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  • python sort numpy ValueError:包含多个元素的数组的真值不明确。使用a.any()或a.all()

python sort numpy ValueError:包含多个元素的数组的真值不明确。使用a.any()或a.all()

python python-3.x numpy

python sort numpy ValueError:包含多个元素的数组的真值不明确。使用a.any()或a.all(),python,python-3.x,numpy,Python,Python 3.x,Numpy,我正在尝试按总和对数组进行排序,并收到此错误 根据这项已获批准的问题 ValueError:包含多个元素的数组的真值不明确。使用a.any()或a.all() 有人知道怎么解决吗?调试器值看起来不错,似乎都有值 00 = {ndarray: (144, 1, 2)} [[[408 414]],, [[407 415]],, [[404 415]],, [[403 416]],, [[402 416]],, [[401 417]],, [[400 417]],, [[398 419]],, [[3

我正在尝试按总和对数组进行排序,并收到此错误

根据这项已获批准的问题

ValueError:包含多个元素的数组的真值不明确。使用a.any()或a.all()

有人知道怎么解决吗?调试器值看起来不错,似乎都有值

00 = {ndarray: (144, 1, 2)} [[[408 414]],, [[407 415]],, [[404 415]],, [[403 416]],, [[402 416]],, [[401 417]],, [[400 417]],, [[398 419]],, [[398 420]],, [[396 422]],, [[396 424]],, [[395 425]],, [[395 435]],, [[396 436]],, [[396 438]],, [[397 439]],, [[397 440]],, [[401 444]],, [[402 444]],, [[403 445]],, [[406 445]],, [[407 446]],, [[417 446]],, [[418 445]],, [[424 445]],, [[425 446]],, [[436 446]],, [[437 445]],, [[445 445]],, [[446 446]],, [[448 446]],, [[449 445]],, [[453 445]],, [[455 443]],, [[456 443]],, [[456 442]],, [[457 441]],, [[459 441]],, [[460 442]],, [[460 443]],, [[461 444]],, [[462 444]],, [[463 445]],, [[466 445]],, [[467 446]],, [[469 446]],, [[470 445]],, [[474 445]],, [[476 443]],, [[477 443]],, [[478 442]],, [[480 442]],, [[483 445]],, [[493 445]],, [[494 444]],, [[496 444]],, [[497 445]],, [[498 445]],, [[499 446]],, [[535 446]],, [[536 445]],, [[540 445]],, [[541 446]],, [[560 446]],, [[561 445]],, [[562 445]],, [[562 441]],, [[560 439]],, [[560 427]],, [[559 426]],, [[559 425]],, [[557...
01 = {ndarray: (46, 1, 2)} [[[105 414]],, [[104 415]],, [[ 96 415]],, [[ 95 416]],, [[ 93 416]],, [[ 92 417]],, [[ 91 417]],, [[ 86 422]],, [[ 86 423]],, [[ 85 424]],, [[ 85 426]],, [[ 84 427]],, [[ 84 435]],, [[ 83 436]],, [[ 83 447]],, [[ 84 448]],, [[ 84 456]],, [[ 85 457]],, [[ 85 459]],, [[ 86 460]],, [[ 86 461]],, [[ 92 467]],, [[ 95 467]],, [[ 96 468]],, [[225 468]],, [[226 467]],, [[228 467]],, [[231 464]],, [[231 463]],, [[233 461]],, [[233 460]],, [[234 459]],, [[234 457]],, [[235 456]],, [[235 427]],, [[234 426]],, [[234 424]],, [[233 423]],, [[233 422]],, [[228 417]],, [[227 417]],, [[226 416]],, [[224 416]],, [[223 415]],, [[215 415]],, [[214 414]]]
02 = {ndarray: (222, 1, 2)} [[[311 383]],, [[309 385]],, [[309 386]],, [[308 387]],, [[308 389]],, [[307 390]],, [[307 391]],, [[306 392]],, [[306 393]],, [[305 394]],, [[305 395]],, [[304 396]],, [[304 397]],, [[303 398]],, [[303 399]],, [[302 400]],, [[302 401]],, [[301 402]],, [[301 403]],, [[300 404]],, [[300 405]],, [[299 406]],, [[299 407]],, [[298 408]],, [[298 409]],, [[297 410]],, [[297 411]],, [[295 413]],, [[295 414]],, [[294 415]],, [[294 416]],, [[292 418]],, [[292 419]],, [[290 421]],, [[290 422]],, [[288 424]],, [[288 425]],, [[286 427]],, [[286 428]],, [[284 430]],, [[284 431]],, [[283 432]],, [[283 433]],, [[281 435]],, [[281 436]],, [[279 438]],, [[279 439]],, [[277 441]],, [[277 442]],, [[275 444]],, [[275 445]],, [[273 447]],, [[273 448]],, [[271 450]],, [[271 451]],, [[270 452]],, [[270 453]],, [[269 454]],, [[269 461]],, [[270 462]],, [[270 463]],, [[271 463]],, [[272 464]],, [[278 464]],, [[279 463]],, [[280 463]],, [[280 462]],, [[281 461]],, [[281 460]],, [[282 459]],, [[282 458]],, [[283...
03 = {ndarray: (57, 1, 2)} [[[ 25 329]],, [[ 24 330]],, [[ 23 330]],, [[ 23 331]],, [[ 22 332]],, [[ 22 337]],, [[ 21 338]],, [[ 21 342]],, [[ 22 343]],, [[ 22 351]],, [[ 23 352]],, [[ 23 396]],, [[ 24 397]],, [[ 24 399]],, [[ 26 399]],, [[ 27 400]],, [[ 83 400]],, [[ 84 399]],, [[ 85 399]],, [[ 85 397]],, [[ 86 396]],, [[ 86 394]],, [[ 85 393]],, [[ 85 391]],, [[ 77 383]],, [[ 76 383]],, [[ 72 379]],, [[ 71 379]],, [[ 67 375]],, [[ 65 375]],, [[ 64 374]],, [[ 63 374]],, [[ 61 372]],, [[ 61 371]],, [[ 60 370]],, [[ 60 354]],, [[ 62 352]],, [[ 62 350]],, [[ 63 349]],, [[ 63 348]],, [[ 68 343]],, [[ 68 342]],, [[ 69 341]],, [[ 69 337]],, [[ 68 336]],, [[ 68 335]],, [[ 67 334]],, [[ 65 334]],, [[ 64 333]],, [[ 58 333]],, [[ 57 332]],, [[ 49 332]],, [[ 48 331]],, [[ 44 331]],, [[ 43 330]],, [[ 38 330]],, [[ 37 329]]]
04 = {ndarray: (174, 1, 2)} [[[629 305]],, [[626 308]],, [[626 309]],, [[606 329]],, [[605 329]],, [[593 341]],, [[592 341]],, [[587 346]],, [[586 346]],, [[580 352]],, [[579 352]],, [[568 363]],, [[568 368]],, [[569 368]],, [[570 369]],, [[573 369]],, [[574 370]],, [[576 370]],, [[577 371]],, [[579 371]],, [[580 372]],, [[582 372]],, [[583 373]],, [[585 373]],, [[586 374]],, [[588 374]],, [[589 375]],, [[591 375]],, [[592 376]],, [[594 376]],, [[595 377]],, [[597 377]],, [[598 378]],, [[600 378]],, [[601 379]],, [[603 379]],, [[604 380]],, [[606 380]],, [[607 381]],, [[609 381]],, [[610 382]],, [[612 382]],, [[613 383]],, [[616 383]],, [[617 384]],, [[620 384]],, [[621 385]],, [[624 385]],, [[625 386]],, [[628 386]],, [[629 387]],, [[632 387]],, [[633 388]],, [[635 388]],, [[636 389]],, [[638 389]],, [[639 390]],, [[641 390]],, [[642 391]],, [[644 391]],, [[645 392]],, [[647 392]],, [[648 393]],, [[650 393]],, [[651 394]],, [[653 394]],, [[654 395]],, [[656 395]],, [[657 396]],, [[659 396]],, [[660 397]],, [[662...
05 = {ndarray: (251, 1, 2)} [[[595 283]],, [[594 284]],, [[594 285]],, [[593 286]],, [[593 287]],, [[592 288]],, [[590 288]],, [[589 289]],, [[586 289]],, [[585 290]],, [[582 290]],, [[581 291]],, [[578 291]],, [[577 292]],, [[574 292]],, [[573 293]],, [[570 293]],, [[569 294]],, [[567 294]],, [[566 295]],, [[563 295]],, [[562 296]],, [[559 296]],, [[558 297]],, [[555 297]],, [[554 298]],, [[553 298]],, [[552 299]],, [[550 299]],, [[549 300]],, [[548 300]],, [[547 301]],, [[545 301]],, [[544 302]],, [[542 302]],, [[541 303]],, [[540 303]],, [[539 304]],, [[537 304]],, [[536 305]],, [[535 305]],, [[534 306]],, [[532 306]],, [[531 307]],, [[530 307]],, [[529 308]],, [[527 308]],, [[526 309]],, [[525 309]],, [[524 310]],, [[522 310]],, [[521 311]],, [[520 311]],, [[519 312]],, [[517 312]],, [[516 313]],, [[514 313]],, [[513 314]],, [[512 314]],, [[511 315]],, [[509 315]],, [[508 316]],, [[507 316]],, [[506 317]],, [[504 317]],, [[503 318]],, [[502 318]],, [[501 319]],, [[499 319]],, [[498 320]],, [[497 320]],, [[496...
06 = {ndarray: (188, 1, 2)} [[[253 274]],, [[252 275]],, [[251 275]],, [[250 276]],, [[249 276]],, [[248 277]],, [[247 277]],, [[246 278]],, [[245 278]],, [[244 279]],, [[242 279]],, [[241 280]],, [[240 280]],, [[239 281]],, [[237 281]],, [[236 282]],, [[235 282]],, [[234 283]],, [[233 283]],, [[232 284]],, [[230 284]],, [[229 285]],, [[228 285]],, [[227 286]],, [[225 286]],, [[224 287]],, [[223 287]],, [[222 288]],, [[221 288]],, [[220 289]],, [[218 289]],, [[217 290]],, [[216 290]],, [[215 291]],, [[214 291]],, [[213 292]],, [[211 292]],, [[210 293]],, [[209 293]],, [[208 294]],, [[206 294]],, [[205 295]],, [[204 295]],, [[203 296]],, [[201 296]],, [[200 297]],, [[199 297]],, [[198 298]],, [[197 298]],, [[196 299]],, [[194 299]],, [[193 300]],, [[192 300]],, [[191 301]],, [[190 301]],, [[189 302]],, [[187 302]],, [[186 303]],, [[185 303]],, [[184 304]],, [[182 304]],, [[181 305]],, [[180 305]],, [[179 306]],, [[178 306]],, [[177 307]],, [[175 307]],, [[174 308]],, [[173 308]],, [[172 309]],, [[170 309]],, [[169...
07 = {ndarray: (102, 1, 2)} [[[383 241]],, [[382 242]],, [[381 242]],, [[381 243]],, [[380 244]],, [[380 263]],, [[379 264]],, [[379 274]],, [[378 275]],, [[378 284]],, [[377 285]],, [[377 291]],, [[376 292]],, [[376 295]],, [[375 296]],, [[375 309]],, [[376 310]],, [[376 315]],, [[375 316]],, [[375 334]],, [[374 335]],, [[374 340]],, [[373 341]],, [[373 344]],, [[372 345]],, [[372 347]],, [[371 348]],, [[371 351]],, [[370 352]],, [[370 354]],, [[369 355]],, [[369 357]],, [[368 358]],, [[368 360]],, [[367 361]],, [[367 366]],, [[366 367]],, [[366 374]],, [[365 375]],, [[365 381]],, [[364 382]],, [[364 391]],, [[365 392]],, [[365 393]],, [[367 395]],, [[367 396]],, [[369 398]],, [[369 399]],, [[372 402]],, [[373 402]],, [[374 403]],, [[378 403]],, [[379 402]],, [[380 402]],, [[381 401]],, [[381 400]],, [[382 399]],, [[382 395]],, [[381 394]],, [[381 392]],, [[379 390]],, [[379 389]],, [[377 387]],, [[377 377]],, [[378 376]],, [[378 370]],, [[379 369]],, [[379 365]],, [[380 364]],, [[380 362]],, [[381 361]],, [[381...
08 = {ndarray: (255, 1, 2)} [[[331 234]],, [[327 238]],, [[326 238]],, [[320 244]],, [[319 244]],, [[310 253]],, [[309 253]],, [[307 255]],, [[306 255]],, [[303 258]],, [[302 258]],, [[299 261]],, [[298 261]],, [[296 263]],, [[295 263]],, [[294 264]],, [[293 264]],, [[290 267]],, [[289 267]],, [[287 269]],, [[286 269]],, [[284 271]],, [[284 273]],, [[285 274]],, [[285 275]],, [[299 275]],, [[300 276]],, [[304 276]],, [[305 277]],, [[305 280]],, [[304 281]],, [[304 282]],, [[303 283]],, [[303 284]],, [[302 285]],, [[302 286]],, [[301 287]],, [[301 289]],, [[300 290]],, [[300 291]],, [[299 292]],, [[299 293]],, [[298 294]],, [[298 295]],, [[297 296]],, [[297 298]],, [[296 299]],, [[296 300]],, [[295 301]],, [[295 302]],, [[294 303]],, [[294 304]],, [[293 305]],, [[293 307]],, [[292 308]],, [[292 309]],, [[291 310]],, [[291 311]],, [[290 312]],, [[290 313]],, [[289 314]],, [[289 316]],, [[288 317]],, [[288 318]],, [[287 319]],, [[287 320]],, [[286 321]],, [[286 322]],, [[285 323]],, [[285 325]],, [[284 326]],, [[284...
09 = {ndarray: (95, 1, 2)} [[[433 223]],, [[432 224]],, [[432 237]],, [[431 238]],, [[431 243]],, [[430 244]],, [[430 266]],, [[428 268]],, [[428 269]],, [[425 272]],, [[425 273]],, [[423 275]],, [[423 276]],, [[420 279]],, [[420 280]],, [[418 282]],, [[418 283]],, [[416 285]],, [[416 286]],, [[415 287]],, [[415 288]],, [[413 290]],, [[413 291]],, [[412 292]],, [[412 293]],, [[410 295]],, [[410 302]],, [[411 303]],, [[413 303]],, [[414 304]],, [[420 304]],, [[421 305]],, [[427 305]],, [[428 306]],, [[443 306]],, [[444 307]],, [[446 307]],, [[447 308]],, [[456 308]],, [[456 304]],, [[455 304]],, [[451 300]],, [[451 299]],, [[449 297]],, [[449 294]],, [[448 293]],, [[448 287]],, [[450 285]],, [[450 284]],, [[451 283]],, [[451 281]],, [[452 280]],, [[452 279]],, [[453 278]],, [[453 277]],, [[454 276]],, [[454 274]],, [[455 273]],, [[455 272]],, [[457 270]],, [[457 268]],, [[460 265]],, [[460 264]],, [[474 250]],, [[476 250]],, [[477 249]],, [[478 249]],, [[480 247]],, [[481 247]],, [[481 241]],, [[480 240]],, [[477...
10 = {ndarray: (4, 1, 2)} [[[457 203]],, [[457 208]],, [[463 208]],, [[463 203]]]
11 = {ndarray: (12, 1, 2)} [[[561 194]],, [[560 195]],, [[558 195]],, [[558 197]],, [[557 198]],, [[557 225]],, [[558 226]],, [[558 228]],, [[711 228]],, [[711 195]],, [[709 195]],, [[708 194]]]
12 = {ndarray: (108, 1, 2)} [[[255 165]],, [[254 166]],, [[251 166]],, [[250 167]],, [[248 167]],, [[247 168]],, [[245 168]],, [[244 169]],, [[242 169]],, [[240 171]],, [[239 171]],, [[238 172]],, [[237 172]],, [[235 174]],, [[234 174]],, [[233 175]],, [[232 175]],, [[231 176]],, [[230 176]],, [[228 178]],, [[227 178]],, [[225 180]],, [[224 180]],, [[223 181]],, [[222 181]],, [[220 183]],, [[219 183]],, [[218 184]],, [[217 184]],, [[214 187]],, [[213 187]],, [[210 190]],, [[209 190]],, [[206 193]],, [[205 193]],, [[202 196]],, [[201 196]],, [[199 198]],, [[198 198]],, [[196 200]],, [[196 201]],, [[194 203]],, [[194 204]],, [[192 206]],, [[192 207]],, [[189 210]],, [[189 211]],, [[186 214]],, [[186 215]],, [[185 216]],, [[185 226]],, [[186 227]],, [[186 228]],, [[187 229]],, [[187 230]],, [[188 231]],, [[188 232]],, [[193 237]],, [[227 237]],, [[228 236]],, [[232 236]],, [[233 235]],, [[236 235]],, [[237 234]],, [[238 234]],, [[239 233]],, [[240 233]],, [[241 232]],, [[242 232]],, [[243 231]],, [[244 231]],, [[247...
13 = {ndarray: (405, 1, 2)} [[[186 132]],, [[185 133]],, [[183 133]],, [[182 134]],, [[181 134]],, [[179 136]],, [[178 136]],, [[177 137]],, [[176 137]],, [[174 139]],, [[173 139]],, [[172 140]],, [[171 140]],, [[170 141]],, [[169 141]],, [[167 143]],, [[166 143]],, [[165 144]],, [[164 144]],, [[163 145]],, [[162 145]],, [[160 147]],, [[159 147]],, [[158 148]],, [[157 148]],, [[155 150]],, [[154 150]],, [[154 152]],, [[155 153]],, [[155 156]],, [[157 158]],, [[160 158]],, [[161 157]],, [[163 157]],, [[164 156]],, [[165 156]],, [[167 154]],, [[168 154]],, [[169 153]],, [[170 153]],, [[172 151]],, [[175 151]],, [[176 152]],, [[176 155]],, [[175 156]],, [[175 157]],, [[174 158]],, [[174 159]],, [[173 160]],, [[173 162]],, [[172 163]],, [[172 164]],, [[171 165]],, [[171 166]],, [[170 167]],, [[170 169]],, [[169 170]],, [[169 171]],, [[168 172]],, [[168 173]],, [[167 174]],, [[167 175]],, [[166 176]],, [[166 178]],, [[165 179]],, [[165 180]],, [[164 181]],, [[164 182]],, [[163 183]],, [[163 185]],, [[162 186]],, [[162...
14 = {ndarray: (200, 1, 2)} [[[ 71 125]],, [[ 69 127]],, [[ 68 127]],, [[ 62 133]],, [[ 61 133]],, [[ 58 136]],, [[ 57 136]],, [[ 54 139]],, [[ 53 139]],, [[ 51 141]],, [[ 50 141]],, [[ 48 143]],, [[ 47 143]],, [[ 46 144]],, [[ 45 144]],, [[ 43 146]],, [[ 42 146]],, [[ 41 147]],, [[ 40 147]],, [[ 39 148]],, [[ 38 148]],, [[ 37 149]],, [[ 36 149]],, [[ 35 150]],, [[ 33 150]],, [[ 32 151]],, [[ 31 151]],, [[ 30 152]],, [[ 28 152]],, [[ 27 153]],, [[ 26 153]],, [[ 24 155]],, [[ 23 155]],, [[ 22 156]],, [[ 21 156]],, [[ 17 160]],, [[ 17 161]],, [[ 16 162]],, [[ 16 168]],, [[ 17 169]],, [[ 17 170]],, [[ 20 173]],, [[ 21 173]],, [[ 22 174]],, [[ 23 174]],, [[ 24 175]],, [[ 31 175]],, [[ 32 176]],, [[ 52 176]],, [[ 53 175]],, [[ 60 175]],, [[ 61 176]],, [[ 61 178]],, [[ 60 179]],, [[ 59 179]],, [[ 56 182]],, [[ 55 182]],, [[ 48 189]],, [[ 47 189]],, [[ 41 195]],, [[ 40 195]],, [[ 34 201]],, [[ 33 201]],, [[ 28 206]],, [[ 27 206]],, [[ 24 209]],, [[ 23 209]],, [[ 21 211]],, [[ 20 211]],, [[ 19 212]],, [[ 18 212]],, [[ 17...
15 = {ndarray: (281, 1, 2)} [[[431  91]],, [[430  92]],, [[430  94]],, [[431  95]],, [[431  98]],, [[433 100]],, [[433 101]],, [[434 102]],, [[434 103]],, [[436 105]],, [[436 106]],, [[437 107]],, [[437 108]],, [[439 110]],, [[439 111]],, [[440 112]],, [[440 113]],, [[441 114]],, [[441 115]],, [[443 117]],, [[443 118]],, [[444 119]],, [[444 120]],, [[446 122]],, [[446 123]],, [[447 124]],, [[447 125]],, [[448 126]],, [[448 127]],, [[450 129]],, [[450 130]],, [[451 131]],, [[451 132]],, [[453 134]],, [[453 135]],, [[454 136]],, [[454 137]],, [[455 138]],, [[455 139]],, [[457 141]],, [[457 142]],, [[458 143]],, [[458 144]],, [[460 146]],, [[460 147]],, [[461 148]],, [[461 149]],, [[462 150]],, [[462 151]],, [[464 153]],, [[464 154]],, [[465 155]],, [[465 156]],, [[467 158]],, [[467 159]],, [[468 160]],, [[468 161]],, [[469 162]],, [[469 163]],, [[471 165]],, [[471 166]],, [[472 167]],, [[472 170]],, [[471 171]],, [[469 171]],, [[468 170]],, [[466 170]],, [[465 169]],, [[464 169]],, [[463 168]],, [[461 168]],, [[460...
16 = {ndarray: (48, 1, 2)} [[[361  47]],, [[360  48]],, [[352  48]],, [[351  49]],, [[349  49]],, [[348  50]],, [[347  50]],, [[342  55]],, [[342  56]],, [[341  57]],, [[341  59]],, [[340  60]],, [[340  68]],, [[339  69]],, [[339 149]],, [[340 150]],, [[340 158]],, [[341 159]],, [[341 161]],, [[342 162]],, [[342 163]],, [[347 168]],, [[348 168]],, [[349 169]],, [[351 169]],, [[352 170]],, [[376 170]],, [[377 169]],, [[379 169]],, [[380 168]],, [[381 168]],, [[386 163]],, [[386 162]],, [[387 161]],, [[387 159]],, [[388 158]],, [[388  60]],, [[387  59]],, [[387  57]],, [[386  56]],, [[386  55]],, [[381  50]],, [[380  50]],, [[379  49]],, [[377  49]],, [[376  48]],, [[368  48]],, [[367  47]]]
17 = {ndarray: (181, 1, 2)} [[[259  20]],, [[259  21]],, [[258  22]],, [[258  24]],, [[257  25]],, [[257  31]],, [[256  32]],, [[256  40]],, [[255  41]],, [[255  44]],, [[254  45]],, [[254  48]],, [[253  49]],, [[253  53]],, [[252  54]],, [[252  58]],, [[251  59]],, [[251  63]],, [[250  64]],, [[250  72]],, [[255  72]],, [[256  71]],, [[257  71]],, [[258  70]],, [[259  70]],, [[260  69]],, [[263  69]],, [[264  68]],, [[267  68]],, [[268  67]],, [[271  67]],, [[272  68]],, [[272  70]],, [[273  71]],, [[273  73]],, [[274  74]],, [[274  76]],, [[275  77]],, [[275  80]],, [[276  81]],, [[276  83]],, [[277  84]],, [[277  86]],, [[278  87]],, [[278  90]],, [[279  91]],, [[279  93]],, [[280  94]],, [[280  96]],, [[281  97]],, [[281  99]],, [[282 100]],, [[282 103]],, [[283 104]],, [[283 106]],, [[284 107]],, [[284 109]],, [[285 110]],, [[285 113]],, [[286 114]],, [[286 116]],, [[287 117]],, [[287 119]],, [[288 120]],, [[288 123]],, [[289 124]],, [[289 126]],, [[290 127]],, [[290 128]],, [[291 129]],, [[291 131]],, [[292...
18 = {ndarray: (12, 1, 2)} [[[ 47   7]],, [[ 46   8]],, [[ 44   8]],, [[ 44  10]],, [[ 43  11]],, [[ 43 113]],, [[ 44 114]],, [[ 44 116]],, [[165 116]],, [[165   8]],, [[163   8]],, [[162   7]]]
19 = {ndarray: (156, 1, 2)} [[[683   5]],, [[679   9]],, [[679  23]],, [[678  24]],, [[678  27]],, [[677  28]],, [[677  30]],, [[676  31]],, [[676  32]],, [[675  33]],, [[675  35]],, [[674  36]],, [[674  38]],, [[673  39]],, [[673  40]],, [[672  41]],, [[672  43]],, [[671  44]],, [[671  45]],, [[670  46]],, [[670  48]],, [[669  49]],, [[669  50]],, [[668  51]],, [[668  53]],, [[667  54]],, [[667  55]],, [[665  57]],, [[662  57]],, [[661  56]],, [[659  56]],, [[658  55]],, [[656  55]],, [[655  54]],, [[653  54]],, [[652  53]],, [[650  53]],, [[649  52]],, [[641  52]],, [[637  56]],, [[637  65]],, [[639  67]],, [[639  68]],, [[653  82]],, [[653  88]],, [[652  89]],, [[652  90]],, [[651  91]],, [[651  93]],, [[650  94]],, [[650  96]],, [[649  97]],, [[649  99]],, [[648 100]],, [[648 102]],, [[647 103]],, [[647 106]],, [[646 107]],, [[646 110]],, [[645 111]],, [[645 113]],, [[644 114]],, [[644 117]],, [[643 118]],, [[643 120]],, [[642 121]],, [[642 125]],, [[641 126]],, [[641 129]],, [[640 130]],, [[640 132]],, [[639...
20 = {ndarray: (170, 1, 2)} [[[555   2]],, [[554   3]],, [[552   3]],, [[551   4]],, [[550   4]],, [[549   5]],, [[547   5]],, [[544   8]],, [[543   8]],, [[542   9]],, [[540   9]],, [[539  10]],, [[537  10]],, [[535  12]],, [[534  12]],, [[532  14]],, [[531  14]],, [[530  15]],, [[529  15]],, [[521  23]],, [[521  29]],, [[522  30]],, [[522  37]],, [[523  38]],, [[523  40]],, [[526  43]],, [[526  46]],, [[527  47]],, [[527  49]],, [[528  50]],, [[528  52]],, [[529  53]],, [[529  56]],, [[530  57]],, [[530  59]],, [[529  60]],, [[528  60]],, [[527  61]],, [[526  61]],, [[525  62]],, [[524  62]],, [[523  63]],, [[514  63]],, [[513  64]],, [[510  64]],, [[509  65]],, [[507  65]],, [[505  67]],, [[505  72]],, [[506  72]],, [[507  73]],, [[510  73]],, [[511  74]],, [[513  74]],, [[514  75]],, [[515  75]],, [[516  76]],, [[519  76]],, [[520  77]],, [[528  77]],, [[530  79]],, [[530  82]],, [[529  83]],, [[529  86]],, [[528  87]],, [[528  92]],, [[527  93]],, [[527  95]],, [[526  96]],, [[526  99]],, [[525 100]],, [[525...
我也试着利用这一点,没有工作
排序(A,key=sum)

你的数据是什么? 
00 = {ndarray: (144, 1, 2)} [[[408 414]],, [[407 415]],, [[404 415]],, [[403 416]],, [[402 416]],, [[401 417]],, [[400 417]],, [[398 419]],, [[398 420]],, [[396 422]],, [[396 424]],, [[395 425]],, [[395 435]],, [[396 436]],, [[396 438]],, [[397 439]],, [[397 440]],, [[401 444]],, [[402 444]],, [[403 445]],, [[406 445]],, [[407 446]],, [[417 446]],, [[418 445]],, [[424 445]],, [[425 446]],, [[436 446]],, [[437 445]],, [[445 445]],, [[446 446]],, [[448 446]],, [[449 445]],, [[453 445]],, [[455 443]],, [[456 443]],, [[456 442]],, [[457 441]],, [[459 441]],, [[460 442]],, [[460 443]],, [[461 444]],, [[462 444]],, [[463 445]],, [[466 445]],, [[467 446]],, [[469 446]],, [[470 445]],, [[474 445]],, [[476 443]],, [[477 443]],, [[478 442]],, [[480 442]],, [[483 445]],, [[493 445]],, [[494 444]],, [[496 444]],, [[497 445]],, [[498 445]],, [[499 446]],, [[535 446]],, [[536 445]],, [[540 445]],, [[541 446]],, [[560 446]],, [[561 445]],, [[562 445]],, [[562 441]],, [[560 439]],, [[560 427]],, [[559 426]],, [[559 425]],, [[557...
01 = {ndarray: (46, 1, 2)} [[[105 414]],, [[104 415]],, [[ 96 415]],, [[ 95 416]],, [[ 93 416]],, [[ 92 417]],, [[ 91 417]],, [[ 86 422]],, [[ 86 423]],, [[ 85 424]],, [[ 85 426]],, [[ 84 427]],, [[ 84 435]],, [[ 83 436]],, [[ 83 447]],, [[ 84 448]],, [[ 84 456]],, [[ 85 457]],, [[ 85 459]],, [[ 86 460]],, [[ 86 461]],, [[ 92 467]],, [[ 95 467]],, [[ 96 468]],, [[225 468]],, [[226 467]],, [[228 467]],, [[231 464]],, [[231 463]],, [[233 461]],, [[233 460]],, [[234 459]],, [[234 457]],, [[235 456]],, [[235 427]],, [[234 426]],, [[234 424]],, [[233 423]],, [[233 422]],, [[228 417]],, [[227 417]],, [[226 416]],, [[224 416]],, [[223 415]],, [[215 415]],, [[214 414]]]
02 = {ndarray: (222, 1, 2)} [[[311 383]],, [[309 385]],, [[309 386]],, [[308 387]],, [[308 389]],, [[307 390]],, [[307 391]],, [[306 392]],, [[306 393]],, [[305 394]],, [[305 395]],, [[304 396]],, [[304 397]],, [[303 398]],, [[303 399]],, [[302 400]],, [[302 401]],, [[301 402]],, [[301 403]],, [[300 404]],, [[300 405]],, [[299 406]],, [[299 407]],, [[298 408]],, [[298 409]],, [[297 410]],, [[297 411]],, [[295 413]],, [[295 414]],, [[294 415]],, [[294 416]],, [[292 418]],, [[292 419]],, [[290 421]],, [[290 422]],, [[288 424]],, [[288 425]],, [[286 427]],, [[286 428]],, [[284 430]],, [[284 431]],, [[283 432]],, [[283 433]],, [[281 435]],, [[281 436]],, [[279 438]],, [[279 439]],, [[277 441]],, [[277 442]],, [[275 444]],, [[275 445]],, [[273 447]],, [[273 448]],, [[271 450]],, [[271 451]],, [[270 452]],, [[270 453]],, [[269 454]],, [[269 461]],, [[270 462]],, [[270 463]],, [[271 463]],, [[272 464]],, [[278 464]],, [[279 463]],, [[280 463]],, [[280 462]],, [[281 461]],, [[281 460]],, [[282 459]],, [[282 458]],, [[283...
03 = {ndarray: (57, 1, 2)} [[[ 25 329]],, [[ 24 330]],, [[ 23 330]],, [[ 23 331]],, [[ 22 332]],, [[ 22 337]],, [[ 21 338]],, [[ 21 342]],, [[ 22 343]],, [[ 22 351]],, [[ 23 352]],, [[ 23 396]],, [[ 24 397]],, [[ 24 399]],, [[ 26 399]],, [[ 27 400]],, [[ 83 400]],, [[ 84 399]],, [[ 85 399]],, [[ 85 397]],, [[ 86 396]],, [[ 86 394]],, [[ 85 393]],, [[ 85 391]],, [[ 77 383]],, [[ 76 383]],, [[ 72 379]],, [[ 71 379]],, [[ 67 375]],, [[ 65 375]],, [[ 64 374]],, [[ 63 374]],, [[ 61 372]],, [[ 61 371]],, [[ 60 370]],, [[ 60 354]],, [[ 62 352]],, [[ 62 350]],, [[ 63 349]],, [[ 63 348]],, [[ 68 343]],, [[ 68 342]],, [[ 69 341]],, [[ 69 337]],, [[ 68 336]],, [[ 68 335]],, [[ 67 334]],, [[ 65 334]],, [[ 64 333]],, [[ 58 333]],, [[ 57 332]],, [[ 49 332]],, [[ 48 331]],, [[ 44 331]],, [[ 43 330]],, [[ 38 330]],, [[ 37 329]]]
04 = {ndarray: (174, 1, 2)} [[[629 305]],, [[626 308]],, [[626 309]],, [[606 329]],, [[605 329]],, [[593 341]],, [[592 341]],, [[587 346]],, [[586 346]],, [[580 352]],, [[579 352]],, [[568 363]],, [[568 368]],, [[569 368]],, [[570 369]],, [[573 369]],, [[574 370]],, [[576 370]],, [[577 371]],, [[579 371]],, [[580 372]],, [[582 372]],, [[583 373]],, [[585 373]],, [[586 374]],, [[588 374]],, [[589 375]],, [[591 375]],, [[592 376]],, [[594 376]],, [[595 377]],, [[597 377]],, [[598 378]],, [[600 378]],, [[601 379]],, [[603 379]],, [[604 380]],, [[606 380]],, [[607 381]],, [[609 381]],, [[610 382]],, [[612 382]],, [[613 383]],, [[616 383]],, [[617 384]],, [[620 384]],, [[621 385]],, [[624 385]],, [[625 386]],, [[628 386]],, [[629 387]],, [[632 387]],, [[633 388]],, [[635 388]],, [[636 389]],, [[638 389]],, [[639 390]],, [[641 390]],, [[642 391]],, [[644 391]],, [[645 392]],, [[647 392]],, [[648 393]],, [[650 393]],, [[651 394]],, [[653 394]],, [[654 395]],, [[656 395]],, [[657 396]],, [[659 396]],, [[660 397]],, [[662...
05 = {ndarray: (251, 1, 2)} [[[595 283]],, [[594 284]],, [[594 285]],, [[593 286]],, [[593 287]],, [[592 288]],, [[590 288]],, [[589 289]],, [[586 289]],, [[585 290]],, [[582 290]],, [[581 291]],, [[578 291]],, [[577 292]],, [[574 292]],, [[573 293]],, [[570 293]],, [[569 294]],, [[567 294]],, [[566 295]],, [[563 295]],, [[562 296]],, [[559 296]],, [[558 297]],, [[555 297]],, [[554 298]],, [[553 298]],, [[552 299]],, [[550 299]],, [[549 300]],, [[548 300]],, [[547 301]],, [[545 301]],, [[544 302]],, [[542 302]],, [[541 303]],, [[540 303]],, [[539 304]],, [[537 304]],, [[536 305]],, [[535 305]],, [[534 306]],, [[532 306]],, [[531 307]],, [[530 307]],, [[529 308]],, [[527 308]],, [[526 309]],, [[525 309]],, [[524 310]],, [[522 310]],, [[521 311]],, [[520 311]],, [[519 312]],, [[517 312]],, [[516 313]],, [[514 313]],, [[513 314]],, [[512 314]],, [[511 315]],, [[509 315]],, [[508 316]],, [[507 316]],, [[506 317]],, [[504 317]],, [[503 318]],, [[502 318]],, [[501 319]],, [[499 319]],, [[498 320]],, [[497 320]],, [[496...
06 = {ndarray: (188, 1, 2)} [[[253 274]],, [[252 275]],, [[251 275]],, [[250 276]],, [[249 276]],, [[248 277]],, [[247 277]],, [[246 278]],, [[245 278]],, [[244 279]],, [[242 279]],, [[241 280]],, [[240 280]],, [[239 281]],, [[237 281]],, [[236 282]],, [[235 282]],, [[234 283]],, [[233 283]],, [[232 284]],, [[230 284]],, [[229 285]],, [[228 285]],, [[227 286]],, [[225 286]],, [[224 287]],, [[223 287]],, [[222 288]],, [[221 288]],, [[220 289]],, [[218 289]],, [[217 290]],, [[216 290]],, [[215 291]],, [[214 291]],, [[213 292]],, [[211 292]],, [[210 293]],, [[209 293]],, [[208 294]],, [[206 294]],, [[205 295]],, [[204 295]],, [[203 296]],, [[201 296]],, [[200 297]],, [[199 297]],, [[198 298]],, [[197 298]],, [[196 299]],, [[194 299]],, [[193 300]],, [[192 300]],, [[191 301]],, [[190 301]],, [[189 302]],, [[187 302]],, [[186 303]],, [[185 303]],, [[184 304]],, [[182 304]],, [[181 305]],, [[180 305]],, [[179 306]],, [[178 306]],, [[177 307]],, [[175 307]],, [[174 308]],, [[173 308]],, [[172 309]],, [[170 309]],, [[169...
07 = {ndarray: (102, 1, 2)} [[[383 241]],, [[382 242]],, [[381 242]],, [[381 243]],, [[380 244]],, [[380 263]],, [[379 264]],, [[379 274]],, [[378 275]],, [[378 284]],, [[377 285]],, [[377 291]],, [[376 292]],, [[376 295]],, [[375 296]],, [[375 309]],, [[376 310]],, [[376 315]],, [[375 316]],, [[375 334]],, [[374 335]],, [[374 340]],, [[373 341]],, [[373 344]],, [[372 345]],, [[372 347]],, [[371 348]],, [[371 351]],, [[370 352]],, [[370 354]],, [[369 355]],, [[369 357]],, [[368 358]],, [[368 360]],, [[367 361]],, [[367 366]],, [[366 367]],, [[366 374]],, [[365 375]],, [[365 381]],, [[364 382]],, [[364 391]],, [[365 392]],, [[365 393]],, [[367 395]],, [[367 396]],, [[369 398]],, [[369 399]],, [[372 402]],, [[373 402]],, [[374 403]],, [[378 403]],, [[379 402]],, [[380 402]],, [[381 401]],, [[381 400]],, [[382 399]],, [[382 395]],, [[381 394]],, [[381 392]],, [[379 390]],, [[379 389]],, [[377 387]],, [[377 377]],, [[378 376]],, [[378 370]],, [[379 369]],, [[379 365]],, [[380 364]],, [[380 362]],, [[381 361]],, [[381...
08 = {ndarray: (255, 1, 2)} [[[331 234]],, [[327 238]],, [[326 238]],, [[320 244]],, [[319 244]],, [[310 253]],, [[309 253]],, [[307 255]],, [[306 255]],, [[303 258]],, [[302 258]],, [[299 261]],, [[298 261]],, [[296 263]],, [[295 263]],, [[294 264]],, [[293 264]],, [[290 267]],, [[289 267]],, [[287 269]],, [[286 269]],, [[284 271]],, [[284 273]],, [[285 274]],, [[285 275]],, [[299 275]],, [[300 276]],, [[304 276]],, [[305 277]],, [[305 280]],, [[304 281]],, [[304 282]],, [[303 283]],, [[303 284]],, [[302 285]],, [[302 286]],, [[301 287]],, [[301 289]],, [[300 290]],, [[300 291]],, [[299 292]],, [[299 293]],, [[298 294]],, [[298 295]],, [[297 296]],, [[297 298]],, [[296 299]],, [[296 300]],, [[295 301]],, [[295 302]],, [[294 303]],, [[294 304]],, [[293 305]],, [[293 307]],, [[292 308]],, [[292 309]],, [[291 310]],, [[291 311]],, [[290 312]],, [[290 313]],, [[289 314]],, [[289 316]],, [[288 317]],, [[288 318]],, [[287 319]],, [[287 320]],, [[286 321]],, [[286 322]],, [[285 323]],, [[285 325]],, [[284 326]],, [[284...
09 = {ndarray: (95, 1, 2)} [[[433 223]],, [[432 224]],, [[432 237]],, [[431 238]],, [[431 243]],, [[430 244]],, [[430 266]],, [[428 268]],, [[428 269]],, [[425 272]],, [[425 273]],, [[423 275]],, [[423 276]],, [[420 279]],, [[420 280]],, [[418 282]],, [[418 283]],, [[416 285]],, [[416 286]],, [[415 287]],, [[415 288]],, [[413 290]],, [[413 291]],, [[412 292]],, [[412 293]],, [[410 295]],, [[410 302]],, [[411 303]],, [[413 303]],, [[414 304]],, [[420 304]],, [[421 305]],, [[427 305]],, [[428 306]],, [[443 306]],, [[444 307]],, [[446 307]],, [[447 308]],, [[456 308]],, [[456 304]],, [[455 304]],, [[451 300]],, [[451 299]],, [[449 297]],, [[449 294]],, [[448 293]],, [[448 287]],, [[450 285]],, [[450 284]],, [[451 283]],, [[451 281]],, [[452 280]],, [[452 279]],, [[453 278]],, [[453 277]],, [[454 276]],, [[454 274]],, [[455 273]],, [[455 272]],, [[457 270]],, [[457 268]],, [[460 265]],, [[460 264]],, [[474 250]],, [[476 250]],, [[477 249]],, [[478 249]],, [[480 247]],, [[481 247]],, [[481 241]],, [[480 240]],, [[477...
10 = {ndarray: (4, 1, 2)} [[[457 203]],, [[457 208]],, [[463 208]],, [[463 203]]]
11 = {ndarray: (12, 1, 2)} [[[561 194]],, [[560 195]],, [[558 195]],, [[558 197]],, [[557 198]],, [[557 225]],, [[558 226]],, [[558 228]],, [[711 228]],, [[711 195]],, [[709 195]],, [[708 194]]]
12 = {ndarray: (108, 1, 2)} [[[255 165]],, [[254 166]],, [[251 166]],, [[250 167]],, [[248 167]],, [[247 168]],, [[245 168]],, [[244 169]],, [[242 169]],, [[240 171]],, [[239 171]],, [[238 172]],, [[237 172]],, [[235 174]],, [[234 174]],, [[233 175]],, [[232 175]],, [[231 176]],, [[230 176]],, [[228 178]],, [[227 178]],, [[225 180]],, [[224 180]],, [[223 181]],, [[222 181]],, [[220 183]],, [[219 183]],, [[218 184]],, [[217 184]],, [[214 187]],, [[213 187]],, [[210 190]],, [[209 190]],, [[206 193]],, [[205 193]],, [[202 196]],, [[201 196]],, [[199 198]],, [[198 198]],, [[196 200]],, [[196 201]],, [[194 203]],, [[194 204]],, [[192 206]],, [[192 207]],, [[189 210]],, [[189 211]],, [[186 214]],, [[186 215]],, [[185 216]],, [[185 226]],, [[186 227]],, [[186 228]],, [[187 229]],, [[187 230]],, [[188 231]],, [[188 232]],, [[193 237]],, [[227 237]],, [[228 236]],, [[232 236]],, [[233 235]],, [[236 235]],, [[237 234]],, [[238 234]],, [[239 233]],, [[240 233]],, [[241 232]],, [[242 232]],, [[243 231]],, [[244 231]],, [[247...
13 = {ndarray: (405, 1, 2)} [[[186 132]],, [[185 133]],, [[183 133]],, [[182 134]],, [[181 134]],, [[179 136]],, [[178 136]],, [[177 137]],, [[176 137]],, [[174 139]],, [[173 139]],, [[172 140]],, [[171 140]],, [[170 141]],, [[169 141]],, [[167 143]],, [[166 143]],, [[165 144]],, [[164 144]],, [[163 145]],, [[162 145]],, [[160 147]],, [[159 147]],, [[158 148]],, [[157 148]],, [[155 150]],, [[154 150]],, [[154 152]],, [[155 153]],, [[155 156]],, [[157 158]],, [[160 158]],, [[161 157]],, [[163 157]],, [[164 156]],, [[165 156]],, [[167 154]],, [[168 154]],, [[169 153]],, [[170 153]],, [[172 151]],, [[175 151]],, [[176 152]],, [[176 155]],, [[175 156]],, [[175 157]],, [[174 158]],, [[174 159]],, [[173 160]],, [[173 162]],, [[172 163]],, [[172 164]],, [[171 165]],, [[171 166]],, [[170 167]],, [[170 169]],, [[169 170]],, [[169 171]],, [[168 172]],, [[168 173]],, [[167 174]],, [[167 175]],, [[166 176]],, [[166 178]],, [[165 179]],, [[165 180]],, [[164 181]],, [[164 182]],, [[163 183]],, [[163 185]],, [[162 186]],, [[162...
14 = {ndarray: (200, 1, 2)} [[[ 71 125]],, [[ 69 127]],, [[ 68 127]],, [[ 62 133]],, [[ 61 133]],, [[ 58 136]],, [[ 57 136]],, [[ 54 139]],, [[ 53 139]],, [[ 51 141]],, [[ 50 141]],, [[ 48 143]],, [[ 47 143]],, [[ 46 144]],, [[ 45 144]],, [[ 43 146]],, [[ 42 146]],, [[ 41 147]],, [[ 40 147]],, [[ 39 148]],, [[ 38 148]],, [[ 37 149]],, [[ 36 149]],, [[ 35 150]],, [[ 33 150]],, [[ 32 151]],, [[ 31 151]],, [[ 30 152]],, [[ 28 152]],, [[ 27 153]],, [[ 26 153]],, [[ 24 155]],, [[ 23 155]],, [[ 22 156]],, [[ 21 156]],, [[ 17 160]],, [[ 17 161]],, [[ 16 162]],, [[ 16 168]],, [[ 17 169]],, [[ 17 170]],, [[ 20 173]],, [[ 21 173]],, [[ 22 174]],, [[ 23 174]],, [[ 24 175]],, [[ 31 175]],, [[ 32 176]],, [[ 52 176]],, [[ 53 175]],, [[ 60 175]],, [[ 61 176]],, [[ 61 178]],, [[ 60 179]],, [[ 59 179]],, [[ 56 182]],, [[ 55 182]],, [[ 48 189]],, [[ 47 189]],, [[ 41 195]],, [[ 40 195]],, [[ 34 201]],, [[ 33 201]],, [[ 28 206]],, [[ 27 206]],, [[ 24 209]],, [[ 23 209]],, [[ 21 211]],, [[ 20 211]],, [[ 19 212]],, [[ 18 212]],, [[ 17...
15 = {ndarray: (281, 1, 2)} [[[431  91]],, [[430  92]],, [[430  94]],, [[431  95]],, [[431  98]],, [[433 100]],, [[433 101]],, [[434 102]],, [[434 103]],, [[436 105]],, [[436 106]],, [[437 107]],, [[437 108]],, [[439 110]],, [[439 111]],, [[440 112]],, [[440 113]],, [[441 114]],, [[441 115]],, [[443 117]],, [[443 118]],, [[444 119]],, [[444 120]],, [[446 122]],, [[446 123]],, [[447 124]],, [[447 125]],, [[448 126]],, [[448 127]],, [[450 129]],, [[450 130]],, [[451 131]],, [[451 132]],, [[453 134]],, [[453 135]],, [[454 136]],, [[454 137]],, [[455 138]],, [[455 139]],, [[457 141]],, [[457 142]],, [[458 143]],, [[458 144]],, [[460 146]],, [[460 147]],, [[461 148]],, [[461 149]],, [[462 150]],, [[462 151]],, [[464 153]],, [[464 154]],, [[465 155]],, [[465 156]],, [[467 158]],, [[467 159]],, [[468 160]],, [[468 161]],, [[469 162]],, [[469 163]],, [[471 165]],, [[471 166]],, [[472 167]],, [[472 170]],, [[471 171]],, [[469 171]],, [[468 170]],, [[466 170]],, [[465 169]],, [[464 169]],, [[463 168]],, [[461 168]],, [[460...
16 = {ndarray: (48, 1, 2)} [[[361  47]],, [[360  48]],, [[352  48]],, [[351  49]],, [[349  49]],, [[348  50]],, [[347  50]],, [[342  55]],, [[342  56]],, [[341  57]],, [[341  59]],, [[340  60]],, [[340  68]],, [[339  69]],, [[339 149]],, [[340 150]],, [[340 158]],, [[341 159]],, [[341 161]],, [[342 162]],, [[342 163]],, [[347 168]],, [[348 168]],, [[349 169]],, [[351 169]],, [[352 170]],, [[376 170]],, [[377 169]],, [[379 169]],, [[380 168]],, [[381 168]],, [[386 163]],, [[386 162]],, [[387 161]],, [[387 159]],, [[388 158]],, [[388  60]],, [[387  59]],, [[387  57]],, [[386  56]],, [[386  55]],, [[381  50]],, [[380  50]],, [[379  49]],, [[377  49]],, [[376  48]],, [[368  48]],, [[367  47]]]
17 = {ndarray: (181, 1, 2)} [[[259  20]],, [[259  21]],, [[258  22]],, [[258  24]],, [[257  25]],, [[257  31]],, [[256  32]],, [[256  40]],, [[255  41]],, [[255  44]],, [[254  45]],, [[254  48]],, [[253  49]],, [[253  53]],, [[252  54]],, [[252  58]],, [[251  59]],, [[251  63]],, [[250  64]],, [[250  72]],, [[255  72]],, [[256  71]],, [[257  71]],, [[258  70]],, [[259  70]],, [[260  69]],, [[263  69]],, [[264  68]],, [[267  68]],, [[268  67]],, [[271  67]],, [[272  68]],, [[272  70]],, [[273  71]],, [[273  73]],, [[274  74]],, [[274  76]],, [[275  77]],, [[275  80]],, [[276  81]],, [[276  83]],, [[277  84]],, [[277  86]],, [[278  87]],, [[278  90]],, [[279  91]],, [[279  93]],, [[280  94]],, [[280  96]],, [[281  97]],, [[281  99]],, [[282 100]],, [[282 103]],, [[283 104]],, [[283 106]],, [[284 107]],, [[284 109]],, [[285 110]],, [[285 113]],, [[286 114]],, [[286 116]],, [[287 117]],, [[287 119]],, [[288 120]],, [[288 123]],, [[289 124]],, [[289 126]],, [[290 127]],, [[290 128]],, [[291 129]],, [[291 131]],, [[292...
18 = {ndarray: (12, 1, 2)} [[[ 47   7]],, [[ 46   8]],, [[ 44   8]],, [[ 44  10]],, [[ 43  11]],, [[ 43 113]],, [[ 44 114]],, [[ 44 116]],, [[165 116]],, [[165   8]],, [[163   8]],, [[162   7]]]
19 = {ndarray: (156, 1, 2)} [[[683   5]],, [[679   9]],, [[679  23]],, [[678  24]],, [[678  27]],, [[677  28]],, [[677  30]],, [[676  31]],, [[676  32]],, [[675  33]],, [[675  35]],, [[674  36]],, [[674  38]],, [[673  39]],, [[673  40]],, [[672  41]],, [[672  43]],, [[671  44]],, [[671  45]],, [[670  46]],, [[670  48]],, [[669  49]],, [[669  50]],, [[668  51]],, [[668  53]],, [[667  54]],, [[667  55]],, [[665  57]],, [[662  57]],, [[661  56]],, [[659  56]],, [[658  55]],, [[656  55]],, [[655  54]],, [[653  54]],, [[652  53]],, [[650  53]],, [[649  52]],, [[641  52]],, [[637  56]],, [[637  65]],, [[639  67]],, [[639  68]],, [[653  82]],, [[653  88]],, [[652  89]],, [[652  90]],, [[651  91]],, [[651  93]],, [[650  94]],, [[650  96]],, [[649  97]],, [[649  99]],, [[648 100]],, [[648 102]],, [[647 103]],, [[647 106]],, [[646 107]],, [[646 110]],, [[645 111]],, [[645 113]],, [[644 114]],, [[644 117]],, [[643 118]],, [[643 120]],, [[642 121]],, [[642 125]],, [[641 126]],, [[641 129]],, [[640 130]],, [[640 132]],, [[639...
20 = {ndarray: (170, 1, 2)} [[[555   2]],, [[554   3]],, [[552   3]],, [[551   4]],, [[550   4]],, [[549   5]],, [[547   5]],, [[544   8]],, [[543   8]],, [[542   9]],, [[540   9]],, [[539  10]],, [[537  10]],, [[535  12]],, [[534  12]],, [[532  14]],, [[531  14]],, [[530  15]],, [[529  15]],, [[521  23]],, [[521  29]],, [[522  30]],, [[522  37]],, [[523  38]],, [[523  40]],, [[526  43]],, [[526  46]],, [[527  47]],, [[527  49]],, [[528  50]],, [[528  52]],, [[529  53]],, [[529  56]],, [[530  57]],, [[530  59]],, [[529  60]],, [[528  60]],, [[527  61]],, [[526  61]],, [[525  62]],, [[524  62]],, [[523  63]],, [[514  63]],, [[513  64]],, [[510  64]],, [[509  65]],, [[507  65]],, [[505  67]],, [[505  72]],, [[506  72]],, [[507  73]],, [[510  73]],, [[511  74]],, [[513  74]],, [[514  75]],, [[515  75]],, [[516  76]],, [[519  76]],, [[520  77]],, [[528  77]],, [[530  79]],, [[530  82]],, [[529  83]],, [[529  86]],, [[528  87]],, [[528  92]],, [[527  93]],, [[527  95]],, [[526  96]],, [[526  99]],, [[525 100]],, [[525...