Proof: Subtract Both Sides

Let's prove the following theorem:

Proof:

Proof Table

#	Claim	Reason
1	a + (c ⋅ (-1)) = (b + c) + (c ⋅ (-1))	if a = b + c, then a + (c ⋅ (-1)) = (b + c) + (c ⋅ (-1)) (Additive Property of Equality)
2	(b + c) + (c ⋅ (-1)) = b + (c + (c ⋅ (-1)))	(b + c) + (c ⋅ (-1)) = b + (c + (c ⋅ (-1))) (Associative Property of Addition)
3	a + (c ⋅ (-1)) = b + (c + (c ⋅ (-1)))	if a + (c ⋅ (-1)) = (b + c) + (c ⋅ (-1)) and (b + c) + (c ⋅ (-1)) = b + (c + (c ⋅ (-1))), then a + (c ⋅ (-1)) = b + (c + (c ⋅ (-1))) (Transitive Property of Equality)
4	c + (c ⋅ (-1)) = 0	c + (c ⋅ (-1)) = 0 (Additive Inverse Property)
5	b + (c + (c ⋅ (-1))) = b + 0	if c + (c ⋅ (-1)) = 0, then b + (c + (c ⋅ (-1))) = b + 0 (Substitution)
6	a + (c ⋅ (-1)) = b + 0	if a + (c ⋅ (-1)) = b + (c + (c ⋅ (-1))) and b + (c + (c ⋅ (-1))) = b + 0, then a + (c ⋅ (-1)) = b + 0 (Transitive Property of Equality)
7	b + 0 = b	b + 0 = b (Additive Identity)
8	a + (c ⋅ (-1)) = b	if a + (c ⋅ (-1)) = b + 0 and b + 0 = b, then a + (c ⋅ (-1)) = b (Transitive Property of Equality)

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