Proof: Algebra 10 Help
Let's prove the following theorem:
a + (b ⋅ ((-1) / c)) = a - (b / c)
Proof:
| # | Claim | Reason |
|---|---|---|
| 1 | (b ⋅ (-1)) / c = (b ⋅ (-1)) ⋅ (1 / c) | (b ⋅ (-1)) / c = (b ⋅ (-1)) ⋅ (1 / c) |
| 2 | (b ⋅ (-1)) ⋅ (1 / c) = (b ⋅ (1 / c)) ⋅ (-1) | (b ⋅ (-1)) ⋅ (1 / c) = (b ⋅ (1 / c)) ⋅ (-1) |
| 3 | b ⋅ (1 / c) = b / c | b ⋅ (1 / c) = b / c |
| 4 | (b ⋅ (1 / c)) ⋅ (-1) = (b / c) ⋅ (-1) | if b ⋅ (1 / c) = b / c, then (b ⋅ (1 / c)) ⋅ (-1) = (b / c) ⋅ (-1) |
| 5 | (b ⋅ (-1)) ⋅ (1 / c) = (b / c) ⋅ (-1) | if (b ⋅ (-1)) ⋅ (1 / c) = (b ⋅ (1 / c)) ⋅ (-1) and (b ⋅ (1 / c)) ⋅ (-1) = (b / c) ⋅ (-1), then (b ⋅ (-1)) ⋅ (1 / c) = (b / c) ⋅ (-1) |
| 6 | (b ⋅ (-1)) / c = (b / c) ⋅ (-1) | if (b ⋅ (-1)) / c = (b ⋅ (-1)) ⋅ (1 / c) and (b ⋅ (-1)) ⋅ (1 / c) = (b / c) ⋅ (-1), then (b ⋅ (-1)) / c = (b / c) ⋅ (-1) |
| 7 | (b ⋅ (-1)) / c = b ⋅ ((-1) / c) | (b ⋅ (-1)) / c = b ⋅ ((-1) / c) |
| 8 | b ⋅ ((-1) / c) = (b / c) ⋅ (-1) | if (b ⋅ (-1)) / c = b ⋅ ((-1) / c) and (b ⋅ (-1)) / c = (b / c) ⋅ (-1), then b ⋅ ((-1) / c) = (b / c) ⋅ (-1) |
| 9 | a + (b ⋅ ((-1) / c)) = a + ((b / c) ⋅ (-1)) | if b ⋅ ((-1) / c) = (b / c) ⋅ (-1), then a + (b ⋅ ((-1) / c)) = a + ((b / c) ⋅ (-1)) |
| 10 | a + ((b / c) ⋅ (-1)) = a - (b / c) | a + ((b / c) ⋅ (-1)) = a - (b / c) |
| 11 | a + (b ⋅ ((-1) / c)) = a - (b / c) | if a + (b ⋅ ((-1) / c)) = a + ((b / c) ⋅ (-1)) and a + ((b / c) ⋅ (-1)) = a - (b / c), then a + (b ⋅ ((-1) / c)) = a - (b / c) |
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