected with the graph curves, then mapped to the Y Axis 0a194642-2ace-40a2-9371-1fdb31c6e9bd true Values Values false 8e13165d-ec24-43b2-ab6d-2081a50fd148 1 865 2581 81 27 905.5 2594.75 Domain of the graphs X Axis, where the values get plotted (if omitted the input value lists domain bounds is used) 1152e18b-29f2-4516-95b9-d00168a6ab5a true X Axis X Axis true 213585e8-4f3a-4f2c-9e91-8385c0f5293e 1 865 2608 81 28 905.5 2622.25 Domain of the graphs Y Axis, where the values get mapped to (if omitted the input value lists domain bounds is used) 22bd9999-24b4-4c89-b7c3-8cfceb7bfd7a true Y Axis Y Axis true 213585e8-4f3a-4f2c-9e91-8385c0f5293e 1 865 2636 81 27 905.5 2649.75 Flip the graphs X Axis from the bottom of the graph to the top of the graph e894ba31-d10e-430a-ae57-3b907326c13b true Flip Flip false 0 865 2663 81 28 905.5 2677.25 1 1 {0} false Resize the graph by snapping it to the extents of the graph curves, in the plane of the boundary rectangle 5dd47338-a69e-403c-b0e6-28ce8cb72d72 true Snap Snap false 0 865 2691 81 27 905.5 2704.75 1 1 {0} true Size of the graph labels aea304b8-4d9b-4ff0-baf1-1ab501b12c7a true Text Size Text Size false 0 865 2718 81 28 905.5 2732.25 1 1 {0} 0.0625 1 Resulting graph mapped values, mapped on the Y Axis c49f47cc-5dc4-4e0c-b8c8-2572f883a609 true Mapped Mapped false 0 970 2526 72 20 1006 2536 1 The graph curves inside the boundary of the graph af88c05c-c65a-452e-afb8-03ead7ccdd13 true Graph Curves Graph Curves false 0 970 2546 72 20 1006 2556 1 The points on the graph curves where the X Axis input values intersected true d53018cc-57d9-4a8a-8ec1-f657ce6bf8c7 true Graph Points Graph Points false 0 970 2566 72 20 1006 2576 1 The lines from the X Axis input values to the graph curves true 28ed54b6-fb95-4400-9b96-be39d08e61f2 true Value Lines Value Lines false 0 970 2586 72 20 1006 2596 1 The points plotted on the X Axis which represent the input values true 3859e8eb-a8d8-489c-9af3-07cbef237797 true Value Points Value Points false 0 970 2606 72 20 1006 2616 1 The lines from the graph curves to the Y Axis graph mapped values true 15f46ee6-4d3b-4829-92f3-0234381521fc true Mapped Lines Mapped Lines false 0 970 2626 72 20 1006 2636 1 The points mapped on the Y Axis which represent the graph mapped values true eae5032a-27c6-492d-a9ad-a32197a98c69 true Mapped Points Mapped Points false 0 970 2646 72 20 1006 2656 The graph boundary background as a surface 385cfc7d-69b8-4bf8-a8e8-235ff6dcb3a3 true Boundary Boundary false 0 970 2666 72 20 1006 2676 1 The graph labels as curve outlines e5350df2-11ec-4670-a160-59d360906919 true Labels Labels false 0 970 2686 72 20 1006 2696 1 True for input values outside of the X Axis domain bounds False for input values inside of the X Axis domain bounds 7632ccf4-a432-45cd-8527-b7823f3b8396 true Out Of Bounds Out Of Bounds false 0 970 2706 72 20 1006 2716 1 True for input values on the X Axis which intersect a graph curve False for input values on the X Axis which do not intersect a graph curve 70491f98-3972-4ff2-a978-dec7aa20383c true Intersected Intersected false 0 970 2726 72 20 1006 2736 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 0517f2f3-0517-41f2-956d-3caa6df4c5ab Relay false 2272069e-441f-44d2-9cee-25e8d582e273 1 390 2654 40 16 410 2662 4d2a06bd-4b0f-4c65-9ee0-4220e4c01703 Scale Scale an object uniformly in all directions. true 014f3a82-3e2e-4c4a-b79b-fb754973b0be Scale Scale 136 2607 201 64 273 2639 Base geometry 088ca25e-6ea7-48f3-ace4-0c8e930bf8c0 Geometry Geometry true 244a5752-77fd-4f13-8350-52f02184bb09 1 138 2609 123 20 199.5 2619 Center of scaling 9e7f199c-7b01-4add-9318-865c5543c1ca Center Center false 0 138 2629 123 20 199.5 2639 1 1 {0} 0 0 0 Scaling factor 43d3790a-ac7f-4569-a53a-79ba4fab9fc3 Factor Factor false ac864993-ecc7-4645-ae0f-6a08f6579f35 1 138 2649 123 20 199.5 2659 1 1 {0} 65536 Scaled geometry 2272069e-441f-44d2-9cee-25e8d582e273 Geometry Geometry false 0 285 2609 50 30 310 2624 Transformation data 6ff09d7b-d063-494c-aed8-d823c8e1aee5 Transform Transform false 0 285 2639 50 30 310 2654 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 244a5752-77fd-4f13-8350-52f02184bb09 Relay false ffc7114c-425e-4e46-9780-4f5439b2a045 1 47 2621 40 16 67 2629 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 790c5d89-8027-4b3f-9974-0aa9c9725140 Division Division 1447 3499 85 44 1487 3521 Item to divide (dividend) c76f374e-534e-4e89-b239-d9dc8de969fb A A false b8207e8f-d1d2-4ad2-b43b-73db4643f17e 1 1449 3501 26 20 1462 3511 Item to divide with (divisor) 897bf1c5-c5a3-40ee-991e-0ef5fe2738c1 B B false 0 1449 3521 26 20 1462 3531 1 1 {0} Grasshopper.Kernel.Types.GH_String false 1 The result of the Division f654ad66-626e-4a53-b0fb-b97bf8db47c6 Result Result false 0 1499 3501 31 40 1514.5 3521 78fed580-851b-46fe-af2f-6519a9d378e0 Power Raise a value to a power. true 2a8521de-e5f6-49cb-bbe3-75b663e3287e Power Power -559 2069 85 44 -519 2091 The item to be raised 29d4dc65-97fd-47bd-928a-25c3e40e4289 A A false 0 -557 2071 26 20 -544 2081 1 1 {0} Grasshopper.Kernel.Types.GH_String false 2 The exponent 9080713f-2153-4baa-8370-7871a215faff B B false 1144e4e4-28c8-484b-b1e7-db119f50edf8 1 -557 2091 26 20 -544 2101 A raised to the B power ac864993-ecc7-4645-ae0f-6a08f6579f35 Result Result false 0 -507 2071 31 40 -491.5 2091 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers 1144e4e4-28c8-484b-b1e7-db119f50edf8 Digit Scroller false 0 12 11 16.0 -663 2029 250 20 -662.1945 2029.497 fb6aba99-fead-4e42-b5d8-c6de5ff90ea6 DotNET VB Script (LEGACY) A VB.NET scriptable component true 6725d6c9-efab-49aa-9d02-2daa52073dc7 DotNET VB Script (LEGACY) Turtle 0 Dim i As Integer Dim dir As New On3dVector(1, 0, 0) Dim pos As New On3dVector(0, 0, 0) Dim axis As New On3dVector(0, 0, 1) Dim pnts As New List(Of On3dVector) pnts.Add(pos) For i = 0 To Forward.Count() - 1 Dim P As New On3dVector dir.Rotate(Left(i), axis) P = dir * Forward(i) + pnts(i) pnts.Add(P) Next Points = pnts 1128 5105 104 44 1183 5127 1 1 2 Script Variable Forward Script Variable Left 84fa917c-1ed8-4db3-8be1-7bdc4a6495a2 84fa917c-1ed8-4db3-8be1-7bdc4a6495a2 true true Forward Left true true 2 Print, Reflect and Error streams Output parameter Points 3ede854e-c753-40eb-84cb-b48008f14fd4 8ec86459-bf01-4409-baee-174d0d2b13d0 true true Output Points false false 1 false Script Variable Forward 996d5ff5-14c1-4c31-b303-f95d048ef52d Forward Forward true 1 true 5bb9f473-b63f-45e9-b4cc-e2754dd53763 1 8e991e99-5fb8-41e1-928d-1bba8fb9f7d7 1130 5107 41 20 1150.5 5117 1 false Script Variable Left d2c0c4fb-9cf6-41fa-b702-09c17addb9e2 Left Left true 1 true 7eca8f17-b48d-4b73-ada0-90a22d3fe212 1 8e991e99-5fb8-41e1-928d-1bba8fb9f7d7 1130 5127 41 20 1150.5 5137 Print, Reflect and Error streams 04cee30c-e625-489e-9e48-8001a66c4b60 Output Output false 0 1195 5107 35 20 1212.5 5117 Output parameter Points a249c8f7-8389-41ef-9421-d4c3316c347e Points Points false 0 1195 5127 35 20 1212.5 5137 e64c5fb1-845c-4ab1-8911-5f338516ba67 Series Create a series of numbers. true 40d5b1ce-cd1e-4185-b05f-eb342b59a010 Series Series 561 5266 89 64 605 5298 First number in the series 2b666a1d-1cca-44a3-a105-682eb0e2206c Start Start false d644c106-358a-4d53-8003-e44a23932f16 1 563 5268 30 20 578 5278 1 1 {0} 0 Step size for each successive number 85a9b54a-9b4d-46b5-aa17-b491a16746a3 Step Step false d644c106-358a-4d53-8003-e44a23932f16 1 563 5288 30 20 578 5298 1 1 {0} 1 Number of values in the series ac84610d-c601-4c95-a440-2d941cb8b3cc Count Count false 4c725ef7-1aec-4903-a426-fcecb964fe28 1 563 5308 30 20 578 5318 1 1 {0} 500 1 Series of numbers d2dee351-7ad7-4195-88b0-b83aeaa59ee9 Series Series false 0 617 5268 31 60 632.5 5298 dd8134c0-109b-4012-92be-51d843edfff7 Duplicate Data Duplicate data a predefined number of times. true f446bebf-5581-4727-80df-0479210e1c8b Duplicate Data Duplicate Data 552 5109 102 64 615 5141 1 Data to duplicate df3c469b-15dd-4113-9695-cfe00ba73739 Data Data false 46557eca-0fa8-4257-9968-cd3caf6e4133 1 554 5111 49 20 578.5 5121 Number of duplicates b029cd2f-bf2b-4ae1-ba0f-ef7e2e1f9cc2 Number Number false 4c725ef7-1aec-4903-a426-fcecb964fe28 1 554 5131 49 20 578.5 5141 1 1 {0} 500 Retain list order 5ee2542c-8564-4e98-b47e-a98477318db4 Order Order false 0 554 5151 49 20 578.5 5161 1 1 {0} true 1 Duplicated data 7a247abb-61c5-46ae-9afb-f19cc07f8a56 Data Data false 0 627 5111 25 60 639.5 5141 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers 53dfe8d4-944d-46bf-8495-cdb43c7556b1 Digit Scroller . false 0 12 . 11 1024.0 27 5260 250 20 27.61891 5260.25 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers c2429a84-5049-49fc-9a38-42778a26f71d Digit Scroller ЯR false 0 12 ЯR 1 0.12228574351 32 5161 250 20 32.31831 5161.933 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers bfe92d3e-548e-4939-be0c-6a54fc045c4e Digit Scroller ° false 0 12 ° 2 0.0003860762 30 5205 250 20 30.23642 5205.192 a4cd2751-414d-42ec-8916-476ebf62d7fe Radians Convert an angle specified in degrees to radians true 2276773a-904f-4273-aa34-9d5c0f9aced4 Radians Radians 406 5167 108 28 461 5181 Angle in degrees 541b6184-b2d9-4841-abf0-775b3d5c9532 Degrees Degrees false 778435a9-4a09-40c9-a8d3-b6ca4d0b2811 1 408 5169 41 24 428.5 5181 Angle in radians d644c106-358a-4d53-8003-e44a23932f16 Radians Radians false 0 473 5169 39 24 492.5 5181 fbac3e32-f100-4292-8692-77240a42fd1a Point Contains a collection of three-dimensional points true ddf12dcc-4532-4f5f-9017-ca2181ae4120 Point Point false a249c8f7-8389-41ef-9421-d4c3316c347e 1 1057 5256 50 24 1082.998 5268.367 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 4c725ef7-1aec-4903-a426-fcecb964fe28 Relay false 9b585c51-4d8d-4d1a-abf6-db393bf44760 1 417 5229 40 16 437 5237 be52336f-a2e1-43b1-b5f5-178ba489508a Circle Fit Fit a circle to a collection of points. true ff0d8658-7c8a-4efc-9ff7-d21a2f4d80b9 Circle Fit Circle Fit 534 5527 104 64 579 5559 1 Points to fit a482c1db-c849-4af7-9253-38455522194a Points Points false ddf12dcc-4532-4f5f-9017-ca2181ae4120 1 536 5529 31 60 551.5 5559 Resulting circle b4ec1d74-9d97-4ab2-9c19-ca7a15e3e6d2 Circle Circle false 0 591 5529 45 20 613.5 5539 Circle radius 823410ef-5164-49ce-aaf0-4fd337d12394 Radius Radius false 0 591 5549 45 20 613.5 5559 Maximum distance between circle and points 721bd50f-6894-48cd-8640-471beedf3b88 Deviation Deviation false 0 591 5569 45 20 613.5 5579 9df5e896-552d-4c8c-b9ca-4fc147ffa022 Expression Evaluate an expression cos((4*atan(1))/N) true 97df6443-4cee-4503-a278-5775d3d97c17 Expression Expression 469 5463 215 28 567 5477 1 ba80fd98-91a1-4958-b6a7-a94e40e52bdb 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Expression variable ac53965d-9c57-49ef-a4e1-15cf2c013e39 Variable N N true 4c725ef7-1aec-4903-a426-fcecb964fe28 1 471 5465 11 24 476.5 5477 Result of expression 8a13a8ee-43ae-490c-9a67-94c0a5edb3de Result Result false 0 651 5465 31 24 666.5 5477 4d2a06bd-4b0f-4c65-9ee0-4220e4c01703 Scale Scale an object uniformly in all directions. true 0fb4bac9-595d-4516-9de2-921f847556b0 Scale Scale 708 5634 126 64 770 5666 Base geometry 269c46c8-fb57-4272-8066-350e30875f30 Geometry Geometry true b4ec1d74-9d97-4ab2-9c19-ca7a15e3e6d2 1 710 5636 48 20 734 5646 Center of scaling f959d9b2-b769-41c1-a28e-850ee2a2a776 Center Center false 3554d94d-6df9-4e70-a491-7d5078530e78 1 710 5656 48 20 734 5666 1 1 {0} 0 0 0 Scaling factor f2bf6058-f07e-4ee4-aaf8-c12678761178 Factor Factor false 8a13a8ee-43ae-490c-9a67-94c0a5edb3de 1 710 5676 48 20 734 5686 1 1 {0} 0.5 Scaled geometry ec397e86-bb0d-45eb-be56-aed938deaf9d Geometry Geometry false 0 782 5636 50 30 807 5651 Transformation data 4161ae35-ffb9-4065-975d-03f05b73c621 Transform Transform false 0 782 5666 50 30 807 5681 2e205f24-9279-47b2-b414-d06dcd0b21a7 Area Solve area properties for breps, meshes and planar closed curves. true cd77b622-9a86-4cac-9598-e29eb480069a Area Area 522 5644 118 44 584 5666 Brep, mesh or planar closed curve for area computation 51ccef21-cf74-4b38-acac-13099eba9e08 Geometry Geometry false b4ec1d74-9d97-4ab2-9c19-ca7a15e3e6d2 1 524 5646 48 40 548 5666 Area of geometry 2e0e9257-78e7-4846-ae26-603cf7b7191f Area Area false 0 596 5646 42 20 617 5656 Area centroid of geometry 3554d94d-6df9-4e70-a491-7d5078530e78 Centroid Centroid false 0 596 5666 42 20 617 5676 ce46b74e-00c9-43c4-805a-193b69ea4a11 Multiplication Mathematical multiplication true e0da04d7-7efb-44af-880c-05873d34cb64 Multiplication Multiplication 833 5546 70 44 858 5568 2 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 First item for multiplication 00864368-5c1c-4f5f-99fe-d6e5c94e6ebf A A true 8a13a8ee-43ae-490c-9a67-94c0a5edb3de 1 835 5548 11 20 840.5 5558 Second item for multiplication 42f713fe-412d-4667-86ff-c867d8d99fe1 B B true 823410ef-5164-49ce-aaf0-4fd337d12394 1 835 5568 11 20 840.5 5578 Result of multiplication d279ab5e-07f6-49ba-9dd7-e164e8d7e621 Result Result false 0 870 5548 31 40 885.5 5568 9df5e896-552d-4c8c-b9ca-4fc147ffa022 Expression Evaluate an expression .5*L*(1/SIN(π/N)) true d089d8e3-7cf2-484e-bc5c-7ae0430080bb Expression Expression 796 5398 207 44 890 5420 2 ba80fd98-91a1-4958-b6a7-a94e40e52bdb ba80fd98-91a1-4958-b6a7-a94e40e52bdb 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Expression variable f0766318-0199-4d9f-ae92-ebd30f99e69e Variable L L true c2429a84-5049-49fc-9a38-42778a26f71d 1 798 5400 11 20 803.5 5410 Expression variable fda47015-0c34-4726-8afc-bc4c082daa74 Variable N N true 4c725ef7-1aec-4903-a426-fcecb964fe28 1 798 5420 11 20 803.5 5430 Result of expression 31cc3c48-9804-4a57-8cb1-d42fea2c8488 Result Result false 0 970 5400 31 40 985.5 5420 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 14c9fb5a-3cf2-4f86-aa99-97cab6eec72b Panel false 0 31cc3c48-9804-4a57-8cb1-d42fea2c8488 1 Double click to edit panel content… 1060 5392 160 100 0 0 0 1060.971 5392.169 255;255;255;255 true true true false false true 9df5e896-552d-4c8c-b9ca-4fc147ffa022 Expression Evaluate an expression R/(.5*(1/SIN(π/N))) true 72dcab9e-b4c9-4e1f-805d-7d9edf73b6b3 Expression Expression 452 5029 224 44 554 5051 2 ba80fd98-91a1-4958-b6a7-a94e40e52bdb ba80fd98-91a1-4958-b6a7-a94e40e52bdb 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Expression variable 4208bc57-258a-4aaa-acbb-6ff9d4f4e246 Variable R R true afcc5191-a0bd-476c-9768-591ad0f7378c 1 454 5031 11 20 459.5 5041 Expression variable eb739245-110e-46d1-9a32-a5e452ca05bd Variable N N true 4c725ef7-1aec-4903-a426-fcecb964fe28 1 454 5051 11 20 459.5 5061 Result of expression 46557eca-0fa8-4257-9968-cd3caf6e4133 Result Result false 0 643 5031 31 40 658.5 5051 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 88abfddb-dc25-4a47-b1b4-50a31d0d4a16 Division Division 223 5326 90 44 268 5348 Item to divide (dividend) 999497b8-4949-42d0-82ee-bb6922eaa656 A A false 0 225 5328 31 20 240.5 5338 1 1 {0} Grasshopper.Kernel.Types.GH_String false 360 Item to divide with (divisor) 2027e357-80d3-4640-b420-0441660b8610 B B false 53dfe8d4-944d-46bf-8495-cdb43c7556b1 1 225 5348 31 20 240.5 5358 The result of the Division 07a66282-69e2-4d09-a2fc-d9349dd70354 Result Result false 0 280 5328 31 40 295.5 5348 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values e15bd0e5-52c7-4abc-b78c-67d41b71e40a Panel false 0 823410ef-5164-49ce-aaf0-4fd337d12394 1 Double click to edit panel content… 787 4979 160 20 0 0 0 787.0285 4979.544 255;255;255;255 false false true false false true 6ec97ea8-c559-47a2-8d0f-ce80c794d1f4 Reverse List Reverse the order of a list. true 3e455af5-11a5-4594-aa1e-1337627e9e91 Reverse List Reverse List 636 5204 66 28 669 5218 1 Base list 586d2783-4e94-43a8-943c-6fdfd3322a72 List List false d2dee351-7ad7-4195-88b0-b83aeaa59ee9 1 638 5206 19 24 647.5 5218 1 Reversed list 7c44bb6d-fef3-43c3-a0d7-3be44f7b0065 List List false 0 681 5206 19 24 690.5 5218 a3371040-e552-4bc8-b0ff-10a840258e88 Negative Compute the negative of a value. true 8bf27de0-4004-4ff7-b736-5cb42643e79f Negative Negative 665 5284 88 28 708 5298 Input value b7de0a45-9da5-47cd-8e32-3a10c8e4a2c6 Value Value false d2dee351-7ad7-4195-88b0-b83aeaa59ee9 1 667 5286 29 24 681.5 5298 Output value dc80f669-d3b5-461a-bbfc-9b9c97908674 Result Result false 0 720 5286 31 24 735.5 5298 3cadddef-1e2b-4c09-9390-0e8f78f7609f Merge Merge a bunch of data streams true aaecc85c-5804-4f33-b45d-79f7f9c6f1ac Merge Merge 796 5167 122 84 857 5209 4 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 2 Data stream 1 1a063d31-b99f-4b3b-a626-650425924c2b 1 false Data 1 D1 true 7c44bb6d-fef3-43c3-a0d7-3be44f7b0065 1 798 5169 47 20 829.5 5179 2 Data stream 2 8b6a68fc-650b-43b3-b24c-6d7280ddacda 1 false Data 2 D2 true 0 798 5189 47 20 829.5 5199 1 1 {0} Grasshopper.Kernel.Types.GH_String false 0 2 Data stream 3 0da47d86-2eea-46ac-9cc6-efef4ba603aa 1 false Data 3 D3 true dc80f669-d3b5-461a-bbfc-9b9c97908674 1 798 5209 47 20 829.5 5219 2 Data stream 4 1e2778df-a9ca-4306-96b5-4c9c4125ec24 false Data 4 D4 true 0 798 5229 47 20 829.5 5239 2 Result of merge 277e686f-fcb5-4411-b782-b0d4e125e2c1 1 Result Result false 0 869 5169 47 80 884.5 5209 6ec97ea8-c559-47a2-8d0f-ce80c794d1f4 Reverse List Reverse the order of a list. true 60e0663b-6476-4b01-bd63-0c0198ccc786 Reverse List Reverse List 674 5092 66 28 707 5106 1 Base list 2dbaef14-36fe-4e6b-a6fc-d6ece26ab7f3 List List false 7a247abb-61c5-46ae-9afb-f19cc07f8a56 1 676 5094 19 24 685.5 5106 1 Reversed list 332a85d2-acae-400d-b270-26b2f3125210 List List false 0 719 5094 19 24 728.5 5106 3cadddef-1e2b-4c09-9390-0e8f78f7609f Merge Merge a bunch of data streams true 23c55c34-6817-421b-8b50-44e1f6ed219e Merge Merge 879 5025 122 84 940 5067 4 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 2 Data stream 1 8b9f8878-3208-4942-ac54-df3ab345b55b 1 false Data 1 D1 true 332a85d2-acae-400d-b270-26b2f3125210 1 881 5027 47 20 912.5 5037 2 Data stream 2 19058d50-e13c-474a-95c0-830c3a9db49b 1 false Data 2 D2 true 0 881 5047 47 20 912.5 5057 2 Data stream 3 a500a7bf-9d14-419c-b493-2feba5d238de 1 false Data 3 D3 true 7a247abb-61c5-46ae-9afb-f19cc07f8a56 1 881 5067 47 20 912.5 5077 2 Data stream 4 c4fef57a-4dca-44a4-84c6-20aadccc963c false Data 4 D4 true 0 881 5087 47 20 912.5 5097 2 Result of merge 5bb9f473-b63f-45e9-b4cc-e2754dd53763 1 Result Result false 0 952 5027 47 80 967.5 5067 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 282f65b3-c82c-4daa-95bc-75a538e5c507 Panel false 0 277e686f-fcb5-4411-b782-b0d4e125e2c1 1 Double click to edit panel content… 1328 4998 160 479 0 0 0 1328.951 4998.402 255;255;255;255 true true true false false true 59daf374-bc21-4a5e-8282-5504fb7ae9ae List Item 0 Retrieve a specific item from a list. true 2d148978-bc67-490f-aac8-90ad0eee5b78 List Item List Item 954 5545 77 64 1011 5577 3 8ec86459-bf01-4409-baee-174d0d2b13d0 2e3ab970-8545-46bb-836c-1c11e5610bce cb95db89-6165-43b6-9c41-5702bc5bf137 1 8ec86459-bf01-4409-baee-174d0d2b13d0 1 Base list 043107fb-534e-4338-b36d-df84e0cf9cca List List false ddf12dcc-4532-4f5f-9017-ca2181ae4120 1 956 5547 43 20 977.5 5557 Item index 350a0836-dcc8-4f52-8157-c6cd516a99d4 Index Index false 0 956 5567 43 20 977.5 5577 1 1 {0} -1 Wrap index to list bounds d7dc3b8b-6076-4e6c-b5b6-1ab79a6eb7b8 Wrap Wrap false 0 956 5587 43 20 977.5 5597 1 1 {0} true Item at {i'} f0a2926d-0090-4148-a401-3d572f930ace false Item i false 0 1023 5547 6 60 1026 5577 9abae6b7-fa1d-448c-9209-4a8155345841 Deconstruct Deconstruct a point into its component parts. true b86a52bf-2406-4de9-86d2-b4d485bc251e Deconstruct Deconstruct 1067 5551 120 64 1108 5583 Input point 548b57c4-3a3c-4a6f-8af8-bf61e4e59001 Point Point false f0a2926d-0090-4148-a401-3d572f930ace 1 1069 5553 27 60 1082.5 5583 Point {x} component 44bc53b6-00e2-489b-a5dc-407425442819 X component X component false 0 1120 5553 65 20 1152.5 5563 Point {y} component 2f6a5a53-3d55-41a3-aff0-e99afa30befd Y component Y component false 0 1120 5573 65 20 1152.5 5583 Point {z} component 7190c040-cf1d-4a5e-8023-43bb486fb5ff Z component Z component false 0 1120 5593 65 20 1152.5 5603 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values f154e627-b8c9-4f9e-b1ba-a80649ec7c08 Panel false 0 68c4ecd4-8214-404d-ae51-7077c9a01211 1 Double click to edit panel content… 95 4973 116 20 0 0 0 95.03748 4973.852 255;255;255;255 false false true false false true 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 5933667b-3af6-464f-b517-0cc7a179cde2 Panel false 0 f2e126e1-a59b-4fae-8f48-32341df4b306 1 Double click to edit panel content… 95 5055 118 20 0 0 0 95.86689 5055.486 255;255;255;255 false false true false false true 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 85f48747-2124-46a4-98df-e9d256731d7a Division Division 1211 5551 70 44 1236 5573 Item to divide (dividend) 2432be2c-9d9f-4aac-803b-2fcde25fb454 A A false 44bc53b6-00e2-489b-a5dc-407425442819 1 1213 5553 11 20 1218.5 5563 Item to divide with (divisor) 65c55d0e-0edc-48e9-8eae-b467e344896f B B false 2f6a5a53-3d55-41a3-aff0-e99afa30befd 1 1213 5573 11 20 1218.5 5583 The result of the Division 1bd4238d-59e3-4478-af43-8dbfe4dda340 Result Result false 0 1248 5553 31 40 1263.5 5573 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 007da1ee-8d7e-41b8-aae6-e1f819a393a3 Panel false 0 d2feb401-36df-4805-af94-8e108f24e9dd 1 Double click to edit panel content… 94 5015 116 20 0 0 0 94.83049 5015.627 255;255;255;255 false false true false false true c552a431-af5b-46a9-a8a4-0fcbc27ef596 Group 1 255;255;255;255 A group of Grasshopper objects f154e627-b8c9-4f9e-b1ba-a80649ec7c08 5933667b-3af6-464f-b517-0cc7a179cde2 007da1ee-8d7e-41b8-aae6-e1f819a393a3 3 3d90ee0a-71c1-442e-a7e7-660c8099a19d Group 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 2bb0b080-8bdc-42a3-8107-71e06cc4368c Division Division 336 5272 49 44 365 5294 Item to divide (dividend) 16c182e4-0901-4869-a917-a38957b02052 A false 53dfe8d4-944d-46bf-8495-cdb43c7556b1 1 338 5274 15 20 345.5 5284 Item to divide with (divisor) 7858c11b-02d6-4b55-b212-bd137673d36b B false 0 338 5294 15 20 345.5 5304 1 1 {0} Grasshopper.Kernel.Types.GH_Integer 2 The result of the Division 9b585c51-4d8d-4d1a-abf6-db393bf44760 Result false 0 377 5274 6 40 380 5294 2b2a4145-3dff-41d4-a8de-1ea9d29eef33 Interpolate Create an interpolated curve through a set of points. 5452b66d-1aec-4c7d-9c3e-d3512215367d Interpolate Interpolate 951 4868 225 84 1124 4910 1 Interpolation points e9187188-4b3d-4dcd-89de-83e57a651893 Vertices Vertices false 065f686a-4028-4e05-b353-3c9ef8ca5da0 1 953 4870 159 20 1032.5 4880 Curve degree 036ab95a-1c40-4f62-81f0-cb6d46d98e73 Degree Degree false 0 953 4890 159 20 1032.5 4900 1 1 {0} 3 Periodic curve 02139147-d05f-45b9-af8b-12fbeb61998b Periodic Periodic false 0 953 4910 159 20 1032.5 4920 1 1 {0} false Knot spacing (0=uniform, 1=chord, 2=sqrtchord) 17783bc4-4d55-418a-9ec5-a284d3ac4e64 KnotStyle KnotStyle false 0 953 4930 159 20 1032.5 4940 1 1 {0} 2 Resulting nurbs curve ee4ecbe2-4fbf-4854-bfd4-5d67e8d925cb Curve Curve false 0 1136 4870 38 26 1155 4883.333 Curve length 926602c6-92cf-4952-979f-f93dfb6a8664 Length Length false 0 1136 4896 38 27 1155 4910 Curve domain f0d328d9-b8a7-4455-a914-0a12376e0d53 Domain Domain false 0 1136 4923 38 27 1155 4936.667 f31d8d7a-7536-4ac8-9c96-fde6ecda4d0a DIFERENCE CURWATURE SHAPED GRAPH 7H0HXBNZ13dQpEpRUVAUgwVRuh2VlRaKhKKgYieQANGQxCQo2BYVe0NFRWzYsYIde8O2lsXe67qKbcVeVuW7dzITMhXyECDP9z7uTxfmZCZ3/ufcU+499xwjf0lccpJArCgFf/RYLFYd8NdcKkpOEIqHjRLI5EKJGJIiwGVIhn8M4Uew+4IEPL5ABj9SByWbYKRgf3jZGFzqH3j/WeSQVeHT7irCt8iS1xhGyASjhILRkG4C6AaRieApfAv0cqhAnhiVKhVAcm30i81QWphElsQTQUorcHX16tWl2F2RApEgTiHgYzShUFhq5S+IF4qFCvAWETKJVCBTCAVy7LHwr74/T4F8jxH4ZdfjpJnzp901MvUXyONkQqkCfXk4RJZ+GC9JgP32pnZ0UKCr65M9S1+unAH+fbIkD/z7eMmOx0t2Iz8gv+5eD/+dPxf5N+Px/EWqTxZlhcGfF6bDJyyGtzxZvk718+PMhY8zF6k+9njJJtXTlB9TPuTlkl3w+tKJuK/G7kWHhFI34Ye3oux7Z2YjH57N9HP2ZtUD0X/RK4x3IT+jb4R8o9oANqnGho4TG3bZZxCq8h3RL0XeHUUVeQKKD3YvGUklwijayi/CGIHyBX0ajn0ovAhnXV0Dg6KN+wAJg1NBjk0T+McMu+onSVZOoNrYFADCNhwIIyo/tdDLBlE8WYIA+aQdnGpfS0sH1QOSNVAiScJm0KSmMT3r9APijPsqY3iF9DXGfeKkXF6qJFmh/lmTQJkkWUr6cN3AIB+uMFbGk6FTQA+dWXVwH4VXDJWfS0XGjN5u6SOXC5JiRakBySKR+lTwiUiOjxfI4oXyRGd2P6XG8Org6g7/c2b7JYsUyTKBl1iQrJDxRM7siORYkTAuRJAaJRkhEHuJwdMssEf3K9M38MmG6FMMfJIViRIZdtksVBiXyBOI2BGyVImsVjAf0zKri1c0HebRj5tnME/4q9hkDG7GmpQN05Dme+qVKYvwWMg+FUz9AAdNlddwYMHrBsrrEKNaKH76gX3LdJ/Huj6nBuVtCshdZ3H+xIRPi3GjqoPwythPIlbwhGKlHnVEn2LgK5GhqhVjjIGfRCRJlmEaDv6fSlfZ+bAT4HPZknh2oIwnlydKpED3sSXKt6oV7I9ID/i7sM/LcQM+JoTNdHvl+v1F8mJA0kNJpTF3rj+83yoks/eOYVkX/jABpFooSTb2l3Oxu6l/3h95r23zQxoCUm2U9MS+G++Y6yzuljVbPN4ILBwBSR8l7TjjM+q7rU3Q0WeP5nW1tH8ASHVQ0ofrTwrWNCjm5jx7PiQ9essLQDJASasOdbC6/rNu4GG9WgUT7LK+A5IhSpLmcVdusejGSWs01ye49YTRgGSEkiZ9PsQyP6Ifnn+oq97lfYHrAMkYJU0/earv0b/MuFvTn8zv+uKrEyCZoCTxXpeXp19s52x+tCXG03H/N0AyRUm1D464Xsfzl3fOmwWPdroNuA5IdVHSzAmtf7y5ERuwyCzizccI24GAZIaSUj41sneSZoWsnTDLcNnXGf0ByRwl/XjSqtvFN5167fOMdBm5OuYjIFmgpJ8HfFYMXLTWP9u49PLa2+lGgGSJkpo3X3F+TsfHQfNXni3cGfh9ISDVQ0lLQ15xj23pyl2w16npyoG9nQGpPkp6s7Zu0/wHluE7Y3rz79u2KASkBijJ3vi4k3vIO5+CqB/H5tdp1BWQrFBSk8HSFfW7vA1epL/fdKR58BJAaoiSHrz8uHFOeqOg7cdHPLXcumwTIDVCScVtOKf/zejpd3CZj1vc+M+PAckaJf0+J8vo7NufAdOdr+b9sX5iIiDZoKT4hpHf9KaOC5imt08mtg+ZDkiNUVJ4VsGklNphPmuGJdR/ZZT+LyA1QUlnkjt0fD8hLfTQg/W3rxulTgQkW5R0qfPC0QtOFPXKr7/xIPv0xHaA1BQlZU25tu/7iiSfbe/szfnibChRzbDpUCicWt86i5PxntP+BNfrFSDZoaQeV5pfW7jyqM/6cVsnJY0YuxmQmmPv9SB3wMYpncInxj+/x2JlxgISGyWtFCZl7l7ryllfJ/vWoV/99hoF+w/DaRB7qJmDxXIFTxwnCEwWqpTZZNmfdW4frRV0dG/onEfHePoUasMoTBg3Qv0yy8RHoZAJY5MVSg2Pqm5MRelpTUX9Vo0qqkNUwZIfwTf9cnu+6OKz74pCTUVJdzfLMzBM4uTddO40Y9LLwWoqakvepe2T3jwM2RlrGfPGrKelmoqa2Dfs09kNKQGbJDOCpvumnlBTUU9f71/1LjDYd4ZT23msIPZTNRW1K+/4r6A9A7hz7GaVnF9yzEJNRfWNanrGrn+pz9KTHXOMo35+VFNRUT0aJ01t9Sp8Vpjex8lmId/VVNT4QIVk+HqPwIO1rqY/rHv0g5qKWuYUZhfw79CwHfJlyza2m7hDTUV9z0rx3xzMCtzZaJbX88l936upqIXTOR2LbMcGrOm2lvOscFdLNRVV8nu9en9ODQ1aFtR8d5RL289qKsoktPPnyytaBOX1utVzaKtrF9VUVFHE+3yX56GcTS3X2Jl5yF3VVNRMp7WpthHcwIzUbNudV/ocUFNR+5YWGtoayrgb+t+wM7xeOEBNRbXdfefsu0+vQmavfucW2d86U01F1fLauWDM/gnhi79092o/vfSamoo68TrifROLdiFLnVesMNkYsE1NRX3K6xdgkucdsr+lW72EPj23qamou8PYwgPX+wQtt7/a58awg6vUVNTM4T5fZ19YFbwj9UODnKehKWoqivVXQpeIPSW+Ga3evR0yu8dNNRXFihzw/Ni1tb12Xm28v86sO/XVVFSfzl5ZDSKdfHYPntHLcd6bdDUVNa3xaNvsXRdCZo3lWRe+Hs5WU1H9kof5dShMDdll6JVv9VHWUk1FcS/ZnF5RUC9g5bHf4xvual+qpqI+eizkeL4rCdrll3Pg2pBWSWoqqs4/M5J9BswMmt7bZ9BFSZC3mora+iF8Q5evrfz3mOx4f3ziQpmaimr5+Y/X3vbHA5cbbGVPidZvAEj2KMmz3SGum1+XgB1ngjv7jNg5D5BaoKQRAR59DXat8p1oNmX2hPvnoAvQEht8VPrgLcv1A5bGft5gfXBMT0BqhZIO279dHDPNxmfqmcxbXtsPHwWk1igpzTFjc0u7+b4H2x6IWjLwsQ0gOaCkCdw9A88k5QbsS+qybG7/5taA1AYludxlL+V/9eLM6rLCult/OfwuR2yE/a+YLxvVtlf2RkuHF4U9ZwJSW5S0qF5pWGf+uNAVr1p8uCsP7Q1I7VDSWpf8hbdcZ3jPYUdNjSicdweQnFCS3VqvP84nJQbsXrv99gpWJz9AckZJm/R6tzrLjfSbeiV7mGEP03OA5IKSTi+wNPjt3cPQDetWPAq7ePgwILliU2/qmtN1zd722tDb1TK6VwtbQHJDSf827rRuaPto78Orv/zFPecsASR3lPTl69ONF5uWBE39TXw5o8WVsYDkgZL+cD7Z6HztuaFHZ3yyf2VUfxkgtUdJ66d0cV456LbvTjuF5R9216CB7YCSno3ZN+n+RXmvrVzr4LP8Mb6A1BElLe8mfdT5TmrAbpHRvnnPdroBUidMs11zaDH05ODAufV2ng/5vCAAkDqjJHmtZOuwZpa9Fuz4uGP4h309SEavC4vG6E3Z+Dzax+Fc0MQXZ2abWIw314LRgwaB0ugd2TD7t9yfeb32HOsRdfagvD7uuwzCkpNiBTK81TNEH0Vlz9zQT8rZPHacRCRSBn/QusWLJDyFUJzAlkqEYgVbjDxYTvn6RFNHNSTS+2PXw5HxKJdGkFDQIBLY4TgBC+XKxsdLG4+/3TVs/58TEkOdiqaYKsmk4I8Apyp29QUf5COX4ERnpbXjsCI6nGKxgnxZrGM+dSKEoyTIc6DKYVk6c8bObH/KPAJGWnKFQKzw5yl4zFGnga8MAJLIUmMY+UP6ETxFIvbqtce6j9cPVgiSWKyy1SkDJcLwM1jsymJleKPiUJtOHA4LNmwW/zzPneN8ape7rP4QHPbGfsmyUTwYyOIlAjoHBjQS0Z0ziidK5ikEbEWigB2HPQCKBA/5VcDmKcCPcqkgThgvFPDZUp4MfKdCIHM1CBLy+QKxCi9KaSF6PzQjJglMGamCrGY7cgCAgNXfAavTfAmsZjsD6m+nTJHRDxOKpclILGyIgkwFTT0/5PUVErYAxYjyBce9fdHudeaa4NmDTNv3XfNxIl4bIM8gvRx6ubzJQPQBKzkZvAFCUm90MpQQJ0NRWw4rrScOIb1yEGodgckCG2gRpbTwJUlA8MpFbUFKyzyvkB4h267fOGCd1UyGFwvVc8liUUYqD71f/eeLiutmB0yrnebao9+03VpAD0gQA3o5XqfqKtGTJCtQATNggK9hBKJrVdCBiTZWMZ4SLttBC+8t9ojw3mPxuEnA9QGReCFDnkMWMuVlEkxUOLAqjsMjZ1SKegAccog4RLtyWEU98TjolYODtWqqs0cB5SeRMSHBf2JkwPWbxV0d/FvXde+KXmmuT6oEEfeeTIgAucEhUqviiMQJZXEiRtk43/9madCG46GbeaJ/Cq2eeOsIIiVeTIhEeJ1CbR2MailtnevzWPsfsq8hmQOu3XLL3WyFe6+6/sJRQr6AjShSsrkzpAG2LXobZtvABAGKamQyT8QWCcQJikS2XJAAd4XkFTJuxPidfogk9HHUCsJaBFSQe3cA6xMqE5fhBKieGpk4C5WJ4yOjoXzJniuSp91+VjcofdqRzXODC3/proErAfhYQnxKfCjE7hFQ0dJulAaOzl+ur/RaoTeEyQUlREUp9WIcGivCVpg8u9htzLSNBIjg61BAhFwuDyJijKUFiIo8mSACIlTDDjG8iQ05osYpTGPScco6UioSKlRcgvpyhFA8giaC+aOD/sqxzYMPzvn+vNHImQPw7AqB95HZpbysbU0J+ZHRlYkfJV1qhB+GsRKJSMBTKUAWybXBFIuBT1ycQC5XfzylroEKD25oKUNMas6suMczyL35wGdNhzp/c/i9juBjS8ShIbMGu65t3kQ4o+pkMJUVM3JF1AnJ09EQlhZRPHECYCzq+iCSy68AUnuaCnJXhszymRx6c/qiA70e45AyQh9KxqqMUhVoIZqFFi2gWUhekIZotSyLOGB0IagwXMRggLDrij2VDJg6rSogQyY/LWRg8qNuUh0WjZu0auzi6/8Uj/DL3db256U/21+nMM94/8iYAd82tAtEQGgEMmGc0m+qmHdEtO6GoTypVChOwJCCr6NFZ+JJB/0GxvcPhs5dlTncMTyocyUtJYzo2MaAOTMplo4GZjtzOg00wphjQMecWMepLbP1j3jviW5ls/n87Ua417XwF8RJAG6y5DgF20cWR3Zj69CwqXsfAXgFwSjlqk0sTy5gS0U8scCZLePxhcmAe2I++JsgUsXjcD1HzObJ4iq2akPcYmIcN4lhxA9UNGoAtvAYByB+gcq9ZQH39pifRu5tU/DdbBBO+iljKOjmlg2M8r0f7E17aftuYMD+4e0zOOGF93DvXZvqXZGL5YkmMUSrpGiy4GIDBCoHOA1SIlA5bRGgNFqKsPVVyRAiKkrclLEnJVBr/9TLveueEnCgec+GbeTLmuH1KfK0CPg0sj5Vo2lbnx5zQnGJptKnUhcOi8XRcGmij3I+VQgT/z2HThyZdd9/ZuaN9hNGm37BOy/KJ5GdF/R6VWAR48+EBVFGyluUYPuoKxRH8BcqG55Y3haFhxIUo4LTDfQ/5vltf7tC8bLk8yO8wkceSVb4ystVAQnbjwmSNF9Mo2NRIUmjuy0Yn9qs26+A+X07zWItG7AEL/jhYP6EjwLeSTRZmdemwbWBnyQJwA8mHpx88OaUiilp4mY/3VDIc7CMVlFPBeiUjOEAunwA3SMidCzgx+QLNVLNpsHwU0onjvLllj2v9+vU9r7hm63PtL8ZySOsePaD95HlRnm5PG1M3IGupDaWwnUFiE2xD8UeU3Q7BBuNtHHdcORjDOi84o9oXHdgw/A93qPudLj6KJugagTyZBF5xQG7rvV55YwC8JUKgAIXBAB0XhnRzauRR4VOwrDNfvuOhIuePx30FvdGpr2TwbvAFBxpIrUzW8H4oZW/UA6sXCrc0RIooN5KdcECCejzJsBvoEScmD5DOz4S7DgiCXvjSIlMEa6en0QhscT0lwpKrOppBIbFtAGqbhRgWCM/+Jfg2g5vw0kaP+qUGZapHizmC1Kwx8H/o6w0pmPlq35hXH23b36L1l4IWB0ePBAHlT4XsI6sHPVpGGbvJxPA3UkeWwQ+zo4VKEYLBGK2YrQEjfYqpiqJGU7kIZHYhlzVwHPNiEc9V3eS5wpmgLtAI/VoCb+cDd5DplC+J+VbtW28/Iney9WcOYMnbflltssGL5ORyN3Ue0M4Ynn6krj5pAXvVQrBiqAywzlAXxYJNNqGNEfAEoCQhx6qp3t+67jb5anvpsv9eH3yPWfjN0k44F5qoNRI5cFEdIm1ABOQGgaYMvgamhWlUCmXSClRSkxKDepzf4/ftqPOtaaMnNayotNE+ybFBZWRfGBS2MQJJXVFoEH1kAmdHjq3jMf96WkdOGmDneHLlmPxi4lGCBiR/tyKR92+eF2EAgliynjwK58dm6o+YZ3ZCnRhD8biys0l1/EVUlbEnEvqcZOX9jBKBTHOAUrLaA3A+B5VuO0NOGC0ugqUVlSji9uieg7jTEkwHed20yQA79gheons2CkvV7OiOgYA+rr6FAyxKWYgG0QTuas12k6yQQDC5MKRL5Qp19faUgL1e6I1L5f7njNraVCD3W0jTPEqyx+7mayyykjlARZz9PAH24ODA9Kf5A4wL+myQQuARTMCBiSqRjaXlIvr8DMdWHR/SnoSN5wwZ5UygEF4qZzX1KnxV3hnjqUWcA4YBn2bbr/Hsn6wWCGQAWZwUqQy4KqqPauWSzTegecijyU78Oj18thKzPTVAlsLcpjYmphT03uGZUl0JT21bBSjD0x8/r5Vcdjs+1+7NF7cb3GNGUWWK6qP8qmW/fJdkemFGkVTFo1R7Ne81ojMHZa++1eL3nYfbxSEX9lVZQMqJa3iiRX79VS34vIG4wQy+AB2PE+Z2COSiBPYQoUcs4joF6F0OTuOJwZOPlueLJWKYLZhrAQQhViGVLIY3goNqhg5YCscAz6CXHRl+yVCvYosiA8KG1KWpgiXfRWSBLh0pYoewGdgBJEk4QsqGEAQDzswwkZeECd8oKIrCzBhbzNguL4fhYXOh2H3pqpIabQ99CE52c2CO+nFji2pB6+v0OImDXEyVVI1ZQCEYjbTLel5AyfZcjPJRDPlEbTAySM7Hq74IpihgIGPUkJmbhAxt/++3Zz5+gF/HJ05KaZy+rySigKicmwTEypAbnRIYWuS6NExOJ4dJUsWOCOzGM8toVxdLzi6u7qzJ7A9XN2p/SvDLYKcTcscgtO3HbZa7djxK375NEz1IPLyqRqtKljHZmRdUa5O5IPoaWRlmylTXYFJgFwrSyZn8J8W3J9YO8P2SK+tmZeO9OG9wm+dVm/KK9waQLRMEBVTWG6IltFoX8kBn/WhETDuntc6WbWx9Ft5y7jw1qoi/LK/IfpgEjQqQlWAgygbWnCAstFoo6mN0kqVWXBN0OGnLMms3ekANzf/xP3AtmlztZFYrgWE2IwIgTmN+m11WTR+G8ennVOp1zWf3Ad2m66sfNsBv9aHxBZSiQhYdLLPZkSDcydsPUMM82Cx+/mowVMkyiTJCYllK+WarLcSD4DSjpa8MqlGrKhfDByhnG1oWmwu0U0qAvhGbCW5SUaYeqzYxoFV2bDKyTSKeXe5cdTmlIC5+skng/fenIVfvekHi7uALySv3qgo5blQRMVYSRcKORmzjS5XOwvIrvc2jVyousrpyxckyATU/uXFHHMHo9ELObPOrMz8+9eHdnhnyR+5kewsode1PTvh+5dsZXr/nK017SypJFMDRwkOWSjhYylblIzYumCH6+FuBZy9w/9KOxDz4m+8rGIPIMuqilIVzIhgZAarZphBSodVZ0XtcljhGiKWKID54sXBE5aO7l4gZAWRRZIz28MrLlEi4zuz23vJR8oUyC/U3up0O5Pp41YO9J963uNxYkbpabxdg18QqUilyKVQI1UFs/K3MDErZosuzBz4KM0OZik3yiGzxMmyWDnDDMr4YpXe47eSXpOf2IpfTLa7U5lQubKhgzuqyG0AO4qI7DjmwenbeptmXiqqyRm8ra55nd2PDLsUOq/PuVBr9919ajbsBQAc24oCcIsCAKhaNPJEMVOGpDxRAjB6h2ly5zAHzvql9QZ8NX1YQjBlyI0Upkx5vSoAKN7CAMDmMVswR9OMReNo/mcnzukQ1MqJc2LNEK2eOCceZ9fGifN8mhPnA5s4c1Jf52E8MKfjgcY53UYMLNBqTjexRosWlwaJqlQLjHi0nYkR47ZjjLCgYwQ7oeXe6XNm+C48uZW79Nv+sfjX7SMQ8VKpGUEIK+g8gwY+7NFCmYAtg09CywpR4k7MAKIYCAl3PXa5mBPzyCqbMw8wPzbiFNyyBwygKLfA8h6BYW5Jh7lx5JJRG5KH++e9+Srowt6Ejx0t0Jg1FPwjE/JEFd+haFIW7YZLBeJALjsJfUbFQlpinSHGYZF3AAgf0GA5sGQ9ugNQRMqDAC5WxDpSaMvkijZTFr6Csx8uqfCF8fHJcgE7LpEnFgtElC9+26XTk5P3srwP5Q69NMYh4Bx+vclf+QTyehNG0LaRyweQPIKQpFF5nfkwL2Z9jXiddYBylahKin358qVUk6iZjWcMXOtKFvFk7ERhQqII/KVWC+eH/fxz+omJoRt//FxkO+3XSXwAF4k+hBzAqShVwR1vRu6UrNMB7pSWsko1Caabc5KEcrkQ+IJxODZhKoSSOZJ1W1fe2Lo6ZHfdia/s0p8dwjNH+USK/I0ySlUwJ2cdE3MidIE5kD+ahNddfJLgVyI8AcMBcbZMII5LVW4AebElUt5IuF/kgfxW9gnqGdU7+66smaMtd96M339Kd3RPxB/pj1J7PvlIP45aFcxjMTIvf21NR9tlm3qPcJt6+uVw0KuMg/JEoThVDFwnwD7ALrEEnmrzAD+JJKMRIvzVHZKSeCnKC9RLW6E3l998/sV3zjb7L0tlpQmENLNEqrQN9HJVcC5mLRPnLGucc/AmPkvDdZL6ZeskjIpwJZfTO8DewL9g9953V0euq4NXhLQ+UxlF2xxxd0V9COinniW5VW6IIkT91HosGj+1sf7YyBMHP4YfNcr726HzWGfcW5n7JcsVkiQ2WvUd76ZCTOlOA7XxEQFJl6OZB/AZyGZ2gkCSJFDIUtlS5QPlFsHiOFEyXxAs7iMQo6cH6J1XYiVMprGS+ECgm8Mq31KJTBEgFCkEqoLXFZ4NbTmsoo0A+yyqXPkMuFe2kXa3hjKGCsSwUUgweCrk0RvV+j3vzAuHwKl5oi31G3RYgBdL7KlksVRRqjnZBZ5IPgaR86bSIxFOHJZ0o0b5qA2j1FwY5OiZjK4ITDPP7K6PGr0L3r/ed0j7loTo5z+awgSsiDpCG6e3GbEq2lCtOhfrO2GIhlzwQ9DZuZ9zv9RIgHp82EVfd9/SOohtI1pVIywwwD4K/19X3e3B38HCKkzWp1NjOhpuEwv0Vlu47d6SKdwuaV7V4fbajU3kj2bVD1o6Z/XfJi8PL9WBcNuyJZPzIm2hAzFDfn5+NYTbxcs5R+/FNA9Y9PfjAoHC6aVOhNtF9kzccbfXAe5US7h948saS97TN36TjFat+H38/QidCLcz2IxrIc11gDmsmgy3i2c+t1jLfua34/vZl6OGt5+pU+F2RHPGcNuupoM2HQq3s4I9T99s0cl3R1+LcPdjQ0fUcLhtacdosZrVNOeqNNyefbH16043jP3Wvmtf18jCPF8nwm3Eh6ANt4EiRP3UBqz/D8JtYguJGg63c9oyhdvejtUTbg/gm7r1GOIVPLnZ3QGtG+/YpfVwW8vVRJGC2G2ZQshHjlUVbu8r8pwsuvw0cJOog4Tb7p+hWg+3iTpCC1gBOWLAKqfN/6lw24pOjelouE3sbFNt4XbiHqZw++yuqg63TaZvvJYxoL9fZvjCXy3G6a3WgXA7eg+T82K0RwdihgcPHlRDuN0+y3F9195twucltK99rtPrAzoRbhfsZuJO4m4d4E61hNs3s7i2O/JWBWe+upv6JMreVCfCbRtG5gBtUvPMYdVkuG0SvLPFtf4mPplpLR7k3/zVS6fC7ZRdTMxzrBnm6Wa4fbfrWstfBx38JrrP2dnKotmWGg63b+1k4tz0nTXNuSoNty2cWtp7tooOmTXz4PweqfJNOhFuIz4EbbgNFCHqpzZk/X8QbhN7L9ZwuB2zjynczt9bPeG2r5PfkuF9UnvNXRZz9ejDxm+0Hm4TU8G1EEJG7GMKIVn7qircfr7gfgOFIqrXrpvT/7XY+9t9rYfbRB2hBayAHDFgFbP3/1S43YhOjfn8GiV/rZgQvCuh+a8IWcwsQlyrarNEUVoUfg1dWcpm/jIeUGN9wEtI2ISnVPCINLErrAFXEjdCwFfdxDhSiggc/wENDkm4ewBBmuRLVWEGFq50I6krpgYC9soTU1C/l40IqaoKonGk9GqFwPnl1nj+yHyhX85Ax7BUVoeOjODoVA8iWJjREiJqRTU1z8IkHXeN1FizSF6SVAS9EICaXKhIxaKzQNpatQW/vf2ruFNd/4X1Zb8av8z8gxE9Q3/lYynWOFCCtv0TpMSnGxNEQOh0wGNEZFyDknDmkXE8EVI/n76McGurqfEtzs8L2dRrRlD/wtaWzIKNPJDCkUculyfYxN7SWhDsDFcmrpW46ALXhCyVVbBm0ViF5G+HOuzMiQpZ+jN68IzuK6fjHUZ/YYJQwY6Mk8HDchp0120ZlpyEnKeTo7cialAuRMrmM51vJHKKUSgIw6vQqS+6CWuEPQVexGy4AfIFqqNrsCKJAXCO44UpZV9RB3YtUBWFNkWELzle7SNoLXYMsnjsG1lKzlW052YrDuuYE5C5MX5kmRvYqxWn0wEnLJKxoWO2X5sLbp6TH3JzAla/U3g2xreqMOsjSOJJ2cqzovKK981to7wP5aqyjyCPLRaMhpcQIVAeGq6QtSO2emcYIYndeHJFcYXpC/MArpeozH4EjFLmalRYzhzhNgxRZHA41M0S98uSAgdeCNw04dHaGVknH2ixoj+x630lVV0MgCcHwlOXStWlAFUXMU8jG26mHA/TQXKTFp3EZwOlgTs/h9zl+7gZ4c84K+8nn3FGr5eHT8TBqy8tL1zkrhu1KqL3tyMNtIAPixEfID41YQqMkCo9o5RA9GAR/2hWac4siidLECiYmPZ5SO/t+/tYhezvzxkyd94HfDFNA+X9ZKah17XtVkGuxMxl4oqljnJFo2U5C0ThSQV8VPlSMiakd0mv85/ucDNFIX23t1uMP/1jEIrcT2YMel3bjLF0RdUJXI8jdY6OcOOwHOdpVpjDVoUBrIUaJxKWh8f38XqmYedOcef8/JTA6XblHT4C8FM+gBwBYISqQCR/LhMiXedidr0xi8au5y8I+Tioe7fgqR9/KoxO3sGXSUe/seJdeHqoirvjDTh7dKIwLpEtEMdJkqQ8uRx2CmGLwAyCfj5q/isW8LP+SugSsafEN6PVu7dDZve4STVeskwqr2tQ0p09By3pTmrT4w3r9cyubCW0pqirAY29ULlKCwv0KkdC+eKil3tN7PtGha9SjM4PbzfqMF746BwbFaGajT+sdm0JMXT3pehmw26HYKiRxuqBxQXKsi+4MsQiyWiBXNkjAO6Fw5/LfEr22DDqlt9Ee16jVWdgexMEMBsqwOBmBAAMncxN6CazzhTaIEqTlgpt/IcdfGgXgIEY5s5iKrSROAvD3FbnMSfWq9cS5mb631fsDQv0WfJ51e/Wo1P/qmzrbJg5vJIOc3eAuftKDPOmdJiH7Qu4dI5V6Jc2sHF34cte9fChfSjcb5SKhHFIlUmy8aJD2jYU+GDAJVCAO0XsJNxTKmSbpjUebZu960LIrLE868LXw9lMwyLvoOHpFVUbcD1pBYBzNuVOGUyvXH7KTFWVFfNWMRtugjSQw/ESfpMhcjmYj8nAAP7ZuXpHjf0P/GMdaubUoAij69HQTZWt10gyYqS8Tv9g5XiQ4cKPMAXLzQKEMqDnhcBNRlaI8Pyi5I+rYbpgwt5FAdkLGv7ddtQQfIN5PR/y7PAhzQ49wuxo9vb4vSUOC4KXj0gcsX3kpjWVLSMK2JkG2enuQxV9wH2GFafUQNIrByS7SNiqla8RSknLHMctePgifOOc1zPfHhXji1Pp+ZJR8i0XpT+cTzY6X3tu6NEZn+xfGdVfpgWUgFgzoJSx/BQqgypZYvItbJRJCtAZrQBARI1Yo20DYfdrRGJg20BSj6cgFwQpVJ82o9On2QWPBkx7+jX4QMGeAztGPOYSqoTzxAIRuWEgnRp19GFL4R1q6QlssUQhULacUAhS0JaM1G4u95LN6RUF9QJWHvs9vuGu9qUUQyFhy6JCFVmT7QO5CC+qF8onCKfPjkQHE5um3MnDkjZEX+fTrvAb9ZULZFFg+NjXtvaXJMeKBDByjBuBtIPgCxXou4NZB1cHnqRtIPBRtT5MXEx04LBKYgAfPf1YadP8TEJ5sgShmCuIxwmFqfJyH5jsqX7dWHk9SiJVv0pc6XXgJL2JOWWBgBghk0hhrWTlqAyxUSkzTOElbOPYFG7SBov5sKqyan4bw4twyULtEmK/ROh+tNJIwhRSIU/kBzuEqFhjEKkAQWKS6nf9/jKetExzKEXVjk5Udcbd+uixkOP5riRol1/OgWtDWiVpyd0iyr8WXNyiWCYXNyIWUw/NdR5zYs9ZLWFObDmtBcwzApkwtwzEMGfTYe6xrs+pQXmbAnLXWZw/MeETvl9SnUCZJFmKx7wuhrmvRL0Pqh7drKZwFnzYCfC50AwGynhyeaJECnQEyhB5rWB/DLB+ycP8OhSmhuwy9Mq3+ihrCUiYK0iUX0CqhZKIMwaQarOomwkDkj5KKu3e5u6769Y+W+o/n1rr6UUro2D/YTjOQI1KXbzoQ/iGLl9b+e8x2fH++MSFMgoIyaaEwGMWxmMlu+zp2KVDFtSz3SGum1+XgB1ngjv7jNg5T+sWlDR/CrvfG7KEt8E3XzriUd9//nSpGQta1JrDKpgOS5VWmQW905ozeef0/w4L2oJOVHVGm48I8OhrsGuV70SzKbMn3D/XUEvanCj/WtDm3jOZtDlrJqbNW+o85tyo9MFblusHLI39vMH64JieurswF5HChHnRaAzzVnSYf48ddKaDycbQ9Ydr/2Ql/lxIVVW94jsbdqECnhym4SHrzcqGWcBOom36KrZ3cdj+7eKYaTY+U89k3vLafvioJnXeK5q1DttC2wLkCqj2LkqcgGfSRLN2tKpmd0lKACjf7OTURZzo0XvDZ3b4O3BEHp/gDOtSZmEETJCGAJX4UKyzw5QOAJBmvS/Lre/fSa/xuzl+Uv+9n7wT86/Nqdn6/rDhIQKAEdVGA2wZDQBA51ZrurmlowuwaY4Zm1vazfc92PZA1JKBj22qYQEWSkzXbLoF2CIw4aYv/d8CLMqf7SNa5S4YNZGTO8j/4Mt9yX20sAC7qF5pWGf+uNAVr1p8uCsP7a2FpBzHbLqlxQJAvbW0qhdgZ9k+DPf8bSdny4ZJDZMGy220sABLzOTQAkpArBlQ6rq0ChdgiYvuNboAm+GMSgzlAux0FwQpVJ860OlTnfEPJ3D3DDyTlBuwL6nLsrn9m1tXxD+kCB6r3j2cvoPJPQzagUHeRuchH9H/ivmyUW17ZW+0dHhR2HOmdiBPTEoN6nN/j9+2o861poyc1lIba1oJjGtaCRjkjjoPOdFoaAdyoptXScil8DDAEjrIoRuXvwSDvC0d5A3j9+dlnzrHWb71yZjzTcfl4LOGOClSkYRP0eyyDg3CDugdWNyjTNmWJ/GQRH20/3sFM7kW9nk5bsDHhLCZbq9cv79IXkw5NHJCE0qo6NEs2OfiMNTOVO4Z3DxzP/wfxkMC5UAo3+0vqwDr8N2XA/ZOG/D5exfOMi3GQ1o+MAqT3YogQJTt52zgfvRhjRpXduojAKKB1MHgC2C6n0QuhHQ2GJ9QxAaSopITNk8GG9xLkoRxlCj+afCulsWakIDsGVNONeicgJcQY9X3kLv1lZG0furKEZEYBrgeHdKJ1orkztKYVFcwQ9EFnWj8MnYpEnkKdhJvhICdLEXWQWJ5sC4QbVu/3NrDWq/cIg9ZarkxYdasrZaEyjPoYykqz2AUrWfMuqDC7k/FvSxXRNhJOcQaAmeP9aDFjhgKiEBSgrXM+VBc+pw+IdnPZdF222fjdyv+o463WgDLnREsIOqo/WnHorE//ZrXGpG5w9J3/2rR2+7jjfC5/RYcuI0B84XpVuPoCnXt11PdilkiIJrgRwAGTA5FW9nzRBJxAoi95OjqjCu+1b2cHceDiaRsebIURByAQ7ESQAT3Kx+ZLIa3wj0XsapXvfKiK9svEXYCR/g7KGyIWpttYBkUkgR4WE09Q1UxWsJOgov4FbONpTF3rj+83yoks/eOYVkX/jBhhI18jJnwgYo6HLB6zDG0kBj5GDOwlSlHNbKV9cpsJTogypcd3p5jEXBjedA2ru3om9sL62nRWBI1UCWNJVJqDSIUTTUl4FKQzTGNjGULnDyi+30QMxQwugjYS/Hj84jxV0J3XA8/EN3DK6pmO4YCVM4eZUIFyI2OVh0q7/hSx+B4dpQMloaCsxjPLaFcXS8glaQmwApS1K2H+y2YPWZaQV/u/tyuP9Z+LrqKY5lJmOpBJLap06qCdY6MrLt1REfdGablpGYRSDdUYBKwOnnCeKjeGdbok89d9jBY+SF44j3x/thj0wkbY8jzyEpIeVnbTIElGxEtE0TFFJYbomU0OunkEAWNFUBklEBpFzUApnFp7SLXdn9wNmVOYGXOekWIINEHk8M0jFAV4CDKhhYcoGw0ak/cRmmlyiy4Juj0mrcr76RFUvCcWg9mp3SwXIQPUVTL/uQQpYxUFQg5MiIE5jTqtzmxaPy2c8t43J+e1oGTNtgZvmw59gjeG+UCH40d6c+t+MKBr+pgGMxvwDxhECHGg1+B35XKBtjKFMo2xkDZovIKfS/UdRtfIcdJNvaXc7G7qX/eH3mvbfNDGlKPm+xFYxRNwsDP6BExkqvkDT3nT5otKyADUMOAutrNzh6e3Rr4B21e+E9f3uGplwh1LuDdFHUukMvleUpE/aeF819sCJCUSgjZsHPQJ40Of9sgAGFy4cgXypQdmKmN7c3Ny5/ONpsYkNaAN7Cg5Mlu/LT0x24mT8syUnmAebh/bBf+97JeK5frbdP7dT5eC4ClfWICDEhUjThRSpsBP9OBRfeHfCacqcSLKcJLBq0qSz+gcIh9FzijobjRmMknTeojZ58BMzgpUplAVQYLcWp9fCMdo9tWzgEmsDYpf8bRlFO2AenmI5aZtFRM1AJrH31kYm3GR93xjzM0O0hel6umzymZaWVs6Nwm28F/UeNp2/u2OYRvaqHPpSqyqbyq9SOWrqhOyveBvCDGt67IFEMNozOLxjD6XrO+P6rLLu9tg4bazOp3GJ/oaQW3DhRw6RNWthbAWmsCDU5Pu/lJkgDkyg0M5DH8sscgwWHZoWk+EJIKWcQn9t14x1xncbes2eLxRmDhWP6ASeyg/JQGiwru5wHoxVQJSTFA+I/9UdnD1D5cNVDgcgNMzITehkTMdsQOAgP0EMOK/KTUaXK4Gi0ZLeBTG5FryTOsbrjzQvct6d5mf7ZHO7yOQWqqUBw1R6+Xp2MyA9q1C4n8LWjR83CP84M9O2hhZYINYdanyurJaovAXNkl4dZq7FetbsVJxHJBXDIiHjDLgXp1c/R9R9bPXk6+Kw9HBg9OW9IDh6Vp2XPJ4S+OqG2VwHZGYRtMBdstFwQ2VCW40KmE8+YtP3h0loROff82xPXq7xxi4SGpiBcnYIcli0QUuoDOYXbB7hPD+6DMCsWjeCIhXynko4Uw/xCEKbKKa4IdZ3xGfbe1CTr67NG8rpb2DxjGSVUgSY2sgZcsPUe3+ZYD0T1b2bnfCBo1pIyCAh77h0oSIkadWHPp5J9br/QKWDT7xLoBH58H491n5EFk91l5ubzpPOnzIZb5Ef3w/ENd9S7vC1ynBZchBiKXTuUywM14y3O07nMFkbNVISfDiRoULersutOPp6WyuAG7zhi2vdZz1nd82XNUQKi3dPBUbc9iiBaQJAa0pGer1cHCBmoUlSoVqOPQUu1cjWsIcGkFIlf4GblrYNAw6OQmCGSESnzwT2UVdyPEQELGgkeAoDpVyWpKLhMNU2UmSWVrMbmis6CEKs0MFrgBs0CjhTAbZTkU6CsgtgoTfT51gZDQEIerWzN6bU+euPpG/FdCRQXkrSg2JpDLVQEFIuK0UAARRw2VK0vX82+I2lI7+TfE3DUtpDylnGFKeep6BoPcTechn37yVN+jf5lxt6Y/md/1xVcn7UA+9odDmMe9caGH+usdithsXawFyG9dYYI86woGuTsd5BqfnLTAIK+Gk5PEaEzt5CTRPVM7Ofnh+pOCNQ2KuTnPng9Jj97yQu3k5KpDHayu/6wbeFivVsEEu6zvaicnpXnclVssunHSGs31CW49YTQg1WFRuyuAZICSiIICSIYoKauZ2P3B5MSgaTZbXfSeXntAOooJhZdS+sR7XV6efrGds/nRlhhPx/3ftHAU04OO/y1CCl3u7zAJ2KjPj73xwhLP/wbKxX4/kUQO3UVkA6fi9UpbBAjhAcxEeGJR+QAkpIRxpkYHgWofHHG9jucv75w3Cx7tdBtwvdwhksCh+pAGrUa6ngST7BbV2jXMOux6QqO1a1vlbhvSWUGCHGqWwKxA+rygdtP/PP1YKA7PX2pW17hJg98rs9dWtcvYRXB/9CRqdkkl9o7BBgInKP1wOqwaqlIi1LGirr7I72ZR0r5N8MIl/Yd6xte5p7tnqiBKQGYYUDp2XLMzVc4R2LxCJhuCGTblYKiH5Z7Rb5UkjTYqaczeH753WEb/+H5NrWtwPxcWtUKEiHJDDp64unVCMze2nWr3EEKkhActtAgsEE43UVewGR7d6F/5v8FrrBQ3L14JTtKBXUsI0vQTTCB1PaHZvm5rf6HyzVVLVWUio6z4SaugNp9k3/i+zDb0gMWihp7jF7fC7yJizyXvIqooVYFO8XEmdLKOY45RexaNYXzVL4yr7/bNb9HaCwGrw4MHkhfiyZaQrnWHPX4/V5XqNlqCrrJWzBDOnND6x5sbsQGLzCLefIywpRgS9d5ABWF7BBRT/ikA2wWqBShYcpF1qgq2aTcZiq40SZrjm7t5eavzD4ZPwi92IvuxNGYdRyx3m4qg4iqpxVmwxzEEK4JKxmDjgohTGtk6cwQsAZhp9FBl1w7ZsNuzb8DiBZ/qfYg6LsZrIg64lxooNVI1uwQQJhYjTPmFGh4gLncLjbjXXGNbaFDTIDICt9BIh92krgg0qB7qQKeHdL+VQMqnRvZO0qyQtRNmGS77OqN/lbcSkAKxOfaarpVAGlwpf6X1VgJvPz02bfHbJe+dX3PrW/jXa6rFVgI/D/isGLhorX+2cenltbfTjSq7uwVn1Wu6ouy5sFPXa223Emgm6cyW1eH1mtjgdt9usXe2arWVwI2WbT5zfTr6bG/WsXD/C9k9LeBjyYgPEB+dLFqv5VYCDi4zxpbO2uA/74Cevn2DKa1rtJUA5Ir0FRNX2DrFlZKjGFe030og6uDx+76Gj31mG3kKkro6Pq7RVgLerqg6oSycnwYL57+u4lYCnb38Tuf2nsiZt37qfPm2xoTDj9XeSgAicuwVEyJBrzC73pFFY9f/21oJ/HjSqtvFN5167fOMdBm5OuZjFbUScH/J1Erg2IvqbyVwYbD3ZUloP87BDps38Y+f+6LlVgJaNv5IKulLplYCAMMabiVAtOc13koAAYy2lQAADJ3Mnegms85sXBGlSUsVy4jbHFrYuSooZtq5SinGMO9Mh7mOVlVq3nzF+TkdHwfNX3m2cGfg94VMw9JSVaVHIMj++p6uqhLcowh6/7+qSih/ilILu945UBQ4xau9uYHI/bkWqirdWHZ27iP7VuHLf9S6lxdjUek1EzA7it/T1QuKBtSs91VdVWmhaPWVtRc3hG0ftdW1Xcd4fy1UVZrWqYg9ff8TvwWhNwRRPusru/sNUQpiROnruyqsqkTMeq/RqkrIgvd7uqpKji4IUqg+7fJfpk+XhrziHtvSlbtgr1PTlQN7O1eTPs15y6RPS/75nz5F+fO4tP3nP+/NDNi4xCNtx+MDm7SgT9+srds0/4Fl+M6Y3vz7ti0KtaApMt4yaQrvt1WtT/uNnBc8yjfZf2Ynu1prurmM1YI+JS4SaAElINYMKOX8U4X6lGhDa1yfIhJDq08BUqg+7UqnT3UmJiBOJ52s3wVDgqw3TCFB9BsMck86yDVOZjPHIK+GZDbiNolaMhtxbUUtmY0Y0KklsxEjDbVkNqLRVEtmI0qDWjIb0UMjZaxBrUgpYvbGx53cQ975FET9ODa/TqOuWshY66Y1JptWI5OJZdrUmEysUqPGZGKGmxqTiXv+JJ7o0/GkyWDpivpd3gYv0t9vOtI8eIkWeNKdjic61NChuA3n9L8ZPf0OLvNxixv/+THFULTcEmmNfdJU/p2ZPou8n6Z1XZ26veZaIkU8PlXFLZEOcR//dzR06EEnqjpjln+fk2V09u3PgOnOV/P+WD8xUUtLdUT510ZzgSeMpUyfYHbZS+cxj28Y+U1v6riAaXr7ZGL7kOm6uzxafJUJ89yrGOa/0WGusZk0Y1WfmXzw8uPGOemNgrYfH/HUcuuyTWpmkii/amaSOGPUzCSRsWq+UNoe54dnW57nbD695FJ31xZWar7Qrk2+M/PCHnC3J35pu2xDx1kk4wq1PqUghWcVTEqpHeazZlhC/VdG6f9qwbj2pOOkceSSURuSh/vnvfkq6MLe9B5f3g7d+AsF/8iAqqx4VcAm2JahmB0uFYgDuewk9BkV2xA8k9yh4/sJaaGHHqy/fd0odSLjsMhV9wgf0OTk9ne06l4RaWkGRGZpX0lbhExpEs2Uoo1Vn4QlBJJhmc5EnhgYOcoXlwuHRQ7swvedPdJ/aJKi1RP8hqC/8gnkDUGMoPUWFbB5OIQkjSpxIh/u+H2rkcSJOnEAWpXSKCkpKdWk2B8bzxhYXypZxJMh+4wi6L5Q8ibr5Pas0Su7hx7Navhvp/dbdhGKqKIPoSiiilGqgjvSb0zcYesCd4A2KtUku6g5J0koR8oWx+HYhKkQSubs7ivdVzJoVvjEk+7+tie3jMMzR/lEikXcMkpVMKfoKxNzgDapeeZA/qgzB7NMdMzp4pMEvxLhCRiOHNwqEMelKosuerElUt5IWKPRA/mt7BPUM+rd+XUDdqX88F3f5Z82j3Z1wtdBqBul9nzyOXYctSqY587IvEdfdKdQEL6Qpn45HPQq46A8UShOFQMnGLAPsEssEUPWgZ9EktEIEf7qDklJvBTlBUo+Chc179Z7/V9hs07eWyXpF1BEqIaWSJUWjV6uCs5lfGHinHeNcw7eBHdUNEqVqa9cjxaKE5gVoevduCPLha7B0xPHtnpxzukTXhHS+kxlFK0veLuiPgSMOM6S3Co3RBGifqo3i8ZPbaw/NvLEwY/hR43y/nboPJawU+enXMiJkAlGCQWj8W4qxJQus62ND6w6JFdbDEIKyCYIJEkChSyVLVU+UG4RrMzmChb3EYjR+IXeeb3UeeHoBSeKeuXX33iQfXpiO6axkncV8XTzfuAfqUSmCBCKFMovpnL3aWdDWw4r+gfAPotqtzEDuLS5/9JmvVFGw4EYNsjBSWSMFfLonTfXW7EvrWl4+vXLM39/OQN/7tgIeypZLFWU8uJkYnGzysbJALkgiJw3lR6JcOKwvv6rUaJ7wyg1F4YtGSWQyYQ0PSusTUOG1rW/yVlft87ZySe3N6j8FCZgRdQRWsAKyBEDVtH/VqvOxdYxDdGQC34IOjv3c+6XGglQjw+76OvuW1oHsW1Eq2qEBQbYR+H/66q7Pfg7VOG2D50a+18R/v+oCH/WlGv7vq9I8tn2zt6cL87+zgibNovw25QyFeG3+VUVRfgP+GUNn3T/RK8DtcPbrmI1e6rF0+Za1pFwwcSolKlmecGvainC36zezr0H7y7zmzzcesfM/UkhNV6EP/EXY2uCXzXtgarvONVMEf6JiT0brJ1TL2iL+wqfF722DtGZIvxnfzL2T/j5f6MIf51nkzedPWLlv7TkfNM/j7/pQdjprO4i/IiWoa2iDrRMtRXhnzr07I97TdMCt/ke8Fw+ZwY+G6FmivAjyoa+Q8GvaizCf/i6+4kjm0/75tZZHrrl0/XbOlDOAmlT8JOxTcFPLPz0ZdH4bRyfdk6lXtd8ch/Ybbqy8i2+FJ8pcohPKhEBi0722YxocO5UtkUiLLsfrYUBEJdJkhMSgQ8nFyBLNZrUclhYKJxa3zqLk/Ge0/4E1+sV7WjJVQ/UiBXN7YOd+/ROs1hPAHq5pLbLAN/prNOVPFhlVTYscBXFgvLVDdu12/h4QmTwInnw5PWn3Yor37uL4EIRFWMlXShY9tYRokfZxS4L1sXQO62JC4X2QOcLEmQCav/SbKrpwuzoj73SL92oa3rgWnPCCSnkRooTUsrrVVH29xaL6f3zWad1YLkOkUwNHCU4ZKGEL4xjqG0TNS7W1OXH3pCJNhMzH3f2rIOXVewBZFlVUaqCGdMZmRFTM8wguj8sTXYsXEPEEgUwX7w4uHbq6O4FQlYQWSQ5sz284hIlMr4zu72XfKRMgfxC7a1e7vLcPH/2Y9+556SX03yCJuPtGvyCSEWqiKL/ZRmpKpjVlZFZljoxc+CjNPJWG5YtdIuTZbFyhhnkdK5zAbufu9/8wsX7R6bf/FKZULmyoYM7qsjhUc8iUl0oD86W96zTGnmpqCZn8LZCo+tzDVrMDd8x+OGeP6TXdtZs2AsAOMZCAbhFAQBULRp5opgpoy8ykfpDPzDmsyt305/d/7Vt1HN2jR72hQBEsRgkoF8z1mnU0fRj/Xfl4/S40vzawpVHfdaP2zopacTYzdWWj+Nc+zRDPs7gWiTPUsv5OKOf1Wv4Z+x2792f389fPjojRAfycVpBSGh3N3/UqhGlj08quHHjRjXk4/y+7o2P2a1toauehPI7lI7ophP5ONdqMXFnqy5wp1rycW4V6rU5ayLnZk4obd2/zdODOpGPk87InMG6wBxWTebj7DDsorfgrxifXbY2Pn/Z9mypU/k4HRmZV7dmmKeb+TiSjJ39PsR3Dy+YExE/9NYg2xrOx3mqx8S5Q3o1zbkqzcdZkhSa7ffCI3iecMIVX/dzxTqRj4P4ELT5OEARon6qP+v/g3yc3x/kDtg4pVP4xPjn91iszNgazsfpqH+aIR/nXm3axVKt5uPENwtdqLAe5J3+Luum7/zYDK3n4xBjcy3kmDhD5GhzTPT1SQulWsrH4f6exR1lkey9f2loaOsWdWtrPR+HqCO0gNW92kxY7a5drTq3pvNxOHRqbORRoZMwbLPfviPhoudPB73F75T0ToZnJwNlPGki+YSpBtsXrfyFcik8PabazUl1UZ4yZfNgzbwE+A2UkrdSmJS5e60rZ32d7FuHfvXbSzs+8k6OOpEkf8aRQIWFqx/FopBK4rmnCkql6mnExkltOKz856dYrEZ+8C/h/OfwNpxDW5+fMosUiADDBPxgoNdTsMchbFWyMoCOlRqfSXNUyXbVn0mzmJ3aLb1TPd8jhRb7uobVmqV2Jm32hw9N027fDkxPfDaoWUvDcLUzafM83vF8NweGbXH9t42lvv0StTNp56MPhNxxXuy7pyh+juNFt1lqZ9LmWYa2XRKYEbCm1e1h2e0Pl6qdSbs0JOYep9Xn8M3fJsyo73/HTe18frewK2cWOxQGZfTvLVvSbFqeWrOZeY95p6PuSDl5okbdDkRu8gAkI5S0tNlj2/hpPXw3p0rur8hxhGftjFFS+z/X/toYH8LZaDVr0GrjO1MByQQlHZVffZBsci10xsqiCR5nGuwEJFOUtMAz+e+FYx8Gz+ct6NrAQR4ASHVRUv36LVp31GP3ypvy/Gpw/NAZgGSGkqaaRI3oGcIP3PygsInc3/MyIJmjpGHD2Bv/juwQMH9uzoSXo/5cAEgWKMnzQsihaSERYdOdpNZDxh4fCUiWKKnttvj42x0u9sqrZdBrVfSvUECqh5JcTz063MrjpPfsMVGxV5cvuwhI9VFSUbN20/eOuBcw+bevTa7MNhkHSA1QUtCBoJSlJQlBeY+Tm2XVurMfkKxQkrR5e7Owy7t9so6WXBk8oFECIDVESX9HHi29e9XY56Cd0ONbryNDAakRSoq7eMO47ZpszuHmb9pO+cdzMiBZY4O/+jQ+eOpP7szfurD8h5zqB0g2mLBFW808stTQZ9+OS89O947/G5Aao6SOfcNNRxz2Dtv1+681KyZm8wCpCUoyi1trdWFCbOCRSdvPL9BvOwWQbFHSyw4l32JePQpbPfHBvjMRc7sCUlOU5Cvp+HXlq0T/iRktd7/9tjMWkJphXL4j+HZ53jHflYYTXk04dnYmINmhJI8r5o1S3h4IX3vaZXyTus//AaTmKGlre+tXJ6/X8c1o0VFs/ek8fC82Sir2K7QqPrXYd2u34c9qNTwsIx22tGfRHLZcWr9Ts2Kb537TvK2avB14cagWDlsG0qmohvH787JPneMs3/pkzPmm43Lwi4mcFKlIwqfIIKBrTOqA3qHK+URKrcuTeCIRUEJoFfsKpgwQFRTl0MjrnCihgn5JGogFg4xP03QhjXDmsEqMSN4vYxOIsoxK5UAo3619nbp7nW2LubM+XIgz6T3ylxYTKrXs5MIitd7GdHt6NjB10FijbIBOfYDDJEPW7vgCWKZXIhciKRRgfEIRbLqskhM28KDYPBhyxVGi+Hdc00u/DVjiN9nerO0tz99b4LdAVd9D3gItI2k7koVwAYlhgOuskU7sV5PT9TRsG+qCTjR+GbsUiTwFiF9GCNjAAVG1YaLfK/311E5ScGN9SOanL4/te55KIayWo4+lWC3HKNrmnqULKuz+lBvYroiwk3ZMNQTOHkvswRatBUQgKcHq03DP3k/ZV3xnNzs2ZvXYr4mVTyPSAliIqNOCBUQdtT9BrP+dPtDm6QOih15tpw8yTU4znD6wMtHIVlbw9MHD9JQNKdenB+2t42DXvLXNBC0aS6IG0sLpg9kQIdpkbb6JRsbyPz19sHqesN2qtcKwPVM9op80bL+qxk8f9GBEBciNju6UVN/pgyl38pz3PU3tNW9tpvmqi5ErdOb0wWtjJtYVGuuoO6Pl0wfPG50WL9ni4Dcz+ESdRWtPXK7h0weIlqFNHwdaptpOH5yZnL0l9IeR/8I7H1u5P4920IHTBz0YwbEy0Sznq1KnD4b329C2f+p335UpBg/qdn+NrwFSc6cPkDlNixCY06jfFsyi8dvOLeNxf3paB07aYGf4suXYI3hvFOlZF+nPrfjCgS++ZSTqCYMIMR78CvyuVPW+ikDZovIKfS/UdRtfIceJuH5JPW6yF41RNAgDFa1PK1u7kFwlb8CBj600W1aoUG9JyZRpDrZeEt/1BX81X8fe2IawyQ7vpthkRy6X5ykR9Z8W+raIIEBSKiFkO3FY/q012juzQQDC5MKRL5QB8QV0amN7fuCWiSbjXDkZgwpj77U+jq8RbOyP3UyelmWk8gD7p9/cU/sHZARMvNpcdKNNSGUPtEPAmjICBiSqRpwopc2An+nAovtDPtJpxMBLU4SXDFrVd9aO1xmdUjgH7ROOb9od/6U+chgHMIOTIpUJVFt3iFPr4xvpGN22cg4wgbUyi3lznjWeETq3w7MhV3rnH9QCay+0YmLtuhpiLZV/nKFZA7jy+5cGupvdrPPM2Xe6RZ2gr+37p9VY/1KWK6qTYP9SKSm+dUWmGGoYe7FoDKPvNev7o7rs8t42aKjNrH6H8aWBrWDJTQVc+oTZuAK4PyzQoOuZm58kCUCuLPyJPIZf9hgkOCxrdsYHQlIhi0jctit/wCR2UH5Kg0WFEgsAerEvRRO0GCD8BRaVPavnw1UDBS43wFK+0NuQiNmOWAMvgJ7yEB/8SanT5HA1WjJaQHMC52qAo22H6EUBc5vnzRTtCbXA6xikFypFizj0ern5F+b9rDsZ9fDb0c355zpZx/ZaWJkohjDr+1K0/cpqi8Bc2SXh1mrsV61uxUnEckFcMiIesIUE9epm7c1JKX2GngzMu+7Xdz7vYhw+q6DsueTwF0esihNNCGyDqWC75YLAhqqEEDqVcN685QePzpLQqe/fhrhe/Z1DbBgsFfHiBOywZJGIQhfQOcwu2H1ieB+UWaF4FE8k5CuFfLRQkciWgDBFVnFNQNylZxgnVWNjNbIGXrKlBd3mWw5E17yyc78RNGpI+0MFbNcHlSREjBKAnSfWjUoovhq24M2YwLNPDI7h3WfkQWT3WXm5vOlMzErQgstgBJFLp3IZYEHlR+a07nMFkbNVISfDiRoULUr4FgWsTn508VLwIStX7ujjb17iU7VRAaHe0sFTtd6Y3BGRJAa0Msyr1cHCBmoUlSoVqOPQUi1nxzUEuLQCkSv8jNw1MGgYdHITBDJCljD8U1nF3QgxkJCx4BEgqE5Vspo6eZhgmCozSSrJ1xhXdBaU+FAlFbohs0CjhTAbZRtT6CsgtgoTfT4lFJP825vcMwnwKzi0W5awZLw+YWMCvhXFxgRyuSqgQEScFgog4qih4rJoDJXO1K0nakvttPCpgrL1VuZo0jpl2fqPZhjkoToPOTE3TjuQ2xx0aXOtND5k1a0ZVu2/XXiqBcgLGzBBvq4BBnkYHeQaZ2VaYJBXQ1YmRRIllpVJkUSJZWVSJFFiWZkUSZSqrExyEiWWlUmRRIllZVIkUWJZmUODWrxsePCZ9wY+l9ffau40UsobFF5K6SOmX2oh5S2cjv8tQgpd7u8wCdioz4+98cISz/8GysV+P5FEDt1FZAOH7JQb0My2FgFC2LInEfa4UT4ACSlhnImmIVRse5+YclruEEngUH1Ig+NRH03BJLtFtXYN20EqTDVau7ZV7rYhp0EkkDUAD/ALfV7QQ9/fr9hnzvCetpgXc+bEhQ2V2Wur2mXsIrg/aoqa3RLSAXsQVuebUvrhdFg1VKVEqGNFidJt47wpD++14Ezhjv076d0OlhbTIib2Dft0dkNKwCbJjKDpvqkntICSghGlrqbkxQcmP805AptXyGRDMMOmHAz1sNwz+q2SqT8OdOcJHnKW2SedsVypuF2D+7mw/SIiRJQbcsdAGFxoqpkb2061ewghilOrWQEtEE43USdW+rw89efyrUFTeMevWIwvma8Du5YQpOWMIClMNdvXbe0vVL65aqmqTGSQjUV6BWX668zh66P+DF66JPCvq+y1+Ip7RthzybuIKkpVoMNlRKeVKeYYRbBoDOOrfmFcfbdvfovWXghYHR48kLwQT7aE+jTg2uP3c1WpbqMlGpWNIx6wqOjeQEU7H8OeCmYAtgtUC1AsANutulWwTZvavn8Dg9Rdvgdn6+++2m7eCfxiJ7IfS2PWccTytDhRxVW2Yy7Q044QrAgqGcsBrjnLTCNbZ46AJQAzjR6qn43PX8u0zvde/KxB6LKeInxjdmMOuJcaKDVSNbsEECYgNQww5dfVzNiVv4VG3GuusS00qGkQGYFbaKROwlJXBBpUD/Wm00N+bS64eU5+yM0JWP1O4dm4GXEdOoknZSvXaSjWy+lc8zbK+7DdHuRcCo8tFoyGlwQyYRxqICukloiHuxhGSLVSrkau6C4ZLErABrheovLJ02DOE1sjRWWObEMpF3fBcCjfcoxT3pkrp7cF56xvc37Jxi7ueBcJeQDZRVJeLm/OEc+5VXZ3C8CzG8JTl2rO5YKQZTZbo2wSM+V4mAp9jV82dcfl84t8DqZxTl+Krj0Av/unvJ+8+4deLw+fa7nnJgiWzAg43OxF5+lPxSIt4MNnxAeIT01kGBghiRujlED0YBH/aFYJ3CyKJ0sQKJiY1mlF4+yevdeG7rOut2Y05yAhLUR5P5lp6HWtJ9fCBURGrrxurktcKTmKcUUj82WBKDypgI8qX0rGtLvkdXfPt+VBc2wiVtqm91qOZ0wocj+ZMeh1bTPG2xVVJ3CZkRSvpsH6zGzNAjJbFQZIYCESlofH2ZPNB4a/G+s/ycZYKn1WexQ+q9ZP+QByVi1GqApEejAiwmJjdr0Pi8au5y8I+Tioe7fgqR9/KoxO3vmA57HyGyueDNNDFWHgDTh7dKIwLhG4lfBsIU8uhxUNVFkxqPmvWPBBPKdNNV6yTCqva5In2hzNEyVlv3iDqK5H88rugDdFXQ1o7IXKIjXwCJNyJNTdXlcEmE75p9Q/Z4DbhcObZ+INvyGdY6MiVLPxR1JJIYbuVDka7HYIhhpprB5hqEQpy3LiDmrBfCC5cn0AlgKEP5f5lOyxYeMpESXa8xqtCgrjWgQwGyrAYC0mABg6mSPpJrPObFwRpUlLPa6J2xxa2LkqsGPaucqywzCPosM8bF/ApXOsQr+0gY27C1/2qoevGoX0k5eKhHHIsTCyIqVD2jYU+APAPCnAnSJ2Eu4pFdKTxMoUTMMiF7PC0yu6cAOD7JYAztlUCzdwjyKt5Wkz1Wok5jlh9sQkGOpSHC/hNxkil4P5mAwM4J+dq3fU2P/AP9ahZk4NijC6Hg3dNBxRLyQZMVJep3+wcjzIcOFHmAK3ZgFCGdA5MDsBSWbC84uSP0+zhlyN/HQseMrK4NgRz37HN//T8yHPDh/S7NAjzI6udaN7nHTvFryp2/AFCc8cFJVdMwGzowiy050qeyEaUHNbnlYDqbyVJbtIQZwEaGhNUBrgOPPI98/J/puDvn/I2bL0Ch4lXzJKvuWi9KKk+MDHdiu8MwduamL0s3CgFlBKY0QpuuVpVAZVssSY7aKsFwgdowoARMx6x9sw5aPINgy9XhUL3ojEfKVaaHJ0QZBC9Wnf/zJ9SiznU0361LkFkz69Zv8/fYryp77Rif0zm80IW/O5d48VNxKKtaBPiWWatKApWrVg0hQ/7Ktan67mbpjc+Norn1V/Zy0uODpguRb0KXGRQAsoAbFmQGmrfRXqU6INrXF9ikgMrT4FSKH6tB+dPtWZmIA4nbSTzNZJr/G7OX5S/72fvBPzr83po4WQwNGeKSQwUkHenw5yjZPZzDHIqyGZjaIGHqbqKWrgYclsFDXwsGQ2ihp4WDIbRQ08LJmNogYelsxG9NBIGWtQK1KKGLF6nhYy1qK1xmTTamTyf1ZHkqKoIsZk4p4/iSf6dDwhli3UAk8G0PEku+DRgGlPvwYfKNhzYMeIx/hzfnUieGKBiFyglU6xOfqwpfAOtSrTbLFEIVAWF1IIUhRsZXFWytcm1l2kGEpFtJ1pZJxMIhL1gRYLXlRvyErQhHvvTrrBGzDc9+gfpzz7/qj1nU4TGvWVC2RRYPjY17b2lyTHimCuFqwECwv/8IUK9N2BhwF3OZ6kbSCwBCvVS1qUduCwSpoABerpx0qb5mcSypMlCMVcQTzOAJoqL/eBPTvUrxsrr0dJpOpXCSVgezlw0v9pctoCATFCBs8NKoTKURlio6KaUDLe6GAxH5bdwuDVM4YX4daL2iXEVxehZYWVAQHsBCLkifxgLSg1Q6SQCXhJqt/1+8t4UtU9qKgOpBNVnTHLxCqgWlqqI8q/Fuxyui2TXebbYnZ5kM5jTiyvqrvLozFWTJh7W2GYD6bDXGMzacaqPjNJUTcXM5MUdXMxM0lRNxczkxR1czFf6FXdetmxv60MmtuYF92838hrar4Qd3FmVouoFkFrvwzq67fE0ZNkXKHWpxQkYjFeLRjXIXSc1NGWY8Siw9XWckzUhqnl2HKHqm45Ful0avqJp06h2aMattmzLx1faLVmWo7x2zA1cOnRRgf6JhUXF1dDy7EXb3bFzs9rErik6/xhR0p27tCJlmNWjNx57aAD3KmWlmPSK1G/Nf/h7JNtkM1zs/t5QSdajhU6MDFnuS4wh1WTLcf2f5j7Il3+yq9g+Eibz5kX8DnHNd1yTMHIPG7NME83W44d79vB4cH5pX7bG28/lBA8C7+jV/0tx1oxcu5H65rmHLypylqO9dzb+HmTM2P8Dm08ZtWq0zZ8ZbqaajmG+BC0LceAIkT91KEsGj/1v6nlGLEtRg23HJvuyNRyzN2xmlqOfVrUw+32t+C1nDST00bTP2u95RixuJkW2milOTK10Yp2rKqWY+Pe7fNd0HhkaPqK5Lsxi5s/13rLMaKO0AJW7oxYGTn+n2o5NoxOjf2vCP9/VISf2E2o2orwF7dlKsKf2LYqivDvrSdv2m3ztJCZCa1bXJtS31eLp821rCPhgsmjtkw1ywvaVksRfuOFs/1X5T7otZk16dqdUQmuNV6EP4MRFSA3OhM7aHbwR3tF+P/50exwY7u/Qmdd9XJZZHrujM4U4fdmZJ1NzbCu2ovwW98T1pcf3h04N/aXXbOrPW/WcBF+RMvQVlEHWqbaivAH2ppn3z3eO3CraML+a+bf8Nq5ZorwZzCCk9i2Govw65nfL7WSBIfMbpGXcsFu0B4dKGcBEfJmRAjMadRvi2HR+G0cn3ZOpV7XfHIf2G26svJtB3wdAeQQn1QiAhad7LMZ0eDcqWyLRFh2P1oLAyAukyQnJLJVTWM1qeVA7LBIO1py1QM1YkVz+4AjNNsJ4PsE4JtLdJOKAL5P21X2YJVV2bDAVRQLyleve/liyHD/wwH5Q1bzLi5fZF353l0EF4qoGCvpQsGyt+lOdF3ssoDsDnbSyIWqq5y+fEGCTEDtX976988ln76LQvPmbd81fXl3MeGEFHIjxQkp5fWqKPvbkfH96zrVtLOkkkwNHCU4ZKGEL4xjqG0zdufSyY7PzUKXpH+4PvxAsQAvq9gDyLKqolQFM8BkZWDGoXY64f6wNNmxcA0RSxTAfPHi4Nqpo7sXCFlBZJHkzPbwikuUyPjO7PZe8pEyBfILtbeanbe5aKXbi/CNHQr3t05w2oK3a/ALIhWpIor+l2WkqmBWJiOzRDXDLMLMgY/SyFttWLbQLU6WxcoZZtAd1lID82d6YUfeHHXe+9VxZmVC5cqGDu6oIodHPYtIdaE8OFvCnDTzUlFNzuBtneUeFDXqviZww4Y6Y2+LI8fWbNgLAGiKAXCLAgCoWjTyRDFTRl9kYvvd7tZX7rgFZv4cEpo9TtGGYMqq97AvBCC/HQMA/VLbYY4mj/XflY9DbMxdbfk4012Y8nEKnKs6H+fLs9ih/xb3DNtnMUqPe2Rubx3Ix0lzYdrdjHbRgaSCP//8sxrycTJu7l46KCAueEPEgE5WFy6E60Q+jjsjd4x0gTvVko/T6sui/uLlet4Lc9zOBJjF79CJfJxHzkzMAdqk5pnDqsl8nHqSPb0TjM2DNp0LStS/8NsQncrHyWBkXmLNME8383EeLurjZHf0UMC8bTt/WzTmWpcazsfxZuScTY1zrkrzcWZ04R9M6fGEm2vqljB16oxNOpGPg/gQtPk4QBGifmos6/+DfJyt7a1fnbxexzejRUex9afz/Wo4HyfDlSkfp6tr9eTjNNhidD36QWjIMq/X1rkPW83Xej4OMTbXQo7JdFemHJMY16rKx3FfOuVm9Lws/1U7s1cM2mnzXuv5OEQdoQWsujJiZen6fyofJ45OjY08KnQShm3223ckXPT86aC3+J2S3snw7GSgjCdNJJ8w1WD7opW/UC6Fp8dUuzmpLspTpmwerJmXAL+BUvKK/Qqtik8t9t3abfizWg0Py2jHR97JUSeS5M84EqiwcPWjWBRSSTz3VEGpVD2N2DipDYelDwtzNfKDfwnnP4e34UypZXfaLFIgAgwT8IOBXk/BHoewVclKPh0rNT6T5qiS7ao/k9Yow+5y609/cyfdcYhw/jrpvdqZtObzwoa1dTPrtalBR4s3ua1/qZ1Ju1H68513+52cjTK9uGWRGUfUzqTJ+/Eu1TMsDDnYOzx2ZfHoMWpn0nbdCJIMPNAxdOXw2wl+XcN4amfSHm6YE/jV+U345IeB7NRVj1+rnc8fxZLs+2w+kLt7Vi2bOn+s3qXWbKbbonOt/86d6r3tb4NNDVMyQwDJCCVlhv92O/Hqi4BF+4sK4sJPzAEkY5R0rcESzqrB/pzl+4ea9R55+SUgmaCk0EML3w9/EB624bPs/rrzEfaAZIqSgkxKZTx3HmfOWpmT54j3qwGpLkoyqT8k89/8mJDdJ/wnFSbd3ghIZigpffzdCSN6Z/pu2tmocGz6E3gMzxwbYdwcg+h6+/zXiurVffs9zQyQLFBSu+kDBie03BmyLuXU3KBV7ccCkiWmkAco7ofIF4TP+tuuj/lZV4hhPZR0d1m3kfGbB4astx7sMm2ZSRYg1UdJJ84OP+hQMCB4gzyF7Sm6DbncACX1H92p5Q9u06C0hoH6cwMtWwKSFXbX3seRq3/2C1h9P2pQ7hUFRL4hSrrvGmN4YynLf+Ha7jP/bb0oHZAaoaR585Y88PjSOGS7ufsMUfGI0YBkjZL2fZ0x88nZHoGrD0SFThq0ZRog2aCky04zmsuanPA78OQlN+z82QxAaoySxnqlWZ8SdPU9FN723Dr5/Z6A1AQlTX0Z4dh5+Af/mTlu3bdZ/3MPkGxR0kV/SZ87vw4ELLa03ZCzP6A1IDVFSXn91iy/MvO19/IJ9lHFiy9CYWuGSZSBaN6Te3Lv9Ea9f3T91S4FkOxQ0priFV6d0lsGb6v/xXfshHQpIDVHSc9W305M4XwL29cuzmv+mkmwugQbJZl5bhrnfO8650Bqo4QjQ1+8JR22tGfRHLbcPHPZm3v2KWGThiyd9/Bx5kMtHLYU0KmohvH787JPneMs3/pkzPmm43Lwi4mcFKlIwqfIIKBrTOqA3qHK+URKrcuTeCIRUEJoFfsKpgwQFRTl0MjrnCihgn5JGjxV40HXhTTCmcNq6qFZE4iyjErlQCjfzcDrxQHXlc5+ay9ta29vd1CbCZVadnJhkVqRB92eng0Ilv09NMoG6NQHOEwyZO2OL4BleiVyIZJCAcYnFMGmyyo5YQMPis2DIVccJYqO/fMHPjj50LdgcWKzsQ61P+K3QFXfQ94CLSNpO5KFcDVlhOuju07sV5PT9TRsG+qCTjR+GbsUiTwFiF9GCNjAAVG1YaLfKx3X6GLxlA89QvOntmrwbJC/FWG1HH0sxWo5RtE29yxdUGH3p9zAdkWEnbRjqiFw9lhiD7ZoLSACSQnWpl9fB26P/oM7a+cFzrmClvmVTyPSAlhNGcECoo7an3gWjf353+mD/+j0AdFDr7bTB8faM50+8G5fFacPXFIbPvVVzA8uuN6mvuPHgGAtGkuiBtLC6YOC9kzJ2hntq+X0gc2CgG6HmqZ7758U/U9w5s+IGj99kMiICpAbHd0pqb7TBxMft/s3z2mf715ZM4cFzfr31JnTBzaMrCvx0FF3RsunD/ghW91N0q4GT5M9y2/7kj+xhk8fIFqGNn38/7F3HVBNZF8/uqgogg0QxBI7KsXeCwFCDUXAXiMJEA0EQxRQVERUFFTsiKjYEXtDRAXXgl1xbdgVu66Kbdfu995kJmQqZBmS7PdfzvEcmctMJr/73n33vfu79wIro7XsgytDJnmkfm3skZ6//9mJzs2P6EH2QQgjOA4dtZh9YDe4RifRpXmuW+YN3fPNthjf21h32QcWjAiBOY36bcEcGr/tzEqh4EeP+q5xmxpXe9l8ci7eG0V61vk7C8p+cOCIbxmJesJghxgEfgV+V7R6X0VgbNHxCn0v1HWbUibHiXh+Sf3eZC8ak2iwDXzug7Z2IblKDnCM+lRAb8nN62ae/J783Ds+tvvN+TkX3xKC7PBuiiA7crk0T4lo/1jo2/IAAhRONQi57YCF89EodmaBAISNC2uRRA6GL5BTL7YBI/sVH+jU2WNBw7+b/x3dMBU/LZ2xm8nTskRUGmC7L36eFLO4uUvCvZcJH/MaWbIAWDIjYGBE6cSJUq4Z8G86ceh+yCmdhgy6NEJ0yWBVBQUxY9+1ve2z4k3B2Wnpj17URZJxgDL4UeFysSp0hzi1PEd/68FtyucAE1S7/nbenFXHDnvF/bnNfMqvgN0sqNaBUbUWOlItlX+crFkDuNL7l75Iruy63eyDy8GtQ3q9eiE30Vn/Uo4dapNg/9Jw0v7WDpli6MIYwqFZGB2v1r87sdteh+3DRlokDjyCLw1sCktuKuDRJ2TjimF8WKxB1zN7J1kogFxZ+BN5jKjkMcjmsKTZmQgMkjKtiMSwXekvTFIH5V9pcKjQsDsA/bkjRRO00WDwP+5W3lw9nkANFHjcAEv5Qm9DFsa1xhp4AfSUSXzwf0qbFgFPo2WRYpoMnIdTZ64f1zWbnxNbc+zZy0mFeBuD9EKlaBGHXi/NxrSo9andqO/dHDfcnNf48IH1FiycTJhCmA0cKdp+pbRBYC7vkXBLNfWrTrcCZWER4sAJyPCALSSoTzcz+y+pc/RRLdc5BunzB7zg4CuqG5U8l7z9xQkrIqMJgW04FWyFtghsqEmQ0JmEcybNP3ToKvOa9f6tp92VaXxiw+BwqTBQzPWeIJVS2AI6h9kWuy8M3gfHrCRsolAqESkHeaREEcKVgW2KvOyWgBilZ3hPqsbGamINvOTe3eiCb+kQ3a7lnfvmcFFD2h8qYLs+aCQhYjQ9Hy/4drlTnTezifeYbqu9X+PdZ+RBZPdZebm06UxkJbDgMnSGyMVTuQywoHLNbrTucxmRs1IhJ8cNNTi0KOGLu2FbI8HvD+/Mu5aDIut3WoynaqMDhDqkg5ey3pjcGhlJDGgd7qpVBwt7UcOA6HCxOg7N1Tg7dp7ApRVL7eDfRNi5uo2CTm6wWE5gCcOf8hpuc2SBhIoFjwCb6milqqmzKAgLU3kmSTn1OtoOnQXFPCpSoT0yCzQ6CLNQtjGFvgKyVmFDX0QJhaHxsoif3i8Eh8R7fW+bvnhICEzAb0URmEAuVwQUyBCnhQIMcXShGsuhWaj0pm490Vqy08KnAsrWO3RlKlvPVUE+Tu8hJ3Lj2IG8xflpX8Lq/nSafn96+sOimCYsQF7ciwnygl4Y5FI6yDVmZdbCINcCK5OCRImxMilIlBgrk4JEibEyKUiUGCuTgkSJsTIpSJQYK5OCRImxMmf/NttVmHnNOXdHQR2zxxdHkChvcPBSjj4i/ZIFylsonf6beZ6wvbu7hstmA9GY6y9q4/VfT3nY7ySVRUB3EQngkJ3yqjSzrZmLBLbsCYE9bpQPQLaUcJ+J0hDKFt4nUk5LfUUSOFR/pEF6FLczmGSFVGfXsB1keieNzq6tlNE2JBtEBlUD8AC/0POCLOUDMxOHRzjseX5iqvkw+97libVV7DF2AYyPdkaX3WJSgj3YVt/pROmH02FlpqJEqGNFiZLRpW++BgMHOy3OqrtgdZXUhizSIqYP8P50elOUyxbZHLcEx+hjLKAExgwDSqJOmjVpt/HF5hUy2RDMsCkHt3oY94whVPK988SfcbnuWc6d4mZzJSd0GM+F7ReRQUQZkDsKtsHFnTRzY9uqoocQokC1mhVwBcLZJkpwFkzt2TL11QbeIolpM65VvVF6ELWEIJ3uxARSeifN4rotnSXKb646qioZMkhgkd5ARTZ4OnCl0R1BQuDgy/N/X3ERH0XEnkuOIqokFYFOFCM6vp0wxyiMQ7MwvhroLTCw/+K0dP15l7U+7kPJB/HkldCABtym+HiuiuoWKdOobBwxwaKssYGydj4Ghml4FwDbeaoDKA6AzaBLBYRpL/aY6ZNrN8h7+bUndXsZtCSU7kPisTTLOk5YmhUnmrjydswFdjoAguVLNcbSgWtu00Wjtc4EAUsMZho9VA7Vl4YOdTsl2CC4NDHHbt0AvCXig3upgVITadklgDAZMMJ0p7Nmi13pITRirFlnITRoaZAxAkNopE7C4XYINKgdktHZIafW5+17zLgvSHdZ+07Rw7IR8Rw6VBjOVZ7TUJyX07nmrZX3YdEeJC9FyA0TR8JLYrkkEF0gy2SWiMldDG9IdVKuJi5rlAwMm/aeANeLVD55LEB9l4dGhsoECUMpD3fB61CXCehjtsTgR0+n2XWC97n1HYb/llWQB5BdJOXl0uYcMc+tvNEt2E0ZwlOTas5lgC0Lx1MjNomx8n2YCn21Hfhr27MXjXlLCsYNaDlg3Sp89E95Pzn6h14vDZ96Deob9nl8QbAx5/uwWrP7tmcBn0IPJnzA8NEFw8AQIW5MVALRm0P80awSuHGAUB4sVjApTepwcnvPwl8O2QYffmRUbUOozqa8n6w09Drr5FqglQRGrYzWK60U52Fa0Wj5qoUYvHCxCDW+lIpRLDXLm2Q61/3I94drr6ePscIrxgu5n6wY9DrbinGwQ80JPGYk7Vdj7fmcPz0025BZqTBANhZSSWl4mIQEXRy/7DxvG0d48jV/QTSeVeukfACZVYsJKgKRXR5MiCg8sHU9nEOzru9a5PlxWK+e7rM+/lAYHr/1Aa9j5SeWnQzTW7XDwC/g3MgQSWAIcCthbqEwIgJWNFCxYtDlv2ybD2KeNtX7ksek8romPFF3lCdKYr84gF3dLvfyRsAboq4GXOwlyiI1MIVJ+SaUX3yq65RYD3d3182WD28Nu22BD+RWo3NsVAItL/4IlRRi2J6Ko8Fti2CokcXq7Y2OKGVZTlyiFuQDRSjPB2ApQPj/Ep+SO9l7CnVpG8J6rtOqoHBfiwBmQQUYrMUEAEMn83i6yaw3gSviaGKpxzUxzMFC5MrGnSlyVVOFuZwOc+8DLhfPcE44xQ617CV56VEHXzUK6ScfLpUEImlhZENKh7SVF/AHwPKkAHdKuaG4p5TJThIrUzC9FrmYFV5e1oMbsMkWeAM4k6gObmCM4qNXvrHqNBLznLD1pIY7tKU4XcJPqoZcdhdhY2CI6PT8SnnVnXPe1PcyblevAJNXopEb+SDmhTRGDJXX6R+sfB/kdeGfMG3cGrlI5MDmQHYCQmbC64tSP0dONrtw/IOfyyb5ojUWFpPxlNRKPPLs4JFmRyXC7OiaZd4/2aOH19yGzWa5He0aU94zE1hGAKqzPRV7YTCQNvTOVwOptJOlxv7iQBmw0Jqg1H77hnSjnuaO23Jneva6lNkXj5IjGSXHUlF6NUC+aUOQreOOAk/RhSV/hLOAEhjWDCid98pHx6BqLDGyXZT1AqFjVAaAiKx3/BqmfBR5DUOvV8SBNzJiPlMdNFnbIkih9jTiX2ZPieV8tGVPBYz21PM/e4rqp8OB6i9yOl7gZaYOWTensGFTFuwpsUwTG/ZUwGhPBRVtT1PqPY7fumeR2wG5ZdWxGZXasGBPiYcEbNhTT0Z76lmB9pS4hurengoY7aknZk8VdPZUb/YExOnEDpmtSyXLd/Ocwp2zPjmE7Lo6z4+FLUGaJ9OWIEYF+QQ6yDUms5lgkGuBzEZRAw8z9RQ18DAyG0UNPIzMRlEDDyOzUdTAw8hsFDXwMDIb0UMjMdagVaQcYsTqeSww1iaypmQjLSr5n9WRpCiqiCmZGPMn6cSATifEsoUs6CSSTiep2Q+GzH782T0ne3/O7nEP8ZuqKr7CMLGUXKCVzrBZ87jh8A61KtPcMJlCrCwupBBHKbjK4qzUbB1C3UWKVymLtTPyD5TLpFI/uGLBi+oNWQmW0OZa41jrO91dExLezvActIY2t9lwQIRYHgBeH/vYls6yCWOkkKsFK8HCwj8iiQL97sDDgFGOothNBJVgpXpJh9Kt+JzBfGBAezhxYmc71fASyoMlYQJxEG4BNFJe9oM9O9SvV1deD5CFq18llID1aMV3G8TPr4WA6CuHeYMKifKtqmFvRTWh5MJI9zARLLuFwVupOrwIQy9qlxBfXYqWFVZuCGAnEIlQ6gRrQaktRAq5WBiq+t1gkFwYrroHHapRdENVb5ZlYhVQlo7qiOOfhXX5M59pXS7kY+tytN5jTiyvqr/Ho0m9mTCX9sYwn0SHucbLpDFHe8skRd1cbJmkqJuLLZMUdXOxZZKibi7mCxWmr+jzcfZexx1J9QxChdW6q/lCnYvldYyMtjgfKt45LtvqRmXS4gqtPnVrSEIxXhYW18l0mtTTlmPEosNaazn2oD9Ty7Ha/Su65diHVSYfu53Z55PUefi3zLih6/Sg5Vhhf6YGLrv660HfpAcPHmih5djKJV4jTixI4aW5vpqQ8yTqm160HEtg1M5ofdCOVlqOHfxaL/Zt0A6vfTVfXu/ftw2evqqrlmPdGZVTWx+Uw9Fly7FrfflH9x2ozEudOe/XzmC3fXrVcuy5L5PyjvrqT6Egnbcc+54beqnZ1Vlem/f4dki/GBSn45ZjKYyaC9e55uBNFdZybOeIZit+v/CX+97RjZ7t/7DLQC9ajiE+BG3LMWAIUT81hkPjp/6bWo4R22LouOXYdz+mlmMb/LTTcqzD0rN+spo+/Jz47J7zr4bdYr3lGLG4GQtttD76MbXROu9XUS3Hhq7MMu6/qZ7PbEObkWYb121iveUY0UawgNUGRqxi/P6nWo5NoTNj/xXh/0dF+IndhLRWhH94AFMR/jv+FVGEP39hm/uOVUNdDvw57vPagAX4duvlyzZn2UbCA5OAAKaa5TYBWinCP3BO2zPmG+u6zekvqlE3sXctnRfhN2BEBYwbvdk7aJb4w14R/rpG8zL6u3vwt4VmWo7bEII/ttdlEf59/kyqS9KN6rRehL9TQEN+8DBfr7jqqz/WPTLGScdF+BErQ1tFHVgZrRXhX5gqsIp5nOqWM7Tql2V1ruILZummCL8BIzjA2GivCL/prGZfag9Y6T3P9/KnTvLn+HI6uivCj8xpWoTAnEb9tqkcGr+Nz2vb7lefq7yMe423/LH6LaGOAJLEFy6TghWd7LMZ0uDcpSREIim5H62FARCXyyYEh3BVTWM1qeVA7LBI+7bkqgdqwrJy+4AjxBkI8C0C+GYQ3aQCgO/gAeVNrDIteS1wFcWC8qt/Wb+mXi1JL/elL0IOXS0YgGf0/qPeXQQXimgYy+lCwbK3nwfQdbFLAWO3YIBGLlRN5fQViYPlYmr/8kxcz2PvCp84rUswy721vtiVkCGF3EiRIaW8XhFlfzMYv3/sAF07S6qRqYGjBF9ZIhNJAhlq2/TNcJ8xx9vfY4mpwit265JE/FjFHkAeqypJRShjMKMy2utGGUT3h6NJxMLOM0ymAMuXMBCenVq37wO2rGBnEWrD7dAnMEQmF9lwO/aJGC9XIL9Qe6v+M64V5p9pzl845NmL4ptnZPh1DX6AvyJaStH/skRUEcoyZFTWgwB9mDnwURp5q2YlB91hE+RjIhhmUNxdIzP7MT5O8YfSF/u+79qyPFvl8m4d2qOGHKZ6FpDqQnXgbz02QDMvFbXkDN7WMfM5IsPqRbwDSTOzerl9nqnbbS8AIBkDoJACAGhaNPJEsaWMvsiEc97j2rMO+Tgn7r05dE+j/g10muwLAWjBBMDA1wGYozmN8+/i4xAbc2uNj/N9EBMfx2ZQRfNxuFsjJ+/PK3Rc/+T3P98WTjmuB3ycj4OYopvnB+kBqeDUqVNa4OPcGlUpu+uAkc7bbyv21gx+E6UXfJwNjNqJ0QftaIWPk+fDGd3Kx9gtsUnsrqYrRgzVCz5OAKNybPRBORxd8nH6X05+cvSUk2dseqfEg7t2GOoVH8eAUXl3Bura2dUjPo59TauntbblC2Y8etJ07uEePXXMx9k3kElzSTrXXIXycWw2ia473VjtujRz/qrkEXvT9IKPg/gQtHwcYAhRPzWW8/+Aj/N07c2QKP4X7wNtA/ssXBcXo2M+jsEQJj7OtsHa4ePEXkqbuuRUumtS1JIh0gMdt7DOxyHuzVngmHwfzMQxuTq4ovg48094riyaMNwla0Nw65+/Hc1gnY9DtBEsYLWNEav4wf9TfJzpdGZsfJ6kncQ70+lAro/02eNh+Da+Rv0nwNxJV7kwPIScYapB+KKFsyQiHGaPqaI50bbKLFOuENbMC4afQDnyjHtsibG5c42fE20enDvyBf37kSM56kLS+KvuD0yYj3oqFsWoJOY9lXFUqp5GbJzUms8JcQOj0twJ/iPkf45tzXcLdss39hdLgcLEIndg16OwxyFqVaoyjk6VGuekWavGdsXnpC0e/zXyt0YDvVcmre47fdqpfmo5aae7LDp8v5orb3tXs7fdem15o5aTVitojonh2fO8OT3tk190ahGrlpPm0vPX739+3e61qu6B+Xen94tQy0l7UP/c6NB9bXmZv7ew/rxiyR61nLSWsl7vKs+YxktfmC0JzHv0Ui0/v8XOpwZX/jrrOm927veCqz3XqzWbMUu94jP92iiP2Yc8f2bmfukIRIao6FDNicXZfc7w9/V7ZC2IjO4MRNVR0atppvaLG3V1SJj993Tep60bgKgGKvo24/N3t65LnBYftH168G+3QCAyQkV1TzYunp61WZBocM2134CbO4CoJio6m7q42rdOIrf54mpHXqd3/g2IjFHRF487HoOmZXrsrrZ7y9lT+84BkQkqSk5/XnhSfs1tXYLowZ/G2+8DUS1UVF2yYXVc7nefNfv2Ptl75S58jdqo6E0Dl03zj8Z5pI+8U/XRChv4WXVQUetnhttq5WZ6LO4UL16efC8EiOqiopP+JjeKO5912FJH+nxowYpQIKqHikYlbZzL6WPreDjv7bx7ftY3gMgUFcldz9/b7j3TcbdnrWV+X+rVBiIzVHTm/LE0xdmW7slFee1erUkfA0TmqKhKaK+84uRdrhkWjXMm5vYKAqL6qGi49ZyVI5et9Fm7/FZY/ZMfTwORBSr6tHx9/8/vP/ms3uZm6zes4XMgskRFrg8GHfO8luE+6363U5967OsFRA1Q0eZi++m752xwnb7q54r2bQLhXVaoaEG2kWHHbZe8ZzwZ233k8NMmQNQQFb2THHz7qtdZftzcTh03/pjjCkSNUNEjK5PGt64VO85q13Rvv1d1jwJRY+x7dZjR89OJON4++3iztoODlwFRE1TUrf3dQVaRFt4LJ/d6devureVAxEVFjk9CY+Urz/vMnLa17aHbTS6Qki2bcmiSLdOKO943m/eAtzCwScfnSz/YUJgNTZMtZ9CZKLOggztTT57hp20rmnSuYUw6/jCRHxUulYkoGAR0jUlboXeoOJ9IqfWIUKFUCowQWsW+jJQBooGifDXyOScqKKNfEgv2glEj6bqQ+sI+biM1awJRwqhUvgg1Hz95aY2NOT28d1y6FJq67mUWi4RKlp1cWKQ2fCRdTM8CbJbdRmrEBujiBxwmOXJ2JxLDMr2yCAlCoQDvJ5HCpsuqccIFHhRXCLdcgZQobuX12LjKSu6d07laTsrNmNv4EKjqc8gh0BIR2ztZCBeXEa7PI/QiXk2m62nYNtQWnWiiEnUpQoQKsH8ZJ+YCB0TVhok+Vpo/U3Dmd+t1vJ1PHdPfOTovJ5yWo4+lOC3HJGxrr7YtOtidKQPYdshgJ0VMNQSuKUbswQ6txUQgKcGqvLC2ze0qVb1W+HCyr18QVik/jYgFsLiMYIGhjq4/8Rya9ee/7IN/lH1A9NC1ln1wYhRT9oHzqIrIPrjwpNjidvVmXqu/9u7WqOY5ExYXS6IFYiH74PAoJrL2klFayT4obHgx+nlnqevKttJBx16HHtN59oGUERUwbvQ0UqK97INlGxf+9fHTUJclj1KPyr5F4s9VdJl90JBRdR9H6qk7w3L2wdBU8wipaxXBnOZDayRue9Zdx9kHiJWhpY8DK6O17IOWjQV1kiIEDkcm3v5Vc6ChVA+yD6SM4DiP0mL2gXmkfYcpd+64Luy8/7zRQoMjepJ90JARITCnUb9tJofGbzuzUij40aO+a9ymxtVeNp+ci/dGkZ51/s6Csh8cOOJbRqKeMNghBoFfgd8Vrd5XERhbdLxC3wt13aaUyXEinl9SvzfZi8YkGmwDUyajrV1IrpID0IDF5AroLVnkOE16bfxW75lVTq8cmfPeghBkh3dTBNmRy6V5SkT7x0LflmQIUDjVIOS243NCJmsUO7NAAMLGhbVIIgfDF8ipF9vMU/ys6VOmOM383fPy+tu3puCnpTN2M3lalohKA+zIJf8736o4ea7q0XjPqPZtTVkAzIERMDCidOJEKdcM+DedOHQ/5JROQwZdGiG6ZLCqEWaKUQlP7Rx3rrUq/H756du6SDIOUAY/KlwuVoXuEKeW5+hvPbhN+Rxggmr93bZwRvTO8dx73aVt2CwvBxZUWzyJSbWnJ+mPf5ysWQO40vuXfqjmvyTNyNk13sG+2YqaB3x01r+UY4faJNi/NJy0v7VDphi6MM7i0CyMjlfr353Yba/D9mEjLRIHHsGXBjaFJTcV8OgTsnHFMD4s1qDrmb2TLBRAriz8iTxGVPIYZHNY0uxMBAZJmVZEYtiu9BcmqYPyrzQ4VOCKAejPHSmaoI0Gg/+5qLy5ejyBGijwuAGW8oXehiyMa4018ALoKZP44P+UNi0CnkbLIsU0GThnj2+M4Z5J8lh5WbymneeoJ3gbg/RCpWgRh14vzcZU+/7TQPx1qPMC3rveRQ/55eVfwI2cBYTZwJGi7VdKGwTm8h4Jt1RTv+p0K1AWFiEOnIAMD9hCgvp007Pei+NmThs81tQW8e0ShtfDswpKnkve/uKEFZHRhMA2nAq2QlsENtQkzKYzCedMmn/o0FXmNev9W0+7K9P4xIbB4VJhoJjrPUEqpbAFdA6zLXZfGLwPjllJ2EShVCJSDvJIiSKEKwPbFHnZLQExSs/wnlSNjdXEGnjJDiK64Fs6RDewvHPfHC5qSPtDBWzXB40kRIyaVOWzyuHP9UN4yyr9OvqtseQp3n1GHkR2n5WXS5vORFYCCy5Dd4hcPJXLAAsq1xbRus9lRM5KhZwcN9Tg0KLuczjjUdGTazNcF93x/8T7lfMVT9VGBwh1SAcvZb0xuTUykhjQOhqoVQcLe1HDgOhwsToOzdU4O3aewKUVS+3g30TYubqNgk5usFhOYAnDn/IabnNkgYSKBY8Am+popaoptUxcmMozScqp19F26Cwo5lGRCu2RWaDRQZiFso0p9BWQtQob+iJKKNqkG4RulM10X5GV7T8tas1OQmACfiuKwARyuSKgQIY4LRRgiKMLVQKHZqHSm7r1RGvJTgufCihb7xzIVLa+hQryOXoPOZEbxw7kb6VLVlc3HOK0r+jr6Nb2wz6yAPnHECbIr4ZgkM+lg1xjVmYtDHItsDIpSJQYK5OCRImxMilIlBgrk4JEibEyKUiUGCuTgkSp6ppEJlFirEy7B/36zBtf6LJr2KxYy/5ePBLlDQ5eytFHpF+yQHlLpNN/M88Ttnd313DZbCAac/1Fbbz+6ykP+52ksgjoLiIBHLJTXpVmtjVzkcCWPSGwx43yAciWEu4zURpC2cL7RMppqa9IAofqjzRIj2ohBJOskOrsGraD3DBao7NrK2W0DckGkUHVADzAL/S8oGn7Gp0ddcLEO85tZ5O9h7cuKU+srWKPsQtgfFSILrvFpAR7sK1+MJrSD6fDykxFiVDHipoDsm53VjvPzS5zT096596z+jQWaRHTB3h/Or0pymWLbI5bgmP0MRZQAmOGAaWQ0Zo1abfxxeYVMtkQzLApB7d6GPeMPlQyMPns6gutF7huvzfe3erFw7c6jOfC9ovIIKIMyB2F7RdHa+bGtlVFDyFEgWo1K+AKhLNNlOCs6ia48b7XUe+Ua7Hz+Gu6z9aDqCUE6fxoJpA2jNYsrtvSWaL85qqjqpIhgwQW6Q3U0RWSh9ntQ92z/zpsmnTx4lR8FBF7LjmKqJJUBDoxjOgEjMYcoyQOzcL4aqC3wMD+i9PS9edd1vq4DyUfxJNXQgMacJvi47kqqlukTKOyccQEi7LGBsra+RgYptFjAGznqQ6gOAA2wzEVEKZN7Oqx6fw4kWDtJd+rPZy5q/GHnUg8lmZZxwlLs+JEE1fejrnATg+GYPlSjbF04Jq3H6PRWmeCgCUGM40eqsGpTXvP8xnoHPdg9P7k5t3wrNfqfHAvNVBqIi27BBAmQ0aYHgg1W+xKD6ERY806C6FBS4OMERhCI3USDrdDoEHt0Dw6O+TU+rx9jxn3Bekua98pelg2Ip5DhwrDucpzGorzcjrXvLXyPizag+SlCLlh4kh4SSyXBKILZJnMEjG5i+ENqU7K1cRljZLBYTMR4HqRyiePBaiPnqiRoTJBwlDKw13wOtSFhj5POR+84i/H9SbnpEs39KmLd5GQB5BdJOXl0uYcMc+tvNEtAE8hhKcm1ZzLAFuWXRM1YpMYK9+HqdCX3cOPsza3eei8eeU+g3Hb6l7CR/+U95Ojf+j10vDZO+qde3H3y26xguiRsxeL/2YBnwRGfMDw0QXDwBAhbkxUAtGbQ/zRrBK4cYBQHixWMCnNtbokwmvSdV7e/XD7LhcWFuCVpryfrDT0OuvkWqCV7oxaqa1XWinOw7Si0fJVCzF44WIRanypt2NN8yq3GFedt2b09TuLllfFx3+reiH3kxWDXmdbMQ52qDmBx4yk/WqsPZ+TNlGzDZmVCgNkYyGVlIbH0/zRsoN/1hEkmLyq3qpbd3xqWzUn5QPIrFpMUBGIjGZEpMVEbF2fz6FZ13ct8vw4rFdP91kffygMj9/6gNex8hPLTobprdph4BdwbmSIJDAEuJUwt1AYEQErGqhYMejyX7bNBzFPm+p9yWNSeV0TnugElCdKYr84gF3d6AnljYA3RF0NuNhLlEVqYAqT8k0ov7jVnJstDmxcK0j4Ff45q+Z6PNe9Gp1joxJoefFHqKQQw/ZUHA1uWwRDjSxWb290RCnLcuIStSAfKEJ5PgBLAcL/l/iU3MneUygRJa7nOq0KCve1CGAWVIDBWkwAMHQyL6CbzHoTuCKOJpZ6XBPDHCxEru4omCJXhxUY5sl0mHsfcLl4hnPCKXaoZS/JS486+KpRSD/5cKkkEEkLIxtSOqStvIA/AJYnBbhTyg3FPaVMdpJYmYLptcjFrPDysh7cwNJL0QDOJKqDGyRGEZ1vrDqNxDwnbD2p4Q5tKU6X8JOqIZfdRdgYGCI6Pb9SXnXnnDf1vYzb1SvA5JVo5EY+iHkhjRFD5XX6ByvfB3ld+CdMG7dGLhI5sDmQnYCQmfD6otTPJmGNzTVWP3XZv7mg+nQ7aVecfirxyLODR5odlQiz46T7309qzjdwzN0713B3m/yk8p6ZwLguVGd7KvbCYFhDNjpfDaTSTpYa+4sDZcBCa4JSh40OcbOmLXffPnbX0jThzDF4lBzJKDmWitJfJr2aO32+7rzi++pL1aZYRbGA0gZGlGKi89ExqBpLjGwXZb1A6BiVASAi6x2/hikfRV7D0OsVceCNjJjPVAdN1rYIUqg9Xfgvs6fEcj5asqe+UUz29HPkf/YU1c/co+5rii8OcN+1xsrF7NO1lmzYU0KZJhYshVsUk6XgRlW0PY2XrH/du8M016WPLM3M3Dr0YMGeEg8JWEAJDGsGlAoiK9CeEtdQndtTZMTQ2lOAFGpPF9HZU73ZExCnEztkti6VLN/Ncwp3zvrkELLr6jw/FrYEgkimLYGNCvLFdJBrTGYzwSDXApmNogYeZuopauBhZDaKGngYmY2iBh5GZqOogYeR2Shq4GFkNqKHRmKsQatIOcSI1fNYYKwtYU3JRlpU8j+rI0lRVBFTMjHmT9KJAZ1OiGULWdDJUjqdpGY/GDL78Wf3nOz9ObvHPcTn+VXxFYaJpeQCrXSGzZrHDYd3qFWZ5obJFGJlcSGFOErBVRZnpfzaxLqLFK9SFmtn5B8ol0mlfnDFghfVG7ISLOGbM/XOt3jg6bxk4R/f25+1oWVSGw6IEMsDwOtjH9vSWTZhjBRytWAlWFj4RyRRoN8deBgwylEUu4mgEqxUL9GA+rbicwzGAwPaw4kTO9uphpdQHiwJE4iDcAugkfKyH+zZoX69uvJ6gCxc/SreChv4teLvqDw+vxYCoq8c5g0qJMq3qoa9FdWEkgsj3cNEsOwWBm+l6vAiDL2oXUJ8dSlaVli5IYCdQCRCqROsBaW2ECnkYmGo6neDQXJhuOoedKguoxuqerMsE6uAsnRURxz/LKzLGeOZ1uWE8di6vFzvMSeWV9Xf49E0CRPmMRIM8xQ6zDVeJo052lsmKermYsskRd1cbJmkqJuLLZMUdXMxX8hwUd7L1KV7Hee++3Sx0+ObDdR8obZjE7N+z3/jkf3Yr39YwdsWpMUVWn3q0DmhGC8Li+sKOk3qacsxYtFhrbUcS57C1HLsaExFtxxLaXXNcOjmmW57uvqPm/+4ySo9aDmWMIWpgcvoKXrQN+nmzZtaaDnmE+l3o6n0vU/876vmTJLNMtKLlmPdGbVTWx+0o5WWY0srZw++PPWiZ+73LpdC/G+N04uWY89jmJQDrInulcPRZcux0ErFaf6iHK+8F4smhSw+OEOvWo6lMCovXDfK08+WY1fuFrl9/+bmkyW99del9ZPX6LjlmBuj5rg61xy8qcJajvEC040C2ilcE371bGdqOdBJL1qOIT4EbcsxYAhRPzWVQ+On/ptajhHbYui45di2qUwtxwKmaqflGLeO3/i/ow7yd37luPgJRq1gveUYsbgZC220NkxlaqMVM7WiWo7l/bzfwvVlS5cVxZuHF7gNWMl6yzGijWABqwBGrGym/k+1HFtJZ8b+K8L/j4rwE7sJaa0If9VYpiL8SdMqogj/eOtfB7+bBXjNbXfj5IugLXgSWfmyzVm2kfDApHIsU83yO9O0UoS/6EeboCwbU6+9xjOme9Xa1FrnRfj3TWNCBYwbvdk7aJb4w14R/mGP1lhy+oZ4ZA3ds6dZFZt2elOEX8Sout66UZ3Wi/CHpUQ0qDavpsPCYbcPru58KEXHRfgRK0NbRR1YGa0V4bfPX9P6wR+DHRctmbZx0cSsqnpQhB8xNrTgJE3TYhH+NzVMhy+UFDrkRvbJ3TzlynY9KGcBERIxIgTmNOq3pXFo/DY+r227X32u8jLuNd7yx+q3nfB1BJAkvnCZFKzoZJ/NkAbnLiUhEknJ/WgtDIC4XDYhOISrahqrSS0HYodF2rclVz1QE5aV2wccoUI4PYsAvhlEN6kA4BsfW97EKtOS1wJXUSwov/rvnT5XbXfqkdOisRe9OlTbiu+y+I96dxFcKKJhLKcLBcveXo2l62KXAmNOsRq5UDWV01ckDpaLqf1LM9tbD57y0x1nG236PedZ4jpChhRyI0WGlPJ6RZT93cb4/VNide0sqUamBo4SfGWJTCQJZKhtszzziSAn9rNXmtizqMn7gU3xYxV7AHmsqiQVoYx4RmWE60YZRPeHo0nEws4zTKYAy5cwEJ6dWrfvA7asYGcRasPt0CcwRCYX2XA79okYL1cgv1B7q9W3Z930mDjXIX5Uu9kGk9z749c1+AH+imgpRf/LElFFKGs4o7Lc9GLmwEdp5K2alRx0h02Qj4lgmEETfjZpN3LWWu9Dlaq//P1Gjwfl2SqXd+vQHjXkMNWzgFQXqgN/wMFYzbxU1JIzeFtHJAaTNrba5H7E7GaTpmmxA3W77QUApGMAFFIAAE2LRp4otpTRF5loFrZiWrB5FYfE9nVPiARtH+s02RcCMJYJgEzvWMzRXMX5d/FxiI25tcbHuT6diY8TNr2i+Tg3X+WP2X7Lzy39daP95rsm1dUDPs4f05mim7nT9YBUkJeXpwU+zrhmR1KXTg4U5LzkcNq9Ss/XCz5OJqN2lumDdrTCx4lrmFDvps9p570ukjV7BQcN9YKPE8eonDB9UA5Hl3wczuO/Q258Hum1+tWdSpJawxfoFR9nKKPyXHSjPP3k4wxs3z1u5iGFa1aecdSPXnYvdczH6cioucY611yF8nHMQjv3Hp+f47Bm8MS+l8S9hXrBx0F8CFo+DjCEqJ+6mvP/gI/Trf3dQVaRFt4LJ/d6devureU65uMMjWPi49jFaYePc8l8xz3njbvdE/JykuYMkp9nnY9D3JuzwDEZGMfEMXGMqyg+ztDD1+vbbJrrvrrhzRvdHnw6wzofh2gjWMDKjhGrBnH/U3ycNXRmbHyepJ3EO9PpQK6P9NnjYfja9Eb9J8DcSVe5MDyEnGGqQfiihbMkIhxmj6miOdG2yixTrhDWzAuGn0A58hyfhMbKV573mTlta9tDt5tcoH0/ciRHXUgaf9X9gQnzUU/FohiVxLynMo5K1dOIjZNa8zkOsDCXuRP8hx+VQ8e25pv2VuQb+4ulQGFikTuw61HY4xC1KlWZTqdKjXPSrFVju+Jz0oYH1un9LOgkf+GDD+fWd1wvVMtJ43674nvvY13XNZYdMt2/zT+glpNmbDQ98vpPBW/N8LFdTeIbKNRy0nYcN7vzM63QbfG6XY2nHhvsp5aTZjnqUPfxvdNcZ/eMOSSRNstTy0njDQ5/fnct32Nekd3+qd1OBqvn59uEb46dEOO8pHG3KmMXTeSrNZsZZPLq9baOLz1WDBqcfXPR5OtAZIiKDHd+P7+vksQzxzK20ebcwd+AqDoqqjpkwN9Oa3P5+56eShgbsDMMiGqgojZ3vVc/mRPpszH95/dhb9qdAiIjVNSozdcP79+NcYlf5TDK2OTtayCqiYruFb3fGPF3IH+5v9HI3fc6wuICxqhI8OTZ8C0b4r23ndu4rPL5kNtAZIKKZvuYtL/tms/LWWoQtvJjlStAVAsVTap6cllc56MuaQsvcPcP29sWiGqjom4v8qPH+gd6b9rz/GubHvYeQFQHFVWqxd92t8F21+mu9QuvFm3JB6K6qKil25Ci2i5zfVLDWnt459S5CUT1UNHtrtF5nQZGOs0a7Zdo03zVWSAyRUVPDqbOPLnA2H3666bH362ush+IzFDR7kv7ZzVI6MxfsexVXO+qz+FXNkdF/c9kPo9XNPXYH7Xh1ckYgS0Q1UdFj7pO7OVww4u/x2q2afU2+6cBkQUqenUpwG3Mb/0dc9a0/ulwXgYHmyUqqhnz/kVK/2lec4+2HXs+a9ZGIGqAinYtqzs+4tJmz/hRBms/xJlDkRUqahJyp2df447eazssm3ns2kn4WQ1RkWv8wVZ7b7l5zbcy21u9yjoDIGqEiix2Br/Zemy9Z+auz2camPVKAaLGqMjp0ZyojfHbnDZa2PY5UKffbiBqgoo2KczrfFo+3yNZsaJZvcoZ8DW4qGjLnpd3fvIHC9bNS7Tuu67nCVKyZVMOTbKlyNTCuP2l+16LRo/YcmGgfQiF2dA02XItnYkyCzq4M/XkGX7atqJJ5xrG4IPT1fhR4VKZiIJBQNeYtBV6h4rziZRajwgVSqXACKFV7MtIGSAaKMpXI59zooIy+iWxYC/YM56uC6mvDZ9jEq9ZE4gSRqXyRSi/20hHgV99UWXehvuO9Vr3afmKRUIly04uLFLbNZ4upmcBNsvN4jViA3TxAw6THDm7E4lhmV5ZhAShUID3k0hh02XVOOECD4orhFuuQEoUAx99cth10tA7JX/Ec4c7333xIVDV55BDoCUitneyEC4TRri+ztCLeDWZrqdh21BbdKKJStSlCBEqwP5lnJgLHBBVGyb6WKl/m/XHvpvle+4ouDZ4cdGxvoTTcvSxFKflmIRt7dW2RQe7M2UA2w4Z7KSIqYbANcWIPdihtZgIJHXNodoxi6pu+puXdTGVM3jg0+Ty04hYAMuEESww1NH1Zx3nv+wDNrMPiB661rIPHsQzZR+ka7ZWljH7oPieYuzKX+/dDlll1K0WMSyExcWSaIFYyD64E89E1j6t2WL5T7MP3IveL+y/6obzvnmTWx6fJFquWxoGzD5gRAWMGz2NlGgv+2BW/OPM/hZ7vGIHfOy3J/T9Mb3JPkhiVF2UblSn9eyD1j5fPkxJs3TJ6bTSquDtmhE6zj5ArAwtffw0hZdSUdkH63+ENvu4eYfTvEYmaQ3vxeDPA3WUfcAITnq8FrMPOjb4Mu9Mtw2uh6ZbmFb1HvdTT7IPkhgRAnMa9dvWc2j8tjMrhYIfPeq7xm1qXO1l88m5eG8U6Vnn7ywo+8GBI75lJOoJgx1iEPgV+F3R6n0VgbFFxyv0vVDXbUqZHCfi+SX1e5O9aEyiwTbw8SK0tQvJVXKAFcoXVUBvyReB1r92dFnmNsPjzy4Lanw9Swiyw7spguzI5dI8JaL9Y6FvywMIUDjVIOS243POL9IodmaBAISNC2uRRA6GL5BTL7YPHG9e3/fxhiBDIJxRNT7kDX5aOmM3k6dliag0wA4cv57S6Uqi18xKB9u/OdpAygJg2YyAgRGlEydKuWbAv+nEofshp3QaMujSCNElg1U9verUVEH8cZ+9M64unlNTllcXScYByuBHhcvFqtAd4tTyHP2tB7cpnwNMUO2g+Lv1GgY946c5H+s34+nzz2z0MGJUbYyOVEvlHydr1gCu9P6lL6e1Smnd+Zb7nBEKv53zQmN11r+UY4faJNi/NJy0v7VDphi6MG7g0CyMjlfr353Yba/D9mEjLRIHHsGXBjaFJTcV8OgTsnHFMD4s1qDrmb2TLBRAriz8iTxGVPIYZHNY0uxMBAZJmVZEYtiu9BcmqYPyrzQ4VJg/G4D+3JGiCdpoMPjls8ubq8cTqIECjxtgKV/obcjCuNZYAy+AnjKJD/5PadMi4Gm0LFJMk4FjFWF/dHeHw45LauT9GG0wUIK3MUgvVIoWcej10mxMouDmx+8TO/LWPXp3d/nWvsNYOJmYC2E2cKRo+5XSBoG5vEfCLdXUrzrdCpSFRYgDJyDDA7aQoD7dTD/+m/GbgjkuWw4dmlcQP6oLnlVQ8lzy9hcnrIiMJgS24VSwFdoisKEmYSOdSThn0vxDh64yr1nv33raXZnGJzYMDpcKA8Vc7wlSKYUtoHOYbbH7wuB9cMxKwiYKpRKRcpBHShQhXBnYpsjLbgmIUXqG96RqbKwm1sBLbjybLviWDtB9P6u8c98cLmpI+0MFbNcHjSREjJpr7Hh6Q8rPzoKldz+fetC+Lw/vPiMPIrvPysulTWciK4EFl6EBRC6eymWABZWrzqZ1n8uInJUKOTluqMGhRQnfkBlW7Rs83OOTOCZpbcysVpF4qjY6QKhDOngp643JrZGRxIDWvVladbCwFzUMiA4Xq+PQXI2zY+cJXFqx1A7+TYSdq9so6OQGi+UEljD8Ka/hNkcWSKhY8AiwqY5WqppSy8SFqTyTpJx6HW2HzoJiHhWp0B6ZBRodhFko25hCXwFZq7ChL6JetJ5kvY/dft0l2Whj4xMPniQSAhPwW1EEJpDLFQEFMsRpoQBDHF2oNnFoFiq9qVtPtJbstPCpgLL16bOYytYnqyDfrPeQE7lx7EAurjxyX72vxa5xBgX57bMq72EB8qg5TJCHzMEgz6CDXGNWZi0Mci2wMilIlBgrk4JEibEyKUiUGCuTgkSJsTIpSJQYK5OCRImxMilIlBgrc3HauWspghGuOyZ99pL6j69DorzBwUs5+oj0SxYob1vo9N/M84Tt3d01XDYbiMZcf1Ebr/96ysN+J6ksArqLSACH7JRXpZltzVwksGVPCOxxo3wAsqWE+0yUhlC28D6RclrqK5LAofojDdKjkmeCSVZIdXYN20H6ztTo7NpKGW1DskFkUDUAD/ALPS9oUJ3iqX6Ojl5bbx8M80n/q7A8sbaKPcYugPHRmeiyW0xKsAfb6rCZlH44HVZmKkqEOlaUKJ0wkE6/b7fIJ/PH1tpBHYsaskiLmD7A+9PpTVEuW2Rz3BIco4+xgJIvI0odZ2rWpN3GF5tXyGRDMMOmHNzqYdwz+lBJYuiRtks9nARxdyaIY8Li7XQYz4XtF5FBRBmQOwq2wVEzNXNj26qihxCiQLWaFXAFwtkmSnBqxZ/p2Tf2l9Om9Hv1V9b3MNKDqCUEScQIku9MzeK6LZ0lym+uOqoqGTJIYJHeQNkEr+3jW9jPdUOdQat2teUb4KOI2HPJUUSVpCLQ6c2IjvVMzDHK5NAsjK8GegsM7L84LV1/3mWtj/tQ8kE8eSU0oAG3KT6eq6K6Rco0KhtHTLAoa2ygrJ2PgWGygy78eaoDKA6s8kg+gCp/mPau8ET/Si5Sl71RfypGZSXUwx92IvFYmmUdJyz1CJlg4srbMRfY6bYQLF+qMZYOXHPzWRqtdSYIWGIw0+ihivKs7BbzfA0/r/XmNrXbTB6Ft0R8cC81UGoiLbsEEKbKjDC90XCxKz2ERow16yyEBi0NMkZgCI3USTjcDoEGtUNb6eyQU+vz9j1m3Beku6x9p+hh2Yh4Dh0qDOcqz2kozsvpXPPWyvuwaA+SlyLkhokj4SWxXBKILpBlMkvE5C6GN6Q6KVcTlzVKBoZNQjLA9SKVTx4LK6sla2SoTJAwlPJwF7wO5bf8+qJHwmbLCNdlC+063N/9k9CxEXkA2UVSXi5tzhHz3Mob3QLwxEN4alLNuQywZQlP1ohNYqx8H6ZCX+PSxk/PSNzgseRSmGFuYrvx+Oif8n5y9A+9Xho+s3/ZPduY8dN58c3Hy7xvDdzEAj7DGfEBw0cXDANDhLgxUQlEbw7xR7NK4MYBQnmwWMGktNsN34xp+zDNa8lm+wNOr5tn4JWmvJ+sNPQ66+RaoJXOjFrh6pVWivMwrWi0fNVCDF64WIQaX0rFLJz+4EaL4FGCrUuXj8iY32ACXjFeyP1kxaDX2VaMgx1qTuAxI2m/GmvP5wQla7Yhs1JhgGwspJLS8Hge9Liby+s8x5n5joX2E/5wwLNqnZQPILNqMUFFIOLGiEjbZGxd38ahWdd3LfL8OKxXT/dZH38oDI/f+oDXsfITy06G6a3aYeAXcG5kiCQwBLiVMLdQGBEBKxqoWDHo8l+2zQcxT5vqfcljUnldE57oApQnSmK/OIBd3ekF5Y2AN0RdDbjYS5RFamAKk/JNqLtFPWxpOeGnsUvqtMeLN+4yPYIffHSOjUqg5cUfoZJCDNtTcTS4bREMNbJYvb3REaUsy4lL1IJ8oAjl+QAsBQj/X+JTcid7T6EeSoT1XKdVQeG+FgHMggowWIsJAIZO5u10k1lvAlfE0cRSj2timIOFyNWsBUyRq4kqzHfQYe59wOXiGc4Jp9ihlr0kLz3q4KtGIf3kw6WSQCQtjGxI6ZC28gL+AFieFOBOKTcU95Qy2UliZQqm1yIXs8LLy3pwAzbZ5pCqmUR1cANjFC8X5hurTiMxzwlbT2q4Q1uK0yX8pGrIZXcRNgaGiE7Pr5RX3TnnTX0v43b1CjB5JRq5kQ9iXkhjxFB5nf7ByvdBXhf+CdPGrZGLRA5sDmQnIGQmvL4o9ROwyDljWaWVnvEHTpyeHGSFHzaVeOTZwSPNjkqE2bF6/hPLw2fb+uQMu9p4iMHo8nZt4oDZUReqsz0Ve2EwkP5cmK8GUmknS439xYEyYKE1Qamo9dhPuVbbneevXJz1suClMR4lRzJKjqWi9Nl4191isa/L+lNzToZuLh7HAkpgWDOgdH1hPjoGVWOJke2irBcIHaMyAERkvePXMOWjyGsYer0iDryREfOZ6qDJ2hZBCrWnO/9l9pRYzkdL9tRhIZM9Nf3PnmL6idk4aIf7hz2eS++Mmvy9bcxjFuwpsUwTC5aiN6OlsK5wexo6vnla89y+jsuuh4cV9rHdwYI9JR4SsICSKSNKnIq0p8Q1VOf2FBkxtPbUVGVPd9HZU73ZExCnEztkti6VLN/Ncwp3zvrkELLr6jw/FrYEuclMW4IdqjOV3XSQa0xmM8Eg1wKZjaIGHmbqKWrgYWQ2ihp4GJmNogYeRmajqIGHkdkoauBhZDaih0ZirEGrSH2STKiexwJjbQ9rSjbSopL/WR1JiqKKmJKJMX+STgzodEIsW8iCTvbS6WTZ80+rbAckCQ6e9fnd9Vd6M3y5jpI8VLximGJO5iUli8JgTSj0ATXIOa11XHz8vHgB1s0mt+/pN6WZjU+bMvmVxNKNVQWywHFikeomuq9ArjhSIisrPb0VnxOXCGxdVyeac86gRAr/0gCFi8K/RFwWgn+Z8iM2Z+3Cwe5Zm7d4Ozxpd5st/5Gx2nUJFtyJQrlEOEZKzRnqH97l7PJFOQ5Zq52Mujw7k8OM/kD0UVwfsqPkU6qjRKypWc6VKhZob2oi6iiRs+BaIdojOkpM/qRpiaNUMtApUbs2zrLZhwkc5z1TWt25vvuv94yo0TlNVMd95Q2IdEAhOepAAUl4BwQS1Ibso7MhqdkPhsx+/Nk9J3t/zu5xD/G5wlV8hWFiKbnIM535sOZxw+EdapXquWEyhVhZoEwhjlJwlQWeqUcnoXYrxauUxWMy8g+Uy6RSP+j1woslaePF/Qhj1Nve7LLl3kCHXQvXOfaYvG8v3Rg1HBAhlgeA18c+tqWzbAKcGYFSWE0aFg8TSRTodwe7FBgpLYrdRNAjVu6bpEcweJPnAT32cOLEznaq4SWUB0vCBOIg3KAwUl72g31/1K9XV14PkIWrXyWUkfZoxb+xYF5+LQREXznMPVZIlG9VDXsrqkVZLox0DxPB0n2q0V4dXoThW7VLyH5fipYmVxp/2E1IIpQ6wXpyKtVU9VfIxcJQ1e8Gg+TC8BIDohyq++mGqt649sRKwiwd9xPHPwu+/Z/zmHz7O/Mw85Cl95gTlxP9DbGcZ0wOOqxKDjpAh7nGrrYxR3uuNkXtbczVpqi9jbnaFLW3MVebovY2tp8yjx3XsUt/a7es1HUN6zduUFVtPzXpy8vMovUzBIcedL58ZrP7FpKDDq0+5UAiFvRmwUHPptOknrYtJBYu11rbwgeLmdoWRi2u6LaFopYWnWeceuuzrWO1gDtdfhPrQdvCO4uZmkCdXqwHvdcuX76shbaFrYeuzBLF1/NKMx38vqFF6my9aFu4j1E76fqgHa20Laz58Umf3+4f58/8I/H+wRUG+EbPumpbmMSonCh9UA5Hl20L48427fxjBMc796TdujppG/H1EXXdtlDEqDxf3ShPP9sWyq5cWFtcUMspt774k28Li9Y6blvYm1Fz1jrXHLypwtoWPr6ReO7Dgode+z2Spk+dOPaqXrQtRHwI2raFwBCifupBDo2f+m9qW0hsraPjtoVhS5jaFjou0U7bwnZmAqd2Ht/4GYmBFl3Sufh+3Gy0LSQWSGShFd/YJUyt+AYuqai2hQf2r3sQeHOR8+FT3YsNG8sMyj+FCVgRbQQLWDkyYmW35H+qbWEOnRn7r5HHP2rkQexIprVGHo2XMjXyuEe2nSw08nj18OiZ91+7e2YF9Us6+251EYsVK1i2kfDApMFSpr4HVZdqpZEH3+ONz9c/Fzgceb3tZm7dFvj68bpo5PF+CRMq97RrDRn3DpolD7LXyCPtc9LZeecqeSdNj/lyqMGwSXrTyOMso+qydKM6rTfymHyqbgfjb5cEcY1GhhvNjjHRcSMPxMrQdmIAVkZrjTymJ9e6svPAdPdNBs/b1rjAu6MHjTwQY0MLDjA22mvkwRnb/82XOVuc1/TNckueXD9LD0riQITOMiIE5jTqtx3i0PhtfF7bdr/6XOVl3Gu85Y/Vbzvha5EgicDhMilY0ck+myENzl1KQiSSkvvRejoAcblsQnAIV9V4WpN6MMQurbRvS66coiYsKz8YOELFcHoWAXwziG5SAcA3bWl5kzNNS14LMoiUWFB+9V5HgmxXxd13yl0XWdhR9ju+2Og/6v9HcKGIhrGcLhQsnf3nUrpOmClg7BZq5kLVVE5fkThYLqb2L32fdUgo+vM3ftq34qG97d6cJGRZIjdSZFkqr1dE6fATjN9/11JdO0uqkamBowRfWSITSQIZ6mMdtr2wNbd9gs8Mt/Xvo6NHWOLHKvYA8lhVSSpCGWmMykjQjTKI7g9Hk4iFnWeYTAGWL2EgPDu1bt8HbFnBziLUhtuhT2CITC6y4XbsEzFerkB+ofZW7yb1DX48Zj9/+5DECR7bax7Cr2vwA/wV0VKKHroloopQloJRWaP1YubAR2nkrZqVHHSHTZCPiWCYQS+y3j0bEbPIY3q/9TtfJu45Up6tcnm3Du1RQw7TxQtIteU68Adc1tBLRS05g7dVzPV0PWa9zWfu2Sn8zQ/9Z+p22wsAyMYAKKQAAJoWjTxRbCmjL1Szbef3dZea7uanNgx5U9DqTT3CUqbdggEQgDgmADKDlmKO5mHOv4uP4/RoTtTG+G1OGy1s+xyo02+31vg4b5Yx8XFmLatoPs7mn14v3UyqeC7ysOv4rvaHQD3g47xcxhTdvL5MD0gF2dnZWuDjFA38Ih+6otB7VdSAZ2lfvGrpBR/nGKN2duiDdrTCx+lU7JTk++aw58alxwpD/9obrRd8nFRG5czSB+VwdMnH2eB/cesO7xj3hY3WpTiErnuoV3wcOaPyRupGefrJx3mdfUhWZWQbh7iiY6+3df2VrmM+jgej5rrqXHMVysfhJsninowTOK6q0zRvpIdlil7wcRAfgpaPAwwh6qce4fw/4ONsUpjX+bR8vkeyYkWzepUzNuqYjyNfzsTHcVmuHT5O/3s1fl/S7y4/Y3x+v4F9BINY5+MQ9+YscEzCljNxTIYuryg+zide42nmg856zVv6dkng97RM1vk4RBvBAlYujFh1XP4/xcfJpTNj4/Mk7STemU4Hcn2kzx4Pe4uPlPSfAHMnXeXC8BByhqkG4YsWzpKIcJg9pormRNsqs0y5Qlh3Mxh+AuXI27Ln5Z2f/MGCdfMSrfuu63mC9v3IkRx1IWn8VfcHJsxHPRWLYlT+w/xo1dOI2e2t+RwLWNzP3An+I+R/jm3Nv1F/Qb6xv1gKFCYWuQO7HoU9DlGrUpV5dKrUOCfNWjW2Kz4nbTO/s5Wp3VWnpeFTAg9Uck5Ty0m7npK1O+YPOX/ffseoIlFCkVpO2rXa86RzLV87H34nlvdNO9FHLSfNq8Mj//S2S/grDsRvH1qU3UgtJy0hevW0ITO4Xkmn7UZ1+tj7m1pOWqMXJ5dJ8q34eYeq357+cluBWo2PrkuXcgTN97pvOTJ4XsF7V0e1hlXzcodO4p519d4+eXnwpEO3PgKRIfbAoPXdm29Z57qrYdP3cTV+uw9E1TGRbGVOw8YzHBamXqvLO9JECkQ1sJe3HFkQ+iTMa3P7gC2K2bdrA5ERKtrh/6fLp9+jvRM2jvrW9+uwRCCqiYoGjZTN/5wVyVsnFHTfKNsHi2EYo6K1q1rcmbZ+oPOMZe1aezWoGwJEJqjojldy5IE+RwQzR1+/V7vLgr5AVAsV1d97+mqs7023xGHb7nU8mlEPiGqjIlnN1CPH+3TnbWgT3PzT7obmQFQHFb0L61N71YShLuv3vvGoW/vmViCqi4o4KdZehQFVXTYeP5HoM2jWCCCqh4q2VloyObzaR5/dVq3cdmY9aQFEpqio55o6Jxe0TfKedyfo4tcpXo+AyAx7jYf9uJGvGzvvS6gWeLvPoV1AZI6KfgVZv205NoM3a1aMx+uRUjcgqo+Kjgg5y9ed6+I216/JU+8esZ+ByAIVjZsWM27nwQmes3cljXjw5FpPILJERV2evN4Z65HnNXforI5rjz1/AUQNUFHieIX38Bl1BDOHTti2KC7FB4isUNHvVV9eqhZrKtjT+ZthjezxhUDUEBWZjvZo1qlHpsvhHw/kTSXOS4CoESqamjc1e1my1GPx8ROWZx+chcg3xvQlabih+YYb7od/O/WL98ATDoAmqOiCm+9x6ce/vROajbeUBSQsByIuKno040XU1JfVeatOn89tlnjLhZRs2ZRDk2yZdnGlkW3cdI+tt74Nv/TL+D2F2dA02fIonYkyCzq4M/XkGX7atqJJ5xrG4Ldl1fhR4VKZiIJBQNfcuBV6h4rzibRriAgVSqXACKGdMMpIGSAaKMpXI59zooKyVsgAe8HvKfk0nYx9bficghTNGsmUMCqVL0Lt/7ddPPKHsK7XzBTuKO6BG31ZJFSy7OTCQtefU+hiehZgs/w4RSM2QBc/4DDJkbM7kRiW+pZFSBAKBXg/iRQ2bleNEy7woLhCuOUKpERRmPbiGH/LJ6cU6T1ZlVsNV+BDoKrPIYdAS0Rs72QhXAWMcB1O0Yt4NZmup2HrYVt0oolK1KUIESrA/mWcmAscEFUrN4ZuXAdN/QZ9u+18pPOAdt0e3+ETTsvRx1KclmMStrVX2xYd7M6UAWw7ZLCTIqYaAtcUI/Zgh9ZiIpDUPYsHNuZs67raO+l+rfs9m77klZ9GxAJYBYxggaGOrj+/c/7LPmAz+4DooWst+2DTCqbsg6AVFZF98OGv0VEfrl7zXnjtiuuh5nWfs7hYEi0QC9kH61YwkbXnr9BK9oHcqaZ74lNv/oLb1YIW+85prvPsg0mMqIBxo6eREu1lH/xcO2HR2H4mTlkmd/c/XLmghd5kH/gxqq6vblSn9eyDKwMaDjGMmOh2ONm+7dZz8+N1nH2AWBla+jiwMlrLPpi/3Mlg1ZDZjrncYdIuy1bjCyboJvtgEiM4QSu0mH3Qu/FE78Rre1zmGgyp9mZg1HA9yT7wY0QIzGnUbzvGofHbzqwUCn70qO8at6lxtZfNJ+O1boj0vfR3FpT94MAR33YW9YTBDjEI/Ar8rmj13qzA2KLjFfpeqOs2pUyOE/H8kvq9yV40JtFgG3hnM9oeiuQqOQANpG2ugP60davZnJOE7XJcf3rN0pwqvnUIQXZ4N0WQHblcmqdEtH8s9H4qhACFUw1Cbjs+58RmjWJnFghA2LiwFknkYPgCOfVi637ySN8XG3bxVnV6nnfWOe0Yflo6YzeTp2WJqDTA9v7eqn5oQC+fhYa7zhp3zStvzXsI2C5GwMCI0okTpVwz4N904tD9kFM6DRl0aYToksGq8p7e9hk+8IRrirvNosYxRR/rIsk4QBnkkstVeY7+1oPblM8BJqh23/efa9485bmk5vaNvTapxQUWVJvAqFqFjlRL5R8na9ZEsvQeyIpmj8YObWbpusbQb1Mzh5w8nfVA5tihNgn2QA4n7W/tkCmGLozHOTQLo+PV+ncndtvrsH3YSIvEgUfwpYFNYclNBTz6hGxcMYwPizXonGjvJAsFkCsLfyKPEZU8BtkcljRMFIFBUqYVkRi2K/2FSeqg/CsNDhUC0gDozx0pCoyPBoO/e1p5c/V4AjVQ4HEDLOULvQ1ZGNcaawII0FMm8cH/KW1aBDyNlkWKaTJw3D1u8NuFRvGWWUYpPnR6i2+zXBXpp0zRZhK9XpqN+Sv6yIXQ77OclvRpP6b19xUfWDiZ8IUwGzhSlL1OaYPAXN4j4ZZq6ledbgXKwiLEgROQ4QHb0FCfbgb17tGtielXn1VrVk4xys/Ft6IzKnkuefuLE1ZERhMC23Aq2AptEdhQk3CCziScM2n+oUNXmdes92897a5Mwx9zG/uJw6XCQDHXe4JUSmEL6BxmW+y+MHgfHLOSsIlCqUSkHOSREkUIVwa2KfKyWwJilJ7hPamao6uJNWmiupIu+JYO0M1eWd65bw4XNaSFqgK2/IRGEiJGnVJiZHH28cfKgoOfbwbNEk/siHefkQeR3Wfl5dKmM5GVwEbrVIhcPJXLgBRUXknrPpcROSsVcnLcUINDixK+ZXVd082Tq3guzzwY0Gdo5gg8VRsdINQhHbyU7VkM0cpmRGvDSq06WNiLGgZEh4vVcWiuxtmx8wQurVhqB/8mws7VbRR0coPFcgJLGP6U13CbIwskVCx4BNhURytVTall4sJUnklSTr2OtkNnQTGPilRoj8wCjQ7CLJStkKGvgKxV2NAXUULxNnfW0jCvN24H3j140bD25SaEwAT8VhSBCeRyRUCRzQgFGOLoQnWSQ7NQ6U3deqK1ZKcNWAWUrQ9ayVS2fqAK8nz9h5zAjWMH8s7vxqRNPljXY9Wafh/P1hKX99QIQt53NRPkdqsxyE/RQa4xK7MWBrkWWJkUJEqMlUlBosRYmRQkSoyVSUGixFiZFCRKFSuTTKLEWJkUJEqMlSn1PV1QvUYDp7UeYbMafBZ8JFHe4OCl3oQS6JcsUN5O0+m/mecJ27u7a7hsNhCNuf6iNl7/9ZSH/U5SWQR0F5EADtkpr0oz25q5SGDLnhDY40b5AGRLCfeZKA2hbOF9IuW01FckgUP1RxqkRw1MBZOskOrsGraUNU/V6OzaShltQ7JBZFA1AA/wCz0v6GtQ1eNrZC2csw+P6X4srHhoeWJtFXuMXQDjo6nosltMSrAH2+rOqZR+OB1WZipKhDpWlCgN+zgp71IlOS/nUVornwOHKrNIi5g+wPvT6U1RLltkc9wSHKOPsYCSOSNKn1eQDx+Y/DQbX2xeIZMNwQybcnCrh3HP6EMlwT9a98tNa82Pu9RlpZFni1o6jOfCFq7IIKIMyB0F2+C+qZq5sW1V0UMIUaBazQq4AuFsE3Wyprd9t29/7PHIbrV1TSXBxAV6ELWEILVlBMk8VbO4bktnifKbq46qSoYMElikN1AT6/UfN+SPxV5bOx5I/M63xTezM8SeS44iqiQVgU5lRnTeqGK6Zzg0C+Orgd4CA/svTkvXn3dZ6+M+lHwQT14JDWjAbYqP56qobpEyjcrGERMsyhobKGv3dGCYPkLYzlMdQHEAbKc1W+rKFqbNTRx25frNpy577QZEWCyxqYk/7ETisTTLOk5YmhUnmrjydt0GdroYguVLNcbSgWt+R7O1zgQBSwxmGj1U98fuG13NNN999clRj3b8lZ+Mt0R8cC81UGoiLbsEEKbTjDDtS9VssSs9hEaMNesshAYtDTJGYAiN1I083A6BBrVDZ+nskFPr8/Y9ZtwXpLusfafoYdmIeA4dKgznKs9pKM7L6Vzz1sr7sGgPkpci5IaJI+ElsVwSiC6QZTJLxOQuhjekOilXE5c1SgaGTexGgOtFKp88FqDusFEjQ2WChKGUh7vgdSi/5aRL9uYuhesd5o2vtCpn+87xeBcJeQDZRVJeLm3OEfPcyhvdAvDEQHhqUs25DLBlCdmoEZvEWPk+TIW++FN8hQWL1wpyAyeKXZol/IaP/invJ0f/0Oul4dPDa3zRj7RPXgf73DmXcuzVOxbwCWDEBwwfXTAMDBHixkQlEL05xB/NKoEbBwjlwWIFk9K+Ri/22Znt4rXQ77NxWspzPJW8qvJ+stLQ66yTa4FWbBi1YqFXWinOw7Si0fJVCzF44WIRanypS5KkRA/uGurhOGNd1cHGnTmH8YrxQu4nKwa9znqPaDvUnMBjRtJ+Ndaezxm5UbMNmZUKA2RjIZWUhseXT12NB/NMPBN+frJtbN+5KZ5V66R8AJlViwkqAhEHRkSabcTW9XMcmnV91yLPj8N69XSf9fGHwvD4LXzkCP3EspNheqt2GPgFnBsZIgkMAW4lzC0URkTAigYqVgy6/Jdt80HM06Z6X/KYVF7XhCe6AeWJktgvDmBXd3RDeSPgDVFXAy72EmWRGpjCpHwT6u3tky9V7N7UdM30532+s2ID/jS2Gp1joxJoefFHqKQQw/ZUHA1uWwRDjSxWb290RCnLcuIStSAfKEJ5PgBLAcL/l/iU3MneUygRJa7nOq0KCve1CGAWVIDBWkwAMHQyn6ebzHoTuCKOJpZ6XBPDHCxErqZuYIpchakwv0CHufcBl4tnOCecYoda9pK89MDTu02QfvLhUkkgkhZGNqR0SFt5AX8ALE8KcKeUG4p7SpnsJLEyBdNrkYtZ4eVlPbgBm2wTSNVMojq4gTGKok35xqrTSMxzwtaTGu7QluJ0CT+pGnLZXYSNgSGi0/Mr5VV3znlT38u4Xb0CTF6JRm7kg5gX0hgxVF6nf7DyfZDXhX/CtHFr5CKRA5sD2QkImQmvL0r9jOtaP7/K5aeC5AG3LZ/uT5uO008lHnl28EizoxJhdrSusfYtp8l4r9V3+wXmXSo+Xt4zEzA7akB1tqdiLwwG0r825auBVNrJUmN/caAMWGhNUApYb2Pa1ecv7wVLrqd3irjsjEfJkYySY6kozXln8+7aqkTPOFvbjGHbJpU3uxSiBIY1A0oXN+WjY1A1lhjZLsp6gdAxKgNARNY7fg1TPoq8hqHXK+LAGxkxn6kOmqxtEaRQe3rxX2ZPieV8tGRPu29isqc1/7OnmH4GuJwYO7Nxd5cDLhNrXxo1RM6CPSWWaWLBUnRmtBTcCrenPY1W2SbfmOKZGjIso9dqgzAW7CnxkIAFlGoyovR5YwXaU+IaqnN7iowYWntaU2VPL9HZU73ZExCnEztkti6VLN/Ncwp3zvrkELLr6jw/FrYEWRuZtgSbVGcqBXSQa0xmM8Eg1wKZjaIGHmbqKWrgYWQ2ihp4GJmNogYeRmajqIGHkdkoauBhZDaih0ZirEGrSDnEiNXzWGCsXWZNyUZaVPI/qyNJUVQRUzIx5k/SiQGdTohlC1nQyR90OknNfjBk9uPP7jnZ+3N2j3uIz/Or4isME0vJBVrpDJs1jxsO71CrMs0NkynEyuJCCnGUgqsszkr5tYl1FylepSzWzsg/UC6TSv3gigUvqjdkJVjC+DbLvB+2OO6dtGjeoiMP3j2js4SGAyLE8gDw+tjHtnSWTRgjhVwtWAkWFv4RSRTodwceBoxyFMVuIqgEK9VLOpRuBXY864AB7eHEiZ3tVMNLKA+WhAnEQbgF0Eh52Q/27FC/Xl15PUAWrn4Vb4WrerbiTzy/Lr8WAqKvHOYNKiTKt6qGvRXVhJILI93DRLDsFgZvperwIgy9qF1CfHUpWlZYuSGAnUAkQqkTrAWlthAp5GJhqOp3g0FyYbjqHnSoXqEbqnqzLBOrgLJ0VEcc/yysy4/XMa3LV9dh6/JVvcecWF5Vf49HFzES++NUxP5rdJhrvEwac7S3TFLUzcWWSYq6udgySVE3F1smKermYr7QMpcvDXrF8Jz2HeINWzx8H0/NF+rn6uBePDTRJedqUf3UNcHrSYsrtPqUA4lYjJeFxfU6nSb1tOUYseiw1lqOFWYwtRwLz6jolmP7WycfKYjxdlvsd1ohG5TE1YOWY1czmBq4HM3Qg75JZ86c0ULLsRd/OtWoteFPj5wz/VMOTOlorRctx7YxaidFH7SjlZZj35/sdbc/YeKyu1ZxP3FKDp7KqKuWY/GMygnXB+VwdNlybN25azF+a/p7rah8ZVnI3wkd9Krl2HBG5bnpRnn62XJs2ovEpKpD7vNn/BzyrPmqfI6OW451ZtQcV+eagzdVWMuxoyddW1hZVXLPSx+/songzx560XIM8SFoW44BQ4j6qTc4NH7qv6nlGLEtho5bjgVtYWo51nOLdlqOGdibP567+TgvznzLgfXbnuL5wGy0HCMWN2OhjdaYLUxttLy3VFTLsZe1BybWeiTz2HzLpGjhlj2zWW85RrQRLGDVkxGrVlv+p1qOFdKZsf+K8P+jIvzEbkJaK8JvnslUhP862XayUIQ/vK97u7OtL3lmHWgn25XnvofFbHOWbSQ8MKmbyVSz/CfZRlZEEf4jnxvm1uC19Mys1bXtioNZ+CKzuijC/3ILEyrXtWsNGfcOmiX+sFeEf8L9Sa9HSG0Eay7PGNah+SB84Q1dFuE/xqi6HbpRndaL8Hda+abeoBpzXBbnCYODEnpa6LgIP2JlaKuoAyujtSL8iZur3TKvVEuw5nryg+rZfcz0oAg/Ymxowbm+RYtF+KfLNjxcUrmRa+zBnRv61Y44pQflLCBCxxgRAnMa9dtucmj8Nj6vbbtffa7yMu413vLH6red8HUEkCS+cJkUrOhkn82QBucuJSESScn9aC0MgLhcNiE4hKtqGqtJLQdih0XatyVXPVATlpXbBxyh53B6FgF8M4huUgHAd0lmeROrTEteC1xFsaD86gXvgjoHe2T47D91pkXk6cv4RnX/qHcXwYUiGsZyulCw7O3jTLoudimw8VemRi5UTeX0FYmD5WJq/zKiQZeeVYPuO+Scu39w3KZq+KOUqs7IjRQZUsrrFVH29zDj98/I1LWzpBqZGjhK8JUlMpEkkKG2jeGxkZE2YZ+915te/vPs5BZ38WMVewB5rKokFaGMJYzKiNWNMojuD0eTiIWdZ5hMAZYvYSA8O7Vu3wdsWcHOItSG26FPYIhMLrLhduwTMV6uQH6h9lYrv8qpXXXiZredit9uyZ8cccKva/AD/BXRUor+lyWiilCWlFFZg/Vi5sBHaeStmpUcdIdNkI+JYJhBiUYZP7M/VPY80KW2zSrH483Ks1Uu79ahPWrIYapnAakuVAf+gDOZmnmpqCVn8LYu2L16Vjfb0ycpcGj4MdMm1XW77QUA7MIAKKQAAJoWjTxRbCmjLzJxIe9Qp6a3znhkz6j6rdmn3BWEpUy7yb4QgElMAGSOzMQczVucfxcfh9iYW2t8nKdbmfg4U7dWNB/nnsGFiw0W9HDZnPF2U/t9E4P0gI9TtJUpunlxqx6QCnbt2qUFPk6tv1rcfFurp9fmLwkugUFjn+oFHyeHUTub9EE7WuHjREx+a7/hxFqftE1dhvX+27CtXvBxFjEqZ6o+KIejSz5Ozu3V2aPt3jjMrmdUu/j5rji94uOMZVTeQN0oTz/5OH8a+HyLNarrPDPN/Pu5jdU/6piP48ioOTuda65C+TivPYaFnIw665FoerAo5WOfTnrBx0F8CFo+DjCEqJ96m/P/gI9zwc33uPTj394JzcZbygISluuYjzN2GxMfp+827fBxWq3I97eZNoq/7Hq7xyf2/JbFOh+HuDdngWMStI2JY+K3raL4OP2NWr0e8qanR65lQo8D1XkfWefjEG0EC1j1ZcSq7bb/KT7OHTozNj5P0k7inel0INdH+uzxsLf4SEn/CTB30lUuDA8hZ5hqEL5o4SyJCIfZY6poTrStMsuUK4Q184LhJ1COvEczXkRNfVmdt+r0+dxmibdcaN+PHMlRF5LGX3V/YMJ81FOxKEYlMe+pjKNS9TRi46TWfE5NWJjL3An+w4/KoWNb82fW2JBv7C+WAoWJRe7Arkdhj0PUqlTlXTpVapyTZq0a2xWfk5Z1xbrpj2tTXdbaLTv/6e3ScWo5aWv6nrCpn/yb4yFhs22PGnpaqOWkTZ0Yx+1Wtaf7HMeOO3IEAVK1nLSXz4wOtl3yzXXvK5HH5I+titVy0oavaVWba7nFc+6P34q8L/wpUctJc/15aoVkUrFPUmHdTC/TR2PV8vNvdlsmX/iymiBxqN+2NKcJqWrNZjIfzVnrvWsPb+egqPatInyOAJEhKuoTmjFj6vuXruti/jjZsrZBChBVR0VLJ6afDGhq4pgnT7P5PtxnExDVQEUu9TdvsU//5pIyK/HytntLfYDICBU1Ulh0fndDzku4+5vZPs+uMJG9JirqXv9KpXp/yAV76vUNN3uabApExqio/zyX4pHhJ/jZg5Z/3fyrfwIQmWDfq/EfK9zc73lvOVu5helL805AVAsVRd2z3sifWp+X/XDJt6cL958Aotqo6I+VU34ZH0hwSTAWBtQb0n4WENVBRbULe08WJ1f2ydsfNEFR88QjIKqLit6+fWryfIOh08IuxebvVjf5AUT1UJG3R0j6tK0R3muvhT5fcOXwRSAyRUUOrfg+Tzss5+0cMaKrQVDATSAyQ0Wv6jxZ0KnuAveMv694Xf2r/i8gMkdFdQumv0x68bvPokF34yWHPX8DovqoaMnmnicP9mgrWGu2vfJI40prgMgCFdnFJ60fc/yX29y32Y7df/yxEYgsUdGQfq87Kpp1clmadOfHvCNmUMsNUNEMP5OOdfeYumUOW259pYbiCxBZoSK3xfLTp5+ucZ312nD2nYZnzwBRQ1QU0KKWieyDB+/AjYOHzTkWEMNGqGi5SX7f7rM6u2Z/WnBIGtwgGIgaoyL39J5/Ls/t7LOwONdv4sgdC4GoCSoqqlprqmmIOy9VUXlY68Ohk4CIi4ou/DFqaf8qj7228g657l2+RURKtmzKoUm2bCG+/myr3QXv2BFHrgzJez2XhWTLe3Qmyizo4M7Uk2f4aduKJp1rGJOOP0zkR4VLZSIKBgFdY9JW6B0qzidSaj0iVCiVAiOEVrEvI2WAaKAoX418zokKyuiXxIK9YMx2ui6kvrAD7HbNmkCUMCqVL0L53VZFvxkprzTWYVno4phWky1qlydKVLFOLixSG7WdLqZnATbLou0asQG6+AGHSY6c3YnEsEyvLEKCUCjA+0mksOmyapxwgQfFFcItVyB1js/G8KPnBW8cV039Xdi897hb+BCo6nPIIdASEds7WQiXLyNcvbfrRbyaTNfTsG2oLTrRRCXqUoQIFWD/Mk7MBQ6Iqg0Tfaz0bNWbE8YL2rnvedXCvMEAey7htBx9LMVpOSZhW3u1bdHB7kwZwLZDBjspYqohcE0xYg92aC0mAkndevXBvvr1ph1wPjJ4+SaDrUPXlZ9GxAJYvoxggaGOrj/3OTTrz3/ZB/8o+4DooWst+6DZDqbsgyLN1soyZh9USph+PWbfWt6+VYKcQdYbd7O4WBItEAvZB413MJG1a+zQSvbB0eX1Wo54b86fMXBznwE/k6J0nn3w13YmVIp0syaWIVKiveyDgiz++Kshcz0P3/m+8tWCm7v0JvvgIqPqcvTVnWE5+2DzoKCPB6dH83dOfbI4YXkyoR+S1rMPECtDSx8HVub/2LsOuCaW5x8VFcWCYK+xowJi70oSOqEoiL1ECBANCSZgL1ge9t472EGf2BVQ9KlgV54VuyL2hoq9/Xcvd4G72zsSOZL8/T0/H9+TW+5y+c7szOzO7HcMdvqgE082ZP/kDuJJ2XujWtU/S86qG+f0AWZsGMHJ/NuApw8WlX/DDxaGeO6tUH7sRe+KZiZy+uACK0JJ2rjtPo8hbju9SiL+0aGK6+TNtUs+rz82hRyNYj3r/JzEum8cCMktI/FIGKwQg8GPIO4anbevIjC2uL7C2AsP3cbrdg6Bsn+Jfm96FE2M6LEMLH0Ib+1CC5UcgQTOJBdCb8nTT7vXsW5203FmkeKXGkmqtKMk2eHdiCQ7djm/SIlq/zjo21ICAhSOUkJ+M2feu2S9cmdVMYAIvbAJkqmA+oJxtLN1EHU9V/F9pMehhXVe+HbtMZc8LZ2Im+nTMncoP8B8x2RIJw9OFcaXq7GimvDdIg4Au5vMBhjQKKMEURqfAX+nFY/pD/1IpzmLLC0wWbJY1Ss+l2qn/2rgtEC1PvJTndpPrLDDOEAYzqPCVVJt6g4LagVCP5veTQoWAFNEKxhu2Wp431rO8z+tmx0x5JE3B6Ldzyra9UYSLSo+nq9fA7j8+5e+H3BqZPSobOftLZvOK+5r19Jo/Ut59rhNgv1Lw2nrW3tsiuGO8QGPwTEKr1S5M6LdHse/+w2sOivgMJkauCKk3IyAW5+wGlcK88NSPbqeNRcpwwDkGuJP7DFBuY/BFoe5zc6CgJLo5BGpabv8X5gmDuRv6bGpkL4TgP5UiGiCNhgo/96dBT2rJxDnAQVuN0AqXxhtKBV8G6KBF0BPc4gP/ktj09RwN1o5UspwAqfv14aLvlSLEywo+j2114Wbt8k2BuuFimgRh1/P18Zc++vRq637HLcdvF1mUu1R8RzsTJyDMJsJEW2/ljfBYC7olnDDPOLX7m4FKhVqaWAkph6whQRD17lG1/yKtmvvtTVNei/z3tA25KqC3OfSl7+kwcI40YTB1h8FW4YdBhtuEjKZTMLZcvXft2ir9Ip+98bT/vJEZ2rD4HC5JFDK946UyxG2gClgtiPuU8D7oM7KFCMkclmQRslHyiJC+UqwTFHpbgmoWXqW90Q1Ns4zrEeUPHgnU/ItBqDbusBzvzJ0alj7wwjYrg8aSYgYEoD2N1x7leq6UBBfwXKfd7na9cnhM/YgevisuZzfdKZWJXAQMvSHyE1FhQyQUNltJ2P4rCNyNbTIqUiqBlULnbeOfzvswRq+d3TRUUPtc3wnkku1cQVBp3TIo5w3JrfBNIkFLf5OgwZYxIua+48Ol+bFoX6emh17TxDSSuX28HfU9q5ug2CQGyJVUaqE4Z+CGu7KmIOEggWPAIvq0RpRI6VMdUwFmSQFlOtge3wWZAtQRYXNsVmg10ZYVU0bUxgrYL6KUP0gJBQXq5YrN/GWSrBwWoZTz1PFf1ISE/BbIRIT2OXCgKI1KxR8raN6yGNwVCbDW0+1lty08CkE2vrMBDba+ksJBORZJg85tTaOG8gldX951Rk20XWbW4mqNVo4XuUA8qTdbJDH7yYgf8QEud5VmeUJyA1QlYkooiSqMhFFlERVJqKIkqjKRBRRElWZiCJKoioTUURJVGUiiiiJqszMVXW+tdzd1Gtjv5CzM/d52dNK3qDyIrWPWn7JQcnbYyb51/M8YXdnV2mXLWZBQ649syTL31qz2S+SK9UwXMQSOPSgvATDbKvnIoMte0JhjxvNA7AlJVxn4mUIuqX3qSWn+b4iDRzUL+lxPOoSTC9loPauYTvIhTv02ruuocm2YadBlFA0AA/wA3Nd0NfTao/eW6u6bb7vMPaRR+qAguTaCncbOx3mR3fgbjebdsAeLKt30hP+bFhV0pZE5MUKiVJYstvzV9v/Fh20drVu3z2uLodlEZN6en84tXmUS5xyhtt04ehjHKC0kBWliB36NWm39SXmFTbZMMyIKQeXekTtGXOqxP/yiRVOb4e6LR8YHN375e2xRsznwvaLFxjzuUfBMjhJz3xuU232EEIUmIezAnogkm1CZy09/Zzu/lVKPKmJ07wLneJ+mkDWEoK0mRWkhTv0y+s2dJJpvrl2qypXZbDEIrOBetT9a9Nhj5p6JVi7/ft97doochaReC49i6gdKQx0JrCiM3QHERg94TE4xhcB3mKz5l9ESzacc4n1ce9L34ine0IzBnDrkvO52lK3kUq9aOOoByx0zQ3o2vkYGKZwGMKfQ21A8QBsTgmFkKZdeiI7IrrtFNe1K/tWE1++dpe82YnlYxncOmkwPytONXEF7ZgL7LQcguWL0rEYEJr3TtDL15XDwJKCmcYMVc/UFRUOre3tcjhiuxv/tA3ZyZVyBveigcozZOCQAMLkxAqTQ4J+zi7/FBo112y0FBq0NJiOwBQarZNwuD0GDW6HnjLZIVHjc807TLknjnGJfRvRoVot6j50mCScr9mnQeyXM4XmjTX3Edke7FyKhK+QjoSXpCpZIO4gdTJL1MNdLG+I2inPM6xrlgzy/CYCXC+gYvIogLoiUS9DVQ5LQ2k2d8HrIL9l7Trr+i+y++Qe7XdMeX3wrdXkEAl7AD1E0lzOb85Rz7kVNLsF4ImH8JRBzbmtYMmyNFGvapKymvdhI/qaXWxGwPpnEzz39HjewuXBmCLk7J/mfnr2D7+eHz7h3cb8u7b1AadZ1h6r9tV9EMYBPpNZ8QHqY4wKA3OscGOEBojOPOof/ZjAy/pLVCHSCDahdTw2qvGt4yW84i5Fqtb0nPiKLDTN/XSh4dc5L64FUunLKhUXk5JK9hFCKnq5r/KYwQuXBuHGFymYtjO3PXIutlB4wCJpy/2jQyVkwXhh99MFg1/nWjCO9rg5gduMtPVqVHNn3uxE/RZkNbQYYAsLuSw/PE4n3/u61Om5y+EvqcOtmvxsTq6qFWkeQK+qJQYKAxEFKyK+iYRff8Zj8Os7F3rm9OvU0T0650eE+fGb78ky1nyi7sUwnbUrDLID548MlQWGgrASni2UqNWQ0UBbFYO7f90WH9Rz2qj3peuk5ro+daKJeJ0orfrFEazqXh8saAa8Jh5qQGcv05DUwCNMmjdBfnHn2w9vDw166Tj/dfXrxaskklupl2QKbLQDBnb+WCkpxNABVaPBb4phqJfF6uyNa5SGlpN0UAvWA6k1+wOQChD+Ozem5I/1Ho9uoELx50ZlBYXrWgywqijAIBcTAAyfzM+ZJrPJJK6o2sRRj2tqmoODzNX2g2yZq9VazF8wYe59wOXCad4JUVTfap1kzz0qkFmjsH7y4XJZIHYsjG5ImZCu4QXiAeCeIsCdcn4Y6Sk62UkqMwXba9HJrMjjum7cgEV2Z1gyOxu1cQNzFJbJaWW1u5FE5ET4k9Lu0JaSZAk/qSR22T2I0IE+QafmFjlSyinpdRWvss2s04nxIgzjFj6YeaHpiLnmOvODNe+DvS78FbaFWy0XmQrYHFidgBUzkeWFlE/gV8eYGhXbecWKuz9M8905gySfIgL67BDQZkcRyuzoM7Voqx1zzT0PVIwMcB8w81VB90zA7GgPxemAql7oDUYbJKflASm/naXaftJAJbDQ+qB0aNHa3XXf/XKcP6XBuIuiGHIFYhEhHSVhvijVe/AyuWzpL6LDtfc/HvrE6R4HKFmyovQ9KQ3XQa0usVa7aPgCYWCkA0DUqneyD9M8iu7D8OuFseGNacxn1EaTjR2GFG5PX/4/s6dUOh8D2dPgJDZ72jHpP3uKy2fTiAYLWtnwxTPPdm6olL0cyoE9pdI0cWAphiSxWQrvpMK2p89WOsvmjp8uXthyyshqqfEzOLCn1E0CDlDqyIpSo8K0p1QfanR7imkMoz0FSOH29BWTPTWZNQF1OnFTzNamSLW3c0ThTvs/OIbuvDKnBwdLgqxEtiXBFe2eymsmyPUuZitHQG6AYjYEBx5h6hEceEQxG4IDjyhmQ3DgEcVsCA48opgNwYFHFLNRIzRaxRq0ikgVo7LncVCx9oYzIVsYUMi/xyOJIFUkhEzN+dNkYsYkEyptIQcyyWaSycqD9/tMy/rsnnRwX9KuYQ/I5/yK+0oUUjmdoJXJsNkI+OHwjjws03yFMkKqIReKkI6K4GvIWZFfm8q7iHgVXaydhV+gSimX94AeC17M25CVYgk9MxztzEtOFs7bPjrzmEN3ayZLaN5TLVX5g9cnPrahkzJyiBzWakEmWEj8EySLwL87iDBgliMzajNFJARVL21TuhEwkfuBAe0g4kVNE5X2kqhCZAqxNJjkAC00l3vAnh15r5fSXPdXhue9SqGA9WjkfPzS/rTyGIi+KnhuMEKmeauSxFuhJpRKMtJdEQRptwh4i5SCF2HqJc8lLFaX47TCmgUB7AQik8hFkAsqjyOKUEklYdqfzXqpJOHae3BVfcukqibjlqksoBxt1VH1nwO/bHWAzS8XPUD45XcmjzmVXtV0t0d/shb2v9YW9r9nwlxvN1mWZzg3ieDNJdwkgjeXcJMI3lzCTSJ4c4lYKNn+zM2zjXLcpv/VeIKIX35hnlho49I6zdVrhC6JgWV8zReEZtOcK7T66OUKhYyXA+eawyRJE205RiUdNljLsRKH2VqOrT1U2C3HPH4+s36QHiBYu2a2fV27dZEm0HKs6GG2Bi6vD5lA36Rjx44ZoOWY67Zqx5Z/thJuPxmf1nW4K6WZi5Fajt08xCadNFOQjkFajk0It9+5L+eay3aHcQmpPxODTKLl2G5W4aw1BeHwjNlyrNLcFSe//7PfJWXjoTOXW34fZFItx2ayCm+EcYRnmi3HOkxLvWb+0lUwL/26bY766lEjtxwbwio5b6NLDt5UaC3HxrTqPDM7o5f3xnnjntR5FFLSJFqOYTEEY8sxYAjxOPUDjyFO/f/UcozaFsPILccWH2ZrORZ62DAtx9q0/rJOeDzIe8m8Zds2vL5Ezmlz0XKMSm7GQRut+YfZ2miNO1xYLcdSKzcUN8iJdtkYVrT4P8W2byr4FKZgRbURHGAVyoqV/+H/qZZjH5nM2H8k/L9Fwk/tJmQwEn6nFDYSfrOUwiDh333s1Ohp/u0cJ513vT9xcuoSDk+bc2wj4YaJYwobZ7ltikFI+G/Z2vlPGuXumFhr6NqfM8eRmRWNQcJflRUVoDcms3bQ7+APdyT8tSIPr+3vusFrhmp5E8/Jl0eaDAl/9mE20d02rCMjRGdwEv5H5bPqTRrbVzj7WIk163f36GpkEn7MyjCyqAMrYzAS/p8v1f3H+X1xXZJpW+1Y+vUjJkDCX5UVHLMUA5LwF3Opu/zVQBef2IXdYiosUCSaAJ0FRAib04wIgTmNx22feAxxm7OgabNfXa4Itt6tHXdp7Rvy1q8FdogvXCkHHp0es5kz4NwmN0Uiy70f58IAiKuUkSGhfG3TWH24HKgdFhnfls56kGdQ19o+EAhVPgLwzQT4bqWGSekA32P0MEnPg1UVc18LXMWxQH71Gburni9//rUw+px5QpHnpV4XvHcXJYSiGsYChlCQ9tbqCFMXu+VAd3/qF0KV0UzfIGmISoqOL39uSS3iaSPw3NBRHbPqk8NZygkp7EbECSnN9cKg/X2ewvb9rxk9WNJqph6BEnxlmTJIFsjCbZPhxz+2Ka2I12GPaSdsDjbvT9ZV4gF0XdWOFIYwjrEKY4dxhEENf3j6ZCzsPRXKCOC+JIFw79TGoQtYsoKVRZgtv0WXwFClKsiW37KLergqAvsBHa1Kli0b9LZ9ae/lE30e1jmV4Uf2a/AD/CJGyxH9L3OHCkNYK1mFFW0SMwc+Sq9otVLuRrciUjVEzTKDDqROdyz+5qJrwsv1NY8/+FiuIEvlgi4dHHBDDo96ptN4oVo49/ykZ5SKW3KWaGuJtMqbMw6xwiOJh3y7t+9yy7jLXgDA3RQcgAwEANC06BWJEq6MmWRCfPVywqWxy733xRfPOvXoUoBRD/tCALayARA/O4UIND/z/n/V41AbcxusHqfiUbZ6nO1HCrseZ/HFa6lnrezc9zq4DvNxH1bHBOpxLI+yZTe/HzGBooKtW7caoB5n3TLLVX7de7glX13ttflBl+MmUY/z9AibdK6YgnQMUo/jM3Z0y4RRd9z39P808+i7TvtMoh7nKKtwtpuCcHjGrMe5eSyxzgpektuMtKOZkT5xASZVj7OcVXhTjSM806zHcfo471PK6gDHA0N6u6TdnrnEyPU44ayS6290yRVqPY7ftFeZsl4rHJc2rJ480LLvT5Oox8FiCMZ6HGAI8Tj1C+8PqMfJLFF+QsVQd8HKiKL9Gh8KG2PkepzlR9nqceRHDVOP06xfdkDHSQni1f2TrMdVKzqa83oc6tqcgxqTxUfZakyijhZWPc6M2PTbB28sEcy/tHHA4U8LjnFej0O1ERxgJWfFqvfR/6l6nK9MZmz4EVkzmXe86ECKj/xJVr835ExJ90h4dtJVJQkPpZ8w1SN90cBJpg6Hp8e02ZzRdppTpnwJ5MwLgZ+A1LzzlwYt6V48y2ubINl1z7K4IMb3o2dy8g7S9K+UHzBhPnmPYiG0knruSUet1D6N2jipsTOvPSTmqiyCfynnP4c2dvZqezCtrJ9UDgQmDXIHdn0U8ThMrBpRfmMSZau93sKOzfq4pSREec3MTrhOsfJAfCqlXENUrUfzv7bOo4B+BWpSoPh2JP4ovIclrIcaplDCbpbBfL16j2yw27kow36G4xy+f7TviXk32d4Y4ZdI43pQZkdVSOXxTggRNU1HoRUtn1oINU3+VzfXfrheLkqO/6kYwusRwmFNE8cdNPgAocEQIdhBg9aa1rIphlBBu8DVFZF1CF9Qe0P9soO5CXskijXHjf1cpfFr4d4XB+4+XVKJ3HS8BIOiENe5DiOjbHGg+CgnA+nJj1qm0ja89QSqei8p3P7BECLPOzRCP6tsPJzW4r77Aucj851LTM8gb9fhD6Nv1xEDhYER35INI6oyFf0NjLD8Fl7KAnDKV4smd1uSsPqWU9yK1xPKeG39Tp6L8GGItoKay4WBz/1ybPg4lkvFDf93JsPf5EeVqjv4xZz3CbO/SWuHkA2/BdZvkamelmkdUstLKlFHqjT1rJoEjMa6Q3Zb3Yx77Q1dzpwNC3XZu2HHjTW8NiLGt6J77jyD+pj1igDHY0IEua0lMOsx1jSzrmcNRikh7NkCAUB+31l1/Y9MX3TWe5P6sPt6dTMnamMENb0oSnM1P/tONXpc2HcI1XIBgpL1YBMMKkb7jixOoXaylCn4YiRGhydNifk2zsljRuLT3UsbhO62wspawHd3HgWWbtogGAufe9u1MGo6L70ZjhMsm6LhdN8Wwwmfmj/wqUSbmmYtcgTlTqa7bWjb9maRhPrHi4llQ4ix2Kdrag5qESBOKDFP9vNpafKqHE/9aYpOdJ+3fFepJlLTlL9oqFz0jsviinRvcErsJ4q+tHJQyc4Wp5nfjL4LmndUD410LAOQPoSavPehHCz0isn42pgsBA0Hmge93d0xx8faOW/al1PTJptnbbohmiMAjF8GD9HorMpNMcD02sur5kTRF22vM3TT1FLnN50S3xHEj3Hrf27xPyGUtLNhK6hibHE0LFETFfpQgAY+UX/yGHzo0qcf1tj1nC1OPOPzj+uvmHrkauxc80TfymPaXqmceyJFwZdqH1CabuqKC+yEzVroNDNLR69PK1P2jcfm7vaWvT3q1WB6TXrReO6YHvvWUVVTNb0ZkTyd/CqpBebpXP4jKil2QW/3/VvivB0fNbtF5emkjhuCp9M6FyswIVQyyRA5ehpceTLZ+/sYZ6+5C+wvNij5ajtZGgH4rfzfoumkukoO+iIOhtJEElDaAINytEqqHjSdOmPEa15ixYAPbh7RU+L/VXQXtmfA6LdIOqlmiAOMgE6zYBRVOVUfks6KuSSduQYAidKWByuqjb/R3jvx4oRQr2bpfxmVoHOwHa4rSILO3vYYSrhB/cVkUCtnznGy6nhRFNvm4ZGEUyOdEN4UvaVYQZNvQMDJK60ZItH+4OkJGh0QurJf84FwyzFQKYf7bFB/gXhCpAqsCwPm8tCF1ZmtzKxL3Un2mrtu8VAbH7e2Bii102bqqAks4OF3Fk+F2zPQ4+GigOjpL4oiQoOL4Xcofs/YHq98tthcryMzPtR9YW616jcofguK+mCAuuMqKupF/mTUp7VJ509PzBQt9Lom9RdsemoE1KGuf86mol70T0b9WfbTpJymaxwX942rbv7jRF8joX6/XhoF9WJ/Muoveqo2bwy2E+5I9ww6v/hSuJFQ7+xFRd3sT0b9Y7lO9UWfrzmt+L72YsnxNUYZCXX+aCrqxf9k1D+X3XknW+rrsuHkjNSwLdnDjIR6zAIq6iX+ZNRnvLV9e3XNLM/JdnZb+20f42wk1OdvpqJe8k9Gncq7biTUDyZRUTf/LdQ1VScGR94qd48f7w6NXiV9q9Zm48CWvR0Px356KD5tq0S8O2KVhF0uFLvelho5lmJC/edfuzda25sJ9/evunJzuBeKvZiMeunCR11n6uVPn7O2nK+Z7RbdVfHv/HqXUBzQv0O9XNqr7cd/19RzS/DI6DawwZXzOm6wsEnEN4wqkdJ/pESi9tneO1X/rHN82rILnezrVeRIIsGV/L4UiR7nMq3IAZWirud0DiQSdZUqEYs/UiIvylRYOaTrWre51SS96wQMv8KRRGb3rjgzZUVJwYFdFx6ndQ9+xIFE+JWovqLMHymRjJgVXXKm7RHumG1tFiYp2Z4jifzbbEYdVfVjoqTM52Lvs6fmcyCR3l2oEin7R0rEfOGR5yuX7BHOfPvhQqusG9U5ksiHZRu6f373wWftdje7Hv1qPuVAIqFDqRIp90dKpHLUsJZtutu47V+5vmaV2tVLcCSRFxf93YYU6y5MWtf4p+M55QEOJNJ2JlUi5f9IiSx1+VK90ziBaG+yoN+i/nsFHElk2MRxwxISIz2n7Zw94P6jqx05kEjOWqpELP9IiVCbUHAkkd8s/2aTSN89VIlUYJJI94f3fErKL7iuS0wpOnF/XTLlY2m/UFlwBB/Wj5HFAs/aMZVy1/AJDobl9xK5PLdQCy/pQ+K6vJbC4e6UULdpVbfbFcm6cpfpFRDg6noUq5kz79RFvP6RVo4dbgtGLxS0bq8sVk4YoYTHBYPRCmR9ZXL37TPCvPZe/Me8a3J1cuEZunZPB/0ZeceG98OjmXDtYT/3/lHLOhcwPQ2PrRyEWB11RKSno8Bo6MVUvZiSNBJUYlqBxGV7ZLmFHYcHijZXTrBo/nLsNdoxymDdgClgQhp+86qs3xxoiQkcocQ0UI9z5RawtxZbu7Wmnzp92mLZ1W395IMdGje/QM5JYJ25DAX/qAts8NsYB34aK1JBjyVoZgRk+GOq8h37vZF3i9vjvA71KnLIN77K09+0FAU9wWqXxxTQzmjA+g0wIXAHY2XCDmagW73nlZIfO24OEkt6VZw7rXAcTAOrNBYHs7FCQcn5dHAwxdcsta7+y0M0r83lv0f9W70uNw6mWHzYqB4Dj7smXBX1XCA5H8iBg6kJsWKc5zkV9KPiy9fBzOgX4jEsQOWRULzn4pQnCw8a0cGcq8D2zYGW/IkOxvXVjeKr71bxmj1IpDyxqGRT4zmYcazw+xsHfiM4mKrJdo2v/Ar2XJcxo2LLL+eyjOdgtKYA6WDAhMAdjLUJO5hpxaa5SuKvOqXsSK9QKevCgMJxMLM7sjmYMh0N4GD2NapVNnNfG8c5LUc7FNsQdp0bBxPffXGFow/Lu84wi5nb8xkvkQMHM7Uj2zzv35FjB/P6V7dO0/p+E+zyuHDyU2LwayM6mNas3xxoyZ/oYEpLom0fuEz3TnRQDCnfKs6IDiarAxv8hzr8rziYBucmflFY/RRNujcp5kHmuDrGczBaU4B0MGBC4A6mIpODiVkwJ/Klx2fXpcMrq1fOtCVb9xIusE1ChO4HdtppbuCrlWFSfhDQAH6kGpIbhcslgdJQpTwIqAdGdhCM/R5GfBQhCVHrdHDnV6fGt95erSLYZvUkumjW+YolxMrAYdIg7U2oV6cX/Guu63ouqqkzz8ELLBJ3IqkOAMQOnogDPBAi6IMRB3jgX+oBHu+/7nb1O/nCcerZvVHmb32uUA/wTOkVO/FmeH+35UdjVjxePrsrMV6Uhz6no/MBH+oHIw74MFot2CceFyM6VXywbJi4eRenlI9LGrxqtm54QaTF+dQ5CuRq6YWfd6MZM3hcMlxs0O0Y4kUtFJFy+SA1+A6KEO2XLZH7M+Zyxzp07DEecdCISVZWLrmzLTBSHhGpQp8zOuSzK/vCnrmu0VEzLy/xuRLLKrKSIs2T6EQIxEBhCC3dk01oYDIawwOZiUUagwpvmaid95hsiDnK5GzqwbeEcalMoZaqsP4q4CNIBhMpq3G9/V7wzqU4L/l7kOeV8lVbUmVV0isyAp4K04JPOV8KP9WB7qUc8j0wVvz1jEhBn5lu07sL+p1XujkWMJ6FQp3vwSbUbHfagTG2U3XlcGUH/jsCmCgkeIJdoY1KV60pnjIobHPvq0HrWBXdDFo6Ou8AdpVzLgt73C4dFSBcumNzTMVxl17pD3Dpm/5qZ7u23w3h7toRlmdqX5luIJfOn8Dm0vnj/nPp6BOW1TeNWXBgslN0naOuqV33dzU5l86bwGZIBo//33PpUYKsJVPG8MXrTxadf2zTHbEJuvSj49iEBibj/4pLL/Eyoo5je1vRJLsxM5fvX3fFYC5d7D+1/7bVZi4rhnzcXCV5TDcOXHrUWDah3h/DuUs/0en2gGWSzcKd4cPu93x90c6kXDpmlxhdOlBx3KVX/gNc+p444cwE77viHaGfmqza3HqWgVy6eQabSze//p9LR/fk+PrLWdRH6rNJcjnl1NK9C0zOpX++zmZItl7/33Pp/Udtnlih5niXbZeKH53TX1zBBF16b1ahmRtWaMZ06WNn9F2blNrCc/oLnxdNeRb9DebSf/OMC5tQD15jE2roNc5d+vq6YdFBN2cKljhmRbWPHb3DpFw6ZpcYXTpQcdylV/kDXLp46eLl9fzruW341K+naJlNBwO5dMfKaSwu/WiltP9cOkpa0eqyDzOmWHtv6PZk/uXwQd1MzqW3h3JlNCSWlQ2aRTQJl36zZezQC9aTheu/mE3zcr7R0ARd+tNKbEIDk/F/xaUHjvygsC1RVDx1SUazjLD5Vw3m0n/zkCSbUJezCjW8UhrXLn3/rcnXJH2GCo+cSe3Q83vRrybl0jG7xOjSgYrjLr3qH+DSW2erKlhYxDklZycMO1jjelEDufTvXdlc+riu/7l0pLSytx4+PPT+Sc/lPTzHpY5va2VyLj2nK5shOdf1f8+lX5utdnI+WsJlwVkP1Yq7Zz+YoEvfyCq0cYYVmjFdepWGxxMSDt5wi5YM6fVRvvqGwVz6b56yZxOqP6tQbbty7tJtr9aOsrnd3nX69DdTPHutq2ZSLh2zS4wuHag47tKr/QEuvenQWfv/SXvtcTCrR3dF+psGBnLpZeRsLn32sP9cOlJa5Rsqd47Obiye1+JgpeDKl1aZnEs3k7MZktvD/vdcuuWklp3N9zcUTpPeHV62m299E3Tpe4exCW22YYVmTJfe7uiSSXWfKX123ZV93vVXv+oGc+m/SdPCJtQgVqF2Hsa5S3992vpcg/ueTosXXPrucMb2uUm5dMwuMbp0oOK4S6/+B7j0MV+ex2dumCJOvt/639Nb3OMM5NJfz2Rz6Ttm/ufS0QHYisG3vy7YJFxkXdmp2EkVu38whkt/PpPNkFyb+b/n0u0zfOv9/DrVbWM/24HfnJ53N0GXfoxVaDsMKzRjuvTht+Mm/ORlekW3U2w5uKRrPYO59N/k+WIT6kpWoUbP5Nylezev9G+1PYGOOxesF3YYu3ePSbl0zC4xunSg4rhLr/EHuPRuro7u2X1nuSRdyayycl3IBgO59Lvr2Fz62nX/uXSktA4kn3iX1bGt419Dbfp3Gn3rkMm59Jvr2AxJ2rr/PZcuaXHh+WSJk3DWuHELBMcasZ8SNY5L380qtLWGFZoxXfqqlmPubHy3zTvJQ1D7SmDSDIO59N8kimQT6kxWoY5Yx7lLn9pkqfeDBse9Zy+cs/Dw/bdPTMqlY3aJ0aUDFcddes0/wKVvXFqnuXqN0CUxsIyv+YLQbAO59KZ72Vz68z3/uXSktKTy2v5b0ve7pbj+0+JNrcQ5JufSG+1lMyRWe//3XHqEvHsbm17/OO2ZaV/ih13/fibo0n/uYRMamIz/Ky7935QX1oefxLjPOnz99ZneD8sazKX/JtMwm1CvsQr12B7OXbpnhqOdecnJwnnbR2cec+hubVIuHbNLjC4dqDju0msxufQWG3uk9kuIc9m6sfzZYxM+LCXzSLmqlJHhZI9uo50OSlUQmWCphEgpB98IXmoAfoT/RzY7EvBD4HNhzx1XlUStDlWGh8MWPNibqou6OxHq0zhx4o5hqX2cpiyobJbc5PZAMES4ud2tJkQtvZQs3t9a7l4j7acbGCJmzx5Fxyzxo4ai9YtKT1wa+7UZGCqGDz09/eW9+fsQt6nJ6bZtz+fIwZAZPrS+wYBOztFvnWJfvh829tvJOmCoOD70eKzP9OSWTTzmd3xovbFj3RgwVAIfWlBtcqe4fcU8d6k9Svp3O34EDJXEh/r/U6PFzXt2HjEbUio/kg1oDobM8aHjQ28O37vvm/DwZ8sn5xyH/QuGSuFDk6p3vtT52FfRrmZFFQ9inPuDodL4UOKl5ovHp/Z1mXZfGVVz3QyIhgU+dLDS8wVPJAcc51uVPzev4Q1zMFQGH+qYrtotOKQSLQv4bJE45PRpMFQWH7o39MS7226jHDcWX3z3r3UNx4ChcviQ6OQd22J/W3hviN0yq/1xqypgqDw+tGXuti+Pq333iT298KIkZsUBMGSJD7msLJrW6JC7V+L33Zv+jh0Jv3IFfOjU1tlv1shPOe6Vtznffm3Pl2DICh86+4/30mfDrvhM69dwyyNR855gyBofcp9To1qSSz/XxTlt7t39+PgSGKqID513npZwvWhj8cy38uTajY80BkOV8KEXFR7Na2U1z33rp8teVz5W+QWGKuNDrn8d3jPpqatgcevidfbc/QxFWQUfWlhTdv9TjzHOs/oGHJQ39L0IhqriQ+vmPRqRVGOv465p1X+WirfwA0PV8KE6l26NiCrj6T2nf5c7o/tfnAyGquNDSzo9HtKx8kfx7gGzOsVXu3IGDNXAhy49XOc48Ei8x9wQ0evTWTvgA2viQ6/iY6r/GFXcKWnekQ4VHE5PAUO18KHND7qP3Pu3t3D/leKT+U5doPbWxofGnx0sXXWvt3CKsEnl5bJt78BQHXzo/eNfm6t1jhNsLdPx3MtlqbFgiI8PPTu7tPvlfc6CJVfik/ukBJibuzsNIlmjuuAv0ijWbHlhj7SNm+fspRXFIQnJ5RFmg2YFqXaNR9g1jYmqzWSiKgUnJqxMPe28envmmLM1x8WQIwvnUeFyZRCl5zKcuUxci43wO/gSTVdk4EwhA2GYRC4HRohoAmav0yqDaqCQr0YPevABXe28jTPP4Riw85+FiIb1vrbOPLNjNCZGNq9niXVvhnGEVPMiyO92xHpJQOXBXb2Weh7+llrleoH6QlPCggOp0x2Lv7nomvByfc3jDz6WK2BYEAMAsoUAdUaFBVVB0FD1mF70i216SIFqqGUApCBpoDIsXKmWwXE+eD+ZHGPpJPSEL1EBTYpQhskCkSgOS1/3TN73iPf2xncvOg4aTCYCLqX9HBqSeYa4jhsgXGascGX/YxKkgUUKShpoh0+0oFxxRYSCoDlMMkzKBwFIRKiUP0SilmoMAVJ+iZtyzKtH33RevansgtvCfzqR5Gfuhz+WJr7cEa6lZ2mHK7sTSnrL7TFlJwFXRH/g6gaA5YUM/CaM0SBKUiqQSLDer3uZs6nPDtHs9kuiJ0r/aUAGi3gmHSztSGGAZcYKFlB13P/UYfI/AXWKDlu8y1KYGCt/02m8uRvpW5V3hiShkggpXyxVhESE0v1QSQaME4tobyU8EVBN8E8ABngAP1gSGKFUAWOjBCtxGVBdOfYB9vgH4eNqfqBEwR8i5asjw8PlMiChIUowCO7XPDJSAW+Fu2gKuNSRy8aAX8Eu2vNFoRJFiBSTbz/vAfxwYmcKeoYIZUiIHMwOacRIqVSB/U7ESCU/DCiBjr6RGqGzwkbTCeov6CjwcGDbrkGBm4kQe3A7ga9cqp+vrJDrK/EXQvdOOpG2OqzmFJfD62PXFmleLJZDZ0m1QAV0lvMBQpcgQr1RU8IRWP8U/ZxlPZI+Yt1rNaqHAyZj6F8r3FxU6LQuXhD1+XDLpCKL+eQ9Bwa1IK5zbSggKvGsqAC9MTKPcQke8ed+N324jFu7B/P9VZFSW2wWk6UlU+e1CzYO9g78CfwW9g5NkCJLC61+Z8OFUPfV2+YNnzCwfiMy67i39kE0seUdKwzRTWYVncI4oss/nCnBYnhq+SrBwgS6BCg1dbg0UBYMzbvGCyDFM6rR6uBbLVa6Hv67uNW68cdKk40Q9jy6EdJc5loo4Xa4lXFDCYXXHLMytCiFDY9G/tBZAURGSDV+UQ9gTkwp8frY4ls+ia1G/lg24+Zq8jINfzB9mUYMFAY48azgLKWAUzQfcBprvFSuB9cHnQZWpXN2y065RbX84n2r86+55CWKNl9FX6LkDhUGQpNZEQJzGo/b+Exx2+lVEvGPDlVcJ2+uXfJ5/bEp5GhUDGI0vp+TWPeNA6FIJdVEa3J4Lx4JgxViMPgRxF2j+QBbVQQ/HM4oYGxxfYWxFx66jdeNrIuyf4l+b3oUTYzosQxMSQcY30alKx2BBCak67etgL1AHgyQ325e63/nZCT0d4vy77Ns3slb5NZIxf3g3XQjpbmcX6REtX8FzTYAgJLS8b6GNCXkN3PmbU6nRUpsqbWqGECEXtgEyVRAfcE42tmG7lMtex422XvL7LZNN4VcDSZPSyfiZvq0zB3Kt89S1YNXdh97L1yTU61YQMv1BWYvAIAtZAUMaJRRgiiNz4C/04rH9CebFlSZs8jSApMli1W9UmaPxY9kO/eknm/GXfzL/6qVuwJYSiAM51HhKrAEz/OsEgKhn03vJgULgCmi3ZI6bvSiVW+F+5Ks/EfVbP6YA9EOZRVtgJFEi4qP53fTK9QqI85jz5HCfDUze+L8FDevqKMbXC9IbqRTe0so6Ks7zVWuHSPPHrdJO1E5v5322BTDHWNdJscovFLlzoh2exz/7jew6qyAw2LSt6kI28pGwK1PJ1lwsFQlBVCo6U6yGAOWzUXKMAC5prkt9pig3Mdgi0NNWyO4sQRrfnTyiNS0Xf4vTBMH8rf02FSYmgpAfwqU/z5V+QdDorXUgrZCEojzgAK3G5ThUhWMNpQKvo1Gx9V8gB7mWLF/aWyaGu5GK0dKg9BOZMeSAVUCzbO9DwXXio2buKE+2cYEYP1t6DYGv56fjWn64k2x8od+uE11aTD49T+zr3KwMxEFYTYTwpw2dbOuCQZzQbeEG+YRv3Z3K1CpUEsDIzH1wNpvIbFcFLktweGYj8uiE8NrHHziepuEpUXuc+nLX9Ig1yaBb4vD1h8FW4YdBhtuEuoxmYSz5eq/b9FW6RX97o2n/eWJzqTvVraHFCsx4XtHyuUIW8AUMNsR98E6JUxnZYoRErksSKPkI2URoXwlWKaodLcE1Cw9y3vSpEAe1iNKrpjKlHyLAeg+PVHQuV/ZHWv5BnddpWqsTg5DDAnArj3ff4zZtNcjKsznnv9rBbn6pDj2IHr4rLmc33SmViVwEDJYQuSmokKGdEg8dIIxfNYRuRpa5FQkVYOqhYTP7LzZ3l4Zj5yTaxQtnqjcdJQEXxlcQdApHfIo5/VqNpgmsaB15YRRigzN/UeHS/PiUD9PzY69JwhppXJ7+Dtqe1e3QTDIDZGqKN3X4J+CGu7KmIOEggWPAIvq0RpRow99UhxTQSZJAeU62B6fBdkChFx9m2OzQK+NsKreGLYwVtC0isRVPwjdHqJ8v6XHV+1x31p/wpY69g2GUBIT8FshEhPY5cKAAlNxRiiAiuOOqj6To+KH1N8/fc4M4aLj28UrviSOJX8fGOSNJjsoBlvMtK6zFgAdU2nC19F4SRoSWKq1RLwIvQImXxu8ZERMqn/dcsIjqtW23/v7bC6gDYZ2Y+kJooknFXJLEDlEayFvYPKQU2vjuIHc3WzTz67jYwTrjwV8WFZyyT0OIFecZIN84EkC8oacVWWWJyA3QFUmooiSqMpEFFESVZmIIkqiKhNRRElUZSKKKImqTEQRJVGViSiiJKoyb5SsaZ+0U+I05UaXhzuKH2xGK3mDyouuBKGUX3JQ8taISf71PE/Y3dlV2mWLWdCQa88syfK31mz2i+RKNQwXsQQOPSgvwTDb6rnIFEFYciAQfwC2pITrTLwMQbf0PrXkNN9XpIGD+iUdJ9lOEC1FHweTLAO1dx0OVuQux/Xau66hybaBQDJcpcSyCkpYFchcF9Rue91+oY9KClIavH5QXRK9syC5tsLdxk6H+dHjuNvNphqko2BZHXQcGYczYVVJWxKRFyskSllvSxdt9cTHZ82MG+6BJ8/FcVgWMamn94dTm0e5xClnuE0Xjj7GAUourCjZHKdvPrDFaba+xLzCJhuGGTHl4FKPqD1jTpV0e9PS5kOxl45L0reNv2h53MaI+VwHW1yJkAk5eLZNcVy/MLapNnsIIdLAE6QMg5VPwAORbBM6GHh94N/r5Yd7rDtzssKmd+O+m0DWEoLUlxUkl+P65XUbOsk031y7VZWrMlhikdlACU613DH48w7X3ceX7nYRfCNnF8yJ59KziNqRwkCnJSs6tY8TgVFjJsf4IsBbbNb8i2jJhnMusT7ufekb8XRPaMYAbl1yPldb6jZSie+y6uYIqQcsdM0N6AjbfWCYGsAQ/hxqA4oHYPusn6vTLU37anm09enLPd2X9Bl4y3f5uZnkzU4sH8vg1kmD+VlxqokroBXnATvNh2D5onQMY8ZE7zkxgVUOA0sKZhozVBdjvnvPOfjKbeP4ZSP79YskrwRLOYN70UDlGTJwSABh+nycDaYsPZ1d/ik0aq7ZaCk0rJvoCTyFxqfFjvYYNLgdsmGyQ6LG55p3mHJPHOMS+zaiQ7Va1H3oMEk4X7NPg9gvZwrNG2vuI7I92LkUCV8hHQkvSVWyQNxB6mSWqIe7WN4QtVOeZ1jXLBlQmyEXAK4XUDF5FEC93gW9DFU5LA2l2dwFr4P8lmV3q38skXT33hvfu5bHt3AzcoiEPYAeImku55tBp5xzK2h2C8AzEMJTBjXntoIli8cFvapJymreB9cJJDp/WTQYMC2loU+i5N2dqSPnbyVn/zT307N/+PX88LlWqX7rvUddfVKqHmh16X5wQW0SxKctKz5AfYxRYWCOFW6M0ADRmUf9Qy8bYavFLesvUYVII9iEZqVIOFByxSCv+Z1Lt7r0PpZ87qqE5n660PDrnBfXAqmUY5XK1/OmJJXsI4RU9HJf5TGDFy4Nwo0vUjCDTze+O6peNa+9M9+f7XuwXyJZMF7Y/XTB4Ne5FoyjPW5O4DYjbb0a1dyZ53hBvwVZDS0G2MJCLssPj9iT81e07m0t3rS14s8+nVbWoDA+aB6AYHzABwoDkXqsiJhdIPx6Eya/vnOhZ06/Th3do3N+RJgfv/meLGPNJ+peDNNZu8IgO3D+yFBZYCgIK+HZQokarHTzVMXg7l+3xQf1nDbqfek6qbmuT53oebxOlFb94ghWdevPFzQDXhMPNTTcFoHyyCB4LJeveRPkF/800nZCY/czjlOnX7y3/ea7NLLyMQU22gEDO3+slBRi6ICq0eA3xTDUy2J19sY1ykmjUXkPasF6ILVmfyBUFhIK/50bU/LHeo9HN0eh+HMKBwj2MXRVwq9zXudmhwNWFQWYgz0GGD6Zm5p84oqqTbokrorw898CpaQ5OMhcDT7Plrny1WLejAlz7wMuF07zToii+lbrJHvuUYH0Vct5RcojZOFyWSB2LIxuSJmQruEF4gHgniLAnXJ+GOkpOtlJKjMF22vRREEZ13XjBiyysy8COGejNm5gjuLERQQdGOFPEHRg8JOodGBUOi8qHdhv031Rb0TQfTHZplouMhWwObA6AStmIssLKZ/Vjf4+9fPEWPedHRKbbW5vNZgknyIC+uwQ5Ms9tD744JElb6oIk27WShra8bxrQfdMwOx4CcXpgKpe6A1GMy6mIXi2mECq7ScNVAILrQ9K1yq3KhfYYrJwcfjz8JEVB5LJBIoI6SgJ80Vp/KCUtou6DPZe1ds+xir0+C8OUDrBitLOizSGJtZqlx5SNQAGBkY6AESteif7MM2j6D4Mv14YG96YxnxGbTTZ2GFI4fbU9v+ZPaXS+RjInlZntaevL/xnT3H5PD0k3huw+oDLtMEdJBkP68zlwJ5SaZo4sBSVWS1F0UK3p62qFy3bYFU/1xVb4pYd+nyxNAf2lLpJwAFKry+woXTzQiHaU6oPNbo9rcxqT19rF/h2Jr8moE4nborZ2hSp9naOKNxp/wfH0J1X5vTgYEmw/ALbkmC6FnJ7zorZyhGQG6CYDcGBR5h6BAceUcyG4MAjitkQHHhEMRuCA48oZkNw4BHFbNQIjVaxBq0iUsWo7HkcVKw150zIFgYU8u/xSCJIFQkhU3P+NJmYMcmESlvIgUwcmGSy8uD9PtOyPrsnHdyXtGvYA/I5v+K+EoVUTpZJKRbDZiPgh8M7cIIXdYQyjK9QRkg15EKQPZU/Ajs2hvzaVN5FxKvoYu0s/AJVSrm8B/RY8GLukc/sbhRLGPfB6Vjc0u1uS+MDv8d3vZrFZAnNe6qlKsjPSnxsQydl5BA5rNUC74MR/wTJIvDvDiIMmOXIjNpMEUlxBgPq28iZF3UWGNAOIl7UNFFpL4kqRKYQS4NJDtBCc7mHLCSUdL2U5rq/MjzvVbIVPtm9kXPcxLNp5TEQfVXw3GCETPNWJYm3Qk0olWSkuyII0m4R8BYpBS/C1EueS1isDgtktJfK+EFWCYlcBLmg8jiiCJVUEqb92ayXShKuvQdX1RYm75apLKAcbdVR9Z8Dv5x2ls0v7z9L+OWWJo85lV7VdLdHd7MW9q/XFva34sxNluUZzk0ieHMJN4ngzSXcJII3l3CTCN5cIhZavujW9OgzfOFfe/5tH+5SpHyeWOjHxIAPk6xtXbZaTrPIGhx2meZcodVHKhKVjJcD59qaSZKl/JaN2Bw51Cnh1WdpO37cOzK9HZ748wL/UQFTqTsrYHUiZajg+4RLFa5ifhj+DN0SglTSYdbXorPuUX5Bj5PbSf/irHvptK0ZsDLr8S8tRchWJlFLo9oE+ySkEIiENJ2hEgVwcsgvPrfLkSZF+40QLul37cnyVtOHkxOCTpon0BOCxADXi1V4QmE/hCQKVTixE2b8/jVK4UTxQACt1mgkJSX90ofsj08WDOSXipRLVFieUQ7DF3TlROO2bTyHDXZb02vpgJ4Hn5K3Ecz98IcgSFSJkcKQzlxW6YwxBekAa/RLn+qiOs5hMjVGWxxIEhNhQpDCqTh9ZW95x6aeSbvcX+yf/tKJLBzNExGbuLkjhSGcYFbh9DAF4UD55BUO4ZmYhNNOEAY/EpMJeB01uFWqCBytIV3swleGS4ZDjsYW2E+5v4GeUe1sv26LK39dkNjm0Zw9s67vIp9j98/zfPo5dtJoYQivK6vwmhpHeDoQaZrlI8EuuRJUh8oUoxUgCAbiA+JSKBVQdOBfcuVIbBD+6ACHwiSjNBeQcnx+oaYq3LuY8MCpgLOrpv17ncKGFooqi8YvF4bkKrNKrqjRJQdvghkVvUplrDT70bChEashHB8osNn9bL37hmeng1alxO8lG0LGmCl3hPMNb3s8hoArjlO0sKo5ZgjxOLUNU5xazWys37HkHJ8j5gmPGrUda0vO1Ik0Gzm+KukImXQkvXcbU2VbYwFkHVLn2QzCCGRDpMowaYRqND9c80B1eXdNNZe7oodUga9fmINXalsMtnelZxXJ4+UCwH/ClaoIF5k8QvPBqHCfcTY0cea5XQLYL0dlG+eDkLbmJcaqN+Rq2JXABjs4ib2jThF9/NJnlyz3t3afH1HJJnmYVQ5ZLYmn0tVSO5LfOplKblbQdTJAzgki54iyI77NnHkOl/QqdK/knyeE4StHSFUqGUPPiquuVVc18X4gjMuafO7TDIebBZ/C1HIJio3gAKuarFiZXzKozSX2MUviSy74SzDYuRNz55e5FI/4iItCB+Gv4phvo3pVc2JhQPwq/H+ZvGEP+Q7tcrstkxn7j4T/t0j4qd2EDEbC//kSGwn/Qbrt5ICE/23lrBVHfgx1/Nu9/N6xzyeSj7sU7LQ5xzYSbpjkXGLjLL9Pt5GFQcJv0/XdObtYG6+Vz6vUL5IlcTQ6Cf85VlQOGtYasq4d9Dv4wx0J/9Foqw4lV3VzPXRy7qwmJTeQMxTGJOHfyCq6+cYRncFJ+OtKru46Pyfdef7Dc7NG2l+bZ2QSfszKMLKoAytjMBL+k2/dr4lelvSZMX+qebtnOatMgIT/HCs4By8ZkIRfPLb/38rhZsKDJS3KiRK2kPlkjEfCv5EVITCn8bitHVPc5ixo2uxXlyuCrXdrx11a+6YVmUcAO8QXrpQDj06P2cwZcG6TmyKR5d6Pc2EAxFXKyJBQEMOppdhWjT5cDtQOi4xvS2c9yDOoa20fCITOXAb4ZgJ8t1LDpHSA74jLBT1YVTH3tcBVHAvkVy8+f/r7K30eu84NaDrkuGWouuC9uyghFNUwFjCEgrS3aZeZutgtB7q7+7JeIVQZzfQNkoaopOj4svHc+T0bTK7lPDXr5M1SddPcKSeksBsRJ6Q01wuD9nct6/efednYwZJWM/UIlOAry5RBskAWbptH2W/Lv4jZ7Bxd1nFWp60byNXn5sQD6LqqHSkMYYxgFcYQ4wiDGv7w9MlY2HsqlBHAfUkC4d6pjUMXsGQFK4swW36LLoGhSlWQLb9lF/VwVQT2AzpaHdXZ7s0/r5PEq9pmvB2568xGsl+DH+AXMVqO6H+ZO1QYwvJmFVZHk5g58FF6RauVcje6FZGqIWqWGVTjjt8cyb3t7lPOLnZ/fvJm04IslQu6dHDADTk86plO44Vq4dxz22X9olTckrNEW8HWrXpW+FxPuDVpfK/AH+NrGHfZCwBYSACQgQAAmha9IlHClTGTTKxeOF6xveQL17+3PO2cIU10orgywx72hQD0ZwMg3vEyEWi2/39Wj0NtzG2wepxTV9jqcQZfKex6nEorXZP3VbH3Wdyztv3aHhnlTKAe58QVtuzmzismUFQQGxtrgHqc9qtWu88efMF57yJLdfskvq9J1OOsZpXOdFOQjkHqcdI7FW9S7Phjt0VlxxSLnbe2lUnU40SwCmewKQiHZ8x6nBNXYrfYBLl47E+XBMQt3JlsUvU4YlbhtTeO8EyzHude+LaQYi87eO+d/MX31rYui41cj9OAVXKWRpdcodbj/Btj537ufRPHuZf9FZm8tD4mUY+DxRCM9TjAEOJxaoc/oR7n/eNfm6t1jhNsLdPx3MtlqbFGrscRX2Wrx+FfNUw9Dr/46OWPPW2Ffz/7XiYs9ZWa83oc6tqcgxoTt6tsNSatrxZWPc7DIAHv2ZwqXnM7Vbq+1uxRJuf1OFQbwQFWfFasylz9n6rH6chkxoYfkTWTeceLDqT4yJ9k9XtDzpR0j4RnJ11VkvBQ+glTPdIXDZxk6nB4ekybzRltpzllypdAzrwQ+AlIzXt2dmn3y/ucBUuuxCf3SQkwZ3w/eiYn7yBN/0r5ARPmk/coFkIrqeeedNRK7dOojZMaO/OyzgGtrCyCfynnPyWNnVs9PJdW1k8qBwKTBrkDuz6KeBwmVo0oOzGJsnLmHCerjhdFsW0eHkk4NZK8F1REiBZgBY11R8iMV1ozRDpkhTsD2uErrpg8qIfkf4PJQ9fooAiDlBxARCaH9BSwRe5RAY56ZybUf/61e6O1vZlwf/+qKzeHe23K9/Rl6cJHXucTm9TTexyd2PzNecMmkXKnqBLpwiSRmAVzIl96fHZdOryyeuVM2wHkPVEXWDwTQY/IGJeXmhv4auD1Nf0uI9Uw5MV6tYUq5UGQjhGWBAZjv4eFwxGSELVOMQj1iGQJsTJwmDRIexPq1enbuZrrutKAAjDvQjB3ChFFfZBUfe0pBP0ShAiu4xD0S/AvlX7J+6+7Xf1OvnCcenZvlPlbnytU+qUpvWIn3gzv77b8aMyKx8tndyXGicOov03PRP1gBD0Tk6QtIHsALkaktGbtOd5h+LZgcZT32PTSaf52BZEW93T4kEMIytUSFfLcByFP2imjNJ60gP0dB6nBd1CE5BqM3J8xUzPWoWOP8QiWKCZZWbnkzjYQEEVEqhgC18xRDRuOGuGdVGaboNmA9LWsIisp0jwJwXWMDxSG0HazCm2tYYVGmGAzsUhjUOEtE7XzHpMNMUeZgr16Tnjra5lCLVVhVXfgI0gGEymrld1bvhrQ+LLHomzzZ89fBs2iyqqkV2SEZIhcS2DBoyS74Kc60N2VQ75cX7/prtiEOpNVqCNO0bi+WBso4Mou1fCzIMGj0qSwKroZtHT0Nh3YVa5VPMoet0tHBYhO947NMRXHXXpXJpfe/eE9n5LyC67rElOKTtxfN5pcK+sXKguO4MO+smS3Dv0VU0/rGj7BwXApIpHL8farMtg4D5J32yMBtr/frcuc4RkuO/tFR1Xr7iVgegVEvKTrthTQjP4hBDEFbVvK1pl3O7igdWRlse67YG6q4QujyRemehzsUaypd9SlastufKtal9rgBfkV8w0JPa2fHa8k2uixzjLI2X56f+sCzjG4hPeHWB11RMyxKDBqG6Jf1ZhGgkpMK5C4eKpbNfQqe99rl2zHsS1pDe7RtpSDdQOmgPMJfnMz1m8OtMQEtpMxDdQjx2YBeYbYqKeO2UvsRZ+EXrPW9O/zq+jdF2S9hHcbCv69wWzwzzYO/LQKsYI26tbMCFjtDL4JUiJv5IvXljLvI9qb+XVw4+b9cn7TUhR0N98ujymgOZjBdtiEwB1MNxN2MItWn726XDzAdceYz15yv+EVCsfBrJzO5mD6TjeAg7l4Qh1kduqR25SpJR7N2P/NnhsHE3O8WNnX6TNc4pKT56RPHdSGAwezdDrbPJ88nWMHM2dl5XW/vgW4zvDyPDtu0CBPIzoYBes3B1ryJzqY6is/FP/48ZbrdIdOd7qefDDQeA7GhRX+lsaB3wgORlp04F7rr9muk83S0xz2F91tPAejNQVIBwMmBO5gHE3Ywch9T6WXKl1dFOuhiK7+WZxTOA4meg2bg3FZYwAHY7W39RGb2ns94i/6D/tuJ47lxsEEd+7Qrk7Frz5r1q0ab5GW4sGBg5m8hm2eK9Zw7GBmVGwtun95h+uydX23lfC+tNKIDqYv6zcHWvInOpglkipD1h595b61+56GC7JLPTeeg2nJCn9t48BvBAfT+u2Q1WMTrTzWrOuWc6a8dKrxHIzWFCAdDJgQuIMRmLCDyVxV51vL3U29NvYLOTtzn5d94TiYnF1sDmbvLgM4mCSvVL/aY2zdl4wsNqfprqd7uXEwIxpd8yvarr3X1jTpvcx7Q7lYwWTvYt0o2sWxg+k6LOBE5w7nvFcWH/N6nU//HCM6mFOs3xxoyZ/oYLpvbjJ7dYaF85EW3Tpuqzirv/EcTAwr/LONA78RHIyk7i+vOsMmum5zK1G1RgvHq8ZzMFpTgHQwYELgDkZowg7mRsma9kk7JU5TbnR5uKP4wWaF42A2p7E5mOA0AziYbeNt/U9NmOq5cO3rXV9fLL/DjYNZFLktweGYj8uiE8NrHHziepsDB7M+jW2ez03j2MEMDv/U66PnX47ba+Y8sLq70MmIDmYM6zcHWvInOpgx7xo0LPL5rPOGO2ue3Pi12tV4DqYHK/xdjQO/ERyMu9mmn13HxwjWHwv4sKzkknvGczBaU4B0MGBC4A5GxORg9O6pYKOVXuH3VKhxt/bbf0ZNEi/9/u7TssiUlDw9FeyPJzx0rlxXPEtgV3tuS8HMPD0Vpk3YU/OaOsBjacCOntUSbs3O01PhbmiLZwNW3fdM4hWLSasQtDBPT4Umrg+CXvCsnOY+3hBZURbwOU9PhcdjfaYnt2ziMb/jQ+uNHevG5OkvtaDa5E5x+4p57lJ7lPTvdvwIGCqJD/X/p0aLm/fsPGI2pFR+JBsAe1mZ40NOfWwW9Ws+xH3DwaTwwNvrYAesUvhQqyfxk2IyvByT0lULHHJcvcFQaXzo8+xjyQMGtBD+PWlAjYDts2CvCAt8iN/nVwPnplfdl+2ZOPHas6nbwVAZfMhWHpd4d+FJ9/htD/cuOuyVBobK4kNTV6zdlLqwmGj+1got3GxdssBQOXwofV7LhUWfrvGZvmWrnW+trm3BUHl86M6m5t7fi5x23ffZrM+3i1t4YMgSHwro8nbuzfetvKJ8WlmW/dr1HzBUAR9abPUx/p7knesG2wrNvqQXGwKGrAh4A4our3BA7bN0ZtzdrQ6tIPLWxAPnl0oYs2CFR9w19+ffkxPqg6GK+NDCJlVmfXtQwXl5r6xZjU7VLQWGKvEYW3FUJh44YWL4CS8bYcKVH7WLN8qeCIaq4ENK8ZdV6xff8lj5769HDc2LTwJDVQmh2HzuPmjJDZ+lvZ8X6bPnagcwVA0fCq66qHSrabZuM11iNo+Y5V8aDFXHh17Ve1M2rNp6l53tNz6Jf7RyBBiqgQ9VUd8/2r7NZs+oIZKEDd9LVAJDNfGhePP0b5d8hjnt8f6a07hPSAAYqoUP9ShbJDzSYovzuo+2LcwyRKPBUG18aMc3/9gmDmcdd3Q4u/9lsfOzwFAdfGjteHvvnDvB4k0fX5wO+dR0FBji40Mb65xLOfMxRrCq3CLJ0oRVb2nNQuryGJqFHJamzS5/YZ1oo1nK6ho9buxCmA19m4U4MZmoSsGJCStTTzuv3p455mzNceT2VyWdR4XLlUEIBiymALgRfgef4CyVKWBYGAYCYmCE1NKQMKnOlFdUA4V8NXplIz6gazGXjTPvbgZs3Yg6veULwuPdGXoxglrmMoJqXgT53aJOp30fwe/uM2lfEcETwdtFHBKCcnxIKwYAdDODiZOmKmz3lKFXTNymhxSoBnb2PEgaqAwLV6plGAUYeD+ZHFs6EXrCl6gg660yTBaI1pDM1b86bfX23Pdr3j+j5eP9yRQ+2s+hU/jkDnEdN0C4drPCtTbDJCI5Ot2knpGcHT7RgnLFFREqieCHSYZJ+SAAgXQCQySQi4OR66fZk4ybPY+9E27paj7yzMpO/1LYHvDHItgeiBGupWdphyu7E0p6y+0xZacx/ugJXF2CmI4gXZBSgUS3BC5Z/vi9DlaiXU8HB9TrNfFpwWnwOABrNytYQNVx/+PM5H/+Y8/+LfZsaoRuMPbsqTfY2LOdbhQGe/bJL80uyB0thbsrBN/b3utoIIfOkmqBOGDPjrrBRjYsv2EQ9uzEjPufvNv5ue6fspDXO8ezr9HZs3uzogL0xkSZPvLbYOKOPXvhDUerofx7LslXhh65sWv9fpNhz3ZgFV1N44jO4OzZDWXxxwWXvrrOOZryKPLOPL6R2bMxK8NIfwysjMHYsz+tt6ksjfYUrJsiP9rxvBk5hWEc9uzerOA43TAge3a5nO/L2sS88ombd6GH0xqvoSbCnu3AihCY03jc5sIUt51eJRH/6FDFdfLm2iWf1x9LXpybi0GMxvdzEuu+cSAk2Az5sKMzEQmDFWIw+BHEXaP5AFtVhIYnGhhbXF9h7IWHbuN1Cpyo+5fo96ZH0cSIHstA+ROA8W1U1s0RSMD2iX7bCtgL5MEAHSm1rJBZrJ/A6UDCKn/ZwNmtKNkkeDeCJAq7nF+kRLV/BT1SCAAKfYKfgKcpIR8ehnqiF/dLVQwgQi9sgmQqoL5gHO1swxSV6gasau6x5OiT72F3T8nI09KJuJk+LXOH8m3IdO2m+JXVMtclr2KeLDiV8Z4DwBxZAQMaZZQgSuMz4O+04jH9obckMWeRpQUmSxar+jzWrWdUptJ9d5/p9Ta6ptW2wsjkgTCcR4WrpFrqGSyoFQj9bHo3KVgATBFtuWUzNk1wPSNcMfRKSserEV4ciLYqq2jNjCRaVHw8v5teoVYZcR57jhRmBfcFd4Kvl/Bc7Tr9zIgpDYOoCT8EsZ3mKteOkWeP26SdAkTOb6c9NsVwx+jK5BiFV6rcGdFuj+Pf/QZWnRVwWEz6NhUhAUkE3PqEbLJSyG8kVdOdZDEGLJuLlGEAcg0NCvaYoNzHYItDTa0J3FiCxB46eURq2i7/F6aJA/lbemwqtLwNQH8KlP8+VfkHA+WvfLug9SkCcR5Q4HaDMlyqgtGGUsG30ei4mg/Q0zShgP/S2DQ13I1WjpQyMMiXWZVqJ3Dt6zI/oFRP0ZCeFmQbE4AVHdBtDH49Pxtzs+JR34UvH3luivIRLPfeGMHBzoQ9hNlMCA+uUzfrmmAwF3RLuGEe8Wt3twKVCrU0MBJTD6wmCr2K+NxluPfNWc5TBwwVxI2yIdNbWuQ+l778JQ0WBiM/Blt/FGwZdhhsuElwYzIJZ8vVf9+irdIr+t0bT/vLE51J361sDynGI8H3jpTLEbaAKWC2I+6DZCSYzsoUIyRyWZBGyUfKIkL5SrBMUeluCahZepb3pEmBPKxHlHzsFlPyLQaeUrpV0Llf2R2rw4O7rlI1RoaDIYYEwLt4vSJeJZp5zP065NWvuVO6kMNn7EH08FlzOb/pTK1K4CBkSIHITUWFDOlNnXnxtxjDZx2Rq6FFTkVSNahaSPiud17oUTwwy/Wv8pm7Xn16Q2n9jSsIOqVDHuWclMYG0yQWtCbfMgqTkLn/6HBpXhzq56nZsfcEIa1Ubg9/R23v6jYIBrkhUhWlJA7+Kajhrow5SChY8AiwqB6tETVSylTHVJBJUkC5DrbHZ0G2AEWK2RybBXpthFX1xrCFsYKmfhdX/SAkFLUmfi9+o+FX4QH/RMUl215tKYkJ+K0QiQnscmFAsZQVCqDiuKNyZ3JU/JD6+6fPmSFcdHy7eMWXxLH5Mv8x2GKmdZ3OLH5Ua6kLix8vXxs8qXrnS52PfRXtalZU8SDGuX9BKVlh4uIWUVlNhdwSRA6ttZB7mDzk1No4biBP2x4d0ePFaaf5P2rmjKk27xoHkNe8ywZ5mbsE5J6cVWWWJyA3QFUmooiSqMpEFFESVZmIIkqiKhNRRElUZSKKKImqTEQRJVGViSiiJKoy25Z7EPXu2jKXVWnmrx56NrSglbxB5UVqH7X8koOSNzGT/Ot5nrC7s6u0yxazoCHXnlmS5W+t2ewXyZVqGC5iCRx6UF6CYbbVc5EpgrDkQCD+AGxJCdeZeBmCbul9aslpvq9IAwf1S3rQ+7e+CSZZBvLECDywqF+av4Ym24axmSuhaAAe4AfmuqCm/opEUc2ZHrGq1IdbApd3LEiurXC3sdNhfvQm7nazaQ2iwLLa6iYyDmfCqpK2JCIvVkiUakvjW9dq1Nk7+VrFaz9qvr/IYVnEpJ7eH05tHuUSp5zhNl04+hgHKOXcYEPp2g365gNbnGbrS8wrbLJhmBFTDi71iNoz5lTJXzmbcgbI7YXz7XzltUdNExsxn+tgiysRMiEHCWxr3tQvjG2qzR5CiALz9FyDHohkm5Dg/FoY92Hq/hrC/assQ4OCt4lMIGsJQTJnBSlHz7xuQyeZ5ptrt6pyVQZLLDIbKPWH7nF3M596LTuwN+uzm90hchaReC49i6gdKQx07jPmdCE657Q5XS8mx/giwFts1vyLaMmGcy6xPu596RvxdE9oxgBuXXI+V1vqNlKpV9tj6gELXXMDOsJ2HximS1CpzqE2oHgAts03CyFN6/x81Cbp2q2Oq/m8YWc8u5I70Flg+VgGt04azM+KU01cAa04D9jpCxAsX5SOQRbuJP18XTkMLCmYacxQNegqbTl4jb9oY/UxjxfVLt2GbImcwb1ooPIMGTgkgDBtZoVp4U39nF3+KTRqrtloKTRoaTAdgSk0Pi12tMegwe2QN5MdEjU+17zDlHviGJfYtxEdqtWi7kOHScL5mn0axH45U2jeWHMfke3BzqVI+ArpSHhJqpIF4g5SJ7NEPdzF8oaonfI8w7pmyWBTrUcA1wuomDwKoJ6epZehKoeloTSbu+B1kN9S/LPbl3NVZgtS6vyUHjg8mHIOCXsAPUTSXM5vzlHPuRU0uwXgKQPhKYOac1vBkuVzll7VJGU178PWqHZD10gHr0nvBUtuJLfZmDo3gZz909xPz/7h1/PD5+LJOrvCTts5LRy2J2WRvEI3DvDJymLDB6iPMSoMzLHCjREaIDrzqH/oZSNstbhl/SWqEGkEm9De3NhX3cVzvdvkYUODF7c/3YAsNM39dKHh1zkvrgVSOcQqla0mJZXsI4RU9HJf5TGDFy4Nwo0vUjCju42oFdd4hvvmvbOe73PfUJQsGC/sfrpg8OtcC8bRHjcncJuRtl6Nau7Me52l34KshhYDbGEhl+WHxxSbpbWaz7B0O5I4rFXV8s+aU9o6aB6AaOuADxQGIulZbIjsziL8ug+TX9+50DOnX6eO7tE5PyLMj98kRyn4J+peDNNZu8IgO3D+yFBZYCgIK+HZQolaDTtyaaticPev2+KDek4b9b50ndRc16dONAuvE6VVvziCVZ0v3a/rmQGviYcamgYWWJNFeIRJ8ybIL747+cW0O7sOe8e9uu05ceKNVWTlYwpstAMGdv5YKSnE0AFVo8FvimGol8Xq7I1rlKatPOmgFqwHUmv2B2Ara/jv3JiSP9Z7PJohmuLPjdrVHq5rMcCqogCDvUR9tZPZ1+QTV1Rt4qjjFzXNwUHmqlwWW+bq50MC8+5MmHsfcLlwmndCFNW3WifZcw8yoXo5L1IzOrohZUK6hheIB4B7igB3yikt7XSyk1RmCrbXojdjJY/runEDFtlrHwM4Z6M2bmCOQvUY0fOL8CeInl/wk6g9v6g9u6g9v367pxf1RkRPLybbVMtFpgI2R58WhAubbxlc96ml9xLJkU3blllMILcgFNBnhyDfBkPfD62a3mFCZ4+FD4ue3FJa9q6geyZgdqyE4nRAVS/0BqPRj9MQzbSYQPqdRo2rG0UfimhczPGIveT5z1IS8lajbo0aqShNef6wz7fuX11m3Vw058GscVygpGJFaeBjWhsm1moXTb9rGBjpABC16p3swzSPovsw/HphbHhjGvMZtdFkY4chhdvTHv/P7CmVzsdA9vTUIzZ7uvrRf/YUl0+TbSJ7uw27vGNvzgr+52XSBQ7sKZWmiQNLceIRm6XY+aiw7WmHSh6Lxzet7xi9xWrz2LYbUjmwp9RNAg5QWs2K0vRHhWhPqT7U6PYU0xhGewqQwu2pn8mvCajTiZtitjZFqr2dIwp32v/BMXTnlTk9OFgSuDxiWxK01ULuz1kxWzkCcgMUsyE48AhTj+DAI4rZEBx4RDEbggOPKGZDcOBpKQbpHHhEMRs1QqNVrEGriF70UNjzOKhY68mZkC0MKOTf45FEkCoSQqbm/GkyMWOSCZW2kAOZBDDJZOXB+32mZX12Tzq4L2nXsAfU+iGJQiqn96dnMmw2An44vAMneIFt0fkKZYRUQy4EW6SycdhSeRcRr6KLtbPwC1Qp5fIe0GPBi7lHPrO7USzhBovXd6qHN3FKcpGqNxWdp2KyhOY91VIVbMJKfGxDJ2XkEDms1QLvgxH/BMki8O8OIgyY5ciM2kwRSXEGA+rbyJnXNBMY0A4iXtQ0UWkviSpEphBLg0kO0EJzuYcsJJR0vZTmur8yPO9VshWu69/I+VuTzLTyGIi+KnhuMEKmeauSxFuhJpRKMtJdEQRptwh4i5SCF2HqJc8lLFaHBTLaS2X8IKuERC6CXFB5HFGESioJ0/6MERNr78FVtZfJu2UqCyhHW3VU/efAL0dksvnloEzCL/c2ecyp9Kqmuz06mLWw31db2N+HMzdZlmc4N4ngzSXcJII3l3CTCN5cwk0ieHOJWCgzcfDTdveripfP7NCFtzgjK08sNGjhPxfiPFM9Dgx92LiheHwQzblCq49UJCoZLwfOtS+TJEv5LRuxOXKoU8Krz9J2/Djy0qg8nvjzAv9RAVOpOytgdSJlqOD7hEsVrmJ+GP4M3RKCVNJh1teis+5RfkGPk9uhT3HWvXTa1gxYmfGe0lKEbGUStTSqTbBPQgqBSEjTGSpRACeH/OJp1SP3b7hmJ1i7sMvZbU+ti5ETgk6aJ9ATgsQA14tVeEIhCEIShSqc2Akzfk+NUjhRPBBAqzUau3fv/qUP2R+fLBjILxUpl6iwPKMchi9I2fi98Xh40HOs15LFlc0/b5TcppCo4g9BkKgSI4Uhnc6s0rExBekAa/RLn+qiOs5hMjVGWxxIEhNhQtCF9EdEN5rtP+Ox86Fsfc6uDeTUmLnmiYhN3NyRwhBORVbh8ExBOBC6vMIhPBOTcNoJwuBHYjIBr6MGt0oVgaM1pItd+MpwyXDI0dgC+yn3NxjKs69LOou3dxX8veJLvPWCJWHkc+z+eZ5PP8dOGi0M4b18wia8DBMiCiITaZrlI8EuuRJUh8oUoxUgCAbiA+JSKBVQdOBfcuVIbBD+6ACHwiSjNBfQnCLp6sbbX5VyX/9XkZ01jm4YSeutgyiLxi8XhuROsEpup9ElB2+CGRW9SmWsNPvRMkUIuyG8G/TJ4cCpNj5bywwcUyRxEjl6NGeMmXJHON/wtsdjCLjiOEULq5pjhhCPU/sxxanVzMb6HUvO8TlinvCoUduxtuRMnUizkeOrko6QSUeSw1SIKVNlW2MBZB1S59kMwghkQ6TKMGmEajQ/XPNAdXl3TTWXu6KHVIGvX5iDV2pbDLZ3pWcVyePlAsB/wpWqCBeZPELzwahwn3E2NHHmfYTYL0dlG+eDkPYMPaQlFsjI1bArgQ12cBJ7R50i+vKddzerX6uj+5Z6DmkjTxchc4+ZE0+lq6V2JL91MpXcrKDrZIDcO4icI8qOwDZSd5/qVeheyT9PCMNXjpCqVDKGnhW8fe6jldIxrovmD/pYYdb7FgWfwhSsqDaCA6zOsGK137ChDrGPWRJfcsFfgsHOnZg7v8yleMRHXBQ6CH8Vx3wb1auaEwsD4lfh/8vkDXvId2iX2/2ZzNh/JPy/RcJP7SZkMBL+zc/YSPiDnxUGCf+kmB5PKypGuO1vsSzFt/fWTRyeNufYRsINk/XP2DjL5z4zCAn/glcBvr3ebXVeyE9/9HbFuNNGJ+Efw4oK0BuTWTvod/CHOxL+slXUb1eO4TluaD10e/9g++UmQ8Lfg1V0XY0jOoOT8C+/Hvxg3rqePtv8tszP8Zjx3cgk/JiVYWRRB1bGYCT8pTbElt3RLdR16mzP4LbXxZdNgIR/DCs4wc8MSMK/ptqUkjXvVXeZZv267qroUKUJ0FlAhHqwIgTmNB63DWCK25wFTZv96nJFsPVu7bhLa9+Q6d4tsEN84Uo58Oj0mM2cAec2uSkSWe79OBcGQFyljAwJBTEc7HKtDNaLy4HaYZHxbemsB3kGda3tA4HQqOcA30yA71ZqmJQO8G3wvKAHqyrmvha4imOB/OqnRg2QLposcFt2ymfHZ7d0s4L37qKEUFTDWMAQCtLeRjxn6mK3HOju4Of6NcLWTN8gaYhKio4vPVo7lYl9eMAran3Fk4ca/1xGOSGF3Yg4IaW5Xhi0v2LW79/+ubGDJa1m6hEowVeWKYNkgSzcNkse8I5a8hZ57lVm9mu+6yOlzxzxALquakcKQxgNWIVhaRxh0Jpj65OxsPdUKCOA+5IEwr1TG4cuYMkKVhZhtvwWXQJDlaogW37LLurhqgjsB3S0+rh7Ve/rHg+ct0y/s/tIx4hvZL8GP8AvYrQc0f8yd6gwhPX9GZuwnhp9mUHU1egVrVbK3ehWRKqGqFlmUPwH3557Z8d4pPgGzVTn9O1akKVyQZcODrghh0c902m8UC2ce/Z5rl+Uiltylmgr8uWCJS/nRPssKv8t1CLJQWzcZS8AwJEAIAMBADQtekWihCtjJpn4687c+BJ2353Xx59pMiXgTQuKKzPsYV8IQGk2AOJfawPNgf/P6nGojbkNVo8z4gVbPU65F4Vdj7Pz1pqhD8pmex5c1G9gelZ2qgnU46hesGU3B74wgaKCFStWGKAe51G/LWqzlk4eG+/8267uwidZJlGP48EqnbamIB2D1OPM8qnt+X6PrfuuCVkf1jxSzTWJepx6rMIpZwrC4RmzHqdcmGV0rX/fOC4vkz1li7lVlEnV43x9zia8x0ZfJppQPU5IkyI86wkNvNZnzZ9jEzbttpHrcS6xSi7F6JIr1Hocxx/t3kyt39E17q7148bfkq+bRD0OFkMw1uMAQ4jHqYP+hHqctePtvXPuBIs3fXxxOuRT01FGrsf5+oKtHucCPaQtlHqcZInV9VPW1q4J3VKOPp+6RcZ5PQ51bc5BjcnHF2w1JpkvCqseJyLjia/1RG/HZWYhnb99fhbGeT0O1UZwgNUFVqySDBvqGLseZzCTGRt+RNZM5h0vOpDiI3+S1e8NOVPSPRKenXRVScJD6SdM9UhfNHCSqcPh6TFtNme0neaUKV8COfNC4CcgNW9jnXMpZz7GCFaVWyRZmrDqLeP70TM5eQdp+lfKD5gwn7xHsRBaST33pKNWap9GbZzU2Jk39yHQysoi+Jdy/jOosfNfcx6mlfWTyoHApEHuwK7/H3vfAdZE9r0dFaWLoiKIYOxYQNS1lwVC6E2w7NojCRINBJMgIhbsFXvBjg1FRbEr9t67q667NixrW3uv371TAjNzZ0hgSPL7f8vz+Dwyh5lM3nPvOefec+57hpCPw9SKq1LCpkqHvDRf+7YXRMtb3D+w6WSSL40FA63Airh1R+hMYIWLKIesCGfAOHzFF5MH/ZB8EZg8dI0OSrFoyRNEZNUg3Q9skXvQm0C9HxvqP8ZtWVXJw8xnR0/HhZkJobRiJcTpS6uSR17nE5v003t8ndgs2rzh0sje23SNRLNpJGNmWuLzoE/+8wY5qBdObtyLuifqB4tnNMyIjHV5id8gVAOvj/e7TFTDkBfr1RarVEghHSMsCYzB/g4LhzWS/mqdYhD6EclyIcrogTKp9ibUqzO3c/HrutKAAjCn3oG06T6Ioj5Iqh5yB0G/BCGC6zgE/RL8R6dfCht3u2PUiWdeY89sS7V4HX6VTr80ptvykTcTegakH8xY8Ch9akdSTh5GLTI9E/2DEfRMbJq2huwBhBrROTDLj6vazFoUtF3p3fr2rv2tiqMt/unwIYcQ1GsFVMhzF4Q8mjtGaTxpDfs79lGD7xDfP99g5P+OmZoUz7aRwxEsUWy6svfLn20gINIkqtCB61P/U790tjnjNTF27GGP6h2vc6rMXIQ/CcF1TAhKQml9OZUWYlilkSbYLESEG1R4y0jtvMd0Q85RtmCvli/R+loer5apsKo78BEUg4nU1cBO23oPe7zUe6/LvmZBwVVX03VlHpqokfRTaAksBLRkF/xUT6a78iyU66uI7opLqa05lVrnDoPri7OBAjHYZTg/C7pFAI0mhXOgm0FLx2zTgV3le4inehB26aA3otO9VxNsiBMuXcrm0jvdvxNurjjvv2z3/tIjd9QcT62VjYqVx2iEsK8s1a1Df8XW09o5PCYGLkUkCgXRflUOG+dB8m4PJMD0hoNsr4CIl3TdlgIjo/MtkpiCsS3VWCyofKu4dWS2WPddMDfV8IXR9Pg1N235evhg0MyRWU//MX+VTW/wgvyKhYaE9KbrxZxjcAkfAbE66IWYY6lA2v6WflVjuAaV2KhA4tIjIL31nQmbRGl/R0SPm76+AWNLOUY3YIo5n+A3d+P85mCUmMB2MjYC9cixWUOeIS7qqS7hm1OrlRkrGtNLWe3k9ps51HEJ7zYU/AJO+J//bRoVYsVt1I3PCFjtDL4JmqqD1nG3iJaiuLv57gVMAcPB9HXHJgThYGRsDkZvPh83rfZKns9HM/PgiH4nW3vvq56WvCCpZkoBPp+mi855zVnsFJp+dOzjf7dNtC/A53PKY8JvJ2JWh89sMW3gmT7WoQX4fI5W2FtnkKM8fG0p0YQ3d8SLCvD57HYu659QPc9756blE+N7/TG9ILchs/MvyW2I6PxLNupFdP61IEQLqvbu2Ts3wye1y1+Bj/74CIkZLQlRuX3lV9vHdw5ZUuvs249hweWByIoQ1bLx2/Bi3+zg3SPjRkvsqsUDkTUh8u10LGp4/ZPeM6qv++IzYf13ILIhRDl3hzZwaH/ZLyvq13uKub06AJEtIbp3dVzVVOv3gcuazDk91ulZABCVJ0TN/JQfmuxd4rNkaNJB/yP+W4HIjhCtiR1RLe1E1eCV9mtG1pnRvQIQVSBEZeK2H3Oxey5e+rV3Ro9D5j5AVJEQvfl72+W1MQNES/6Ne1l67bb1QGRPiD48H9d5h3OHgJ2SyIHjYixVQFSJENXo+GL7mpPpolUfZjRNuZqRBkSVye81eJ7L0PGa8OWWV5svmPIkGoiqCFhpoBwI0fovQ2PrzggSrav466m/JJMcgagqIbqbuK9jTE8/vxlPHEcd6PutOhA5EqJRdw+WutuwpdeyrvVanqgyeBAQORGi74vWN1zXeIjXnn7H/7z59fU6IKpGiB680WTeazsxaNy8am+7D/1jCRA5E6Lmjod33X/5OmTRpAGzo7KPQKCqE6LYuz+Wjh12wDtrfvs6fzZ+3gCIXAiRrFXt2W+7+IRuTuluv7LRvrpA5Erqa3sb8xu3vvqsvhT9plb1BEjaWYMQ3RfXDxr6SCVetCw3u/2HBVOBSEhOh6i3i5KjAkJ3erqM2dB9RH0GUVVNAQtR1QPF75Ia520C5n7+263tdKuLPBBVxbCZqCoxuzctPHZKvHhD3tAz1YdlUJeu4iEJCqUUcfqCLQCuR9whJM/LYm3q1HEgIAZGiOgAqONxC7qBQr4ac1VNCHRdSLiBZdULSBuMyhxGwIbsL/RroJl/GhV/EeR3+6f6wnZPHsYGLL/45Yj9kBobeTyMynOCEDb4+eUFWz20I1iVCl/oFRO3iJSBoYHVPUllsMWRUi3Hjp+A95MrsKUTOU6EEhU8ca2Mk0ejK9WGpjQsVXN40JrFre/KDu5YTi0f134Os3w8X8R33ADhsuGE69O/JhHJMY866hnJuRMTTZqvLk2sRCOMkwyUCUEAom1hzV5nbpGjPDS8xmb/TfvMjkWHKmrQKg2JxyIqDUkJ39qr4E4Mdl9k8b8HNtgZ1eZ6AleTPBRFFvzJ6EAiwfJs2Uuscm4cMrmh78mTnWdSLXWRjmDxAJYNJ1hgqBP+pz+b//mPuaFIzA30CN1gzA23X3AxNyzVz1fqyNzwssNvf9kdrBSYO1c61OnDufs8Oku6BeKBueHmC66D7sf1c5ZFZW7o4rqu0Y5LA0LHfq5p1shhTaLRmRu2cKICxo2JVpkWtsHEH3ODz4OyLWbF3/da4V42RPqgbX+TYW6YzKm6wcZRncGZG4SlMjcoJ/cQbXL8Hq08POmFkZkbMCvDevT+OCJKKSnmhhNDhHaD5+4IG7ejWsDKaXnrTIC5YQsnOEtfGJC5od44y7tuK6VBUz+8jb798RC1KZvxmBsmcyIE5jQRt8WyxW2nFklCvrep6j8609X8ae2U/dRoNATEaMIo3xDdNw58tM1wYTcBMhIGK8QY8CuIu5KFAFuVBucoAMaWGK8w9iJCt+E6BU70/Uv0ezOjaFKixzLw+DeiLS4jVPICGhj/Tb9tBewFCmCA/HaZgiu9D5295Tf+37lttw1924+WTYJ3Iw4oYJcLi5To9o+HnreHvxHVV4xBKGwkFmz8plfdsSMGEDku3KRyFRi+QI52thZNrIVbVz4OXVX1ucrKeRiV1tjSl7yZOS3zRYUBNtru3LLLNs/EW3M+mB/o3KouD4At5AQMjCijBFG4z4B/01zA9sOkw7Lg0KU1pksOq9rE/Mzcp5LSgRvTN69KvXX9pz1GZAKUIR6SoJJpy56xoNbbJ8rttwbFC4Bpqt0TkV5bPDAyeFPr1+/GrMlx40G1Kk7V9jaSalHx8Yxf9Qq1bEIK2HOkMkfc7Xo74NQQr/QaFyJTsm7spSf8EIeq8Ku8t5X2IGxSDqqoJMcDm2KEY5SzOUafq1VvDW611Su7R2/HKV33UckDKsPiVw3c+oQnmWWwtl6mR8f4JiJlHIAcL8HFHiPNfwy2OMxvFA+LSnXyiPS0XeEvzFAH8q/02FSY+hqA/tgH0UC+Lxj8Ca+LW5/iHVIAFLjdANsgwWhDGS90I5ufA/RwAiT4P9ymqeFutDJJxsJe8kdWl7SWDZ+Jlh6z/7u652Kqty3XFSs6YNoY4nphNqbap9sNkj76hW1b2LaeddMum3nYmZgIYTbzQbRMT2+AwVzcLeG6BdSv3d2KVsarZdGJ2PDAaqLQ3FrCu3/vuHwkYNcYB6/AD/eoDQ+t85/LXP5ShCXBBoPB1hMF2w13DDbCJAxgMwlnytd+27SlMnT8m5fBHldGiinfzTZShtUwCsMSFQqELWALmN3J+2AhLDZm5fGDJQq5FB/kSXJNrFAJlikq3S0BPUvP8Z4MLVDFekTJ1V+zJd8yALqvXhV37jsEYnV4cNdVpsYKsTHEkAAM8Rj/vW3nUeFTtz8tVevkje7U8Bl7EDN8xi8XNp3pVQk8hAyOELmxqJABNqMye80aPuuInLMWORVlqMGhhYTvw6bBdrNXV/IZ0/rFb19821KDahtigKBTOlQp7wXRbthI4kDr71dGqWK36JycICuIQ+0CNTsewSCklSk84N+oPfwD+sAgt79MRSuJgz/FNdwOmIOEigWPAIvqZFzVSC3THVNxJkkx9drXg5gFr7xRBzKbYLNAr40wxzAMWxgr4PW7xNCXIqFoOGLR0NU314WPaWVV7sDg8Ju0xAT8VojEBHa5JKDAhjgrFGCIE45qIJujMpmef3RryU/74xJo+bf0FVfLv2layBUmDzm9No4fyEeZlWs+q21M4CJNuxV7nzn/ygPkg99yQR7zloQ8jreqTDsScgNUZSKKKMmqTEQRJVmViSiiJKsyEUWUZFUmooiSrMpEFFGSVZmIIkqyKrNDmuyD2WKR37yphzRHrC2WMEre4OBFjj56+SUPJW/xbPqvFXzU/dZmK781ZtJ+155UoOq/Er7ZL1Io1TBcxBI4zKC8HMtsq+Unh+2OY2F/YPwB2JISrjOJMgTd0vv0ktNCX5EBDuqP9KCWmfYSTLIbyBMjYEUe9lKvvWtnPNuGMWkooWoAHuAX9rqgztN+DH3U6XlIepxbZo2JeduKk2sr2W3sizA/+pJwu68Y5IRgWa14iYzD2bCqoi2JKIgVEqXZ87vG/HOtvte6Bm/nrus/NoDHsohRXcLen8wc4pelnBQw0Sf5MA8ohXGi5PmSufnAFac1jiDnFTbZMMzIKQeXemTtGXuqpOGUT6U2dvw3ZLT1WRdVb9s3RsznejYmBhEyIQcPTw9+qV8Y21CbPYQQRRfg+4QeiGKbkOAcS/HN7fe0SsDMiK0zU6+N6WECWUsIUj9OkMJe6pfXresrx7+5dqsqf8hgiUV2A/Wy97oWbn7ZQWu8rFe5hXWhFS6Sz2VmEbWSkkCnLSc69V6SgZGSzTE+6xoWYtbks2juyrN+y8MDuzM34pme0IwF3JrUfK621C1JqRflPv2Aha65AR1huwsMU2MYwp9FbUAJYGti5gZU8dO0vzjb9fiz70LvsQ1jKgY1e05tw2yN5WNZ3DpFWJgVp5u4YlpxAbDTbhCsCNQYgwwQlV/p5evKY2DJwExjh0rze501ZXeo/af+2WpLN7taZ6mWSAzuRQNVQGTgkADCJOCE6bmezq7wFBo912y0FBq0NNgYgSk0ISN29MCgIexQApsdEtU/26TNmDshGX7LX2vaOLnQ96HjJAlCfJ8GsV/OFprXx+8jsz3YuRSJMF6WBC/JVPJowkHqZJboh7s43hC1U15ArGuWDAybAV8ArudRMXkqQL3hF70MVXksDYVv7oLXQW+H/xyeutb7vc+u121dxW1vU1uelsUewAyR8MuFzTn6ObfiZrdg9y8Ijw1qzq0FS5bIL3pVk9ji78NFkv7ri5tj3R1bB6bWO/ZX0IIKWdTsH34/M/tHXC8MH6ereU8HN98UOsq/oUWP3j0G8IBPR058wPAxRoWBBVa4MRgHor2A/qNfFzXbzhJVf5mGS2lPt0hrfVmTFZ7TceBVV2X3SKrS8PuZSiOu815cC7TiwKmV0iallVcHSK3o5b7sMIOXIJMSxhepmFtJiyftbbVRtNSx2eDgViMvUBUTit3PVAxxnW/FeHkQ5gRuMzLWq6lNxIKAL/otyJy1GGALC4W8MDwi1tY46T5oSkjW9tAte83s99AohfAHICiFCEFJINKQExGbL6RfH8Tm13NmBb/r0a5t4Ph33zUWR26+peoY/0Tdi2Haa1cYVAcuTIqVR8eCsBKeLZSo1ZANUlsVQ7h/3RYf9HPaqPdljkn8uj51op+JOlFG9YsXWNWt+1zcDHh1ItTAyZMwgl94hAl/E+QX93g+IyJOeS90ruuG9/7mnVtQBx9bYKMVGNj5Y6WkEENPVI2GsCGGoV4Wq30YMaLwliaUg1qwHkiN7w/ANgrw//kxpTAlbDgSUbo/N2pHFbiuxQBzRAEGeawBYMRkVpl84oo+mnhim6SnOXjIXMV+5spc/abFXM2GedhOv/OnBEdFqd2d2smfBlWkMm6HUohQmYaUDWnnUBAPAPekAXcqaHSqOtlJOjMF12sxicCpcl03bsAi+9NXAOdU1MYNzFGc/YrgmyT9CYJvEn4SnW+SzhdJ55ssMp8k/UYEnySbbXLxk6uAzdGH/vZ5xe+u9Sw9vKf1bnCsQ27dP6n0t97M2eFdKLndl46xZRu2eh6++NWwvHsHXZcVd88EzI53UJ2eqOqF34D07tfjCCJHNpCKQhL8/dSd7A61XEKn3rFdETylFvV8tW4kwXSU7rauPeLhN2lg7omnijoNfxS3hhOidJYTpV1fGRSAnNUueK8FGBjpABC96p3qw/BHMX0Ycb0kNryxEfMJtdHk5o4hRdhTzf+YPaXT+RjIntbitKcfvvxnTwn9yHwkVcZpngfNWh+T1aCcx1Ie7CmdpokHS+HKaSmsStyevrCdJV7wOiR4WdNOb8tnXR7Bgz2lbxLwgNKHL1wo5X0pQXtK96FGt6eunPb0g3aBn2jyawL6dOKnmK1FKafXaaIE3x3vvWJzrqZF8rAkyPjCtSSYoYV8MG/FbOVJyA1QzIbgwCNNPYIDjyxmQ3DgkcVsCA48spgNwYFHFrMhOPDIYjZ6hMaoWINWETnE6Ox5PFSsJfGmZGsDKrloPJIIUkVSyfScP0MnZmw6odMW8qCTIWw6Wbjr7u8THnwKzN21PXfzwHvUc35lIyTxMgWzNwqbYXPzFibAOwp06BLGKzUynFwI0nNzcdjSeRcRr6KLtbOOilYpFYpI6LHgxfwjn69+pVnC7T1+vL6TVS58pvr0oBcTnFgrqS26qGUqSABOfmxdX2ViPwWs1YJddCDxj1SuIb47iDBgliMvNZOmErLNEYM1t55YMPojMKBtRILUCSKrUImqvzw+RBZDcYDW+OVI2O+04HVL/HpnZULBq1QrXLlrPfHlUR+P22EgRqjguUGNHH8rc/KtUBNKJUkKjJdC2i0S3lKW8CJMvRS4hMXqCqIlE74ggF1U5RKFCHJBFXBEGpVMEqf9HSMm1t5DDNVkk3fLdBZQnrbq6OOfB798/iOXX97/kfTLQ00eczq9quluj+ZyFvav0xb2p/DmJm0FhnOTCN5c0k0ieHNJN4ngzSXdJII3l4yFYjpWiro3vpZoz7ih31YfrhFeIBY6PCb5wI0dY7zHdT/f227Y49sM5wqtPnp/jEbGy4NzHcamSRNt104nHTZYu/bD37natXf/XtLt2o8PXPg+vU2Y38wj5g2P9/s9xgTate//ztX8dt13E+g5vX79egO0aw8859r2+e/p4Uv3PVgR1WYRreOokdq1z+PUzmhT0I5B2rWXibiUp94S67VEEDdle1LmYpNo1x7PqZzupqAcgTHbtZ8NP38193QP750xj8pFDjxG7Utr7HbtfpzKa2Yc5Zlmu/b9Ntm1HD0Xe0/eu1b252ULarcqw7drd+XUnJXRNQdvKrF27W1kH6us8HAO2T575ZiOEZuo3BDGateOxRCs7dqBISTi1OFscer/Urt2elsMI7drj/jB1a69zg/DtGuv9CF0+aGZoYF7P/jH1V9VdiDv7drp5GY8tCAP+cHVgrz1j5Jq115hTE7VueMXhq3q1Lp5suuAXby3a6fbCB6wqsOJVYUf/1+1ax/BZsb+I+EvEgk/vZuQwUj4BT+5SPgPMm0nDyT8f3T09pxZq7Xf8hHOCbLV6VR68uKdNufZRsINk28/uDjLHzNtZEmQ8K98dTbrxo1GASs9nrXxWCluY3QS/qucqBw0rDXkXDvod/CHPxL+GNurv77d1zR0XO3Fu+ttc6W2rjcmCf8GTtWlG0d1Bifh7zhr0G+fq1f23ZA0/nmkzTVaVsXgJPyYlWFlUQdWxmAk/Dknr52WdBAF51Rv8O3ihXrUzJpxSPivcoJz8IcBSfjbHvt5YN8fM303fFrawzbLk7pMMx4J/wZOhMCcJuK2kWxxm9i7YaOfHa56r73tmnV56cvmVB4B7BBfglIBPDozZrNgwblFfopEnn8/wYUBEFcpE/vHghgOdrlWxujF5UDvsMj6tkzWgwJCXWv7QCB0GYZJeQDftfQw6SLAd8TP4h6sqpz/WuAqgQXyqy9W96iVnvNKtPSwXZMqvROoFNdF6t1FC6HohrGYIRSkvT3/k62LXToYu7k/9WuEjU9fqay/SoaOL+uuWSjwHl4xZOqNDY6bj8QIaSeksBsRJ6Tw6yVB+5vJ+f1n/TR2sKQdmXoESvCV5UqpPJqD2yaihdmC5IvbfLddrnhfk32hFXWskg9gjlWtpCSUMYJTGQOMowxGc2x9MhYewfFKDXBfkmi4d+rm2QEsWcHKIq6xsGmH6FilStpY2KyDepBKg/2CjlZvRl986hQWHrDo8a6g6Qebr6L6NfgBUZpkBaL/Zb6oJJTVlVNZPiYxc+Cj9IpWq+RvdMcnqvqpOWbQmEmarMC8+UG7Gt4emvGx4r7iLJWLu3TwJAw5POp5kcEL1VTcZetP/aJUwpJzRFtrWt3NPHFMIVq54vSJwOcd5xt32QsAWEgCcAMBADQtekWipCtjJ5mo2yzgqGWL9V57LHsNnjpSs5fmygx72BcCIOUCYF3ATzLQTP0fq8ehN+Y2WD1OrOAERz3OL4ITJVyPs2JzRM0vEx6HTRg1c+vqFqlrTKAeJwZCwprd7Ck4YfyigpkzZxqgHudG+qvN9o2yfCY4lWr23SZtqUnU40RyaifAFLRjkHqcdjWmnn5/VRi+c9cfp9p87nTRJOpxOnIq5xdTUI7AmPU4sbHXMtv4rwybvSVo0pkOYedNqh6nIafyhMZRnmnW4yzY5tF6RYP3fhtiDi0e/LVFXSPX4zhwas7G6Jor0XqcFbO7NT1lLwydt3PHsbZzVlwziXocLIZgrccBhpCIU0f9X6jHuS+uHzT0kUq8aFludvsPC6YauR5nHcSetR5nDjOkLZF6nK9pY05VUgWGZl7cePJ11bMi3utx6GtzHmpM1kLkWGtMllKR47Ee530V9YcAs6Vh2zovaFqu3pJk3utx6DaCB6zmcGI12bA219j1OKPZzNigA/JG8rB1op37wxX/POjxkpop6ZQIz076qyQJscwTpnqkL+r4ytUJ8PSYNpuT7I6fMhVKIGdef/gJ6JaRUW8XJUcFhO70dBmzofuI+qzvx8zkFBQyxp9lFDBh4QWPYiFGJf3ck46jUvs0euOk+mLBo0/HBQIHEfxHO/8ZU1/c8+Gn47ZRMgVQmEwaCOz6EPJxmFpxVY5hU6VDXpqvfdsLouUt7h/YdDLJl8aCgVZgRdy6I3QmsMJFlENWhDNgHL7ii8mDfki+CEweukYHpVi05AkiMs1XokXuQW8C9bFsqP8Yt2VVJQ8znx09HRdmJoSuLvT0pVXJI6/ziU366T2eTmwWcd5wacThHV0j49g0kjEzLfF50Cf/eYMc1AsnN+5F3RP1g8UzGmZExrq8xG8QqoHXx/tdJqphyIv1aotVKqSQjhGWBMZgf4eFwxpJf7VOMQj9iGS5EGX0QJlUexPq1Znbufh1XWlAAZiPIJg5PoiiPkiqnvkOQb8EIYLrOAT9EvxHp18KG3e7Y9SJZ15jz2xLtXgdfpVOvzSm2/KRNxN6BqQfzFjwKH1qR1JOHkYtMj0T/YMR9ExsmraG7AGEGpHasnrWPu3vrCZh+2JfJV0dWDGvONrinw4fcghBvVZAhTx3Qchz/p1RGk9aw/6OfdTgO8T3zzcY+b9jpibFs23kcARLFJuu7P3yZxsIiDSJKnTg2upynZbn2qcGr73qVNVG9uoBp8rMRfiTEFzHhKAklJbLqbRMwyqNNMFmISLcoMJbRmrnPaYbco6yBXu1fInW1/J4tUyFVd2Bj6AYTKSuloXL3DsNXxicGffcfMCi233pujIPTdRI+im0BBYCWrILfqon0115Fsr1VUR3xaXUWZxKHfGOwfXF2UCBGOwynJ8FCR6dJoVzoJtBS8ds04Fd5XuIp3oQdumgN6LTvVcTbIgTLn08m0vvdP9OuLnivP+y3ftLj9xRczy1VjYqVh6jEcK+slS3Dv0VW09r5/CYGLgUkSgURPtVOWycB8m7PZAA0xsOsr0CIl7SdVsKjIyNb0hiCsa2VGOxIP5NcevIbLHuu2BuquELI7+oj539i0W3nwZNm7p3kP3xLxH0Bi/Ir1hoSEhvul7MOQaX8OsgVge9EHMsFUjnvdGvagzXoBIbFUhcHNzePRvWzS54T/8V0oa/f/vB2FKO0Q2YYs4n+M1Hc35zMEpMYDsZG4F65NisIc8QF/VUK8WudK+rs0SzA2b83N4qtCd1XMK7DQV/d074/YwDP6NCrLiNuvEZAaudwTdB8/3QOu4W0VIUdzffvYApYDiYvu7YhCAczAQ2B6M3n4+bVnslz+fTzbVzo+TDu72X/zuyU5W3v4YU4PO5+u3aX1/dBolzpQ1stgdaPSrA5zMi59q8pet+C5qhqTjpRdNXgwrw+UQ3EvR58uNv76VXr8q39el5pQCfz6zsRvVnJFwKmn82oPyhe/VeF+DzQXT+JbkNEZ1/yUa9iM6/FoToztFqTe26Tg0Z9Xn9v06nHx4BIktCZJFSdvkH+fPQrNV95Vk7FRANK0J0r80hp/ZlbnqlldcERA180gKIrAnRlYHPlvzdNU+UNiio177rrueByIYQ3do8+3TjZReC1vv/Imj+19U7QGRLiLJTfs7zCpf7jGrc/MzP2QHJQFSeEAVEtJJ6nleL9kufZk2+3nENENkRopQmFoqkO9MCctt/u5+eI58JRBUIUaut0iv/vN0Qkno3fsHdY2dcgKgiIZr8+pzrE1m5kIxTZ/7O63fDFojsCdHZDtsvfs2tEpbevMXF+Jd9fwGiSiS8dUeUWnnsUtD+M/PqvN/2+CgQVSZE5V7efdgia6Boe9Ubmz9da9YdiKoIWGmgHAjRxLUPX26OnBy4qdeR3jekLn2BqCoh8pt5dcCvd2cHjndbluK8oN0pIHIkRGPT1EdX3+3oPfFSQF/VkRN7gMiJEHlM3hwTljHAd7V76Q29etS/BkTVCJF4y/Zz7xVPQibUbGsjmtQVMkQ5E6LISmbrzv99STTjTIMzN1vWewpE1QlRZdfWnhrlKZ9lTaZV2fntCRwbLoToy9JhHV/3/uaTtvOxcIdZzgogciVEbXLkkXcbDPWdIh1RZV5rh4NAVIMQ2ZRuIN5Ufqjf+CnxNw8uqAQ/S0iIPru2PTNrZl2/NdNtAr7suBDBIKqqKWAhqrJaVvdct65NvJb30Uyfty9XyQNR1UQ2E1UlZvemhcdOiRdvyBt6pvowKmm8uXhIgkIpRZy+YAuA6xF3CMnzslibOnUcCIiBESI6AOp43IJuoJCvxlxVEwJdFxJuYsGrUicEgk+ozGEECI9vlmJkDjkbaOafRsVfBPndSr31V8/v5iFa+7rzoE6Lxpfl8TAqzwlC2ODnBQQIWQ/tCFalD0oxEoRcIVmLSBkYGljdk1QGWxwp1XLs+Al4P7kCWzqR40QoUcET18o4eTS6g53jjsOTV+eFjzsafn/AYgm1Daml9nOY5eP5Ir7jBgjXTU64LpYySl1G4Ucd9Yzk3ImJJs1XlyZWohHGSQbKhCAA0bawZq8zb3M/7nXFxR9DN7w4nbvQTEhtZmcRRTwWUWlISvjWXgV3YrD7Iov/PbDBzqg21xO4muShKLLgT0YHEgnW1BUTf7V/IQqbVerhuG2+jagnJIt0BIsHsG5yggWGOuF/JrH5n/+YG4rE3ECP0A3G3CAqfYKDuaF2ab18pY7MDc7vU7/3dT8jyl19pvuUQxZuPDpLugXigbnBGyLEetC9VWm9nGVRmRsEtVO2zR1xy2vloUajs/qsuGJ05gZ3TlTAuDHRKtPCNpj4Y26o8G/390dvvA/fkD3PXfChMzXlb0zmBidO1dkZR3UGZ26o2jvbvUlCtveC2+bXmvemHe81PHMDZmVYj94DK2Mw5oYLmQdyZvZvFZ7942HwjdVCKq+OcZgb3DnBqU0Dp7DzcsViboj3+Oz3IO1w+NK2u75WGVPqg4kwNzhxIgTmNBG3TWaL204tkoR8b1PVf3Smq/nT2in7qdFoCIjRhFG+IbpvHPhom+HCbgJkJAxWiDHgVxB3JQsBtioNzlEAjC0xXmHsRYRuw3UKnOj7l+j3ZkbRpESPZWAryxN4W1xGqOQFNFDVUr9tBewFCmCA/Hb/OvRvlbanY3hG5IIt47+Z9aVlk+DdiAMK2OXCIiW6/eOh520LCFACahAKG4kFjSz1qjt2xAAix4WbVK4CwxfI0c520vvtLx98O+a1tZK8csOt/lQeHktf8mbmtMwXFQZYbv3rM/7q29M3516Zia1PHTnIA2A1OQEDI8ooQRTuM+DfNBew/TDpsCw4dGmN6ZLDqtq9eLDF5VTbgHVju7R4veNRtj1GZAKUIR6SoJJpy56xoNbbJ8rttwbFC4Bpqj21MfX0vYF/heaedndrPNDWhwfV2nKqtoyRVIuKj2f8qleoZRNSwJ4jlTnP922SxfM2/kskG+6/CdvpQ0/4IQ5V4Vd5byvtQdikHFRRSY4HNsUIxziFzTH6XK16a3CrrV7ZPXo7Tum6j7prXRkWv2rg1ic8ySyDtfUyPTrGNxEp4wDkeAku9hhp/mOwxWF+o3hYVKqTR6Sn7Qp/YYY6kH+lx6bCwjIA9Mc+iAbyfcHgn1qG9eiOjjtu3iEFQIHbDbANEow2lPFCN7L5OUAPJ0CC/8NtmhruRiuTZCzsJVVdsn980TwVT1Ze+3xv6ntq7qRcV6zogGljiOuF2RgX/1t2AzZuFK2Of/5C2nD6Uh52JtIhzGY+iJbp6Q0wmIu7JVy3gPq1u1vRyni1LDoRGx5YTRQSy6bvDl6d8mKb/+byghrdL7a8Tj2Rkf9c5vKXIiwJNhgMtp4o2G64Y7ARJmEqm0k4U77226YtlaHj37wM9rgyUkz5braRMqyGURiWqFAgbAFbwOxO3gcLYbExK48fLFHIpfggT5JrYoVKsExR6W4J6Fl6jvdkaIEq1iNK7leGLfmWAdANKfbcdwjE6vDgrqtMjRViY4ihB6EkooMo08Vv7tXxif4Lp7lQw2fsQczwGb9c2HSmVyXwEDL0hciNRYUMsBlV1zKs4bOOyDlrkVNRhhocWkj43k5ZmetSb2PArtmv+lf+Ue536jF3YoCgUzpUKe8F0W7YSOJAy6eMQQMs8kUtOicnyAriULtAzY5HMAhpZQoP+DdqD/+APjDI7S9T0Uri4E9xDbcD5iChYsEjwKI6GVc1Ust0x1ScSVJMvfb1IGbBK2/Ugcwm2CzQayPMMQzDFsYKeP0uMfSlaFrOg5aTWr9t4jOzwu0/v3+scoGWmIDfCpGYwC6XBBQhnFD4aB1VGpujMpmef3RryU/74xJo+Ve7DHHgH9nyz1kL+TSTh5xeG8cP5DFznLvJJ+/1Suv48dFjc/FHHiCfbsYF+QQzEvLpvFVl2pGQG6AqE1FESVZlIoooyapMRBElWZWJKKIkqzIRRZRkVSaiiJKsykQUUZJVmRP2hdS2m9TYb9a8P5tFfN61lFHyBgcvcvTRyy95KHmbwab/WsFH3W9ttvJbYybtd+1JBar+K+Gb/SKFUg3DRSyBwwzKy7HMtlp+ctjuOBb2B8YfgC0p4TqTKEPQLb1PLzkt9BUZ4KD+SA9qmUUwP3ADeWIErMhT9EvzO+PZNoxJQwlVA/AAv7DXBR0N6uyQMGNW2NTnDTo0GdvudHFybSW7jX0RYLWgNOF2XzHICcGyejIz4c+FVRVtSURBrJAopR9xm7Q3933o9tLzmle7PvoMj2URo7qEvT+ZOcQvSzkpYKJP8mEeUErhRElRmrn5wBWnNY4g5xU22TDMyCkHl3pk7Rl7quSnfYbT/E19Q3a7qa+dy2mrMWI+17MxMYiQCTl4eHq6nvnchtrsIYQougDfJ/RAFNuEBGfD2+kHwz6V8c8t23jBtcGjPU0gawlBGscJUoqeed26vnL8m2u3qvKHDJZYZDdQn7Lrz1Ek5AVkZj3zCvL7m1aLRz6XmUXUSkoCnUGc6PTX5nRnsjnGZ13DQsyafBbNXXnWb3l4YHfmRjzTE5qxgFuTms/VlrolKfWi3KcfsNA1N6AjbHeBYXoKYTuL2oASwCYQ+rk63dK0M2/ufPK43MqwMd9/j2o65MBO6mYnlo9lcesUYWFWnG7iimnFBcBOP4ZgRaDGGGSAuK2fryuPgSUDM40dqqeJj0KqpvsHjG36JmX8+aFUMndLMbgXDVQBkYFDAgjTVU6YTuvp7ApPodFzzUZLoUFLg40RmEITMmJHDwwawg7NYrNDovpnm7QZcyckw2/5a00bJxf6PnScJEGI79Mg9svZQvP6+H1ktgc7lyIRxsuS4CWZSh5NOEidzBL9cBfHG6J2yguIdc2SgWFjaQFwPY+KyVMB6k/M9TJU5bE0FL65C14H+S2DSk8/MeXn5sDxW2vtfBub3ZAaImEPYIZI+OXC5hz9nFtxs1sAHnMIjw1qzq0FS5bv5npVk9ji78NFkr5pYJ4wq461z4bNl46UnnjiPjX7h9/PzP4R1wvD59GJZg0iKk3y2pOS5Wvxb/Pi7ptAfN6ac+EDho8xKgwssMKNwTgQ7QX0H/26qNl2lqj6yzRcStvbvezEY3M2+a8JX5QzqMW3YKrS8PuZSiOu815cC7Ryh1Mrf5iUVl4dILWil/uywwxegkxKGF90z4Un2YLNHZb7TMs9NbVllXBXqmJCsfuZiiGu860YLw/CnMBtRsZ6NbWJWPDJXL8FmbMWA2xhoZAXhsfSFPHe1um/BE590b3WsLz5UhqlEP4ABKUQISgJRJ6YcyFy05z067PZ/HrOrOB3Pdq1DRz/7rvG4sjNt1Qd45+oezFMe+0Kg+rAhUmx8uhYEFbCs4UStRqyQWqrYgj3r9vig35OG/W+zDGJX9cjA77TnKgTZVS/eIFVXRbTr+uZAa9OhBo4eRJG8AuPMOFvgvzilhvUURPeNfDeExfXrKa8L9W1mbMFNlqBgZ0/zO5uhxh6omo0hA0xDPWyWO3DiBGFtzShHNSC9UBqfH8AtlGA/8+PKYUpYcORiNL9uVE7qsB1LQaYIwowyGOdpZ3Mc0w+cUUfTTyxTdLTHDxkriaac2WuUrWYz2XDPGyn3/lTgqOi1O5O7eRPgypSGbdDKUSoTEPKhrRzKIgHgHvSgDsVNDpVnewknZmC67WYROBUua4bN2CRfRF66KmojRuYo8i1OMHkmyT9CYJvEn4SnW+SzhdJ55ssMp8k/UYEnySbbXLxk6uAzdGH/rbzhEO5t44fFi2MfbvnaJkNVaj0t97M2eFdKLndK7XrCLPQAeFL/zX/Hn7s4Yni7pmA2XEeqtMTVb3wG5AetTiBIHJkA6koJMG3Qo7L+s0KDZhpeTqysWvrdUUgCaajlPz7vTSbiqsCDwz63LhnFVlxazghSrmcKOVYnKBTAHJWu+C9FmBgpANA9Kp3qg/DH8X0YcT1ktjwxkbMJ9RGk5s7hhRhT+f9j9lTOp2PgeypjNOehv9nT0n9TNm1Prhp8399lk+vYKb+8/5NHuwpnaaJB0sRzWkpfi9xe5oyo2fH15PcQ5b7388dsWpPXR7sKX2TgAeUwjlREpekPaX7UKPb02hOexqutafzTX5NQJ9O/BSztSjl9DpNlOC7471XbM7VtOKSRcAlQR0LriVBdS3k6bwVs5UnITdAMRuCA4809QgOPLKYDcGBRxazITjwyGI2BAceWcyG4MAji9noERqjYg1aRXQOl8aex0PF2gLelGxtQCUXjUcSQapIKpme82foxIxNJ3TaQh50spBNJwt33f19woNPgbm7tuduHniPes6vbIQkXqZg9kZhM2xu3sIEeEeBDl3CeKVGhpMLQXpuLg5bOu8i4lV0sXbWUdEqpUIRCT0WvJh/5PPVrzRL2K6J08lqE2t6zagVK3hcLZGVd9mii1qmggTg5MfW9VUm9lPAWi3YRQcS/0jlGuK7gwgDZjnyUjNpKiHbHDE2peuJBbPLAQPaRiRInSCyCpWo+svjQ2QxFAdojV+OhP1OC163xK93ViYUvEq1wuUD64ltZ5U7YYeBGKGC5wY1cvytzMm3Qk0olSQpMF4KabdIeEtZwosw9VLgEharK4iWTPiCAHZRlUsUIsgFVcARaVQySZz2d4yYWHsPMVQXmbxbprOA8rRVRx//PPjlPeW4/PLWcqRfXmzymNPpVU13e3QzZ2F/lrawfwlvbtJWYDg3ieDNJd0kgjeXdJMI3lzSTSJ4c8lYKPes55k5a8+IN/8xduh1Qae6BWKhRX9uW+D9pHXgzPLxzVcHDx/BcK7Q6iMHEp2MlwfnupRNkybarp1OOmywdu3bLbnatY9iUsnw3K79YfcKpUunDg9NT26SNndn744m0K59qyVX89ss4xBmUHtOr1y50gDt2vu4142KmXxavHDCuG6DXcTzTaJd+zJO7cw1Be0YpF37pePV1y3UTPaa9D3GLPKNxUOTaNc+hVM5o0xBOQJjtmtfaXFLsWdnrtdW2Y3DdxQV7EyqXXsSp/LiTIgoyOjt2h1udheWHXRbNPdOmdOHgkY7G7ldezSn5n43uubgTSXWrl0o+71Cw33ufgvbJ5itKX//kkm0a8diCNZ27aO0ZE/L2OLU/6V27fS2GEZu1/7Nkqtd+yNmSFsi7dqVvhd6Tl70h++UWjHB/1qu2cF7u3Y6uRkPLci/WHK1IH+lH22iHu3a/6rYvPTyPlt9t7RJL9WghWx88acwDSu6jeABq0ecWP1tWJtr7HbtGWxm7D8S/iKR8NO7CRmMhL+zFRcJ/y9WJUHC3044st5h4WrR3EP3vu8w63Sbx9PmPNtIuGESacXFWR5gZRAS/n+O3mw7IOdb+Jqy3xKPHOkdaHQS/o6cqIBxYzJrB/0O/vBHwh90+sytFK9zXgfmWjh71Pxy1mRI+Btyqk5oHNUZnIS/Wrslitx97wMnNeu1b9D1ax9omU5Dk/BjVoaVRR1YGYOR8A9RLP/z8+OD4St+RluNCo+eaAIk/B05wfnFyoAk/H836WG57ZcfQYsulsv4ciiZuvQxHgl/Q06EwJwm4rblbHGb2Ltho58drnqvve2adXnpy+ZUHgHsEF+CUgE8OjNms2DBuUV+ikSefz/BhQEQVykT+8eCGA52uVbG6MXlQO+wyPq2TNaDAkJda/tAILQP4psH8F1LD5MuAnxnM8MkPQ9WVc5/LXCVwAJdLNR77sdLzSoHrztyq3PKaQtao7Oi9O6ihVB0w1jMEArS3u6xYutilw7G7mb9QigbfPpKZf1VMnR8KR3uofr2tabPjiVHniVuzI2nnZDCbkSckMKvlwTt7xrO77/E6MGSdmTqESjBV5YrpfJoDm6bES611m28IvCbFH3QYWnn4XWoY5V8AHOsaiUloYzZnMqYZBrhj0CfjIVHcLxSA9yXJBrunbp5dgBLVrCyiGssbNohOlapkjYWNuugHqTSYL+go9XRH0cIVsTMC14+MN1vzvI+y6h+DX5AlCZZgeh/mS8qCWWN5FRWoknMHPgovaLVKvkb3fGJqn5qjhnkPG3GxGEOfwfumTdoyezK45KKs1Qu7tLBkzDk8KjnRQYvVFPx+mw9o1TCknNEW9vVEQkNXR39U5ft8fdtVuGUcZe9AIDlJAA3EABA06JXJEq6MnaSiWMv76anSc0CZv1R+17v6XeTaa7MsId9IQDjuQDoOkQbaK74H6vHoTfmNlg9TntrrnocC+uSrsf560Vn8aDu30Nmyzb0iu1VX2UC9Thtrbmym57WJlBUMHnyZAPU41hN3TPRp/1Nn2Xj6yf+XUNyziTqcepxaqe6KWjHIPU4+weI43rf7xo4qc87Uc0P6jiTqMex51SOhSkoR2DMepylsVGua2olhKRNnXy2gZ3rR5Oqx/lhxaW8d0YPdk2oHifvymrPFO9pPpsne8cPOu7UyMj1OE85NXfX6Jor0Xqcnx/3+zeo18p7tn3r5MnSq5tMoh4HiyFY63GAISTi1JX/F+pxbEo3EG8qP9Rv/JT4mwcXVDJ2Pc4Ia656nFhmSFsi9TijRx6K/fgyRbRnllfTsXb13/Bej0Nfm/NQYzLMmqvGRGVdUvU4Fbe/UZr9IvNZuPp8W7t2UaN4r8eh2wgesIrlxKq3YUMdY9fjrGIzY4MOyBvJw9aJdu4PV/zzoMdLaqakUyI8O+mvkiTEMk+Y6pG+qOMrVyfA02PabE6yO37KVCiBnHn94ScgR95n17ZnZs2s67dmuk3Alx0XIljfj5nJKShkjD/LKGDCwgsexUKMSvq5Jx1HpfZp9MZJ9cUCX0jM5SCC/2jnP+X1xZdF5idso2QKoDCZNBDY9SHk4zC14qpczaZKh7w0X/u2F0TLW9w/sOlkki+NBQOtwIq4dUfoTGCFiyiHrAhnwDh8xReTB/2QfBGYPHSNDkqxaMkTRGTTLIgWuQe9CdQz2VD/MW7LqkoeZj47ejouzEwIXV3o6Uurkkde5xOb9NN7PJ3YLOK84dLIHTO6RtawaSRjZlri86BP/vMGOagXTm7ci7on6geLZzTMiIx1eYnfIFQDr4/3u0xUw5AX69UWq1RIIR0jLAmMwf4OC4c1kv5qnWIQ+hHJciHK6IEyqfYm1Kszt3Px67rSgAIw/ctC2nQfRFEfJFWvXxZBvwQhgus4BP0S/EenXwobd7tj1IlnXmPPbEu1eB1+lU6/NKbb8pE3E3oGpB/MWPAofWpHUk4eRi0yPRP9gxH0TGyatobsAYQa0eSDX54Orf9qk3ju24PnvnTZs7M42uKfDh9yCEG9VkCFPHdByNOurFEaT1rD/o591OA7xPfPNxj5v2OmJsWzbeRwBEsUm67s/fJnGwiINIkqdOB6sqF40Yr7FUNz3vyhGNg6619OlZmL8CchuI4JQUkorSmn0uobVmmkCTYLEeEGFd4yUjvvMd2Qc5Qt2KvlS7S+lserZSqs6g58BMVgInWV9PrzizFrPoRN+aVOZs7iEQK6rsxDEzWSfgotgYWAluyCn+rJdFeehXJ9FdFdcSnVhVOplcoyuL44GygQg12G87Oga6ZpNCmcA90MWjpmmw7sKt9DPNWDsEsHvRGd7r2aYEOccOlr2Vx6p/t3ws0V5/2X7d5feuSOmtTzIFZRsfIYjRD2laW6deiv2HpaO4fHxMCliEShINqvymHjPEje7YEEmN5wkO0VEPGSrttSYGQ00hJTMLalGosF1mbFrSOzxbrvgrmphi+M/KLBnnsXZC4+EDauU26dcV3GUtmGzFi+YqEhIb3pejHnGFzCN4BYHfRCzLFUIK1hpl/VGK5BJTYqkLjkeDa628D1rM/4ShtarMv7YsfYUo7RDZhizif4zatwfnMwSkxgOxkbgXrk2KwhzxAX9dTB7b2HVJooC5jVXDj4zrb2x6jjEt5tKPhLccL/0bD9vUn4GRVixW3Ujc8IWO0MvglSI/SOu0W0FMXdzXcvYAoYDqavOzYhCAeTxeZg9ObzcdNqr+T5fERpW7t7uX0P2lk3YFS38+XUBfh83F/UFSSnrQ1becHub808h6wCfD4t67UfEbf8gNfWi86PD66tX7YAn8+p0JQpWY8qBs169nKFZEfE3wX4fFadW/HYecSM4LXbm465X+l4ywJ8PojOvyS3IaLzL9moF9H514IQNZtfOXD91h+iyS4/DnndS10FRJaEaL65X2JrH3ngNN85tU9/PD8biKwIkdW01WERfbxD54/dez9i5GQvILImRHlDwpYlflwUutMuvVf7lx8g+6INIZqxZsWBlHBb3/1TJyf0694sEIhsCVHbMtf9Kn54Hjyp7LkLmc36ngCi8uQDV9+/ODH+Zti61VVav5S2sgQiO0IU2/j3Lu6qpkELrpV+G9djwlAgqkCIGiRYVekj3O+fLf5uMeJO/EQgqkiIVE29IgTul/33lz7nP8LnbhoQ2ROiVt9GjfItJw4evSzE68volvOBqBIherJOYStN6BGaMenTObN/u74DosqEKOboE/M9A7/4jk24/e5Gr5n/AFEVASsNlAMhutKj4Xeb13O8clatiJ639uFWIKpKiF4/O3ok2Gpk8Px+Povtms6GRIqOhGjYjqmxIbad/Dcfjpd2ayu1ACInQrTNseyjurcTQ+dnX6s+4uL8Q0BUjRBZj/ir88AF14M316+3p7nfJBUQORMih4dPGpyZ+TJ8ttqqYqRXhRlAVJ0QTehuETIu+Vfx3LRBr+NHfDYDIhdCVCvK/dSep0N8lvX6sGu2Y2sociVEv4mm/T7M7c/QbUOFFSrkOi4AohqEKKCBZs69IdV85gy81Dy7UvITIBKSk2j3gaNXMoeFZre66hPX1vEMg6iqpoCFqCr2tXJvi2pnw5fKJtfdMKH2KYTZ0Jeoah2biaoSs3vTwmOnxIs35A09U31YBnXpKh6SoFBKEacv2ALgesQdQvK8LNamTh0HAmJghIgOgDoet6AbKOSrMVfVhEDXhYSbWHDHBtIGozKHESA8PmWjXwPN/NOo+Iugm9Xb3Jt045cIv8WjfvnY5NR9KhV98Q6j8pwghA1+btmw1UM7glXpFRu9YuIWkTIwNLC6J6kMtjhSquXY8RPwfnIFtnQix4lQooInrpVx8mgkir2fvNowPlQYuKjOkjcdohIeUcvHtZ/DLB/PF/EdN0C4TnHCdcDGJCI55lFHPSM5d2KiSfPVpYmVaIRxkoEyIQhAtC2s2evMra5sPzzX77woPfb1pje/eFelVRoSj0VUGpISvrVXwZ0Y7L7I4n8PbLAzqs31BK4meSiKLPiT0YFEgrU4rNqAfS8X+85dYvng5K9bqTyYRTqCxQNYpzjBAkOd8D/r2fzPf8wNRWJuoEfoBmNuaGbLxdxgb1sSzA2OFheXHT8WF7Zs8eaab5cebM6js6RbIB6YGzxtuQ6617M1CHPDUvPLa8eddBDlZte7W7mxZUujMzdU50QFjBsTrTItbIOJP+aGC8E2gS2/xgetrbQzdeW4KT1MhrnBglN1P0w1nOGZucFq+Orupy3mhmf8OPplyR0Pao84wzM3YFaG9eg9sDIGY25o6Tw79cX3r+L5cyXm/2aN+mkCzA3VOcGxtzUgc8Oi38rnjVjW0H+JY+be2pHrnpsIc4MFJ0I/tHHbBra47dQiScj3NlX9R2e6mj+tnbKfGo2GgBhNGOUbovvGgY+2GS7sJkBGwmCFGAN+BXFXshBgq9LgHAXA2BLjFcZeROg2XKfAib5/iX5vZhRNSvRYBtarTLTFZYRKXkAD5Srrt62AvUABDNBF8XO2/n1HNtJ/2yKn3PYDYl/TsknwbsQBBexyoZESzf7x0PO2TmWi+ooxCIWNxIJqlfWqO3bEACLHhZtUrgLDF8jRzvZI1O6seqd+C1mR2GNiVsqjH9Rp6UvezJyW+aLCAHt84m6dmgkzwyY/Ej7b3Wl7Qx4Aq8AJGBhRRgmicJ8B/6a5gO2HSYdlwaFLa0yXHFZ17PN3FyuM8w/dV6XLq8wVW3rYY0QmQBniIQkqmbbsGQtqvX2i3H5rULwAmKbafqrkOt9nvA/Y+myS0x2VQwgPqv1WiUu1byqZTnw841e9Qi2bkAL2HE1ZtsLCfpLXbK/t4xYP+3Pph930hB/iUBV+lfe20h6ETcpBFZXkeGBTjHCM2WyO0edq1VuDW231yu7R23FK133UQofKsPhVA7c+4UlmGaytl+nRMb6JSBkHIMdLcLHHSPMfgy0O8xvFw6JSnTwiPW1X+Asz1IH8Kz02FSaVB6A/9kE0kO8LBn9K+eLWp3iHFAAFbjfANkgw2lDGC93I5ucAPZwACf4Pt2lquButTJKxsJf0W+95uNLY3T454w7NDz9eg9qWuFxXrOiAaWOI64XZmOEhf55IO+cVMHnwxuBmgtu7ediZmABhNvNBtExPb4DBXNwt4boF1K/d3YpWxqtl0YnY8MBqopBY7v5rxR8+Iz97TfW6+OzyhjHVqCcy8p/LXP5ShCXBBoPB1hMF2w13DDbCJGxkMwlnytd+27SlMnT8m5fBHldGiinfzTZShtUwCsMSFQqELWALmN3J+2AhLDZm5fGDJQq5FB/kSXJNrFAJlikq3S0BPUvP8Z4MLVDFekTJncqzJd8yALrtij33HQKxOjy46ypTY4XYGGJIAOqOfD/xrLif35J/J1pMjO1DK8bCHsQMn/HLhU1nelUCDyFDOERuLCpkgM2oxOVZw2cdkXPWIqeiDDU4tNCNXOoPnRfmOyhw9bNqE74oF/WhHnMnBgg6pUOV8l4Q7YaNJA60mpY3ShW7RefkBFlBHGoXqNnxCAYhrUzhAf9G7eEf0AcGuf1lKlpJHPwpruF2wBwkVCx4BFhUJ+OqRmqZ7piKM0mKqde+HsQseOWNOpDZBJsFem2EOYZh2MJYAa/fJYa+FAlF/7yxrr0vXfJa16TZpohvGedpiQn4rRCJCexySUDRjhOKplpHtYnNUZlMzz+6teSn/XEJtPyzL8/V8s9KC3mOyUNOr43jB/Jv8itPrOp18l37SDk/QDj8IA+Qj7DjgnywHQn5Zt6qMu1IyA1QlYkooiSrMhFFlGRVJqKIkqzKRBRRklWZiCJKsioTUURJVmUiiijJqsx5x7Nd6is+++1opcg2z8nZxCh5g4MXnV2hlV/yUPK2hU3/tYKPut/abOW3xkza79qTClT9V8I3+0UKpRqGi1gChxmUl2OZbbX85LDdcSzsD4w/AFtSwnUmUYagW3qfXnJa6CsywEH9kR7UMpNhfuAG8sQIWJEP0C/N74xn2zAmDSVUDcAD/MJeFzRmwbWv08zTRFll/jr5qsmaCcXJtZXsNvZFgNVEW8LtvmKQE4JldTIz4c+FVRVtSURBrNCpjHt2nhMDv3mNae2cff3hhXk8lkWM6hL2/mTmEL8s5aSAiT7Jh3lAaQAnSj1smZsPXHFa4whyXmGTDcOMnHJwqUfWnrGnSoJO3fqrY4uH4XtG/rPufmaVf4yYz/VsTAwiZEIOHp4eoWc+t6E2ewghii7A9wk9EMU2IcHJrhtR5xfX3SFpE9WZqjEZShPIWkKQNJwgDdAzr1vXV45/c+1WVf6QwRKL7Aaq5fM0q382/ek3La3h0RZVd7emZhHJ5zKziFpJSaDTlxOdrrZkYLSVzTE+6xoWYtbks2juyrN+y8MDuzM34pme0IwF3JrUfK621C1JqRflPv2Aha65AR1huwsM058QtrOoDSgBgO2Ifq5OtzTt1Jbnrden/eW3/dL6h5c++felbnZi+VgWt04RFmbF6SaumFZcAOz0dQhWBGqMQQaIc/r5uvIYWDIw09ihGjHo2uibVrf919kf7pTe3bUt1RKJwb1ooAqIDBwSQJiOcMK0W09nV3gKjZ5rNloKDVoabIzAFJqQETt6YNAQdmgbmx0S1T/bpM2YOyEZfstfa9o4udD3oeMkCUJ8nwaxX84WmtfH7yOzPdi5FIkwXpYEL8lU8mjCQepkluiHuzjeELVTXkCsa5YMDJtP9gDX86iYPBWgfsNeL0NVHktD4Zu74HWQ3/L68z436hweEpjdt/WxrxfyhlNDJOwBzBAJv1zYnKOfcytudgvA8wHCY4Oac2vBkuW5vV7VJLb4+3CRpGevT9tzZEp10UbnrLM/4kOoLEfE12Vm/4jrheEzcOsX+cVLdn5pNy8k5tmaC3nAJ48THzB8jFFhYIEVbgzGgWgvoP/o10XNtrNE1V+m4VLapwnN9zX/53f/1L4Od6Mq32pGVRp+P1NpxHXei2uBVs5zauWoSWnl1QFSK3q5LzvM4CXIpITxRTPhBxyy8XvrGj5v4IYDQ7MGlaMqJhS7n6kY4jrfivHyIMwJ3GZkrFdTm4gF/9jrtyBz1mKALSwU8sLwGFz6xtnRs277bvh1waGqX9p1o1EK4Q9AUAoRgpJA5AYnIqfsSb++nc2v58wKftejXdvA8e++ayyO3HxL1TH+iboXw7TXrjCoDlyYFCuPjgVhJTxbKFGrIRuktiqGcP867sLRzmmj3pc5JvHremTAM+2JOlFG9YsXWNWlM/26nhnw6kSogZMnYQS/8AgT/ibIL15mnNPEoHk/gkeVe7bCt3S76tTBxxbYaAUGdv4wu7sKYuiJqtEQNsQw1MtitQ8jRhTe0oRyUAvWA6nx/QHYRgH+Pz+mFKaEDUciSvfnRu2oAte1GGCOKMAgj3W6djLvMPnEFX008cQ2SU9z8JC5SrLnylwptZjvZMM8bKff+VOCo6LU7k7t5E+DKlIZt0MpRKhMQ8qGtHMoiAeAe9KAOxU0OlWd7CSdmYLrtZhE4FS5rhs3YJF9AJbMTkVt3MAcRVYlBN8k6U8QfJPwk+h8k3S+SDrfZJH5JOk3Ivgk2WyTi59cBWyOPvS33h5X87YMlfqPqvFgxsdtn59Q6W+9mbPDu1Byu4iGwTcGPDrrneuf+qjmpRZNirtnAmbHPqhOT1T1wm9AurXSCQSRIxtIRSEJdu+lHLm0bf3AjP1pq6bOrzmsCCTBdJTqZPVSr7l/WjxX2vJQ3X7DrHhAKYsTpWWVGBSAnNUueK8FGBjpABC96p3qw/BHMX0Ycb0kNryxEfMJtdHk5o4hRdjTXf9j9pRO52Mge9qZ0552/M+ekvrJej8mo/L1W2H79p7o5ZSkOsmDPaXTNPFgKSI5LUVAidtTl+jDreetveO3Wv7s36DfN7bgwZ7SNwl4QKkjJ0q/lKQ9pftQo9vTSE572lFrT3eb/JqAPp34KWZrUcrpdZoowXfHe6/YnKtpkTwsCSpV4loSWGshz+WtmK08CbkBitkQHHikqUdw4JHFbAgOPLKYDcGBRxazITjwyGI2BAceWcxGj9AYFWvQKiKHGJ09j4eKtT28KdnagEouGo8kglSRVDI958/QiRmbTui0hTzoZC+bThbuuvv7hAefAnN3bc/dPPAeNRouGyGJlymYvVHYDJubtzAB3lGgQ5cwXqmR4eRCkJ6bi8OWzruIeBVdrJ11VLRKqVBEQo8FL+Yf+Xz1K80Slu9yIUja5E149tcatVdPa1WRzRJadFHLVJAAnPzYur7KxH4KWKsFu+hA4h+pXEN8dxBhwCxHXmomTSVkmyPGpnQ9sSC1IjCgbUSC1Akiq1CJqr88PkQWQ3GA1vjlSNjvtOB1S/x6Z2VCwatUKzw9oJ747ciKJ+wwECNU8NygRo6/lTn5VqgJpZIkBcZLIe0WCW8pS3gRpl4KXMJidQXRkglfEMAuqnKJQgS5oAo4Io1KJonT/o4RE2vvIYbqPpN3y3QWUJ626ujjnwe/vK4il19eUZH0y/tNHnM6varpbo9mcBb2p2sL+w/w5iZtBYZzkwjeXNJNInhzSTeJ4M0l3SSCN5eMhTbvrd/gxNp5gdsuuFqrf6gaF4iFLh+5cbju9JchaUkR1+IOKA4xnCu0+siBRCfj5cG5HmTTpIm2a6eTDhusXfuqylzt2hOYVDI8t2u3c9wx55j8eejKy3+Mbp552BTata+ozNX8Nt04XCjUntOLFy82QLv2ybMHWgalxoUs9Iy8Mv6PU0km0a59Gqd2xpqCdgzSrv2Lol6Ufd0V4m0ql/sdnCKomXRjtWsfyqmcBFNQjsCY7dpnWeckaDZJAha++qt+ysfjVFpiY7drj+FUXk8jcUCZZLv2Iw5dUnu0nRWSHjx+u/uBxEwjt2uP5NRcgNE1B28qsXbtKdXMa6XWig+d5Wd7Ntl+MrWxubHatWMxBGu79gQt2dMhtjj1f6ldO70thpHbtT+rzNWu/Q9mSFsi7doFY/5st/b0Tf+dvef/VV0xaRPv7drp5GY8tCB/UpmrBfkd/WgT9WjX/mlZSo56W+XwTSPzJlb/q48N7+3a6TaCB6z+4MTqjGFtrrHbtR9mM2P/kfAXiYSf3k3IYCT8oipcJPy1q5QECX+3yS6aF+N+8duwdsDlw+e87vN42pxnGwk3TLyrcHGWt6piEBL+7EuP485erO43N/iQ3d5R6u1GJ+F350QFjBuTWTvod/CHPxL+cuOjtzmEXw3IObdqWHR/x54mQ8LvxKk6O+OozuAk/NcedcwNfh8aNG/QxczH/dN3GJmEH7MyrCzqwMoYjIT/kTR1xZUGft4TuyVEmNWtOt0ESPjdOcGpXcWAJPw7nlp0OHiwc8DWQ7uON6/950sToLOACDlxIgTmNBG3HWGL28TeDRv97HDVe+1t16zLS19SG+NYY4f4EpQK4NGZMZsFC84t8lMk8vz7CS4MgLhKmdg/FsRwsMu1MkYvLgd6h0XWt2WyHhQQ6lrbBwKhDRDfPIDvWnqYdBHgO5oZJul5sKpy/muBqwQW6KXTSKnPhu1r/LMtOo65W2kxtadtkXp30UIoumEsZggFaW/XVWHrYpcOxm6GfiGUDT59pbL+Khk6vtxwd2rOj7Nz/dc7BTb5u30mlUuxnC92I+KEFH69JGh/53F+/6lGD5a0I1OPQAm+slwplUdzcNs0/DTTIVtWwTerYURCu3VraGOVfABzrGolJaGM0ZzKGGIa4Y9An4yFR3C8UgPclyQa7p26eXYAS1awsohrLGzaITpWqZI2FjbroB6k0mC/oKPVh+0ddnUc0807883uTR3iKlK39CzhB0RpkhWI/pf5opJQVjynsqQmMXPgo/SKVqvkb3THJ6r6qTlm0PGZHmd6dz4aMGZT5S3dLc2eFmepXNylgydhyOFRz4sMXqim4vWL9YxSCUvOEW0lPpnuvfONW0CW75llgoNfxhp32QsAmEECcAMBADQtekWipCtjJ5loU/bHhr9TN/rldvnFtXXZ7qOMetgXApDIBUDX/tpA8+j/WD0OvTG3wepxGjlw1eN8ZEaWPNfj+LUMn/jcolPw+h6yfhdXnf/DBOpxGjhwZTdrOJhAUcHo0aMNUI8zvM3In3NnrgpettvnSoY476lJ1ONU4dSOtSloxyD1OIsc5z5XXF3qs31L7+9eiScqmUQ9TilO5Xw0TrxkQvU40ac77DwaUs8r2+ehTfXs0k9Nqh7n3ypcyrtv9GDXhOpxXHNXdX9+tZt/6pmv1bf7nqtj5HqcPzk1d8HomivRepwqbQ5sX64cEzjh2eoFLUtPmmAS9ThYDMFaj/NRG6ce+79QjxPQQDPn3pBqPnMGXmqeXSn5iZHrceIcuOpxujkYph6n4t3RMvX1U94rXw1xm77XfSnv9Tj0tTkPNSYDHbhqTCQOJVWPcy5tYTdPj82hG1+2enjuxrVzvNfj0G0ED1h148Qq1LBxqLHrcY6zmbFBB+SN5GHrRDv3hyv+edCDmq+y7pQIz076qyQJscwTpnqkL+r4ytUJ8PSYNpuT7I6fMhVKIGdef/gJaKqc3QeOXskcFprd6qpPXFvHM6zvx8zkFBQyxp9lFDBh4QWPYiFGJf3ck46jUvs0euOk+mJBM0jM5SCC/2jnP2Pri3c0tT9hGyVTAIXJpIHArg8hH4epFVflCTZVOuSl+dq3vSBa3uL+gU0nk3xpLBhoBVbErTtCZwIrXEQ5ZEU4A8bhK76YPOiH5IvA5KFrdFCKRUueICIbTrbIPehNoH6SDfUf47asquRh5rOjp+PCzITQ1YWevrQqeeR1PrFJP73H04nNIs4bLo2ct6Nr5BSbRjJmpiU+D/rkP2+Qg3rh5Ma9qHuifrB4RsOMyFiXl/gNQjXw+ni/y0Q1DHmxXm2xSoUU0jHCksAY7O+wcFgj6a/WKQahH5EsF6KMHiiTam9CvTpzOxe/risNKACzZQVIm+6DKOqDpOoOFRD0SxAiuI5D0C/Bf3T6pbBxtztGnXjmNfbMtlSL1+FX6fRLY7otH3kzoWdA+sGMBY/Sp3Yk5eRh1CLTM9E/GEHPxKZpa8geQKgR3SDgF9cty0vl+c9pmzlgzYTjLYqjLf7p8CGHENRrBVTIcxeEPA0rGKXxpDXs79hHDb5DfP98g5H/O2ZqUjzbRg5HsESx6creL3+2gYBIk6hCB67mS4Q/3/1+WrQs5tahRFf7DE6VmYvwJyG4jglBSShNyKk0B8MqjTTBZiEi3KDCW0Zq5z2mG3KOsgV7tXyJ1tfyeLVMhVXdgY+gGEykrm4OGXpmtjxHvNVm44/h//Ryo+vKPDRRI+mn0BJYCGjJLvipnkx35Vko11cR3RWXUm04lVq6AoPri7OBAjHYZTg/CxI8Ok0K50A3g5aO2aYDu8r3EE/1IOzSQW9Ep3uvJtgQJ1z6aTaX3un+nXBzxXn/Zbv3lx65o+Z4aq1sVKw8RiOEfWWpbh36K7ae1s7hMTFwKSJRKIj2q3LYOA+Sd3sgAaY3HGR7BUS8pOu2FBgZ1bTEFIxtqcZiwZdit6i2xbrvgrmphi+M/KKDlrx/8mfcr+IZ/1Tu1D97C5U5xYzlKxYaEtKbrhdzjsElvCPE6qAXYo6lAml5O/2qxnANKrFRgcSlXd8qZeznx4dtiC33rKn12fOMLeUY3YAp5nyC39yM85t/MWyDaZbtZGwE6pFjs4Y8Q1zUU/vXVa6mGG/lN6HsnX+fK7pS96AwliJDwf+qPBf8j4wDP6NCrLiNuvEZAaudwTdBaoTecbeIlqK4u/nuBUwBw8H0dccmBOFgzrA5GL35fNy02it5Pp99r1RmbYZdDNiWNzl86Lw6wgJ8PvbdLLw7HdsSuLzCfIexaxT3C/D5HEnaePN0mwuBGfIbz9KjA5sW4PM5cn/AzF6LVMG7F763rDW0+e0CfD4f7q1ZtVM1yGtukG1Mlb72xwvw+SA6/5LchojOv2SjXkTnXwtCNN6yddDuES5hGaP2p9xv/8QaiCwJ0Yvdf6Yk+P4RtHVKyC53txajgciKEN2YNS9z56tIr4WrVszvOazlr0BkTYgs6tzrduRaj+Adw2ZpElN2iYDIhhC1G2XTWLr3N9/UC2dkDTY92ANEtoTocamINd8iHwdtq3tt/qAtlb2BqDyJxq+WXQaED/Za+KNn18i/tswBIjtC5H60q8PH8Vd8lt++1nXmbok/EFUgRKWGmYeWFgp8l+bVyXs049gKIKpIiEq39o85+o+n174/qtmOHdp4PBDZE6Idw2zaZJ2/673taPiKpQ+b9wWiSoRolEfYvsjfvgVmp95+17nCnllAVJkQJQVVl5facTz4wLWuj+0+/WUDRFUErDRQDoRo26Y/GwtU4IGPdzpPfhpzHYiqEqIBQ5+VTn6TFzj97rpPQ1XPdgGRIyEanej0+8KnYwM2lorWZH5O9gQiJ0I0Y8wRm07vr4YvvbSwzPT6jYYDUTVC5Lv9nMDsZbvwCZ5vnA9fPVgHiJwJkV/a8xsTv24MGuXlq259cDHUcnVC1PbavDyXR99Cd4iXJQeVKQd5pVwIUdU6G+6LSqn9dvipKu2xd4kGIldCVL/+njeLNv0jmvPyydzfJpaXA1ENQtQh9bIyya+e17bhz0bd6j4fEoQKCVGt0dt7fv7pGH7g99sfJ7kHLWQQVdUUsBBVtXm8YnDzNWu8dk9bf33Zng8ZPBBVnWUzUVVidm9aeOyUePGGvKFnqg+jfpa5eEiCQilFnL5gC4DrEXcIyfOyWJs6dRwIiIERIjoA6njcgm6gkK/GXFUTAl0XEm5iwemqkDYYlTmMAOHxtqr6NdDMP42Kvwi6/17F6LAzbToGrz357Ppc/4lTeTyMynOCEDb4OVmVrR7aEaxK91fVKyZuESkDQwOre5LKYIsjpVqOHT8B7ydXYEsncpwIJSp44loZJ49Gonj6SbxTG8v5QTMDT2yYP6L8XGr5uPZzmOXj+SK+4wYI1zZOuNZVNYlIjnnUUc9Izp2YaNJ8dWliJRphnGSgTAgCEG0La/Y6c0G98dcmdBjks+binO2XHnfpQas0JB6LqDQkJXxrr4I7Mdh9kcX/HthgZ1Sb6wlcTfJQFFnwJ6MDiQRrYVJwjZYVDgRPsthjHRTQi7pSLNIRLB7A2sYJFhjqhP85x+Z//mNuKBJzAz1CNxhzg4sjF3PDd/18pY7MDZqXLWZPenjDa+3t/hd+ez59Co/Okm6BeGBucHbkOuhe0dEgzA21Iu13ZTVYJVp056/WZg9aLzM6c4M5JyrfjeMTdagyLWyDiT/mBo9zDy5ezzgjnqdssKr0kZUbTYa54W1VLtU9MdVwhmfmhpFL4+++W9jXf/WqDr2mPrl+1sjMDZiVYT16D6yMwZgbZja+Xcba83hoVtOKF71m1qUWRRuHucGcE5zvVQ3I3PCzS+7PHt+3+c4NWDbAcuk/VApH4zE3YHOaFaEn2rjtPFvcdmqRJOR7m6r+ozNdzZ/WTtlPjUZDQIwmjPIN0X3jwEfbDBd2EyAjYbBCjAG/grgrWQiwVWlwjgJgbInxCmMvInQbrlPgRN+/RL83M4omJXosAyvWINriMkIlL6CB1676bStgL1AAA/QBhRcJs3z7eXgtcw106nAl+AotmwTvRhxQwC4XFinR7R8PPW/tahDVV4xBKGwkFpStoVfdsSMGEDku3KRyFRi+QI52tuqmc8edvPQmbMqsEcp/RzboQJ2WvuTNzGmZLyoMsEBFwJM+eS2CpytOBXUbeaYKD4B9deUCDIwoowRRuM+Af9NcwPbDpMOy4NClNaZLLp9zbMGDjI4fvHJa1n32T6JdRXuMyAQoQzwkQSXTlj1jQa23T5Tbbw2KFwDTVHvszc88396d/PbXvzXz88iWbXlQ7T+cqr1lJNWi4uMZv+oVatmEFLDnSGW2n7puTZtpvwZla55mj+gn9KIn/BCHqvCrvLeV9iBsUg6qqCTHA5tihGO8wOYYfa5WvTW41Vav7B69Had03Udtq1QZFr9q4NYnPMksg7X1Mj06xjcRKeMA5HgJLvYYaf5jsMVhfqN4WFSqm0ekpe0Kf2GGOpB/pcemgsYJgP7YB9FAvi8Y/DFOxa1P8Q4pAArcboBtkGC0oYwXupHNzwF6OAES/B9u09RwN1qZJGNhL1nTQ1m+ljAzdMua5n9IxGOoh9jLdcWKDpg2hrhemI3xWXA+YcMRK68tjlunD/xtcQ0ediZUEGYzH0TL9PQGGMzF3RKuW0D92t2taGW8WhadiA0PrCYKXaa35uGtmV/8QxaN6jr7+YPxi6gnMvKfy1z+UoQlwQaDwdYTBdsNdww2wiRcZDMJZ8rXftu0pTJ0/JuXwR5XRoop3802UobVMArDEhUKhC1gC5jdyftgISw2ZuXxgyUKuRQf5ElyTaxQCZYpKt0tAT1Lz/GeDC1QxXpEye2d2JJvGQDdesWe+w6BWB0e3HWVqbFCbAwxJAAX1p2Z+SKvrO/Wjh367Dp3cic1fMYexAyf8cuFTWd6VQIPIUNbiNxYVMgAm1F5OrGGzzoi56xFTkUZanBoIeF7s6HBxHmfx4euu73bZfA6iS31mDsxQNApHaqU94JoN2wkcaBV3ckoVewWnZMTZAVxqF2gZscjGIS0MoUH/Bu1h39AHxjk9pepaCVx8Ke4htsBc5BQseARYFGdjKsaqWW6YyrOJCmmXvt6ELPglTfqQGYTbBbotRHmGIZhC2MFvH6XGPpSJBTO8sHVrmc8982de/v+rKjNrWiJCfitEIkJ7HJJQFGPE4rqWkd1ic1RmUzPP7q15Kf9cQm0/PvuyNXy770jCfllk4ecXhvHD+RW/T9crbspPnj+9jBxjXc5r3mAXF6NC3JJNRLyK7xVZdqRkBugKhNRRElWZSKKKMmqTEQRJVmViSiiJKsyEUWUZFUmooiSrMpEFFGSVZmDfIKH9anVKWjGrsEXUrzzTjNK3uDgRY4+evklDyVvV9n0Xyv4qPutzVZ+a8yk/a49qUDVfyV8s1+kUKphuIglcJhBeTmW2VbLTw7bHcfC/sD4A7AlJVxnEmUIuqX36SWnhb4iAxzUH+lBLZMI7doN5IkRsCLv4qjX3rUznm3DmDSUUDUAD/ALe13Q5dvjUyza2/hOSHi9z325x7ji5NpKdhv7IsBK7Ui43VcMckKwrJYyE/5cWFXRlkQUxAqJ0vwydx4G74jyXvJ1xIut5l9r8VgWMapL2PuTmUP8spSTAib6JB/mAaUunCj5OTI3H7jitMYR5LzCJhuGGTnl4FKPrD1jT5XEttl8xu33H2Gj1mT8UaPX5AFGzOd6NiYGETIhBw9Py/XM5zbUZg8hRNEF+D6hB6LYJiQ4g73u3K4R+EycFRjze8iFqoEmkLWEIPXhBKmLo3553bq+cvyba7eq8ocMllhkN1DRN34mnrhfx3fcL23XNzxmMYmaRSSfy8wiaiUlgU4wJzre2lj0DzbH+KxrWIhZk8+iuSvP+i0PD+zO3IhnekIzFnBrUvO52lK3JKVelPv0Axa65gZ0hO0uMExHIWxnURtQAgDbRv1cnW5pWqccv1NXhRkh8wbfTWmyaiQ1OWWN5WNZ3DpFWJgVp5u4YlpxAbDThyFYEagxBhkgdunn68pjYMnATGOH6pXzZOmr5bUCNqY6XXreffpWqiUSg3vRQBUQGTgkgDBt5IRplZ7OrvAUGj3XbLQUGrQ02BiBKTQhI3b0wKAh7NA1Njskqn+2SZsxd0Iy/Ja/1rRxcqHvQ8dJEoT4Pg1iv5wtNK+P30dme7BzKRJhvCwJXpKp5NGEg9TJLNEPd3G8IWqnvIBY1ywZpOJ0AbieR8XkqQD1Iy56GaryWBoK39wFr4P8lqunTJ3RfNiegO3iMrvvJEf+Qg2RsAcwQyT8cmFzjn7OrbjZLQDPPQiPDWrOrQVLlusuelWT2OLvw0WSfrjUwx5tdnf2Wv7VfLP1T1EwNfuH38/M/hHXC8PHcm3nSy+tA0J2NKx9VhK01oEHfM5x4gOGjzEqDCywwo3BOBDtBfQf/bqo2XaWqPrLNFxKe/DlVd9SJ7aGTG0Z1T7r+K2WVKXh9zOVRlznvbgWaGU3p1Y2mZRWXh0gtaKX+7LDDF6CTEoYX6RiRk9pFTnk6J3QnPseT2taNaVuypQLxe5nKoa4zrdivDwIcwK3GRnr1dQmYsFlF/0WZM5aDLCFhUJeGB53S5V+vfPjbv8D3qUa141OoW7HmovwByAohQhBSSByhBORbS6kX7/O5tdzZgW/69GubeD4d981FkduvqXqGP9E3Yth2mtXGFQHLkyKlUfHgrASni2UqNWQDVJbFUO4f90WH/Rz2qj3ZY5J/LoeGfCZLkSdKKP6xQus6sYw/bqeGfDqRKiBkydhBL/wCBP+Juj+L5Wm+ndodjZ4q6TnhMb7T0qog48tsNEKDOz8YXZ3OsTQE1WjIWyIYaiXxWofRowovKUJ5aAWrAdS4/sDsI0C/H9+TClMCRuORJTuz43aUQWuazHAHFGAQR7rMdrJfMPkE1f00cQT2yQ9zcFD5qqfC1fmqrsW8z/ZMA/b6Xf+lOCoKLW7Uzv506CKVMbtUAoRKtOQsiHtHAriAeCeNOBOBY1OVSc7SWem4HotJhE4Va7rxg1YZK+DJbNTURs3MEcxxxXBN0n6EwTfJPwkOt8knS+SzjdZZD5J+o0IPkk22+TiJ1cBm6MP/a0kIMvzVD9FQG61hv6hknZpVPpbb+bs8C6U3G7Ahb/e/1bK02tmqXnz2wzq0by4eyZgdqyF6vREVS/8BqRLXU8giBzZQCoKSfDpnts2VLicK06/ntw5YfA/kUUgCaajFDVm9ZZTT2RhWYL4/9fed4A1kbz/R+UUROwiiiVYQWkWLNgSktCLgl1PjRAgGggm4RDLiR0LdhSxYsXeez17O8/ezga2s+t5nuVO/c9sCezu7JKYJcn9/l+ex+eRHXaz+bwz7/vOzGc+7+fYwHkNeEBpDidKk+swJAA52S54rQWYGBkAEJ31To1h+KOYMYy4XhwL3liP+YhaaHL1wJAi/Omt/5g/pcv5mMmfduL0p27/86ekfVqNPbK3xM8h0i17j37o/qy7nAd/Spdp4sFTdOD0FC2K3Z9e+Xlqm6MDEkN2VW/Z9tCDO1E8+FP6IgEPKLlxolS3OP0pPYZa3J924PSnbnp/+rvVzwnow4kfMptPiRpvMyRJ0p3vRfGbr2RE8jAl+Mo5JfhbPyW4zRuZrTwJuRnIbAgNPD2ZjamBR5LZEBp4JJkNoYFHktkQGngkmQ2hgUeS2egZGoOxBr0isovR1fN4YKzd4c3I9mY08vfpSCJEFUkj0/f8GTaxYbMJXbaQB5vcZbNJ9u77vSY+/Bi0d/eOvVsG51HP+f3QWZ6oUDFro7A5NlexMAneUahClzBRrVPg4kJQnptLw5auu4h4FUO8nX1UtEatUkXCiAUvFhz5fNOJ5gmXDwvLm/D6YNie7gtkqVKHoWye0LabVqGBAuDkxzaUqpMHqiBXC1bRgcI/MUod8d1BhgF3OfLTVtFMQpY5YixKN5IJlLWAA20rEaRNlJQNk2vilImhilhKALTHL0fCeqeFr9vh17uqkwpfpXrhxWGNZGvia52sgIHYWQPPDeqU+FuVId8KNaA08pSgxBgou0XCW8IOXoRbL4UuYbm6iijJhE8IYBVVpVwlgVpQhQKRTqOQJ+h/x4SJ9fcQXfWe1YdlugooT0t19P7PQ1zOrMUVlzNqkXH5vtVjTpdXtd7l0SmcxP6xemJ/Hm9h0kFgvjCJ0M0lwyRCN5cMkwjdXDJMInRzyVzo16wvo5ef/lE0IeHln/8u8x9VKBfq/PhtxSUZZf3Hbpxwok+Xh8mM4Aq9PrIj0cV4eQiu+WyWtNJy7XTRYbOVa59el6tce5+6xV2u/axuV1humWjZiuA7+4Lm/EKdT1mmXHtGXa7it2PrWkHN6Tlz5pihXPugU5lN+v1aOWDL+tWb03p+yLKKcu2pnNZRW4N1zFKu/cyr30rOq+0syvj6S7L8QA2qtomlyrUrOI3TxxqMI7BkufYmuS/nRO+RBh/qMse2RuiBa1ZVrr0Lp/ECLGM86yzX3mnvH99yAhcHLbFTNSy14PUPFi7X3oHTci0sbjl4U7GVa19c3jdIeGhFUO7jbWPKvOr4j1WUa8dyCNZy7cAREnnqA7Y89b9Urp1eFsPC5dqv1eUq136YmdIWS7l2x6itNkp3t4B1H/IWXfjWbxjv5drp4mY8lCC/UperBPkZ42QTjSjXrgs9Nn5Nyl7Jtujl3eSj1lYzfQjTsKL7CB6wOsyJ1U7z+lxLl2t/yObG/ifC/10i/PRqQmYT4fcUconwlxcWhwj/jr13pt37PEKac32/f99zrcrweNqcZx8JF0zchVya5fWEZhHhbzE5rOPBHVUjVvnMHTFiYnmpxUX4nThRAf3GauYOxh384U+Ef67mceUyO9oETB1QO1lXoxpVDNOSIvw2nKb7bJnJg9lF+Ct11NWw26+TrO4//d2Mbw9OWliEH/MyrCrqwMuYTYT/zrJFg22rLQ46cLrryvanX/awAhF+J05wygvNKMI/613z+allO4QtbBbSsO7ov0dbgZwFRMiGE6HP+unnI7a8TSZu0vRbhyvi3Lt11lxa/JrKILPHDvElqVUgojNzNlsWnH0KtkiUBfcTWhgAcY06OS4e5HCwyrU61igtB3qFRda3ZaoeFGo0lNsHEqF5EN98gG8uPU26APBNYKZJRh6sqlrwWuAqgQVabt7dt1XuyZzQdPnZRgsWLVhteu0uWgpFd4wmplBQ9jZTyFbFLgv03SnGpVDl8OEbo4jTKND55YWZ9e847H8qnjW3lniq+6HFtBNS2I2IE1L49eKQ/R3N+f1TLJ4s6XumEYkSfGWlOkYZzaFt03v952/xrSLEmZtOPzj0PrQCta+SD2D2VX1LcRgjgdMY0ZYxBqM4tjE7Fp4hiWodCF/yaLh26urdAUxZwcwiwV3YrEN0vFoT4y5s3kE7RKPDfkFnq2UOJ8S4yz9J1/dfvLOyTx51S94OfkCULlWFqH9Z0FQcxurFaawIqxg58FFGZavVCha6E5M1A7UcI+i3rEqHHNXVAlfWHTTm0r6026ZMlU2dOngTjhwe9bzA0IVqJls30cgslfDkHNnWeZHio6bLlpB9NXzC7j3Zvduy014AwHASgBsIAKBrMSoTJUMZu8hEpQcnQh2yu4fMqVN1R0X5w88WPewLARjABUD3SCGZaD7+j/Fx6IW5zcbHcXTh4uPkMzNLnvk4P7wRu/YWZgVlNvll/Z17zj9aAR+nqgvX7mZZFysgFQwbNswMfJz7i0fGfUlJEM1b1apf1WWvHlsFH0fAaZ2/LROSLcDHGX3MRRLfor7/vsqTfq3p/TzAKvg4L4Rcxsm3BuMILMnHGRuond934enQBYcazbk39PRGq+Lj3OA03nmLJ7tWxMdxmDeyjueR68FTSj1M901Y/NLCfJxjnJbba3HLFSsfZ+t2cZ1Fi7witm/rfT/zanCiVfBxsByClY+Tr89Tn/xf4ON0SLukTvFvJNo+8vnoO73nnbQwH6enCxcfx8/FPHycdm6p70okXg9Li+nW8p8OK1bxzsehz8154Jh0d+HimIS6FBcf51SfN5fHu5+SZoV6PLSvdzWBdz4O3UfwgJUfJ1ZtzDtLsDQf5w82NzbkkLKpMnytZNfBCNWTh31eU3dKuiTDs5MBGnlSPPOEqRHbFw2kSm0SPD2m381J9cBPmQrlUDMvDn4CsufVG7Oj76dvThGHet39MMkjOJv1/Zg7OYUbGf3PLgq4sIjCR7EQvZJ+7snAXql/Gr1wUmOZwBmewneUwH+0858JjWWqmrVPOkQpVMBgipgg4NeHko/DzIqb8imbKR3zM6SVfX+T5Pg8OLTpVAqVA1LCD23ASrh3R9hMUBZvohyyIoIB4/AVX0oe9EPy36HkYWh2UILFSt4gI4snS+QeFhOoP2ND/ev4rSuqeNr47ezrlL0qKWxlkacvyxY/8gaf2KSf3uPpxOZ3jhsui+ypSbfIczaLLJ2Zkfwi+GPA3CGO2uzJ7tQVq9L+kDyjY2ZkrNNL/AahFkR9vN5lshamvFittni1KgbKMUJKYCz2d1g6rJPHaQ3KQehHJEuHqqMHK2L0N6Fenbmci183VAYUgOniDGXT/RCkPiiqXsIZIb8EIYLzOIT8EvxHl18KH3+3Y9TJ56JxZ7en2b6NuEKXXxrbI2fUraS+gVmHl85/nDW1I9lOHkb9bnkm+gcj5JnYLG0P1QMIM6Kr4OTUnVEy5YZko2v8+z13oxuaYi3+5fChhhC0a0VUynMfpDzVnC1SeNIe1nfsrwXfITGuwGEU/I65muHevpEjESpRbLaq7F8w2kBCpEvWoBPXTe5l4xbcXOu3b+Sti9USKgk5TVZGgj8JoXVMNBSH0ew5jVbCvEYjXbBNqAR3qPCWUfpxj9mGHKNsyV49KVH6WpmoVWgw1h34CIrDRNqq+4OPpUuvGRsybvO2IStyBp2l26pMWLJOPlClF7AQ0Da74Kd6M8OVd9FaX98XrriM+qEml1Ff1mRofXEWUCA6uwLXZ0GCR5dJ4ezoNtDTMct0YFf57uJpnoRfOixGVLoXeWFdnAjpL9hCepcH9yLKqM4HLNlzsOSonS5UmcKyUfHKWJ0Q1pWlhnUYr9hqWjtHxMbCqYhcpSLKryph4Two3u2JBJhecJDtFRD5kqHLUqBn/KAXpmAsS7nLBI9MLlHtgFXfBWNTC18Yze88OezZssyTouzhvzlGeYZTC6LasHzFIlNCetF1E8cYnMKXglgdFiHGWBpo/cQsSs3JGsMtqMZ6Bbps/OnlLYbN/lOyfcXChsuVv8gZS8qxhgFj4niC3/x1Da5v/si8BaZZlpOxHmjEHps91Bnikp6aX99x9PmX6f5zxr6qfSqjRTi1X8K7zQX/75zwX7QM/AyGmKmFuvERAdnO4JsgLUKvuPudnsLU1XyPQq6AEWAGeGADgggwL9kCjNF6Pq566xW/nk+1C15uS367Jt5w62SDw68yTxbS82nz9/wBlcUDxQtVnyQfor2fFtLz8f318qUDtZaKp8/u9fHD8V1XC+n5aO5fWRRzZJV0b6lb5+bmTf+hkJ7P4S+21/P2Hgg8FP1HWNjN+NeF9HwQlX9JbUNE5V+yUC+i8q8t0bR2ecOb5dpHBky2T9joWdXxD9BkRzS1fT912IOnR8Rjex/7fMNmYSnQVJZomtH5icvlKc+Dt/YK//K207vjoMmeaKoT3Gj7o9lf/TPaN9F+WenwGDSVI5ruZI2rvLhNp4Cc4EHHatUSaECTAwlUdLtR7Vut8h+7eciPV39dMQQ0lSeahPkrjiydVFa2YXtnZfOd0lTQVIFomiyqV9atdV3/nVuvPSnhnuoDmioSTZ0zjxyt8c/twC1dfEf3aDGyLmiqRDQdcPiYdUQxSTR1uM2pCs77oJJSZaIpLv7RIGFgxaC0z48rBNp1jwNNVYim3Mp5fzdtPFmUVjMvb8LpAPjAqkTTuiyfRUt73Azd9VOO//aHmmGgqZqAVQbKkWj6dMJxxOnDa6TLs2Y0zPQ90go0VSea5M/bdnX3DfHPqnenyqV5YRdAkxPR9C1p7DEXT1/pBoldpf0N4kSgqQbR5F7F72RHySq/qQ62Zb78/Pg5aKpJNJ2fVHnHrarRflOWJ/3aaU7z7qDJmWgq1bR1hODWyLBt3qVaVp6vgXqOtYimzNzP55r4lgo52HbYpN5XtiwCTbXJDvDL7K+nmjuFb3mw+06t684hoKkO0ZRxKqRDxQfr/KcvCppcteWLw6CpLtHU5W25xiEuGtF0ryORzd5JaoMmIdHUatvutXZRQUGLVh0vfTSvjC1DqMpFwCJU1a7WlWqPlzmErsxyvv6o94FohNswVqjqFZuLqha7Z1P28dOyhevzh52tNWIpdeoqG5qkUscgTl+wJcCNiDuE5HlZrEydNgEkxMAJERUADTxuQXdQyFdjzqqJBkMnEpBbVB/KBqN2DjuD9PhZPeMKaBacRsVfBPndBtyZ3l738qfwdcdruMyUBOfweBiV5w1CWODnaz02PrQTmJX+Vc+onNgnUgG6BsZ7ilHAEkdqrRI7fgLeT6nCpk5kPxHKNfDEtTpBGY1W6N7gVGpITfuIvdfKLeq+f0I3Kn1c/zlM+nhBE995A4TrGSdc9+tZRSbHPOpoZCbnQQy0mAJz6eLlOmGCfLBCCBIQfQlrdp7514ODf6pVK0IyR3D5eNcOKzrSmIbEYxFMQ7KFb+tV9CA6uxRJ/vfEOjuDbW4kcC7koSiS8KegA4kES1O9+5qoe+OkM6eKe7wS+Hcw/QgWD2A94wQLdHUi/rxmiz//U274LuUGeoZuNuWGqPpcyg0t6heHcoPH9uNJzV+mB65tUrX7qJnzVvMYLOkeiAflhi71uQ66B9Q3i3LDxFGzkjdF7AqY2yat+76ut89bXLmhAycqoN9YKcu0qAUm/pQbTq/Vldj6rqPf7EEbr5bbvv+q1Sg3uHGarq5lTGd25YZnVWs8Kz/pbliu/4mnJyvOcrWwcgPmZViP3gMvYzblBo3vT60nVEz1n6RctfyXh9VpM0iLKDd04ASnRX0zKjck7559I0h9JnjM2qObzvfofd9KlBvcOBECY5rI296w5W2nF8hDv7StHjBmVZ0yz+oPP0jNRkNBjiaMkoYavnDgpy+GC6sJkJkwmCHGgl9B3pUqBNhqdLhGAXC2RH+FuReRuo00TPKKtn6Jfm9mFk22GDENDGhClMVlpEoiYIHGTYxbVsBeoBAGyG/XWhIdPOPLv9Kx56tf+fevlrRMKQrejTiggF0uKlOi+z8eat7KmhDsK0YnFDaVCdo1MYp37IQBRPYL1xilBnRf0I4Otp0vR5Y6cLW0KH3PEv8uuUpqxU87KXkzc1gWNBUF2KCaG9vUue8sXe0olDfpc13JA2DNOAEDPcoiSRQeM+DftBCw/TDlsGw5bGmP2ZLDq049duzErIvDpVvjrvU/on2ZXRkTMgHGkA1N0ij0tGcsqRX7Rbn2dDMtAaaXxezcutKAk38Epo9Ndzt/f3JPHkxbm9O0VSxkWlR+PKOTUalWudBC/hzNzn02tezAiPf+m+bVezf7Qbe69A0/xKEq/CrvZaU9CZ+0GUUq2eyJDTEiML5lC4x+V6rf+an1NtGGPv2cpnQ/QC2rVBWSX3Vw6ROeZFZAbr3CiIrxXhJ1AoAcp+Bij4kpeAw2OSwoFA9JpQZFRPq2XdEvzDAH8q+MWFRY2wCA/ocfooD8AND5FzYwlZ8iDi0EClxugGWQYLahThS6ksXPAXq4ABL8H+7TtHA1Wp2iYFEvGXjb6+ajzLXSbd297AYpdyuoPqY7Rjpg+hjielE+5kfJgAUe+Q1Fc3U5XScM6LGTh5WJXAizjR+iZHqWGwazqUvCDQuZX7+6Fa1O1Cqik7HugXGikFgmDtRdrDd4qv+qj0133Xz+1Yl6IqPguczpL6WxONRgMNj6omC74YHBRriEP9lcwtny9d81a6UOm/Dn6xDPy6NklO/mEKnAOIzC8GSVCuEL2BJmD/I+SITF+qwy8Se5ShmDd/IUpS5eqAbTFI3hnoC+S8/xngwrUJuNyJI1Ddg235YCdPuaPPYdgzAeHlx1VWgxIjaGGBKA/DsjNz6vdEuc1uf6im+jGx6lps/Yg5jpM365qOFMZyXwkDIkQeTGoVIGWIwqtgFr+mwgcs565DSUrga7FhK+RWfHDPlg8ygwd3BtRWKXWuupx9yJDoLe0qG28k6IdsV6EgdakQ0swmK37ZqapCiMQ/1CnB3PEJDSKlSe8G+0ngGB/WGSG6fQ0Chx8MdUx+2IBUhoWPAIMKlOxU2NtDI9MJkySEy06wBPYhS8EaMOZHpho8CohTCncAxbmCvg/F2i68cgoSg1usn54acOBaw9UHFa0MxRNH+BfSvExgR2uTig6MsJRaQ+UL1jC1RWU/OP7i35KX9cDCX/WjTgKvnXVA/5X1YPOZ0bxw/kwo7/hFVqPlOa4bjJvfy+yGU8QL6kIRfk8xqSkL/njZVZgYTcDKxMBImSZGUiSJQkKxNBoiRZmQgSJcnKRJAoSVYmgkRJsjIRJEqSlfnRpuq7NiNOBqzoX72EvPOTXxmUN9h50bUZafRLHihvf7PZv17IMY87W8r6r7aJGXjtaUWq/avgi/0SlVoL00VsA4eZlJdmGW31/JWw3HE8rA+MPwCbUsJ5JkFDMGx7n045LfIVGeCg/sgIaZl1cH/gBvLECJiRTzFum98Z323DlDTU0DQAD/ALOy+oSZ9Xv/9+t1LgpoVDv9Wc8Lu/KXttxbuMfQFgtaY+EXbfMMQJwbQ6m7nhz4VVNT0lojBW6CM1ru6bHn5sGDyz1+H8ms+1Oh5pEaO7hb8/tWqo/xr1pMB0v9QjPKA0hROlEfWZiw9ceZp7Z3JcYYMNw4wccnCqR3LP2LdK/PtEryjzT6Bsoa3P5DGK0akW3M/1dic6EXJDDh6eXmLkfm4T/e4hhCi6kN4njEAU34ReCfipScSpkhGy9TcTJzU+8/K0FexaQpAyOUGaYuS+bkOpEv/m+qWqgi6DbSyyOyinIUpb+waPQhdUdPonZ+CHmtRdRPK5zF1EfUtxoDOaE50U/Z7uB7bA+Lx7eKiN1ydJ5vJz/jkRQb2ZC/HMSGjDAq4LdT9XT3VLURsluU8/YGHo3oCBsN0HjukzhO0cagFKAGB7aFyoM2yb9kXZmnvTs5cE71hTLuXx62etqYud2H4sS1inNBblxekuzkQvLgB++iMEqzOqj0EFiFfGxbryGFgKMNLYodox4ty1J6kLAtdOSNj+h88HatE/Oxm4Fw1UoSYzpwQQpoecMN0yMtgVvYVG32u22BYa9DRYH4FbaEJG7uiJQUP4oY9sfkjS+JxX27H3Qpf657zVta1Rm74OnSBPEuLrNIj1crbUvDF+H7nbg51LkQsTFSnwkkKjjCYCpGEsEtrhLo43RK2UF2o2dJcMdJsabgDX86icPA2g/snVKEdVHtuGwhd3wesgv2Wz/c98VXYTAja9qzs0aOvVxtQUCXsAM0XCLxc15ujn3Ezd3QLwVIfwlEONuVwwZXFwM4pN4oC/D5dIenhq/7Zfu3QIXve055jWL25QJynE12Xu/hHXizzY3vbLCbfU2qEbN0W//Hd8tR484FOKEx/QfSzBMLDFiBs/4UC0F9B/jKui5tBVrolT6LiMdqrkodEtf+ktnn1i+LeG73+hHq0rjd/PNBpxnXdyLbDKa1cuqzyyKqu8OURaxajwVQFzeEmKGML5omsuDIkKUvgPCBodLp7fo+aCO1TDhGH3Mw1DXOfbMCJPwp3AZUbGfDXNSyawdTNuQuasxwCbWKiUReExr1+Xf6ShHcKXCZfXWvb3uAE0SSH8AQhJIaKhOBD55MqFyDNXMq5/Yovrm2eF/NWnnW/QhL++6GyP3npHtTH+iYaTYdrrZxjUAC5MiVdGx4O0Ep4tlGu1UA1Sz4ohwr9hkw/6OW3U+zL7JH7diB3wk64ET5TBfhGBWd0eZlw3cge8FpFq4OJJmMAvPMKEvwnyi/89511K/r9fgnPnP3TN+9CcSp4rw5bY6BvMHPzh7u5xiKE3iqMhbIJhaJTHah9O9Ci8pAnloBbkA2nx9QFYRgH+vyCnFA4PH4mWeaHFc4tWVIHzWgwwJxRgUMd6j34wf7b6jSt6b+JJbZK+zcHDzlWWK9fO1Qw95v+wYR6+y//8acExSVrvGu2Uz4IrURW3wyhCqExHyoa0cxjIB0B40oE7VTQ5VcP0JmnKFFyvxRQCp7YbunADJtn3YYSeilq4gXsUZ9wQepNkPEHoTcJPoutN0vUi6XqT360nSb8RoSfJ5ptq+ys1wOcYI3+7Vvbr+dGbnwbOern1H822mNlU+Vsxc3SIixS3m3E6qmLJR0sCN946IWs+doap5yYFYHTcheb0RrEXeoLWK24nEUKObCB9j0hwcvoYUf6GuuJ5h2bNGW67ptV3iATTUdr1rvryP8Y/8z+0ZveHciuPmko4gCid4UTpsBtDApCT7YLXWoCJkSEqyjTWOzWG4Y9ixjDienEseGM95iNqocnVA0OK8Kf//sf8KV3Ox0z+NJnTn/b/nz8l7TO/jyLygc160Yrb/V+d67pkBw/+lC7TxIOn0HJ6CmWx+9MD2x/77q3ZPXh2aP6GtKWDXvDgT+mLBDyg1J8TpW7F6U/pMdTi/lTL6U/76/3pF6ufE9CHEz9kNp8SNd5mSJKkO9+L4jdfyYjkYUrQ0o1rSuCuh/wrb2S28iTkZiCzITTwSFeP0MAjyWwIDTySzIbQwCPJbAgNPJLMhtDAI8ls9AyNwViDXhHZxejqeTww1r7xZmR7Mxr5+3QkEaKKpJHpe/4Mm9iw2YQuW8iDTaBBkDbJ3n2/18SHH4P27t6xd8vgPOo5vx86yxMVKmZtFDbH5ioWJsE7ClXoEiaqdQpcXAjKc3Np2NJ1FxGvYoi3s4+K1qhVqkgYseDFgiOfbzrRPOFC5/mZVfuMDMgsOaFq0CzX02ye0LabVqGBAuDkxzaUqpMHqiBXC1bRgcI/MUod8d1BhgF3OfLTVtFMQpY5YixKN5IJFjYGDrStRJA2UVI2TK6JUyaGKmIpAdAevxwJ650Wvm6HX++qTip8leqFuwc3krVY0PhkBQzEzhp4blCnxN+qDPlWqAGlkacEJcZA2S0S3hJ28CLceil0CcvVVURJJnxCAKuoKuUqCdSCKhSIdBqFPEH/OyZMrL+H6Kol2Lqq1YRlugooT0t19P7PQ1w+25grLh9tTMblklaPOV1e1XqXR3/hJPbv0RP7S7FhbnSYdBCYL0widHPJMInQzSXDJEI3lwyTCN1cMhca13LewioPZkhXp7VfHzPuz6OFcqHr67ofGPhbvfDlaSmyLldSchnBFXp9ZEeii/HyEFxt2CxppeXa6aLDZivXfrwJV7n2mUwpGZ7LtV/R7R3yXpovOTRl7pQnj13eWEG59qNNuIrf7rGMYAa15vTUqVPNUK790Z8ZlcqGT/fbFRe0ebsulbpaaKly7Zs4rbPSGqxjlnLt0ZVqf+sQ0k4y/Vqb4KNtQqkrzJYq176A0zgzrcE4AkuWa690tdTzXncHB8+LaN2u0qHuZayqXPtETuONtCKhIIuXa59WL91jjLSC/77Kl/8asFMxwsLl2rWcllNa3HLwpmIr117m0645sXfV4uWjsj8Kl316bxXl2rEcgrVc+0y92NMPbHnqf6lcO70shoXLtZdrylWu/W9mSlss5doHRd0eHD5/acBi5Y9Pl/24kyYHyUO5drq4GQ8lyMs25SpBLmhaXOXan+8Xl/zX72LY+vP9R3SZ+uoE7+Xa6T6CB6z+bsKF1Qvz+lxLl2svzebG/ifC/10i/PRqQmYT4Y9pyiXCL21aHCL8z/9K3H3gpVPQglc7vs5yr12Px9PmPPtIuGAysCmXZnlPpo8sDhH+8uM2pQXtaBm+sWa5858fBGRZXIQ/nBMV0G+sZu5g3MEf/kT4q8xx2hgUW0qyu2Ol3r1rfq5gNSL8vpym87aM6cwuwv/r9Xv/Jm5pI5o+umvktrXlKtB2Os0two95GVYVdeBlzCbCn7Hf6VPyL3PFM0RZX/Pcf69uBSL84ZzgSJuaUYT/9nrP8+PqL/dbXm77+6O5daZbgZwFRMiXEyEwpom8rQxb3iYTN2n6rcMVce7dOmsuLX7dgqojgB3iS1KrQERn5my2LDj7FGyRKAvuJ7QwAOIadXJcPMjhYJVrdaxRWg70Cousb8tUPSjUaCi3DyRCv0J88wG+ufQ06QLAdzkzTTLyYFXVgtcCVwkskF996NtL0kpVu0vnTmu/YJV/b6qeynfV7qKlUHTHaGIKBWVvzzZlq2KXBfruL8alUOXw4RujiNMo0PllUOXSfna+7cKy7ma32Hht3UPaCSnsRsQJKfx6ccj+7uL8/hssnizpe6YRiRJ8ZaU6RhnNoW0T3u5h2XO/3Peb/6WpJu/fSBW1r5IPYPZVfUtxGGM5pzHmW0f6IzBmx8IzJFGtA+FLHg3XTl29O4ApK5hZJLgLm3WIjldrYtyFzTtoh2h02C/obFXUaemVv4VHA8Y5ddnxZd1MKrfDDn5AlC5Vhah/WdBUHMaazmms8VYxcuCjjMpWqxUsdCcmawZqOUbQ2h2iXlPTy4TOvFu1WtC1MQ9NmSqbOnXwJhw5POp5gaEL1Uy27oCRWSrhyTmyrVLKL/V3Px0euE5VWryxUd0tlp32AgC2kADcQAAAXYtRmSgZythFJm7kfQptoG4v3j9p0tZmz4PHW/SwLwRgLhcA3dP1iabtf4yPQy/MbTY+Tqg7Fx/Hyb24+Tgj4gZH/+yQFzZve2b6tSpjB1gBHyfYnWt3U+RuBaQCLUjpi5+Pc6fHr9NWdxkWnLlnrMsd2xt2VsHHacVpHXdrsI5Z+DhJYzfV3JJ2zn/e773ur/o89oRV8HHqcRrHyRqMI7AkHyev5p2vd5fbh6/Mi1j7efeUw1bFxynPaTwbyxjPOvk46aWWugaW+Fkyb+kV97Rr9/0szMf53JTLcm+sYppSbHycie96XZ9zda54zYJdD17YNZNaBR8HyyFY+TjAERJ5qt3/BT5Ol7flGoe4aETTvY5ENnsnqW1hPs40dy4+zlBmSlssfJxmLzrvHpz+PHBz1Ke6TbfeDOCdj0Ofm/PAMZnqzsUxGeNeXHwch3ivxMGrP0rGZge3tamReJh3Pg7dR/CA1VBOrBLNGy0tzccpy+bGhhxSNlWGr5XsOhihevKwD7UQm32XZHh2MkAjT4pnnjA1YvuigVSpTYKnx/S7Oake+ClToRxq5sXBT0D2vFbbdq+1iwoKWrTqeOmjeWVsWd+PuZNTuJHR/+yigAuLKHwUC9Er6eeeDOyV+qfRCyc1lgnCoDCXowT+o53/HNRY9neo60mHKIUKGEwREwT8+lDycZhZcVPas5nSMT9DWtn3N0mOz4NDm06lUONsCT+0ASvh3h1hM0FZvIlyyIoIBozDV3wpedAPyX+Hkoeh2UEJFit5g4xssRtRIvewmEC9HBvqX8dvXVHF08ZvZ1+n7FVJYSuLPH1ZtviRN/jEJv30Hk8nNr9z3HBZ5HVDukUc2CyydGZG8ovgjwFzhzhqsye7/0hdE/WH5BkdMyNjnV7iNwi1IOrj9S6TtTDlxWq1xatVMVCOEVICY7G/w9JhnTxOa1AOQj8iWTpUHT1YEaO/CfXqzOVc/LqhMqAAzB6NoGy6H4LUB0XVWzdCyC9BiOA8DiG/BP/R5ZfCx9/tGHXyuWjc2e1ptm8jrtDll8b2yBl1K6lvYNbhpfMfZ03tSLaXFJgoz0T/YIQ8E5ul7aF6AGFGtOaD+679qiqa0DmPf/qcVOH8OVOsxb8cPtQQgnatiEp57oOUJ6SRRQpP2sP6jv214DskxhU4jILfMVcz3Ns3ciRCJYrNVpX9C0YbSIh0yRp04jok7uC7hZ03BWalHhFcX5uwhNNkZST4kxBax0RDcRhNzGm01uY1GumCbUIluEOFt4zSj3vMNuQYZUv26kmJ0tfKRK1Cg7HuwEdQHCZaMH1X3vWhN16Lt+5L2VKj1e2JdFuVCUvWyQeq9AIWAtpmF/xUb2a48i5S6+s7wxWXUT04jVq/EUPri7OAAtHZFbg+CxI8ukwKZ0e3gZ6OWaYDu8p3F0/zJPzSYTGi0r3IC+viREgvzxbSuzy4F1FGdT5gyZ6DJUftdJlA5cpGxStjdUJYV5Ya1mG8Yqtp7RwRGwunInKViii/qoSF86B4tycSYHrBQbZXQORLhi5LgZ7RTi9MwViWcpcJnBuayiNzwKrvgrGphS+M/KIRz++O2dw4U7I860K53GHxB+gFXpBfsciUkF503cQxBqfwbSFWh0WIMZYGWr0aGscawy2oxnoFEhf7oRElstcuitgkVnXv+KO8NGNJOdYwYEwcT/CbN+T85qCXWMFyMtYDjdhjs4c6Q1zSUz2iZS5Dp0lE0+36V7+bPX8ttV/Cu80FfyVO+MtYBn4GQ8zUQt34iIBsZ/BN0EULaBV3v9NTmLqa71HIFTACzAAPbEAQAaYCW4AxWs/HVW+94tfziXeeEH53ZuvA9P2ZNVJWtyqsbfgx8+y5txFK6fTLeyce/izYXEjPp6+sQV6JfoNEm+MPNY693dKpkJ7PuKTXs5ueqhY+69qkzwEnfmpVSM+nRMSjlVXj9kn2V730k7ChuF8hPR9E5V9S2xBR+Zcs1Iuo/GtLNJVa6jDzwqqciP3794r98vLqgSY7omlpcsrwOeuv+c1YMvxLC8XImqCpLNG0bU0FUe9BQ6SHXo4699H7K3ygPdH000+ew5c8VImy3g2pkfZlbHXQVI5o6vzzmmNO/9hJM/KHT/zFPycZNDkQTZ6vHS9NizoSMev078sex/nNAE3liab+XkfDbtU4Fbph1zqnZkH3xKCpAmmUzytmbvvlZuD+5qFrju4aBF+jItFUrp7/CM/dztKNLcps6ZbT3w00VSKaTi8RPviarfFPS9mU8ccI0Y+gqTLRZHvnr/297WsFbonw7+iW1K0TaKpCNDl2eN9r3/iGIXP8+434dbxiE2iqSjStTIt90ezAZdGhNv1bBwWerAKaqglYZaAciaZ7x7LFNeYvFR0o1aPfW120L2iqTjQ5pNrtKz+nkizbY9kjt1pnYAdwIppC3i3QpDSbFZDZbX+fi68S4WfVIK3ca3dIYM1k0YRW4asmZ8V1A001iaYL2b0PVZbOEe0uFXKzXZ1p00GTM9G0L6Bhk2plVwQszryWuTLeQw6aahFNv/168fHdGuGBOT0vjY93WLIDNNUmmrYOznQWTjkhW3Y7pJfy69l80FSHaLKx7+JdZd0I2YxLNweL35b/HTTVJZr8W273rns9Jixn5diuUcd9boAmIdGUf95D/u+rOeLRty8cfVPh5mmGUJWLgEWoKm7TI99yvf6O2H8v+VyluE8OPAhVVWRzUdVi92zKPn5atnB9/rCztUYspU5dZUOTVOoYxOkLtgS4EXGHkDwvi5Wp0yaAhBg4IaICoIHHLegOCvlqzFk10WDoRMJVJljsCWWDUTuHnUF6nO5pXAHNgtOo+Isgv1uvhMAeMasr+I8/svrQj5NV13k8jMrzBiEs8LPQk40P7QRmpbM8jcqJfSIVoGtgvKcYBSxxpNYqseMn4P2UKmzqRPYToVwDT1yrE5TRSBT7vKpYrmY9x5BZK5rfazp120wqfVz/OUz6eEET33kDhCudE66fPa0ik2MedTQyk/MgBlpMgbl08XKdMEE+WCEECYi+hDU7zzy3TucA9+xOkq1z/+k7dVmFGzSmIfFYBNOQbOHbehU9iM4uRZL/PbHOzmCbGwmcC3koiiT8KehAIsF6Y9/x3/GzfCSb1pQdkXWxXIzpR7B4ACudEyzQ1Yn4U4kt/vxPueG7lBvoGbrZlBveenIpN1w0LlYaqNyQPLmkRnLgiHjiHVf5Fd9393gMlnQPxINyw2tProPuj4wLlt+r3FB1fKl6O+e0DTq0Kv7Q+CNzqf3DEsoNv3OictEyMdEAlmlRC0z8KTec+fKk8oAJD8NWtjg808PvSDurUW44yWm6A9aazvCs3JDsUMX7eZXlYZPWvc86UankZwsrN2BehvXo/SNEllJcyg21T2RtqLpZELE7w+59pdofqQQhyyg3/M4JzkVPMyo3pJdxnrIuo3NEWtzwklJp55ZWotxwkhOhA/q8rTJb3nZ6gTz0S9vqAWNW1SnzrP7wg9RsNBTkaMIoaajhCwd++mK4sJoAmQmDGWIs+BXkXalCgK1Gh2sUAGdL9FeYexGp20iDEif6+iX6vZlZNNlixDTwkQ9RFpeRKolg/VIf45YVsBcohAHy2zWIK5WeNP1S+N6RXqEVfafRDu5GwbsRBxSwy0VlSnT/x0PN2wc+BPuK0QmFTWWCmz5G8Y6dMIDIfuEao9SA7gva0cG2dw/b1pOuNRbtvv3w4bThgonUYSklb2YOy4KmogB7cjWm6fisvyUZilqp2+qp9vMA2G+cgIEeZZEkCo8Z8G9aCNh+mHJYthy2tMdsyeFVw1a6p4W12xe0Z/LMVz1KT/GsjAmZAGPIhiZpFHraM5bUiv2iXHu6mZYA00x7pva7P9pPGybJzHF79XxOjql6b9C0+zhNu8VCpkXlxzM6GZVqlQst5M/RRxrr/rEjbvR96eJzzoOiffyu0Df8EIeq8Ku8l5X2JHzSZhSpZLMnNsSIwFiFLTD6Xal+56fW20Qb+vRzmtL9ALWsUlVIftXBpU94klkBufUKIyrGe0nUCQBynIKLPSam4DHY5LCgUDwklRoUEenbdkW/MMMcyL8yYlEh0BuA/ocfooD8AND5fb1N5aeIQwuBApcbYBkkmG2oE4WuZPFzgB4ugAT/h/s0LVyNVqcoWNRL8rUlK3ya5R2RPehozmJJK2qRvtLdMdIB08cQ14vyMYq8qzl9RSv8xye5aiZ8iRzLw8qEP4TZxg9RMj3LDYPZ1CXhhoXMr1/dilYnahXRyVj3wDhRSCznpXt+leSIpDvH5g2Onxn0O/VERsFzmdNfSmNxqMFgsPVFwXbDA4ONcAlV2VzC2fL13zVrpQ6b8OfrEM/Lo2SU7+YQqcA4jMLwZJUK4QvYEmYP8j5IhMX6rDLxJ7lKGYN38hSlLl6oBtMUjeGegL5Lz/GeDCtQm43Ikit6s22+LQXofvYydew7BmE8PLjqqtBiRGwMMSQAZ/tt25SaLwjMuf9WONb/bFtq+ow9iJk+45eLGs50VgIPKUN5iNw4VMoAi1HZeLOmzwYi56xHTkPparBrIeGTdZ6ytfJtu5Apdd8caZ4xgCq8VY7oIOgtHWor74RoV6wncaD1xssiLHbbrqlJisI41C/E2fEMASmtQuUJ/0brGRDYHya5cQoNjRIHf0x13I5YgISGBY8Ak+pU3NRIK9MDkymDxES7DvAkRsEbMepAphc2CoxaCHMKx7CFuQLO3yW6fgwSCu20iCNXl3UNGvek78V3r1U0fhf2rRAbE9jl4oAC6+KsUIAuTgSqamyBympq/tG9JT/lj4uh5N9FL66Sf6f1kDtaPeR0bhw/kB89flvecIJjyIpBF+/PO/w+lgfIOzTjgtynGQl5dd5YmRVIyM3AykSQKElWJoJESbIyESRKkpWJIFGSrEwEiZJkZSJIlCQrE0GiJFmZdud9ur6qsFmS1ah05pipe5IZlDfYeZG9j06/5IHy5sRm/3ohxzzubCnrv9omZuC1pxWp9q+CL/ZLVGotTBexDRxmUl6aZbTV81fCcsfxsD4w/gBsSgnnmQQNwbDtfTrltMhXZICD+iMjpGWCoF+7gTwxAmbkbsysnGvt2hnfbcOUNNTQNAAP8As7L6hO85rjHs2ZETTth0VhAU1qJ5qy11a8y9gXAFYBZNh9wxAnBNPqNl7IPJwNq2p6SkRhrJAo/fvPob7Vul2WzV0xaMZ+3ZhHPNIiRncLf39q1VD/NepJgel+qUd4QMmNE6WaXszFB648zb0zOa6wwYZhRg45ONUjuWfsWyUDD5/Ma3G4e/As0aMwQe5ohQX3c73diU6E3JCDh6c7eBmXxjbR7x5CiKIL6X3CCETxTeg6scLVtg8W5oknXv99xeuy8ZOtYNcSgtSCEyQ3L+P2dRtKlfg31y9VFXQZbGORw0GdGvHo7YFjYePmP/2x1LdTG6m7iORzmbuI+pbiQKcuJzrV9LloDbbA+Lx7eKiN1ydJ5vJz/jkRQb2ZC/HMSGjDAq4LdT9XT3VLURsluU8/YGHo3oCBsN0HjikLwnYOtQAlALCNMS7UGbZNG+c86G+v26VkaaLU91tePzpDXezE9mNZwjqlsSgvTndxJnpxAfDTcyFYnVF9DCpATDUu1pXHwFKAkcYO1cxRL/dN9bKTTYpu4PZs/Z72VE8kA/eigSrUZOaUAMI0hhOmoUYGu6K30Oh7zRbbQoOeBusjcAtNyMgdPTFoCD9Uk80PSRqf82o79l7oUv+ct7q2NWrT16ET5ElCfJ0GsV7Olpo3xu8jd3uwcylyYaIiBV5SaJTRRIA0yC3RD3dxvCFqpbxQs6G7ZKDb7GoJcD2PysnTAOrzWhrlqMpj21D44i54HeS3vNf74Ml659Nla1OH/9v1RBtHaoqEPYCZIuGXixpz9HNupu5uAXh2QHjKocZcLpiyrGtpFJvEAX8fLpH0Wskv5Ff695NkeeyOWCVavp66+4ffz9z9I64Xhc/h6TtrJVydF75iUM7dZtnrL/CATw4nPqD7WIJhYIsRN37CgWgvoP8YV0XNoatcE6fQcRntwJbLaVMiB0sWnRjsf3F9bDDVaPj9TKMR13kn1wKrZHBaZaxVWeXNIdIqRoWvCpjDS1LEEM4XaZjWpbO1I+KvBEzP2fD7k067qYf9Sodh9zMNQ1zn2zAiT8KdwGVGxnw1zUsmWNXSuAmZsx4DbGKhUhaFx/I+yu2DX9wKW5RRfVJi1jlvmqQQ/gCEpBDRUByIzONEJL0lGded2eL65lkhf/Vp5xs04a8vOtujt95RbYx/ouFkmPb6GQY1gAtT4pXR8SCthGcL5VotVIPUs2KI8G/Y5IN+Thv1vsw+iV83Ygdc0ZLgiTLYLyIwq+vBjOtG7oDXIlINXDwJE/iFR5jwN0F+8WcNRxz3H9TSf/nvy+aGdV9J63xsiY2+wczBH+7uRkMMvVEcDWETDEOjPFb7cKJH4SVNKAe1IB9Ii68PwDIK8P8FOaVwePhIJKL0eG7RiipwXosB5oQCDOpY99AP5lpWv3FF7008qU3Stzl42Llq1ZJr58pTj3ltNszDd/mfPy04JknrXaOd8llwJaridhhFCJXpSNmQdg4D+QAITzpwp4omp2qQn6QrU3C9FlMInNpu6MINmGT/DKmaU1ELN3CPIt4HoTdJxhOE3iT8JLreJF0vkq43+d16kvQbEXqSbL6ptr9SA3yOMfK3rZ2iPl6QSvx2n3u6TLfjqpoqfytmjg5xkeJ2wyp5TalQ7rJ0Z5Bq/VBNy4GmrpmA0TECmtMbxV7oCVo1PicRQo5sIH2PSPDmodvf3p4/wW/+lIc7z7ocuPwdIsF0lBQ9IoPvrWkXMX3jkYPeoy9s5wGleE6U+vkwJAA52S54rQWYGBkAEJ31To1h+KOYMYy4XhwL3liP+YhaaHL1wJAi/Gmd/5g/pcv5mMmfVuH0p19a/s+fEvZ5XnJdTK2RP0qzDnh+VAbYlOXBn9JlmnjwFJU4PUWZYvenpyUHN9f0nBS2OH1/TI3F4u8RXaejRF8k4AGlLy25UHrXshj9KT2GWtyfVuL0p1/0+Wldq58T0IcTP2Q2nxI13mZIkqQ734viN1/JiORhSnCJc0pwRg+5kDcyW3kScjOQ2RAaeKSrR2jgkWQ2hAYeSWZDaOCRZDaEBh5JZkNo4JFkNnqGxmCsQa+I7GJ09TweGGsuvBnZ3oxG/j4dSYSoImlk+p4/wyY2bDahyxbyYJN6bDbJ3n2/18SHH4P27t6xd8vgPOo5vx86yxMVKmZtFDbH5ioWJsE7ClXoEiaqdQpcXAjKc3Np2NJ1FxGvYoi3s4+K1qhVqkgYseDFgiOfbzrRPOFvzQI2X08cGTa78Zb7/p3ve7B5QttuWoUGCoCTH9tQqk4eqIJcLVhFBwr/xCh1xHcHGQbc5chPW0UzCVnmiLEo3UgmaNsCONC2EkHaREnZMLkmTpkYqoilBEB7/HIkrHda+Lodfr2rOqnwVaoXfhPRSObQpsXJChiInTXw3KBOib9VGfKtUANKI08JSoyBslskvCXs4EW49VLoEparq4iSTPiEAFZRVcpVEqgFVSgQ6TQKeYL+d0yYWH8P0VXrW31YpquA8rRUR+//PMRlZQuuuCxvQcblBlaPOV1e1XqXR/tzEvt76In9DXkLkw4C84VJhG4uGSYRurlkmETo5pJhEqGbS+ZCTdcPn91p7XjpOJ/VIT+M87hVKBdS3Z3V8UT5vOAdLnfcxdm5YkZwhV4frZxCE+PlIbg2YrOklZZrp4sOm61ce3QrrnLtXq2Ku1z70RrCkZu0p2VrZvm1kS+sRT3ZaZly7fJWXMVve7SygprT48ePN0O59twWM3T7lmaGb72RPPpeVAx198VS5drDOK0jsQbrmKVce832mQ4u4nd+E5/M2VfiRsedVlGuvS2ncbyswTgCS5ZrPxJ6Rjm4Zoh4z5T+/epXHENV2rV0ufaGnMZztozxrLNcu2TB6OpdKutkizP7njhRLXSPhcu1V+K0XBmLWw7eVGzl2su+7X3MoeVg0WL7zFpnSq6XWEW5diyHYC3XDhwhkac2ZstT/0vl2ullMSxcrn1tK65y7XOYKW2xlGv/kNbswaj+XwM2zUr+o++mbKpgIh/l2uniZjyUIM9txVWCfHGr4irXfsfxcqj/yr4BozscFIoUF/N4L9dO9xE8YDWHE6vJ5vW5li7X7srmxv4nwv9dIvz0akJmE+Ev2ZpLhD+f6Tt5EOEv/cvfY+pW7Bg0+0H6vh13jz7m8bQ5zz4SLpgIWnNplv/N9JHFIcLv5dP7zsvpvf0WSsK3bfDeQ62DbgkR/hetuFDJt3gGWnjHyTIi/NVrJahsI/dKF1SvPnbLyv4LrEaE/wan6c5bxnRmF+Ev895t1IPAbL8Vm2cln/Jq+8rCIvyYl2FVUQdexmwi/A8vPBvr8vFeUKabd2NZhKypFYjwY86GFZz8VmYU4R+6bNu8sU0eSWY1WrOpZIMdd6xAzgIidIMTofP66acbW94mEzdp+q3DFXHu3TprLi1+3YKqI4Ad4ktSq0BEZ+Zstiw4+xRskSgL7ie0MADiGnVyXDzI4WCVa3WsUVoO9AqLrG/LVD0o1Ggotw8kQoPh8MwH+ObS06QLAF9xa1MPVlUteC1wlcAC+dXblOsaciR5fsTuHVNn76+Zesz02l20FIruGE1MoaDsrbI1WxW7LNB3+7c2rhA2PnxjFHEaBTq/HDKvc5Xm819HbHJsphmVXItaiLm0FLsRcUIKv14csr/dOL9/SGtLJ0v6nmlEogRfWamOUUZzaNv8sefImjU1p/qN6X7wlWDsJ6oeuC35AGZf1bcUhzHEnMZobRljMIpjG7Nj4RmSqNaB8CWPhmunrt4dwJQVzCwS3IXNOkTHqzUx7sLmHbRDNDrsF3S2Wv/+SOW2T5NEC4Me+G0NGkpNh+zgB0TpUlWI+pcFTcVhLA9OY9W3ipEDH2VUtlqtYKE7MVkzUMsxgnJ8hpZLT3jutycqdFiGfd5rU6bKpk4dvAlHDo96XmDoQjWTrevT2rgslfDkHNnWhKkug1+Nqxg2v3HiSMd6WZctO+0FAESQANxAAABdi1GZKBnK2EUmWqVVX7e+3qOw3NuRlYdtDa1NC2XmPewLAWjJBUD3Rq3JRLPJf4yPQy/MbTY+zrPWXHycnczMkmc+ju2Rn0ZvDR8XOn/o6p8Ha1+NsQI+zh+tuXY371rG6VNJBYMHDzYDHyel+sxVjWtWlGyt07v5rzH3hFbBx7nCaZ0z1mAds/Bxen99WT32SWTIodUD72ZMWP/eKvg4hzmNs9MajCOwJB+n5KhJ8e3HpvjN9f6YdPjblwir4uOs5zTeMosnu1bEx/mYPDKjVVKsZGzN2VPf9V5X08J8nCxOy02zuOWKlY/j8avzorkpa8I3rDz748xfVK+tgo+D5RCsfJyd+jy16f8FPo5/y+3eda/HhOWsHNs16rjPDQvzcdzbcPFxHNuYh49TU/lt+SG/3tKNpzY1mya4VJt3Pg59bs4Dx6RJGy6OibBNcfFxXGKqOgW/Xho2+fCVZfnSSit45+PQfQQPWDlyYlWuzf9XfBx3Njc25JCyqTJ8rWTXwQjVk4d9qM7ZvksyPDsZoJEnxTNPmBqxfdFAqtQmwdNj+t2cVA/8lKlQDjXz4uAnoAsfnveQ//tqjnj07QtH31S4eZr1/Zg7OYUbGf3PLgq4sIjCR7EQvZJ+7snAXql/Gr1wUmMwnYen/Rwl8B/t/Ke6sey3py1OOkQpVMBgipgg4NeHko/DzIqb0oPNlI75GdLKvr9JcnweHNp0KoVaHb2EH9qAlXDvjrCZoCzeRDlkRQQDxuErvpQ86Ifkv0PJw9DsoASLlbxBRtaeLJF7WEyg7smG+tfxW1dU8bTx29nXKXtVUtjKIk9fli1+5A0+sUk/vcfTic3vHDdcFsloRreIF5tFls7MSH4R/DFg7hBHbfZkd6qmUWl/SJ7RMTMy1uklfoNQC6I+Xu8yWQtTXqxWW7xaFQPlGCElMBb7Oywd1snjtAblIPQjkqVD1dGDFTH6m1CvzlzOxa8bKgMKwHwPwdzshyD1QVH1q80Q8ksQIjiPQ8gvwX90+aXw8Xc7Rp18Lhp3dnua7duIK3T5pbE9ckbdSuobmHV46fzHWVM7ku0lBSbKM9E/GCHPxGZpe6geQJgRaa0Bmr82rK/vHTY78+Cx+3X3hJliLf7l8KGGELRrRVTKcx+kPE+bWaTwpD2s79hfC75DYlyBwyj4HXM1w719I0ciVKLYbFXZv2C0gYRIl6xBJ67nnZ52qhfaO3TW2i6nHz+pVJ/TZGUk+JMQWsdEQ3EY7R6n0a6a12ikC7YJleAOFd4ySj/uMduQY5Qt2asnJUpfKxO1Cg3GugMfQXGY6CPPXtF1vTaUDNk1o2S+y5IJjei2KhOWrJMPVOkFLAS0zS74qd7McOVdpNbXd4YrLqOe5TTqL80YWl+cBRSIzq7A9VnQBHGaTApnR7eBno5ZpgO7yncXT/Mk/NJhMaLSvcgL6+JESPdmC+ldHtyLKKM6H7Bkz8GSo3a6TKByZaPilbE6IawrSw3rMF6x1bR2joiNhVMRuUpFlF9VwsJ5ULzbEwkwveAg2ysg8iVDl6VAz7jpTQpTMJal3GWCPSaXp3fAqu+CsamFL4z8ot331V+fe3hB+J455QeMW7ZcSS/wgvyKRaaE9KLrJo4xOIW/DrE6LEKMsTTQ+iuzKDUnawy3oBrrFUhcpo5P/3ws5wfZtmE+Pus9XEozlpRjDQPGxPEEv/lRzm8OeokVLCdjPdCIPTZ7qDPEJT0V5Pnm+YHbVYP3rbr7e4u359Op/RLebS74N3HCv9Iy8DMYYqYW6sZHBGQ7g2+CluqgVdz9Tk9h6mq+RyFXwAgwAzywAUEEmGZsAcZoPR9XvfWKX8/nlrDqrtVaG+mBto9sSrW/GFJIz+fd47Jhh7IHhS7c2buMo2yfupCeT7gu/GZI2LKQ1X+JkgOCM3IL6fl0rxKdP8T1rN/MqCm/25ypHVZIz+du++z3Dp0Hyg62+mhf0WuxopCeD6LyL6ltiKj8SxbqRVT+tSWaGrW0b9bXMSdo0Q8vc1TbYv4GTXZE09OSeQ2Ob0uSzekZfa3jkTp+oKks0dS45os1US1TI5ZkhsxpE/hbS9BkTzT9vmFN/C2PQeIc+Y2LQy/9XgM0lSOaZtlpj89/uFO8NfGqY/ye1QmgyYFomjqmw+Ps9jdDp/kPyP5XO687aCpPNF0b5BIdWFMXvCCllvNxTeWboKkCCZT9+Np/vgjx2+a8p+YeG2E30FSRaPL93fZSFfuk4Fz/I5KRNi0OgqZKRFP5rj55XR2T/XaOGTrg+fDpfUBTZaKpRcTYf59tGSOZtKdF3uW+DRxAUxWi6cTV85F7f3jqt2GLqP7X1j1PgaaqRFOPsu/eOn8KClg12KPE8NDQ1qCpmoBVBsqRaAo4eOxGu7DxYZnbr2SOz7q+GzRVJ5oS3vZ0zllzS7q+i49zXd9x7qDJiWhS7loWOO9KCfGE9a69zjnNeAWaahBNQz1UXb7IXIK2/dGs1k+XHRaDpppE07DJJ64MlEv8ZoluvF904dBA0ORMNO15kt8ye9k/gdMnR18ZcnvgU9BUi2hqZhO/JXfzdXHGO8cnTbZOfwuaahNN43rmTv/Zvl3oElWVps1K9oP2qkM0xR46Xc398HHR6G0nuqW4T8wHTXVJ5I9fD8+YLAqY9PnOmb3S4fNBk5C8a27Hi8sWtxCvC3WrNK32zvIMoSoXAYtQ1ZzdwmV9nNJD1+yp1TFV4nyQB6Gq5mwuqlrsnk3Zx0/LFq7PH3a21oil1KmrbGiSSh2DOH3BlgA3Iu4QkudlsTJ12gSQEAMnRFQANPC4Bd1BIV+NOasmGgydSLjKBL6+UDYYtXPYGaTHDXyNK6BZcBoVfxHkdxvZZqJvntvqoKnlh2UdXNrbjsfDqDxvEMICP2182fjQTmBW6ulrVE7sE6kAXQPjPcUoYIkjtVaJHT8B76dUYVMnsp8I5Rp44lqdoIxGS9jmbc29VmqrZFzmklerYg/kUunj+s9h0scLmvjOGyBcDTjhqulrFZkc86ijkZmcBzHQYgrMpYuX64QJ8sEKIUhA9CWs2Xnmke3r1w/r/l4yrceDCZ6h0n9oTEPisQimIdnCt/UqehCdXYok/3tinZ3BNjcSOBfyUBRJ+FPQgUSCtaPrUscT47pKp12e2SXz8odBph/B4gGsBpxgga5OxJ8WbPHnf8oN36XcQM/QzabckOHLpdyQYFysNFC5wXbCVfmYVS4BS0fvdtJs2eTJY7CkeyAelBum+HIddB9tXLD8XuWGXX8OuXDx94uhq/tduBM4OY9WJtQCyg0pnKgkWCYmGsAyLWqBiT/lhkdCSXLc8FrSmS2HlLu99Bn11JEllRuiOU3Xy1rTGZ6VG/Ja3p3u6RMdPPufPgfv1+hrY2HlBszLsB69H43IUopLuSH9ZeOvO6ZvlKzzfPwi5FOpwVag3JDCCU6CrxmVG9J/Lr1/nZNImr4lzuPE7RdPrUS5IZoToV76vK0lW952eoE89Evb6gFjVtUp86z+cOoahW0oyNGEUdJQwxcO/PTFcGE1ATITBjPEWPAryLtShQBbjQ7XKADOluivMPciUreRBiVO9PVL9Hszs2iyxYhp4GgxURaXkSqJgAXkYuOWFbAXKIQB+uj74th5EY+Vor3zks8MVJXKp+0mwbsRBxSwy0VlSnT/x0PN21Fign3F6ITCpjJBstgo3rETBhDZL1xjlBrQfUE7OtiOX1BFI9CcC19xvXn2c49p96jDUkrezByWBU1FAXaln134lHzbkFXey8bfrXu3OQ+ADeYEDPQoiyRReMyAf9NCwPbDlMOy5bClPWZLDq/asuSxNyNWXQ2cmh18cMHsi80rY0ImwBiyoUkahZ72jCW1Yr8o155upiXANNOe7be9TtK6eaKxLh9uKR9Xa8eDaXtwmjbMQqZF5cczOhmVapULLeTPkcbcsGJQYKPwH8QL5sQed43fXIe+4Yc4VIVf5b2stCfhkzajSCWbPbEhRgRGH7bA6Hel+p2fWm8TbejTz2lK9wPUskpVIflVB5c+4UlmBeTWK4yoGO8lUScAyHEKLvaYmILHYJPDgkLxkFRqUESkb9sV/cIMcyD/yohFhYftAOh/+CEKyA8Anf9aO1P5KeLQQqDA5QZYBglmG+pEoStZ/Byghwsgwf/hPk0LV6PVKQoW9ZLbdYdv27SwdPCeP1/tbuKfS1WvKt0dIx0wfQxxvSgfs7dkXr2IGzLJRK17p4u3XHN4WJnIhzDb+CFKpme5YTCbuiTcsJD59atb0epErSI6GeseGCcK7QTqfFy+7KetYWM+z8z97fXP56knMgqey5z+UhqLQw0Gg60vCrYbHhhshEtoxeYSzpav/65ZK3XYhD9fh3heHiWjfDeHSAXGYRSGJ6tUCF/AljB7kPdBIizWZ5WJP8lVyhi8k6codfFCNZimaAz3BPRdeo73ZFiB2mxElry+Hdvm21KA7lyTx75jEMbDg6uuCi1GxMYQQwKg/azbvP7ulPCVt5e+3REy4go1fcYexEyf8ctFDWc6K4GHlGEtRG4cKmWAxaiWtmNNnw1EzlmPnIbS1WDXQsLX5+/do+PaOUjm3b6a82qkfR/qMXeig6C3dKitvBOiXbGexIHW1HYWYbHbdk1NUhTGoX4hzo5nCEhpFSpP+Ddaz4DA/jDJjVNoaJQ4+GOq43bEAiQ0LHgEmFSn4qZGWpkemEwZJCbadYAnMQreiFEHMr2wUWDUQphTOIYtzBVw/i7R9WOQUFSI9819kvqDeE6J3DIHptWdQNuYgN8KsTGBXS4OKOZyQjFVH6haswUqq6n5R/eW/JQ/LoaSfwntuEr+KfSQt7F6yOncOH4gfxX1bkzfkrP89vR2Obr5/Q43HiC/2Z4L8ovtScjb8sbKrEBCbgZWJoJESbIyESRKkpWJIFGSrEwEiZJkZSJIlCQrE0GiJFmZCBIlycpMGGkn3h9xPmBGv/IDug/Iv8qgvMHOi+x9dPolD5Q3Xzb71ws55nFnS1n/1TYxA689rUi1fxV8sV+iUmthuoht4DCT8tIso62evxKWO46H9YHxB2BTSjjPJGgIhm3v0ymnRb4iAxzUHxkhLfMI7g/cQJ4YATPy48Zt8zvju22YkoYaKwavhqxAdl7QkKMVFLIBEZKNrefELNtbfa0pe23Fu4x9AWD1wJcIu28Y4oRgWn2FueHPhVU1PSWiMFZIlHYfuL1j3iKfoMz0itfme8iW8UiLGN0t/P2pVUP916gnBab7pR7hAaXjnCjt9GUuPnDlae6dyXGFDTYMM3LIwakeyT1j3yrpdPn8jhPb9gUu3vKu5dqYz18tuJ/r7U50IuSGHDw8fdPI/dwm+t1DCFF0Ib1PGIEovgkJzouVP6Qn1r0XsTvtVFrPfd82WsGuJQTpN06Qjhu5r9tQqsS/uX6pqqDLYBuL7A4q5d7Awwt9KofPePAhMrnUlR7UXUTyucxdRH1LcaCzjxOdLfo93XZsgfF59/BQG69Pkszl5/xzIoJ6MxfimZHQhgVcF+p+rp7qlqI2SnKffsDC0L0BA2G7DxxTS5jCn0MtQAkAbHWYC1Cmb9O69a2b9G3rfMnKlHeq1iu2rKYudmL7sSxhndJYlBenuzgTvbgA+OnmEKzOqD4GFSBc0WtObGCVx8BSgJHGDlXsqlpjbzwuFb7T9cy82Tkz/qV6Ihm4Fw1UoSYzpwQQpjqcMFVFrLSbtoVG32u22BYa9DRYH4FbaEJG7uiJQUP4ofZsfkjS+JxX27H3Qpf657zVta1Rm74OnSBPEuLrNIj1crbUvDF+H7nbg51LkQsTFSnwkkKjjCYCpEFuiX64i+MNUSvlhZoN3SUD3SZKBHA9j8rJ0wDqLURGOary2DYUvrgLXgf5LV13jj5zs/so0fLrpTLWd75AlS39AXsAM0XCLxc15ujn3Ezd3QLwdIHwlEONuVwwZQkQGcUmccDfh0skfcG+ZQ3CVjuHrv+s7el9P7QMdfcPv5+5+0dcLwqflAdL/m1RY3bIruej3DOHz1vDAz4dOPEB3ccSDANbjLjxEw5EewH9x7gqag5d5Zo4hY7LaCvWdJq1ZuMvAZNnnm9/YkvcbarR8PuZRiOu806uBVZx47RKXauyyptDpFWMCl8VMIeXpIghnC/SMJOi/41pX7urdE+fPgfnrDnrSDVMGHY/0zDEdb4NI/Ik3AlcZmTMV9O8ZAI/kXETMmc9BtjEQqUsCo9S/qNjx+1/G7H/r2aznWeOKkmTFMIfgJAUIhqKA5EWnIg0EJFxvQNbXN88K+SvPu18gyb89UVne/TWO6qN8U80nAzTXj/DoAZwYUq8MjoepJXwbKFcq4VqkHpWDBH+DZt80M9po96X2Sfx60bsgJcQETxRBvtFBGZ17zqZugNei0g1cPEkTOAXHmHC3wT5xUOuvE2rs/pRwP5+c69+2DK4A7XzsSU2+gYzB3+4u/ut00k4gUNwNIRNMAyN8ljtw4kehZc0oRzUgnwgLb4+AMsowP8X5JTC4eEj0QsGtHhu0YoqcF6LAeaEAgzqWAPAiMHc0eo3rui9iSe1Sfo2Bw87V5c6ce1cndFj3okN8/Bd/udPC45J0nrXaKd8FlyJqrgdRhFCZTpSNqSdw0A+AMKTDtyposmpGuQn6coUXK/FFAKnthu6cAMm2TUhVXMqauEG7lHYiBF6k2Q8QehNwk+i603S9SLpepPfrSdJvxGhJ8nmm2r7KzXA5xgjf7txxF/1Ag7uCJ54r01Fnz6zK1Llb8XM0SEuUtxu/eQnKW0rpIo3Tu1/rv/p8yYvLYHR4QTN6Y1iL/QEreXFJxFCjmwgfY9I8KNSW88mhPQPnzQyTOuZ/mzSd4gE01E6Me5viVBZK3D0+cnecxtl1OcBJRtOlD6LGBKAnGwXvNYCTIwMAIjOeqfGMPxRzBhGXC+OBW+sx3xELTS5emBIEf5U9B/zp3Q5HzP5000iLn86X/Q/f0rY55JCcDhjSLvAhfJJi9deChzMgz+lyzTx4Ck2iLg8xXJRcfvTjvabWuXPOBqR9ePkTk9Gn2rPgz+lLxLwgNJ8TpSmF6c/pcdQi/tTrMew+tP5+gm+2OrnBPThxA+ZzadEjbcZkiTpzvei+M1XMiJ5mBIkirimBLF6yP14I7OVJyE3A5kNoYFHunqEBh5JZkNo4JFkNoQGHklmQ2jgkWQ2hAYeSWajZ2gMxhr0isguRlfP44GxJuHNyPZmNPL36UgiRBVJI9P3/Bk2sWGzCV22kAebSNlskr37fq+JDz8G7d29Y++WwXnUc34/dJYnKlTM2ihsjs1VLEyCdxSq0CVMVOsUuLgQlOfm0rCl6y4iXsUQb2cfFa1Rq1SRMGLBiwVHPt90onnChS3zz8tzo2TjOvYqva79xdNsntC2m1ahgQLg5Mc2lKqTB6ogVwtW0YHCPzFKHfHdQYYBdzny01bRTEKWOWKo5jaSCS51BA60rUSQNlFSNkyuiVMmhipiKQHQHr8cCeudFr5uh1/vqk4qfJXqhbO6NpKNv9jxZAUMxM4aeG5Qp8Tfqgz5VqgBpZGnBCXGQNktEt4SdvAi3HopdAnL1VVESSZ8QgCrqCrlKgnUgioUiHQahTxB/zsmTKy/h+iqMqsPy3QVUJ6W6uj9n4e4/APnUt2XjmRc9rd6zOnyqta7PPoPJ7H/nZ7YH8BbmHQQmC9MInRzyTCJ0M0lwyRCN5cMkwjdXDIXmj2+yVqnd/6yvTd1J+dNrrqpUC7k2Stl9qCn78JWDynlVUraM4gRXKHXR3YkuhgvD8E1kM2SVlqunS46bLZy7d/EXOXazzKlZHgu197FxqVGl40XpMteVFrVZrwndXfeMuXav4i5it++s4xgBrXm9MiRI81Qrv3MiPqSlkeHyCaW7zj6rwaVqafLLVWu/Smnde5Zg3XMUq79r9e/vvY53VM6J/dig73r+h2zinLtVzmNc9YajCOwZLn2tnX8PzQvGRcyfXrmyYQzMbOsqlz7L5zG22VFQkEWL9f++8C3Ja+HVA9ZsejJmQMXZGUtXK59A6flllvccvCmYivX/tpua+1yJ98EbKk78f79/KcvrKJcO5ZDsJZrP6vfQAxiy1P/S+Xa6WUxLFyu3d+Pq1y7t595yrX3GH37/rQni4M3P6vul19nvYj3cu10cTMeSpBL/bhKkPv6FVe59pG3UuZnDcv0356ntm1wYMcX3su1030ED1h5c2LVyO//q3LtwWxu7H8i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20 1632.5 5060 Second item for multiplication c169fe0a-a0dc-4e54-808f-9ac11fd63248 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1609 5070 47 20 1632.5 5080 Second item for multiplication 2adb01ba-7cd9-4c5f-a316-08243357a8cd B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1609 5090 47 20 1632.5 5100 Second item for multiplication 7bdc141e-6a35-40d3-9584-5154c4315eda B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1609 5110 47 20 1632.5 5120 Second item for multiplication 7b38907c-c7dc-4ebe-ae16-a3819d667992 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1609 5130 47 20 1632.5 5140 Second item for multiplication 5f22b34f-4cbc-4347-a5be-30f64bdd9352 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1609 5150 47 20 1632.5 5160 Second item for multiplication d5cad9cd-1030-4389-a33e-5a68c398ba17 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1609 5170 47 20 1632.5 5180 Second item for multiplication 66b0ed95-d3a5-4c74-8fa1-0b63e7386b14 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1609 5190 47 20 1632.5 5200 Second item for multiplication d774309a-3843-42ba-bb8d-21ce60b8e8ec B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1609 5210 47 20 1632.5 5220 Second item for multiplication 648205e6-512f-460d-8649-72b4e8c4d978 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1609 5230 47 20 1632.5 5240 Second item for multiplication d1929846-c2c8-4d52-92c3-08ed69f640cb B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1609 5250 47 20 1632.5 5260 Second item for multiplication fda35d21-9073-4d87-928a-96c2feb7e0f8 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1609 5270 47 20 1632.5 5280 Second item for multiplication 19507874-964b-46ac-a895-60e53f632f29 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1609 5290 47 20 1632.5 5300 Rotation angle (in degrees) 5927aad1-90d6-4006-b966-f46d1465952b Angle Angle true 0 1609 5310 47 20 1632.5 5320 1 1 {0} 0 Contains a collection of generic curves 3c447cd3-e651-430e-8806-4c598ead2225 Curve Curve true 7e4e6adc-a4d1-47ab-a4c6-c48fb8239b6b 1 1609 5330 47 20 1632.5 5340 1 1 {0} Grasshopper.Kernel.Types.GH_String false 256 Contains a collection of generic curves true 6484f3aa-0d26-42dd-912c-1d535fe27c98 Curve Curve true 0e0d5017-4f0f-4bab-986c-96ea91bffc65 1 1609 5350 47 20 1632.5 5360 2 A wire relay object e457f7af-00ba-475e-92b7-cd11adf29380 Relay Relay false 0 1680 4970 28 23 1694 4981.765 2 A wire relay object 5511ee1e-138a-45cb-b69e-9ea295492e11 Relay Relay false 0 1680 4993 28 24 1694 5005.294 2 A wire relay object e5295388-f02c-4451-a296-4ed151ef7c46 Relay Relay false 0 1680 5017 28 23 1694 5028.823 2 A wire relay object 098e7b9e-7b4d-4cef-bda0-50875a59b926 Relay Relay false 0 1680 5040 28 24 1694 5052.353 2 A wire relay object 76cd154e-bedf-48ef-8855-4e6107eba638 Relay Relay false 0 1680 5064 28 23 1694 5075.882 2 A wire relay object dde5657d-1af7-439f-8363-65e4a0c6e86f Relay Relay false 0 1680 5087 28 24 1694 5099.412 2 A wire relay object a6d64955-5e50-41a2-bee1-f25dc8986948 Relay Relay false 0 1680 5111 28 23 1694 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object 4f8d7f4e-f77a-484d-900b-333bfe51ba19 Relay Relay false 0 1680 5346 28 24 1694 5358.235 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers 64c76e08-bd85-4d09-a143-3a38170cdfe1 Digit Scroller Digit Scroller false 0 12 Digit Scroller 2 0.0625000000 1205 4937 250 20 1205.704 4937.567 f31d8d7a-7536-4ac8-9c96-fde6ecda4d0a DIFERENCE CURWATURE LINEAR GRAPH 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c0ad88f5-83d4-41b4-a330-b847a1378401 c9a38c70-c330-4159-a2bf-918d499eef91 d4be6a2a-28d0-485a-a4a1-5a281e3dd78b f5a21887-cfc3-4a0b-b524-44283d4f606e f6ed359e-c452-4fd9-acd6-48313360e55b 45329fda-4528-406d-a823-54e35ac6ff74 357ceb68-e651-4e13-b8c4-6a838be2149a 3c10a1a1-09f5-411d-ae06-13d21b0f7cd7 88ea5216-22ee-43b9-bf4a-bf732fa4678f 9096d595-00e9-44ef-bf8b-df7cba4ba2ea 17704c02-f561-4245-bc67-2eaf7cd1e000 e294df03-baaa-4b12-b92f-e97f42ff34ec 34281050-3848-44ac-894c-a3119ffa069f 9492d9b1-8423-4285-a424-c395dc7f8b36 054cb35f-8548-43e7-8129-2bbf3a113dd2 d134b7cd-fb62-4a2b-a901-fec5a2d783e9 98a7b290-1680-4c8f-91d6-4080e52ada8f 9d9970f3-5ab6-40b5-b0f2-d257ffef222d b4c2ea06-2f42-44c4-9b4a-584b407a7f6a ad15254d-f361-46c9-90d6-b5db1b60e3d2 f9b9305d-1e20-4067-946a-b44d88604308 7979dd58-784d-428c-ab41-1f9a01cb3b5b 80bcd5c0-5458-4110-bc35-aad5d5e50148 e9837f44-fe89-4576-a1ba-d864d9176564 693656d3-ab20-45a4-a99a-8ca5a8f9ac36 1744 4966 110 404 1840 5168 20 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 3e8ca6be-fda8-4aaf-b5c0-3c54c8bb7312 8ec86459-bf01-4409-baee-174d0d2b13d0 2e3ab970-8545-46bb-836c-1c11e5610bce d5967b9f-e8ee-436b-a8ad-29fdcecf32d5 0 Vector {y} component 60b6e664-6dfe-4c05-a8f3-8e5d2d331a70 Y component Y component true 0 1746 4968 82 20 1787 4978 1 1 {0} 8 Second item for multiplication c0ad88f5-83d4-41b4-a330-b847a1378401 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1746 4988 82 20 1787 4998 Vector {y} component 4b3c853f-0e70-4511-bcfb-fa488944f91a Y component Y component true 0 1746 5008 82 20 1787 5018 1 1 {0} 7 Second item for multiplication 14679402-b72a-4ad2-9f68-a6c0cd5198db B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1746 5028 82 20 1787 5038 Vector {y} component 1ad300f9-25cc-4f0d-9df5-1a184f55ee87 Y component Y component true 0 1746 5048 82 20 1787 5058 1 1 {0} 6 Second item for multiplication b1777aa9-7d12-4a17-b1ef-e0f649917e24 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1746 5068 82 20 1787 5078 Vector {y} component 1afb9ce7-bab4-4278-8768-18616caf7412 Y component Y component true 0 1746 5088 82 20 1787 5098 1 1 {0} 5 Second item for multiplication f5a21887-cfc3-4a0b-b524-44283d4f606e B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1746 5108 82 20 1787 5118 Vector {y} component 225817fa-31b3-46fc-af73-ad1cf4cf3a29 Y component Y component true 0 1746 5128 82 20 1787 5138 1 1 {0} 4 Second item for multiplication a3b8dfd6-6830-44ea-aacc-1b070cbc6d44 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1746 5148 82 20 1787 5158 Vector {y} component 57014ce6-0b16-4557-a459-363b68df79b0 Y component Y component true 0 1746 5168 82 20 1787 5178 1 1 {0} 3 Second item for multiplication bfaecc51-7527-45a3-aa3a-ce297d97da26 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1746 5188 82 20 1787 5198 Vector {y} component d4be6a2a-28d0-485a-a4a1-5a281e3dd78b Y component Y component true 0 1746 5208 82 20 1787 5218 1 1 {0} 2 Second item for multiplication 5dbed678-e1f0-47b2-ab5b-7d564e67d149 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1746 5228 82 20 1787 5238 Vector {y} component 94294c1e-d8bc-4f8e-ad38-88bd70aa7022 Y component Y component true 0 1746 5248 82 20 1787 5258 1 1 {0} 1 Second item for multiplication 7dcdbf99-9851-46d1-bb6a-5efdfe64857f B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1746 5268 82 20 1787 5278 Vector {y} component c9a38c70-c330-4159-a2bf-918d499eef91 Y component Y component true 0 1746 5288 82 20 1787 5298 1 1 {0} 0 Second item for multiplication a096998a-6360-464a-8fc9-30ca988b5c46 B B true 64c76e08-bd85-4d09-a143-3a38170cdfe1 1 1746 5308 82 20 1787 5318 Number of segments 8b025cb0-35f8-4d07-b162-2a8dcf56f30e Count Count true 72713788-9a21-48b2-80ba-d8d582f5c87b 1 1746 5328 82 20 1787 5338 1 1 {0} 10 Contains a collection of generic curves true f6ed359e-c452-4fd9-acd6-48313360e55b Curve Curve true 0e0d5017-4f0f-4bab-986c-96ea91bffc65 1 1746 5348 82 20 1787 5358 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 0e0d5017-4f0f-4bab-986c-96ea91bffc65 Relay false e2bd9108-6f13-4773-8437-12590f64999f 1 1518 5404 40 16 1538 5412 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 72713788-9a21-48b2-80ba-d8d582f5c87b Relay false 53dfe8d4-944d-46bf-8495-cdb43c7556b1 1 1505 5336 40 16 1525 5344 59e0b89a-e487-49f8-bab8-b5bab16be14c Panel A panel for custom notes and text values 778435a9-4a09-40c9-a8d3-b6ca4d0b2811 Panel false 0 0 0.0003845696719497810789 -143 5173 160 84 0 0 0 -142.4984 5173.155 2 255;255;255;255 true true true false false true b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 2bd646c3-138b-4490-8085-395d24c3f8e8 Relay false 44bc53b6-00e2-489b-a5dc-407425442819 1 -183 4935 40 16 -163 4943 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object a09d3489-b53b-4397-8222-838de26f6b45 Relay false 1bd4238d-59e3-4478-af43-8dbfe4dda340 1 -185 5037 40 16 -165 5045 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 83ed3584-92a2-46a9-a2f5-4ea9d7c017a4 Relay false 2f6a5a53-3d55-41a3-aff0-e99afa30befd 1 -187 5087 40 16 -167 5095 758d91a0-4aec-47f8-9671-16739a8a2c5d Format Format some data using placeholders and formatting tags true 12c4a8f8-eb0e-4c23-9e31-db676262a272 Format Format -129 4899 130 64 -37 4931 3 3ede854e-c753-40eb-84cb-b48008f14fd4 7fa15783-70da-485c-98c0-a099e6988c3e 8ec86459-bf01-4409-baee-174d0d2b13d0 1 3ede854e-c753-40eb-84cb-b48008f14fd4 Text format 28fb2c13-7520-4ab7-b732-ed1139ded84b Format Format false 0 -127 4901 78 20 -88 4911 1 1 {0} false {0:R} Formatting culture 72db5d47-eb7d-4255-990d-0ec64b4e2aef Culture Culture false 0 -127 4921 78 20 -88 4931 1 1 {0} 127 Data to insert at {0} placeholders 9a1df9df-53e0-43bd-843c-1ab2324510d4 false Data 0 0 true 2bd646c3-138b-4490-8085-395d24c3f8e8 1 -127 4941 78 20 -88 4951 Formatted text 68c4ecd4-8214-404d-ae51-7077c9a01211 Text Text false 0 -25 4901 24 60 -13 4931 758d91a0-4aec-47f8-9671-16739a8a2c5d Format Format some data using placeholders and formatting tags true 65270bbe-3414-4860-81af-770ba43c1cdb Format Format -129 4983 130 64 -37 5015 3 3ede854e-c753-40eb-84cb-b48008f14fd4 7fa15783-70da-485c-98c0-a099e6988c3e 8ec86459-bf01-4409-baee-174d0d2b13d0 1 3ede854e-c753-40eb-84cb-b48008f14fd4 Text format 718156d1-1bc7-48c4-8ab1-cad81a3cf9d0 Format Format false 0 -127 4985 78 20 -88 4995 1 1 {0} false {0:R} Formatting culture c59d5187-58ba-4eb8-ba3a-cce2b9be8998 Culture Culture false 0 -127 5005 78 20 -88 5015 1 1 {0} 127 Data to insert at {0} placeholders ffd3ed7e-91bb-4d86-92d0-9c2bceabeec0 false Data 0 0 true a09d3489-b53b-4397-8222-838de26f6b45 1 -127 5025 78 20 -88 5035 Formatted text d2feb401-36df-4805-af94-8e108f24e9dd Text Text false 0 -25 4985 24 60 -13 5015 758d91a0-4aec-47f8-9671-16739a8a2c5d Format Format some data using placeholders and formatting tags true 7cafc645-fb57-44e8-bd89-b177fc3b564f Format Format -128 5066 130 64 -36 5098 3 3ede854e-c753-40eb-84cb-b48008f14fd4 7fa15783-70da-485c-98c0-a099e6988c3e 8ec86459-bf01-4409-baee-174d0d2b13d0 1 3ede854e-c753-40eb-84cb-b48008f14fd4 Text format b2d99be3-9d7e-4eb9-af2f-d4ea50055fa9 Format Format false 0 -126 5068 78 20 -87 5078 1 1 {0} false {0:R} Formatting culture 33a32ff1-3d1c-45ec-a3b6-0c24d1d51fbc Culture Culture false 0 -126 5088 78 20 -87 5098 1 1 {0} 127 Data to insert at {0} placeholders ed7c0f88-8e16-4415-9bae-ced65f520a3c false Data 0 0 true 83ed3584-92a2-46a9-a2f5-4ea9d7c017a4 1 -126 5108 78 20 -87 5118 Formatted text f2e126e1-a59b-4fae-8f48-32341df4b306 Text Text false 0 -24 5068 24 60 -12 5098 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object afcc5191-a0bd-476c-9768-591ad0f7378c Relay false c2429a84-5049-49fc-9a38-42778a26f71d 1 259 5107 40 16 279 5115 290f418a-65ee-406a-a9d0-35699815b512 Scale NU Scale an object with non-uniform factors. true a0c1250a-0597-4569-9f33-9ab63d5b8065 Scale NU Scale NU 459 4864 226 121 621 4925 Base geometry 654843b6-c012-4edc-a2a7-f285f6f8d025 Geometry Geometry true ddf12dcc-4532-4f5f-9017-ca2181ae4120 1 461 4866 148 20 543 4876 Base plane 9fc4cd47-7135-4ba4-9fca-12bb61107c40 Plane Plane false 0 461 4886 148 37 543 4904.5 1 1 {0} 0 0 0 1 0 0 0 1 0 Scaling factor in {x} direction 01caad73-e8c3-480c-94d8-6aaf2d86dde3 1/X Scale X Scale X false 44bc53b6-00e2-489b-a5dc-407425442819 1 461 4923 148 20 543 4933 1 1 {0} 1 Scaling factor in {y} direction fd670a22-a3e0-4288-8e39-88c566557d2c 1/X Scale Y Scale Y false 2f6a5a53-3d55-41a3-aff0-e99afa30befd 1 461 4943 148 20 543 4953 1 1 {0} 1 Scaling factor in {z} direction de6449f5-cc7d-4dab-97b7-f94c56833cef Scale Z Scale Z false 0 461 4963 148 20 543 4973 1 1 {0} 1 Scaled geometry 065f686a-4028-4e05-b353-3c9ef8ca5da0 Geometry Geometry false 0 633 4866 50 58 658 4895.25 Transformation data e6c37588-8d61-476f-98b4-879bcbd8ff43 Transform Transform false 0 633 4924 50 59 658 4953.75 310f9597-267e-4471-a7d7-048725557528 08bdcae0-d034-48dd-a145-24a9fcf3d3ff GraphMapper+ External Graph mapper You can Right click on the Heteromapper's icon and choose "AutoDomain" mode to define Output domain based on input domain interval; otherwise it'll be set to 0-1 in "Normalized" mode. true 9458f1e4-5dcf-4329-ae9a-248ba54fda4d GraphMapper+ GraphMapper+ true 958 4652 114 104 1019 4704 External curve as a graph b2c57c52-3939-4f33-b9ab-436fd1ebbfe1 Curve Curve false 22dbbbf7-d064-42aa-b6ff-7919cb335e9d 1 960 4654 47 20 983.5 4664 Optional Rectangle boundary. If omitted the curve's would be landed 68babcf3-de1b-4aad-a440-d0902f9dc7bb Boundary Boundary true 88860703-c3a2-44da-9f68-b7f61777e56c 1 960 4674 47 20 983.5 4684 1 List of input numbers 271151c2-8cab-443c-b33d-53f4e3b46f96 Numbers Numbers false d082c31a-7d28-4f27-855d-7007967854d7 1 960 4694 47 20 983.5 4704 1 9 {0} 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9 (Optional) Input Domain if omitted, it would be 0-1 in "Normalize" mode by default or be the interval of the input list in case of selecting "AutoDomain" mode d9999967-c06b-46f5-9548-ee85878e5e3f Input Input true 6662ae79-7937-416d-a1d8-3b9c21175ff3 1 960 4714 47 20 983.5 4724 (Optional) Output Domain if omitted, it would be 0-1 in "Normalize" mode by default or be the interval of the input list in case of selecting "AutoDomain" mode e29e445c-b82b-418d-86e8-57ff247ac464 Output Output true 6662ae79-7937-416d-a1d8-3b9c21175ff3 1 960 4734 47 20 983.5 4744 1 Output Numbers 89bcc9ed-3adc-47f4-a7f5-021fdf009bd8 Number Number false 0 1031 4654 39 100 1050.5 4704 11bbd48b-bb0a-4f1b-8167-fa297590390d End Points Extract the end points of a curve. true cdd22be9-92c3-4cbe-8b1a-39742554035d End Points End Points 402 4551 84 44 446 4573 Curve to evaluate a4b435ea-afbf-41ff-852e-938e38fc482f Curve Curve false 22dbbbf7-d064-42aa-b6ff-7919cb335e9d 1 404 4553 30 40 419 4573 Curve start point 99e1eab1-8fcb-4ec6-a7d6-8461b6db7ba3 Start Start false 0 458 4553 26 20 471 4563 Curve end point 9cf4e70c-1977-4c9c-8d41-3c777e6c6336 End End false 0 458 4573 26 20 471 4583 575660b1-8c79-4b8d-9222-7ab4a6ddb359 Rectangle 2Pt Create a rectangle from a base plane and two points true d4b63f37-7307-406f-b3f5-3121871ed53b Rectangle 2Pt Rectangle 2Pt 537 4560 198 101 673 4611 Rectangle base plane 5a79d744-c4d6-4c77-8e96-8f4b499eb7a2 Plane Plane false 0 539 4562 122 37 600 4580.5 1 1 {0} 0 0 0 1 0 0 0 1 0 First corner point. 8fd6a73b-4768-42e9-a050-4db35290ee9a Point A Point A false 99e1eab1-8fcb-4ec6-a7d6-8461b6db7ba3 1 539 4599 122 20 600 4609 1 1 {0} 0 0 0 Second corner point. b0023087-1c11-47ca-8da1-b9733170a79e Point B Point B false 9cf4e70c-1977-4c9c-8d41-3c777e6c6336 1 539 4619 122 20 600 4629 1 1 {0} 10 5 0 Rectangle corner fillet radius 01c6a537-4c1a-425a-9fce-5c2d4c05aeee Radius Radius false 0 539 4639 122 20 600 4649 1 1 {0} 0 Rectangle defined by P, A and B 88860703-c3a2-44da-9f68-b7f61777e56c Rectangle Rectangle false 0 685 4562 48 48 709 4586.25 Length of rectangle curve 6f9007af-2f2d-4473-9abb-f5d7287847b0 Length Length false 0 685 4610 48 49 709 4634.75 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 1709c4d6-73a6-453f-8c4e-ef2b381b40e1 Relay false 277e686f-fcb5-4411-b782-b0d4e125e2c1 1 949 5180 40 16 969 5188 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 7eca8f17-b48d-4b73-ada0-90a22d3fe212 Relay false 8f5ab813-3691-4499-bab5-66b32b35b891 1 1051 5172 40 16 1071 5180 f44b92b0-3b5b-493a-86f4-fd7408c3daf3 Bounds Create a numeric domain which encompasses a list of numbers. true 0e4926b2-68c5-4fb5-9406-5ed5323d25c5 Bounds Bounds 788 4797 110 28 846 4811 1 Numbers to include in Bounds f8364432-34aa-4b91-b0e1-9fb5df31bd3e Numbers Numbers false d082c31a-7d28-4f27-855d-7007967854d7 1 790 4799 44 24 812 4811 Numeric Domain between the lowest and highest numbers in {N} 6662ae79-7937-416d-a1d8-3b9c21175ff3 Domain Domain false 0 858 4799 38 24 877 4811 ce46b74e-00c9-43c4-805a-193b69ea4a11 Multiplication Mathematical multiplication true 481d2e17-3a5e-4c66-b2f6-96c2454e0f20 Multiplication Multiplication 606 4698 65 44 626 4720 2 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 First item for multiplication e3fe9b62-e6d7-4e08-a179-1752afe14e7c A true 1709c4d6-73a6-453f-8c4e-ef2b381b40e1 1 608 4700 6 20 611 4710 Second item for multiplication 6621c64a-0d85-41a5-9157-bf80f968c97b B true ac864993-ecc7-4645-ae0f-6a08f6579f35 1 608 4720 6 20 611 4730 1 1 {0} Grasshopper.Kernel.Types.GH_Integer 65536 Result of multiplication 9c3c1611-96aa-4d1e-a87a-e922ccd0280c Result Result false 0 638 4700 31 40 653.5 4720 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true b9b2cd39-0a19-48b3-96da-98d6516509a6 Division Division 1127 4762 40 44 1147 4784 Item to divide (dividend) b6fa3e91-d883-437e-9e09-353a29b328bb A false 89bcc9ed-3adc-47f4-a7f5-021fdf009bd8 1 1129 4764 6 20 1132 4774 Item to divide with (divisor) 6c5f1a49-f196-4546-b9e5-a31f4d8ee704 B false ac864993-ecc7-4645-ae0f-6a08f6579f35 1 1129 4784 6 20 1132 4794 1 1 {0} Grasshopper.Kernel.Types.GH_Integer 65536 The result of the Division 8f5ab813-3691-4499-bab5-66b32b35b891 Result false 0 1159 4764 6 40 1162 4784 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object d082c31a-7d28-4f27-855d-7007967854d7 Relay false 9c3c1611-96aa-4d1e-a87a-e922ccd0280c 1 708 4712 40 16 728 4720 cae9fe53-6d63-44ed-9d6d-13180fbf6f89 1c9de8a1-315f-4c56-af06-8f69fee80a7a Curve Graph Mapper Remap values with a custom graph using input curves. true 1b15e5d7-b70d-40c0-bfb7-a3c51df6fc06 true Curve Graph Mapper Curve Graph Mapper 918 4306 181 224 1013 4418 1 One or multiple graph curves to graph map values with 47d711a0-7060-4d1b-bad2-c959a00717d5 true Curves Curves false 22dbbbf7-d064-42aa-b6ff-7919cb335e9d 1 920 4308 81 27 960.5 4321.75 Rectangle which defines the boundary of the graph, graph curves should be atleast partially inside this boundary 6263c084-69a7-485e-b3a1-322d0d30d4bd true Rectangle Rectangle false 88860703-c3a2-44da-9f68-b7f61777e56c 1 920 4335 81 28 960.5 4349.25 1 Values to graph map. Values are plotted along the X Axis, intersected with the graph curves, then mapped to the Y Axis b246c3b1-0383-40df-a21c-b9274e81e7c9 true Values Values false d082c31a-7d28-4f27-855d-7007967854d7 1 920 4363 81 27 960.5 4376.75 Domain of the graphs X Axis, where the values get plotted (if omitted the input value lists domain bounds is used) 32dc76c2-1d1d-490b-9dee-886be569c4e3 true X Axis X Axis true 6662ae79-7937-416d-a1d8-3b9c21175ff3 1 920 4390 81 28 960.5 4404.25 Domain of the graphs Y Axis, where the values get mapped to (if omitted the input value lists domain bounds is used) fb3d9ec5-c5dd-4452-b9ed-63bf580c10b8 true Y Axis Y Axis true 6662ae79-7937-416d-a1d8-3b9c21175ff3 1 920 4418 81 27 960.5 4431.75 Flip the graphs X Axis from the bottom of the graph to the top of the graph 1cf007db-993a-4878-a634-f7a46e41c0e8 true Flip Flip false 0 920 4445 81 28 960.5 4459.25 1 1 {0} false Resize the graph by snapping it to the extents of the graph curves, in the plane of the boundary rectangle 8eddb96d-8ebc-47f7-83f3-f3158c04cd9a true Snap Snap false 0 920 4473 81 27 960.5 4486.75 1 1 {0} false Size of the graph labels 377f3048-7eac-459f-ab33-2cf99fd856ef true Text Size Text Size false 0 920 4500 81 28 960.5 4514.25 1 1 {0} 0.0625 1 Resulting graph mapped values, mapped on the Y Axis 4d507023-5f74-4ea9-90d5-c49f4efde4c4 true Mapped Mapped false 0 1025 4308 72 20 1061 4318 1 The graph curves inside the boundary of the graph 69566f84-31c7-4b60-a265-958649cc95b8 true Graph Curves Graph Curves false 0 1025 4328 72 20 1061 4338 1 The points on the graph curves where the X Axis input values intersected true 7e15eda7-e3db-46d6-b32c-07f93d04e5e0 true Graph Points Graph Points false 0 1025 4348 72 20 1061 4358 1 The lines from the X Axis input values to the graph curves true 2d35311d-b2fc-4e4a-89b9-f8415c329480 true Value Lines Value Lines false 0 1025 4368 72 20 1061 4378 1 The points plotted on the X Axis which represent the input values true 3dcf8fc7-f872-4db6-964c-02491ea708e8 true Value Points Value Points false 0 1025 4388 72 20 1061 4398 1 The lines from the graph curves to the Y Axis graph mapped values true a619b0f9-cb90-4576-a02e-d14af52404e7 true Mapped Lines Mapped Lines false 0 1025 4408 72 20 1061 4418 1 The points mapped on the Y Axis which represent the graph mapped values true 1bed34b2-cb00-432f-81b2-6a7dbf48a2e2 true Mapped Points Mapped Points false 0 1025 4428 72 20 1061 4438 The graph boundary background as a surface c2408f6a-8cd8-4da3-bab3-ad2d2fa5fd12 true Boundary Boundary false 0 1025 4448 72 20 1061 4458 1 The graph labels as curve outlines a4312d00-9ac4-4615-b68d-4a4a0e2fdfc1 true Labels Labels false 0 1025 4468 72 20 1061 4478 1 True for input values outside of the X Axis domain bounds False for input values inside of the X Axis domain bounds 22d0b470-534d-45c7-88b1-74c65784c17e true Out Of Bounds Out Of Bounds false 0 1025 4488 72 20 1061 4498 1 True for input values on the X Axis which intersect a graph curve False for input values on the X Axis which do not intersect a graph curve 016fc1ef-f251-44ce-b2ef-78713b34bdb8 true Intersected Intersected false 0 1025 4508 72 20 1061 4518 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object 22dbbbf7-d064-42aa-b6ff-7919cb335e9d Relay false bea7057d-410e-465d-a4c2-343e236993d1 1 446 4420 40 16 466 4428 4d2a06bd-4b0f-4c65-9ee0-4220e4c01703 Scale Scale an object uniformly in all directions. true d966a5ed-ebea-462a-a91a-ca140d1f1cc4 Scale Scale 192 4373 201 64 329 4405 Base geometry 5de50612-e493-4e3d-b481-d84f1f959b89 Geometry Geometry true f95021e8-3298-4a32-aa51-3b43667757bd 1 194 4375 123 20 255.5 4385 Center of scaling e329f2e2-8288-48fb-a898-3564a1c888b0 Center Center false 0 194 4395 123 20 255.5 4405 1 1 {0} 0 0 0 Scaling factor 632b3e96-d6eb-4512-8ce4-83fe43ac13a4 Factor Factor false ac864993-ecc7-4645-ae0f-6a08f6579f35 1 194 4415 123 20 255.5 4425 1 1 {0} 65536 Scaled geometry bea7057d-410e-465d-a4c2-343e236993d1 Geometry Geometry false 0 341 4375 50 30 366 4390 Transformation data 6849d363-c208-438c-a436-54d8075fb9a3 Transform Transform false 0 341 4405 50 30 366 4420 b6236720-8d88-4289-93c3-ac4c99f9b97b Relay 2 A wire relay object f95021e8-3298-4a32-aa51-3b43667757bd Relay false 650d961c-ef6f-4573-ade0-97f698f6a536 1 103 4387 40 16 123 4395 9c85271f-89fa-4e9f-9f4a-d75802120ccc Division Mathematical division true 35f29d0e-4815-42cf-ab22-85354efcb3ea Division Division 1496 5266 85 44 1536 5288 Item to divide (dividend) 282f9873-f0b4-4058-ae02-3fa37ecbeb08 A A false 72713788-9a21-48b2-80ba-d8d582f5c87b 1 1498 5268 26 20 1511 5278 Item to divide with (divisor) d96e021c-87ee-46bb-84de-cb2a4be07b14 B B false 0 1498 5288 26 20 1511 5298 1 1 {0} Grasshopper.Kernel.Types.GH_String false 1 The result of the Division 7e4e6adc-a4d1-47ab-a4c6-c48fb8239b6b Result Result false 0 1548 5268 31 40 1563.5 5288 eeafc956-268e-461d-8e73-ee05c6f72c01 Stream Filter Filters a collection of input streams 0ed99bc6-d082-4d7e-bde6-4f2c00d9058f Stream Filter Stream Filter 1500 5589 77 104 1539 5641 5 2e3ab970-8545-46bb-836c-1c11e5610bce 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 8ec86459-bf01-4409-baee-174d0d2b13d0 1 8ec86459-bf01-4409-baee-174d0d2b13d0 Index of Gate stream e26840dc-1a24-4155-abc9-09f76d94d0e2 Gate Gate false 260f423e-0647-408e-b12e-bd215b96451f 1 1502 5591 25 20 1514.5 5601 1 1 {0} 0 2 Input stream at index 0 7b4d6bcb-9029-417e-b075-523527cc84e6 false Stream 0 0 true ee4ecbe2-4fbf-4854-bfd4-5d67e8d925cb 1 1502 5611 25 20 1514.5 5621 2 Input stream at index 1 b5c3a3c9-9d7f-42f8-b75b-c86c05a7e23b false Stream 1 1 true fd4f2049-66dc-451d-986e-db1e735564bd 1 1502 5631 25 20 1514.5 5641 2 Input stream at index 2 72eee393-69a1-4dc3-953e-434e786f7f78 false Stream 2 2 true ab0c2868-9e78-4275-96bc-66b04365341d 1 1502 5651 25 20 1514.5 5661 2 Input stream at index 3 0ffc7e3c-042a-4fc8-895a-7674dcc73f84 false Stream 3 3 true b458474d-c32e-4320-ad51-5c1da52b9f36 1 1502 5671 25 20 1514.5 5681 2 Filtered stream e2bd9108-6f13-4773-8437-12590f64999f false Stream S(0) false 0 1551 5591 24 100 1563 5641 33bcf975-a0b2-4b54-99fd-585c893b9e88 Digit Scroller Numeric scroller for single numbers 260f423e-0647-408e-b12e-bd215b96451f Digit Scroller false 0 12 11 0.0 1346 5531 250 20 1346.551 5531.053 d5967b9f-e8ee-436b-a8ad-29fdcecf32d5 Curve Contains a collection of generic curves b458474d-c32e-4320-ad51-5c1da52b9f36 Curve XHG..⠀⠀⠀⠀ⵙ꞉ⵙ◯ⵙᗝⵙꖴⵙⓄⵙᙏⵙᕤᕦⵙꖴⵙᔓᔕⵙ◯ⵙИNⵙⓄⵙꖴⵙ✤ⵙꖴⵙᔓᔕⵙИNⵙᗩⵙᴥⵙ✤ⵙ◯ⵙꗳⵙᙁⵙᗱᗴⵙᔓᔕⵙ◯ⵙᙁⵙᗩⵙᗱᗴⵙᗝⵙꖴⵙ⠀⠀⠀⠀◯⠀⠀⠀⠀ⵙ⠀⠀⠀⠀◯⠀⠀⠀⠀ⵙꖴⵙᗝⵙᗱᗴⵙᗩⵙᙁⵙ◯ⵙᔓᔕⵙᗱᗴⵙᙁⵙꗳⵙ◯ⵙ✤ⵙᴥⵙᗩⵙИNⵙᔓᔕⵙꖴⵙ✤ⵙꖴⵙⓄⵙИNⵙ◯ⵙᔓᔕⵙꖴⵙᕤᕦⵙᙏⵙⓄⵙꖴⵙᗝⵙ◯ⵙ꞉ⵙ⠀⠀⠀⠀..GHX false 0 1368 5909 50 24 1393.313 5921.028 1 1 {0;0;0;0;0;0;0;0;0;0;0;0} -1 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