Show the Proof¶

In [1]:

import proveit
# Automation is not needed when only showing a stored proof:
proveit.defaults.automation = False # This will speed things up.
proveit.defaults.inline_pngs = False # Makes files smaller.
%show_proof

Out[1]:

	step type	requirements	statement
0	instantiation	1, 2, 3	⊢
	: , :
1	theorem		⊢
	proveit.numbers.multiplication.mult_complex_closure_bin
2	theorem		⊢
	proveit.numbers.number_sets.complex_numbers.i_is_complex
3	instantiation	31, 4, 5	⊢
	: , : , :
4	theorem		⊢
	proveit.numbers.number_sets.complex_numbers.real_within_complex
5	instantiation	6, 7, 8	⊢
	: , :
6	theorem		⊢
	proveit.numbers.addition.add_real_closure_bin
7	instantiation	9, 10, 11, 12	⊢
	: , : , :
8	instantiation	13, 14	⊢
	:
9	theorem		⊢
	proveit.numbers.number_sets.real_numbers.all_in_interval_co__is__real
10	theorem		⊢
	proveit.numbers.number_sets.real_numbers.zero_is_real
11	instantiation	31, 16, 15	⊢
	: , : , :
12	theorem		⊢
	proveit.physics.quantum.QPE._scaled_delta_b_floor_in_interval
13	theorem		⊢
	proveit.numbers.negation.real_closure
14	instantiation	31, 16, 17	⊢
	: , : , :
15	instantiation	31, 18, 26	⊢
	: , : , :
16	theorem		⊢
	proveit.numbers.number_sets.real_numbers.rational_within_real
17	instantiation	31, 18, 19	⊢
	: , : , :
18	theorem		⊢
	proveit.numbers.number_sets.rational_numbers.int_within_rational
19	instantiation	31, 20, 21	⊢
	: , : , :
20	instantiation	22, 23, 28	⊢
	: , :
21	assumption		⊢
22	theorem		⊢
	proveit.numbers.number_sets.integers.int_interval_within_int
23	instantiation	24, 25, 26	⊢
	: , :
24	theorem		⊢
	proveit.numbers.addition.add_int_closure_bin
25	instantiation	27, 28	⊢
	:
26	instantiation	31, 29, 30	⊢
	: , : , :
27	theorem		⊢
	proveit.numbers.negation.int_closure
28	instantiation	31, 32, 33	⊢
	: , : , :
29	theorem		⊢
	proveit.numbers.number_sets.integers.nat_within_int
30	theorem		⊢
	proveit.numbers.numerals.decimals.nat1
31	theorem		⊢
	proveit.logic.sets.inclusion.superset_membership_from_proper_subset
32	theorem		⊢
	proveit.numbers.number_sets.integers.nat_pos_within_int
33	theorem		⊢
	proveit.physics.quantum.QPE._two_pow_t_minus_one_is_nat_pos