Let's prove the following theorem:

if the following are true:

then a > c

Given

1	a > b
2	b > c

Proof Table

#	Claim	Reason
1	c < a	if b > c and a > b, then c < a (Greater Than Transitive Property Pre)
2	a > c	if c < a, then a > c (Symmetric Inequality Property 2)

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