family
stringclasses 1
value | question_id
int64 0
2
| signal_type
stringclasses 2
values | amplitude_scale
float64 0.5
2.5
| frequency_cycles
float64 1
16
| phase_deg
float64 0
240
⌀ | time_step
int64 0
255
| p_value
float64 2.25
2.75
| prompt
stringlengths 157
173
| ground_truth
float64 18
41.3
| symbolic_baseline_answer
float64 18
41.3
|
|---|---|---|---|---|---|---|---|---|---|---|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 16
| 2.456699
|
Two triangles are similar with ratio 2.456698729810778:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.480385
| 29.480385
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 17
| 2.462408
|
Two triangles are similar with ratio 2.462408009626051:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.548896
| 29.548896
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 18
| 2.469562
|
Two triangles are similar with ratio 2.469561928549564:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.634743
| 29.634743
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 19
| 2.477886
|
Two triangles are similar with ratio 2.47788556548905:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.734627
| 29.734627
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 20
| 2.487059
|
Two triangles are similar with ratio 2.487059047744874:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.844709
| 29.844709
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 21
| 2.49673
|
Two triangles are similar with ratio 2.496729843538493:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.960758
| 29.960758
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 22
| 2.506526
|
Two triangles are similar with ratio 2.5065263096110026:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.078316
| 30.078316
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 23
| 2.516072
|
Two triangles are similar with ratio 2.516071973265158:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.192864
| 30.192864
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 24
| 2.525
|
Two triangles are similar with ratio 2.525:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.3
| 30.3
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 25
| 2.532967
|
Two triangles are similar with ratio 2.5329672907550034:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.395607
| 30.395607
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 26
| 2.539668
|
Two triangles are similar with ratio 2.539667667014562:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.476012
| 30.476012
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 27
| 2.544844
|
Two triangles are similar with ratio 2.5448436370766343:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.538124
| 30.538124
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 28
| 2.548296
|
Two triangles are similar with ratio 2.5482962913144536:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.579555
| 30.579555
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 29
| 2.549893
|
Two triangles are similar with ratio 2.54989294616193:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.598715
| 30.598715
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 30
| 2.549572
|
Two triangles are similar with ratio 2.5495722430686905:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.594867
| 30.594867
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 31
| 2.547347
|
Two triangles are similar with ratio 2.547346506474755:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.568158
| 30.568158
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 32
| 2.543301
|
Two triangles are similar with ratio 2.543301270189222:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.519615
| 30.519615
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 33
| 2.537592
|
Two triangles are similar with ratio 2.537591990373949:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.451104
| 30.451104
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 34
| 2.530438
|
Two triangles are similar with ratio 2.530438071450436:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.365257
| 30.365257
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 35
| 2.522114
|
Two triangles are similar with ratio 2.52211443451095:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.265373
| 30.265373
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 36
| 2.512941
|
Two triangles are similar with ratio 2.5129409522551263:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.155291
| 30.155291
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 37
| 2.50327
|
Two triangles are similar with ratio 2.5032701564615074:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.039242
| 30.039242
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 38
| 2.493474
|
Two triangles are similar with ratio 2.4934736903889974:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.921684
| 29.921684
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 39
| 2.483928
|
Two triangles are similar with ratio 2.483928026734842:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.807136
| 29.807136
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 40
| 2.475
|
Two triangles are similar with ratio 2.475:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.7
| 29.7
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 41
| 2.467033
|
Two triangles are similar with ratio 2.4670327092449966:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.604393
| 29.604393
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 42
| 2.460332
|
Two triangles are similar with ratio 2.460332332985438:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.523988
| 29.523988
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 43
| 2.455156
|
Two triangles are similar with ratio 2.4551563629233657:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.461876
| 29.461876
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 44
| 2.451704
|
Two triangles are similar with ratio 2.4517037086855464:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.420445
| 29.420445
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 45
| 2.450107
|
Two triangles are similar with ratio 2.45010705383807:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.401285
| 29.401285
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 46
| 2.450428
|
Two triangles are similar with ratio 2.4504277569313095:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.405133
| 29.405133
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 47
| 2.452653
|
Two triangles are similar with ratio 2.452653493525245:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.431842
| 29.431842
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 48
| 2.456699
|
Two triangles are similar with ratio 2.456698729810778:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.480385
| 29.480385
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 49
| 2.462408
|
Two triangles are similar with ratio 2.462408009626051:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.548896
| 29.548896
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 50
| 2.469562
|
Two triangles are similar with ratio 2.469561928549564:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.634743
| 29.634743
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 51
| 2.477886
|
Two triangles are similar with ratio 2.47788556548905:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.734627
| 29.734627
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 52
| 2.487059
|
Two triangles are similar with ratio 2.4870590477448737:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.844709
| 29.844709
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 53
| 2.49673
|
Two triangles are similar with ratio 2.4967298435384926:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.960758
| 29.960758
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 54
| 2.506526
|
Two triangles are similar with ratio 2.5065263096110026:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.078316
| 30.078316
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 55
| 2.516072
|
Two triangles are similar with ratio 2.516071973265158:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.192864
| 30.192864
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 56
| 2.525
|
Two triangles are similar with ratio 2.525:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.3
| 30.3
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 57
| 2.532967
|
Two triangles are similar with ratio 2.5329672907550034:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.395607
| 30.395607
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 58
| 2.539668
|
Two triangles are similar with ratio 2.539667667014562:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.476012
| 30.476012
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 59
| 2.544844
|
Two triangles are similar with ratio 2.5448436370766343:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.538124
| 30.538124
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 60
| 2.548296
|
Two triangles are similar with ratio 2.5482962913144536:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.579555
| 30.579555
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 61
| 2.549893
|
Two triangles are similar with ratio 2.54989294616193:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.598715
| 30.598715
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 62
| 2.549572
|
Two triangles are similar with ratio 2.5495722430686905:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.594867
| 30.594867
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 2
| 120
| 63
| 2.547347
|
Two triangles are similar with ratio 2.547346506474755:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.568158
| 30.568158
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 0
| 2.543301
|
Two triangles are similar with ratio 2.543301270189222:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.519615
| 30.519615
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 1
| 2.530438
|
Two triangles are similar with ratio 2.530438071450436:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.365257
| 30.365257
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 2
| 2.512941
|
Two triangles are similar with ratio 2.5129409522551263:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.155291
| 30.155291
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 3
| 2.493474
|
Two triangles are similar with ratio 2.4934736903889974:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.921684
| 29.921684
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 4
| 2.475
|
Two triangles are similar with ratio 2.475:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.7
| 29.7
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 5
| 2.460332
|
Two triangles are similar with ratio 2.460332332985438:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.523988
| 29.523988
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 6
| 2.451704
|
Two triangles are similar with ratio 2.4517037086855464:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.420445
| 29.420445
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 7
| 2.450428
|
Two triangles are similar with ratio 2.4504277569313095:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.405133
| 29.405133
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 8
| 2.456699
|
Two triangles are similar with ratio 2.456698729810778:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.480385
| 29.480385
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 9
| 2.469562
|
Two triangles are similar with ratio 2.469561928549564:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.634743
| 29.634743
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 10
| 2.487059
|
Two triangles are similar with ratio 2.487059047744874:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.844709
| 29.844709
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 11
| 2.506526
|
Two triangles are similar with ratio 2.5065263096110026:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.078316
| 30.078316
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 12
| 2.525
|
Two triangles are similar with ratio 2.525:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.3
| 30.3
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 13
| 2.539668
|
Two triangles are similar with ratio 2.539667667014562:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.476012
| 30.476012
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 14
| 2.548296
|
Two triangles are similar with ratio 2.5482962913144536:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.579555
| 30.579555
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 15
| 2.549572
|
Two triangles are similar with ratio 2.5495722430686905:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.594867
| 30.594867
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 16
| 2.543301
|
Two triangles are similar with ratio 2.543301270189222:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.519615
| 30.519615
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 17
| 2.530438
|
Two triangles are similar with ratio 2.530438071450436:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.365257
| 30.365257
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 18
| 2.512941
|
Two triangles are similar with ratio 2.5129409522551263:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.155291
| 30.155291
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 19
| 2.493474
|
Two triangles are similar with ratio 2.4934736903889974:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.921684
| 29.921684
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 20
| 2.475
|
Two triangles are similar with ratio 2.475:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.7
| 29.7
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 21
| 2.460332
|
Two triangles are similar with ratio 2.460332332985438:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.523988
| 29.523988
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 22
| 2.451704
|
Two triangles are similar with ratio 2.4517037086855464:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.420445
| 29.420445
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 23
| 2.450428
|
Two triangles are similar with ratio 2.4504277569313095:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.405133
| 29.405133
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 24
| 2.456699
|
Two triangles are similar with ratio 2.456698729810778:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.480385
| 29.480385
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 25
| 2.469562
|
Two triangles are similar with ratio 2.469561928549564:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.634743
| 29.634743
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 26
| 2.487059
|
Two triangles are similar with ratio 2.4870590477448737:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.844709
| 29.844709
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 27
| 2.506526
|
Two triangles are similar with ratio 2.5065263096110026:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.078316
| 30.078316
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 28
| 2.525
|
Two triangles are similar with ratio 2.525:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.3
| 30.3
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 29
| 2.539668
|
Two triangles are similar with ratio 2.539667667014562:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.476012
| 30.476012
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 30
| 2.548296
|
Two triangles are similar with ratio 2.5482962913144536:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.579555
| 30.579555
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 31
| 2.549572
|
Two triangles are similar with ratio 2.5495722430686905:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.594867
| 30.594867
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 32
| 2.543301
|
Two triangles are similar with ratio 2.543301270189222:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.519615
| 30.519615
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 33
| 2.530438
|
Two triangles are similar with ratio 2.530438071450436:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.365257
| 30.365257
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 34
| 2.512941
|
Two triangles are similar with ratio 2.5129409522551263:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.155291
| 30.155291
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 35
| 2.493474
|
Two triangles are similar with ratio 2.4934736903889974:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.921684
| 29.921684
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 36
| 2.475
|
Two triangles are similar with ratio 2.475:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.7
| 29.7
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 37
| 2.460332
|
Two triangles are similar with ratio 2.460332332985438:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.523988
| 29.523988
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 38
| 2.451704
|
Two triangles are similar with ratio 2.4517037086855464:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.420445
| 29.420445
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 39
| 2.450428
|
Two triangles are similar with ratio 2.4504277569313095:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.405133
| 29.405133
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 40
| 2.456699
|
Two triangles are similar with ratio 2.4566987298107783:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.480385
| 29.480385
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 41
| 2.469562
|
Two triangles are similar with ratio 2.469561928549564:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.634743
| 29.634743
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 42
| 2.487059
|
Two triangles are similar with ratio 2.487059047744874:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.844709
| 29.844709
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 43
| 2.506526
|
Two triangles are similar with ratio 2.5065263096110026:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.078316
| 30.078316
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 44
| 2.525
|
Two triangles are similar with ratio 2.525:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.3
| 30.3
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 45
| 2.539668
|
Two triangles are similar with ratio 2.539667667014562:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.476012
| 30.476012
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 46
| 2.548296
|
Two triangles are similar with ratio 2.5482962913144536:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.579555
| 30.579555
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 47
| 2.549572
|
Two triangles are similar with ratio 2.5495722430686905:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.594867
| 30.594867
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 48
| 2.543301
|
Two triangles are similar with ratio 2.543301270189222:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.519615
| 30.519615
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 49
| 2.530438
|
Two triangles are similar with ratio 2.530438071450436:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.365257
| 30.365257
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 50
| 2.512941
|
Two triangles are similar with ratio 2.512940952255126:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 30.155291
| 30.155291
|
similar_triangles
| 0
|
sinusoid
| 0.5
| 4
| 120
| 51
| 2.493474
|
Two triangles are similar with ratio 2.4934736903889974:1. If the smaller triangle has side length 12, what is the corresponding side length of the larger triangle?
FINAL:
| 29.921684
| 29.921684
|
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