Proof: Add Term to Both Sides 6
Let's prove the following theorem:
if a + b = c, then a = c + (b ⋅ (-1))
Proof:
Given
| 1 | a + b = c |
|---|
| # | Claim | Reason |
|---|---|---|
| 1 | c = a + b | if a + b = c, then c = a + b |
| 2 | c + (b ⋅ (-1)) = a | if c = a + b, then c + (b ⋅ (-1)) = a |
| 3 | a = c + (b ⋅ (-1)) | if c + (b ⋅ (-1)) = a, then a = c + (b ⋅ (-1)) |
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