Proof: Write Skip Line Class Defs At 1

Let's prove the following theorem:

if the following are true:

the line at time 1 = 2
the tab at time 1 = 0
statement at line 2, tab 1 = z = __add__(x, 3)
Class Map at time 1 = [ ]

then Class Map at time 2 = [ ]

Proof:

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Given

1	the line at time 1 = 2
2	the tab at time 1 = 0
3	statement at line 2, tab 1 = `z = __add__(x, 3)`
4	Class Map at time 1 = [ ]

Proof Table

#	Claim	Reason
1	1 > 0	1 > 0 (Fixed Value Statement)
2	Class Map at time (1 + 1) = Class Map at time 1	if the line at time 1 = 2 and the tab at time 1 = 0 and statement at line 2, tab 1 = `z = __add__(x, 3)` and 1 > 0, then Class Map at time (1 + 1) = Class Map at time 1 (Skip Line (8))
3	Class Map at time (1 + 1) = [ ]	if Class Map at time (1 + 1) = Class Map at time 1 and Class Map at time 1 = [ ], then Class Map at time (1 + 1) = [ ] (Transitive Property of Equality)
4	1 + 1 = 2	1 + 1 = 2 (Fixed Value Statement)
5	Class Map at time (1 + 1) = Class Map at time 2	if 1 + 1 = 2, then Class Map at time (1 + 1) = Class Map at time 2 (Substitution)
6	Class Map at time 2 = [ ]	if Class Map at time (1 + 1) = Class Map at time 2 and Class Map at time (1 + 1) = [ ], then Class Map at time 2 = [ ] (Transitive Property of Equality Variation 2)

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