Metamath Proof Explorer


Theorem lsubswap23d

Description: Swap the second and third variables in an equation with subtraction on the left, converting it into an addition.

EDITORIAL: The label for this theorem is questionable. Do not move until it would have 7 uses: current additional uses: (none). (Contributed by SN, 23-Aug-2024)

Ref Expression
Hypotheses lsubswap23d.a φ A
lsubswap23d.b φ B
lsubswap23d.1 φ A B = C
Assertion lsubswap23d φ A C = B

Proof

Step Hyp Ref Expression
1 lsubswap23d.a φ A
2 lsubswap23d.b φ B
3 lsubswap23d.1 φ A B = C
4 1 2 subcld φ A B
5 3 4 eqeltrrd φ C
6 1 2 3 lsubrotld φ B + C = A
7 6 eqcomd φ A = B + C
8 2 5 7 mvrraddd φ A C = B