The prime factors of the places where the first two sequences of length 1124 differ

The following numbers, which are given with their prime factorizations, are the places where the first two sequences of length 1124 take different values. The information was obtained from a table of the two sequences superimposed.

First, here are the numbers bunched up:

1 7 37 41 47 49=7x7 61 67 74=2x37 82=2x41 101 103 107 109 191 193 262=2x131 263 271 274=2x137 289=17x17 295=5x59 305=5x61 307 319=11x29 329=7x47 341=11x31 343=7x7x7 358=2x179 359 361=19x19 362=2x181 377=13x29 379 383 391=17x23 393=3x131 397 403 409 411=3x137 413=7x59 419 421 433 437=19x23 467 469=7x67 537=3x179 541 542=2x271 543=3x181 554=2x277 571 599 607 641 643 653 661 701 709 811 813=3x7x13 821 823 827 831=3x277 857 859 883 887 932=2x2x233 934=2x467 955=5x191 958=2x479 964=2x2x241 965=5x193 1051 1055=5x211 1065=3x5x71 1069 1074=2x3x179 1076=2x2x269 1081=23x47 1084=2x2x271 1094=2x547 1097 1109

And here they are a bit more spread out.

1

7

37

41

47

49=7x7

61

67

74=2x37

82=2x41

101

103

107

109

191

193

262=2x131

263

271

274=2x137

289=17x17

295=5x59

305=5x61

307

319=11x29

329=7x47

341=11x31

343=7x7x7

358=2x179

359

361=19x19

362=2x181

377=13x29

379

383

391=17x23

393=3x131

397

403

409

411=3x137

413=7x59

419

421

433

437=19x23

467

469=7x67

537=3x179

541

542=2x271

543=3x181

554=2x277

571

599

607

641

643

653

661

701

709

811

813=3x7x13

821

823

827

831=3x277

857

859

883

887

932=2x2x233

934=2x467

955=5x191

958=2x479

964=2x2x241

965=5x193

1051

1055=5x211

1065=3x5x71

1069

1074=2x3x179

1076=2x2x269

1081=23x47

1084=2x2x271

1094=2x547

1097

1109