sigarperm

Description: Signed area ( A - C ) G ( B - C ) acts as a double area of a triangle A B C . Here we prove that cyclically permuting the vertices doesn't change the area. (Contributed by Saveliy Skresanov, 20-Sep-2017)

		Ref	Expression
	Hypothesis	sigar	$⊢ G = (x \in ℂ, y \in ℂ ⟼ ℑ (\overline{x} y))$
	Assertion	sigarperm	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (A - C) G (B - C) = (B - A) G (C - A)$

Proof

Step	Hyp	Ref	Expression
1		sigar	$⊢ G = (x \in ℂ, y \in ℂ ⟼ ℑ (\overline{x} y))$
2		simp2	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to B \in ℂ$
3		simp3	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to C \in ℂ$
4	1	sigarim	$⊢ (B \in ℂ \land C \in ℂ) \to B G C \in ℝ$
5	4	recnd	$⊢ (B \in ℂ \land C \in ℂ) \to B G C \in ℂ$
6	2 3 5	syl2anc	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to B G C \in ℂ$
7		simp1	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to A \in ℂ$
8	1	sigarim	$⊢ (B \in ℂ \land A \in ℂ) \to B G A \in ℝ$
9	8	recnd	$⊢ (B \in ℂ \land A \in ℂ) \to B G A \in ℂ$
10	2 7 9	syl2anc	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to B G A \in ℂ$
11	6 10	negsubd	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (B G C) + (- (B G A)) = (B G C) - (B G A)$
12	1	sigarac	$⊢ (A \in ℂ \land B \in ℂ) \to A G B = - (B G A)$
13	7 2 12	syl2anc	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to A G B = - (B G A)$
14	13	eqcomd	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to - (B G A) = A G B$
15	14	oveq2d	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (B G C) + (- (B G A)) = (B G C) + (A G B)$
16	11 15	eqtr3d	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (B G C) - (B G A) = (B G C) + (A G B)$
17	16	oveq1d	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (B G C) - (B G A) - (A G C) = (B G C) + (A G B) - (A G C)$
18	1	sigarexp	$⊢ (B \in ℂ \land C \in ℂ \land A \in ℂ) \to (B - A) G (C - A) = (B G C) - (B G A) - (A G C)$
19	18	3comr	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (B - A) G (C - A) = (B G C) - (B G A) - (A G C)$
20	1	sigarexp	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (A - C) G (B - C) = (A G B) - (A G C) - (C G B)$
21	1	sigarim	$⊢ (A \in ℂ \land B \in ℂ) \to A G B \in ℝ$
22	7 2 21	syl2anc	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to A G B \in ℝ$
23	22	recnd	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to A G B \in ℂ$
24	1	sigarim	$⊢ (A \in ℂ \land C \in ℂ) \to A G C \in ℝ$
25	7 3 24	syl2anc	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to A G C \in ℝ$
26	25	recnd	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to A G C \in ℂ$
27	1	sigarim	$⊢ (C \in ℂ \land B \in ℂ) \to C G B \in ℝ$
28	3 2 27	syl2anc	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to C G B \in ℝ$
29	28	recnd	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to C G B \in ℂ$
30	23 26 29	sub32d	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (A G B) - (A G C) - (C G B) = (A G B) - (C G B) - (A G C)$
31	6 23	addcomd	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (B G C) + (A G B) = (A G B) + (B G C)$
32	1	sigarac	$⊢ (B \in ℂ \land C \in ℂ) \to B G C = - (C G B)$
33	2 3 32	syl2anc	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to B G C = - (C G B)$
34	33	eqcomd	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to - (C G B) = B G C$
35	34	oveq2d	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (A G B) + (- (C G B)) = (A G B) + (B G C)$
36	23 29	negsubd	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (A G B) + (- (C G B)) = (A G B) - (C G B)$
37	31 35 36	3eqtr2rd	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (A G B) - (C G B) = (B G C) + (A G B)$
38	37	oveq1d	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (A G B) - (C G B) - (A G C) = (B G C) + (A G B) - (A G C)$
39	20 30 38	3eqtrd	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (A - C) G (B - C) = (B G C) + (A G B) - (A G C)$
40	17 19 39	3eqtr4rd	$⊢ (A \in ℂ \land B \in ℂ \land C \in ℂ) \to (A - C) G (B - C) = (B - A) G (C - A)$

Metamath Proof Explorer

Theorem sigarperm

Proof