| step type | requirements | statement |
0 | instantiation | 1, 2, 3, 4 | ⊢ |
| : , : , : , : |
1 | reference | 50 | ⊢ |
2 | instantiation | 5, 6, 7, 8, 9, 10, 11, 12, 13, 14* | ⊢ |
| : , : , : , : |
3 | instantiation | 78, 15 | ⊢ |
| : , : |
4 | instantiation | 78, 16 | ⊢ |
| : , : |
5 | theorem | | ⊢ |
| proveit.core_expr_types.tuples.general_len |
6 | theorem | | ⊢ |
| proveit.numbers.numerals.decimals.posnat5 |
7 | instantiation | 38 | ⊢ |
| : , : , : , : , : |
8 | instantiation | 38 | ⊢ |
| : , : , : , : , : |
9 | instantiation | 38 | ⊢ |
| : , : , : , : , : |
10 | instantiation | 19, 17, 30 | ⊢ |
| : , : , : |
11 | instantiation | 19, 18, 70 | ⊢ |
| : , : , : |
12 | instantiation | 19, 18, 31 | ⊢ |
| : , : , : |
13 | instantiation | 19, 25, 32 | ⊢ |
| : , : , : |
14 | instantiation | 110, 20, 21 | ⊢ |
| : , : , : |
15 | instantiation | 91, 140, 96, 95, 67, 97, 77, 104, 108 | ⊢ |
| : , : , : , : , : , : |
16 | instantiation | 22, 23, 24, 25 | ⊢ |
| : , : , : |
17 | instantiation | 138, 36, 137 | ⊢ |
| : , : , : |
18 | instantiation | 138, 36, 129 | ⊢ |
| : , : , : |
19 | theorem | | ⊢ |
| proveit.logic.equality.sub_left_side_into |
20 | instantiation | 26, 27, 28, 29, 30, 70, 31, 32 | ⊢ |
| : , : , : , : |
21 | instantiation | 110, 33, 34 | ⊢ |
| : , : , : |
22 | theorem | | ⊢ |
| proveit.core_expr_types.tuples.len_of_ranges_with_repeated_indices_from_1 |
23 | theorem | | ⊢ |
| proveit.numbers.numerals.decimals.posnat3 |
24 | instantiation | 35, 126 | ⊢ |
| : , : |
25 | instantiation | 138, 36, 37 | ⊢ |
| : , : , : |
26 | axiom | | ⊢ |
| proveit.core_expr_types.operations.operands_substitution |
27 | theorem | | ⊢ |
| proveit.numbers.numerals.decimals.nat5 |
28 | instantiation | 38 | ⊢ |
| : , : , : , : , : |
29 | instantiation | 38 | ⊢ |
| : , : , : , : , : |
30 | instantiation | 87, 102, 104, 88 | ⊢ |
| : , : , : |
31 | instantiation | 110, 39, 40 | ⊢ |
| : , : , : |
32 | instantiation | 110, 41, 42 | ⊢ |
| : , : , : |
33 | instantiation | 66, 43, 96, 95, 44, 67, 97, 104, 108 | ⊢ |
| : , : , : , : , : , : |
34 | instantiation | 50, 45, 46, 47 | ⊢ |
| : , : , : , : |
35 | theorem | | ⊢ |
| proveit.core_expr_types.tuples.range_from1_len_typical_eq |
36 | theorem | | ⊢ |
| proveit.numbers.number_sets.natural_numbers.nat_pos_within_nat |
37 | instantiation | 48, 137, 129 | ⊢ |
| : , : |
38 | theorem | | ⊢ |
| proveit.numbers.numerals.decimals.tuple_len_5_typical_eq |
39 | instantiation | 120, 49 | ⊢ |
| : , : , : |
40 | instantiation | 50, 51, 52, 53 | ⊢ |
| : , : , : , : |
41 | instantiation | 66, 95, 96, 97, 67, 84, 104, 108, 85, 102 | ⊢ |
| : , : , : , : , : , : |
42 | instantiation | 54, 96, 95, 67, 97, 104, 108, 102 | ⊢ |
| : , : , : , : , : , : , : , : |
43 | theorem | | ⊢ |
| proveit.numbers.numerals.decimals.nat4 |
44 | instantiation | 55 | ⊢ |
| : , : , : , : |
45 | instantiation | 110, 56, 57 | ⊢ |
| : , : , : |
46 | instantiation | 94, 95, 126, 97, 58, 60, 104, 108, 59* | ⊢ |
| : , : , : , : , : , : |
47 | instantiation | 94, 140, 126, 95, 60, 97, 61, 108, 62* | ⊢ |
| : , : , : , : , : , : |
48 | theorem | | ⊢ |
| proveit.numbers.addition.add_nat_pos_closure_bin |
49 | instantiation | 63, 104, 102 | ⊢ |
| : , : |
50 | theorem | | ⊢ |
| proveit.logic.equality.four_chain_transitivity |
51 | instantiation | 66, 95, 96, 97, 67, 64, 104, 108, 65, 102 | ⊢ |
| : , : , : , : , : , : |
52 | instantiation | 66, 96, 140, 67, 68, 104, 108, 82, 85, 102 | ⊢ |
| : , : , : , : , : , : |
53 | instantiation | 110, 69, 70 | ⊢ |
| : , : , : |
54 | theorem | | ⊢ |
| proveit.numbers.addition.subtraction.add_cancel_general_rev |
55 | theorem | | ⊢ |
| proveit.numbers.numerals.decimals.tuple_len_4_typical_eq |
56 | instantiation | 72, 140, 126, 71, 104, 108 | ⊢ |
| : , : , : , : , : , : , : |
57 | instantiation | 72, 96, 140, 73, 74, 104, 108 | ⊢ |
| : , : , : , : , : , : , : |
58 | instantiation | 106 | ⊢ |
| : , : , : |
59 | instantiation | 78, 75, 80* | ⊢ |
| : , : |
60 | instantiation | 106 | ⊢ |
| : , : , : |
61 | instantiation | 76, 77, 104 | ⊢ |
| : , : |
62 | instantiation | 78, 79, 80* | ⊢ |
| : , : |
63 | theorem | | ⊢ |
| proveit.numbers.negation.distribute_neg_through_binary_sum |
64 | instantiation | 109 | ⊢ |
| : , : |
65 | instantiation | 81, 82, 85 | ⊢ |
| : , : |
66 | theorem | | ⊢ |
| proveit.numbers.addition.disassociation |
67 | instantiation | 109 | ⊢ |
| : , : |
68 | instantiation | 109 | ⊢ |
| : , : |
69 | instantiation | 83, 95, 140, 96, 97, 84, 104, 108, 85, 102, 86 | ⊢ |
| : , : , : , : , : , : , : , : |
70 | instantiation | 87, 102, 108, 88 | ⊢ |
| : , : , : |
71 | instantiation | 106 | ⊢ |
| : , : , : |
72 | theorem | | ⊢ |
| proveit.numbers.addition.leftward_commutation |
73 | instantiation | 109 | ⊢ |
| : , : |
74 | instantiation | 109 | ⊢ |
| : , : |
75 | instantiation | 91, 95, 126, 140, 97, 92, 102, 104, 89* | ⊢ |
| : , : , : , : , : , : |
76 | theorem | | ⊢ |
| proveit.numbers.multiplication.mult_complex_closure_bin |
77 | instantiation | 138, 118, 90 | ⊢ |
| : , : , : |
78 | theorem | | ⊢ |
| proveit.logic.equality.equals_reversal |
79 | instantiation | 91, 95, 126, 140, 97, 92, 102, 108, 93* | ⊢ |
| : , : , : , : , : , : |
80 | instantiation | 94, 95, 96, 140, 97, 98, 102, 99* | ⊢ |
| : , : , : , : , : , : |
81 | theorem | | ⊢ |
| proveit.numbers.addition.add_complex_closure_bin |
82 | instantiation | 138, 118, 100 | ⊢ |
| : , : , : |
83 | theorem | | ⊢ |
| proveit.numbers.addition.subtraction.add_cancel_general |
84 | instantiation | 109 | ⊢ |
| : , : |
85 | instantiation | 101, 102 | ⊢ |
| : |
86 | instantiation | 103 | ⊢ |
| : |
87 | theorem | | ⊢ |
| proveit.numbers.addition.subtraction.add_cancel_triple_32 |
88 | instantiation | 103 | ⊢ |
| : |
89 | instantiation | 107, 104 | ⊢ |
| : |
90 | instantiation | 138, 124, 105 | ⊢ |
| : , : , : |
91 | theorem | | ⊢ |
| proveit.numbers.multiplication.distribute_through_sum |
92 | instantiation | 106 | ⊢ |
| : , : , : |
93 | instantiation | 107, 108 | ⊢ |
| : |
94 | theorem | | ⊢ |
| proveit.numbers.addition.association |
95 | axiom | | ⊢ |
| proveit.numbers.number_sets.natural_numbers.zero_in_nats |
96 | theorem | | ⊢ |
| proveit.numbers.numerals.decimals.nat2 |
97 | theorem | | ⊢ |
| proveit.core_expr_types.tuples.tuple_len_0_typical_eq |
98 | instantiation | 109 | ⊢ |
| : , : |
99 | instantiation | 110, 111, 112 | ⊢ |
| : , : , : |
100 | instantiation | 138, 113, 114 | ⊢ |
| : , : , : |
101 | theorem | | ⊢ |
| proveit.numbers.negation.complex_closure |
102 | instantiation | 138, 118, 115 | ⊢ |
| : , : , : |
103 | axiom | | ⊢ |
| proveit.logic.equality.equals_reflexivity |
104 | instantiation | 138, 118, 116 | ⊢ |
| : , : , : |
105 | instantiation | 138, 132, 117 | ⊢ |
| : , : , : |
106 | theorem | | ⊢ |
| proveit.numbers.numerals.decimals.tuple_len_3_typical_eq |
107 | theorem | | ⊢ |
| proveit.numbers.multiplication.elim_one_left |
108 | instantiation | 138, 118, 119 | ⊢ |
| : , : , : |
109 | theorem | | ⊢ |
| proveit.numbers.numerals.decimals.tuple_len_2_typical_eq |
110 | axiom | | ⊢ |
| proveit.logic.equality.equals_transitivity |
111 | instantiation | 120, 121 | ⊢ |
| : , : , : |
112 | theorem | | ⊢ |
| proveit.numbers.numerals.decimals.add_2_1 |
113 | theorem | | ⊢ |
| proveit.numbers.number_sets.real_numbers.real_neg_within_real |
114 | instantiation | 138, 122, 123 | ⊢ |
| : , : , : |
115 | instantiation | 138, 124, 125 | ⊢ |
| : , : , : |
116 | instantiation | 127, 128, 137 | ⊢ |
| : , : , : |
117 | instantiation | 138, 139, 126 | ⊢ |
| : , : , : |
118 | theorem | | ⊢ |
| proveit.numbers.number_sets.complex_numbers.real_within_complex |
119 | instantiation | 127, 128, 129 | ⊢ |
| : , : , : |
120 | axiom | | ⊢ |
| proveit.logic.equality.substitution |
121 | theorem | | ⊢ |
| proveit.numbers.numerals.decimals.add_1_1 |
122 | theorem | | ⊢ |
| proveit.numbers.number_sets.real_numbers.rational_neg_within_real_neg |
123 | instantiation | 138, 130, 131 | ⊢ |
| : , : , : |
124 | theorem | | ⊢ |
| proveit.numbers.number_sets.real_numbers.rational_within_real |
125 | instantiation | 138, 132, 133 | ⊢ |
| : , : , : |
126 | theorem | | ⊢ |
| proveit.numbers.numerals.decimals.nat3 |
127 | theorem | | ⊢ |
| proveit.logic.sets.inclusion.unfold_subset_eq |
128 | instantiation | 134, 135 | ⊢ |
| : , : |
129 | axiom | | ⊢ |
| proveit.physics.quantum.QPE._s_in_nat_pos |
130 | theorem | | ⊢ |
| proveit.numbers.number_sets.rational_numbers.neg_int_within_rational_neg |
131 | instantiation | 136, 137 | ⊢ |
| : |
132 | theorem | | ⊢ |
| proveit.numbers.number_sets.rational_numbers.int_within_rational |
133 | instantiation | 138, 139, 140 | ⊢ |
| : , : , : |
134 | theorem | | ⊢ |
| proveit.logic.sets.inclusion.relax_proper_subset |
135 | theorem | | ⊢ |
| proveit.numbers.number_sets.real_numbers.nat_pos_within_real |
136 | theorem | | ⊢ |
| proveit.numbers.negation.int_neg_closure |
137 | axiom | | ⊢ |
| proveit.physics.quantum.QPE._t_in_natural_pos |
138 | theorem | | ⊢ |
| proveit.logic.sets.inclusion.superset_membership_from_proper_subset |
139 | theorem | | ⊢ |
| proveit.numbers.number_sets.integers.nat_within_int |
140 | theorem | | ⊢ |
| proveit.numbers.numerals.decimals.nat1 |
*equality replacement requirements |