colinearalg

Description: An algebraic characterization of colinearity. Note the similarity to brbtwn2 . (Contributed by Scott Fenton, 24-Jun-2013)

		Ref	Expression
	Assertion	colinearalg	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to ((A Btwn ⟨B, C⟩ \lor B Btwn ⟨C, A⟩ \lor C Btwn ⟨A, B⟩) \leftrightarrow \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)))$

Proof

Step	Hyp	Ref	Expression
1		brbtwn2	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (A Btwn ⟨B, C⟩ \leftrightarrow (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))))$
2		brbtwn2	$⊢ (B \in 𝔼 (N) \land C \in 𝔼 (N) \land A \in 𝔼 (N)) \to (B Btwn ⟨C, A⟩ \leftrightarrow (\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (C (i) - B (i)) (A (j) - B (j)) = (C (j) - B (j)) (A (i) - B (i))))$
3	2	3comr	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (B Btwn ⟨C, A⟩ \leftrightarrow (\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (C (i) - B (i)) (A (j) - B (j)) = (C (j) - B (j)) (A (i) - B (i))))$
4		colinearalglem3	$⊢ (B \in 𝔼 (N) \land C \in 𝔼 (N) \land A \in 𝔼 (N)) \to (\forall i \in (1 \dots N) \forall j \in (1 \dots N) (C (i) - B (i)) (A (j) - B (j)) = (C (j) - B (j)) (A (i) - B (i)) \leftrightarrow \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)))$
5	4	3comr	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (\forall i \in (1 \dots N) \forall j \in (1 \dots N) (C (i) - B (i)) (A (j) - B (j)) = (C (j) - B (j)) (A (i) - B (i)) \leftrightarrow \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)))$
6	5	anbi2d	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to ((\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (C (i) - B (i)) (A (j) - B (j)) = (C (j) - B (j)) (A (i) - B (i))) \leftrightarrow (\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))))$
7	3 6	bitrd	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (B Btwn ⟨C, A⟩ \leftrightarrow (\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))))$
8		brbtwn2	$⊢ (C \in 𝔼 (N) \land A \in 𝔼 (N) \land B \in 𝔼 (N)) \to (C Btwn ⟨A, B⟩ \leftrightarrow (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (A (i) - C (i)) (B (j) - C (j)) = (A (j) - C (j)) (B (i) - C (i))))$
9		colinearalglem2	$⊢ (C \in 𝔼 (N) \land A \in 𝔼 (N) \land B \in 𝔼 (N)) \to (\forall i \in (1 \dots N) \forall j \in (1 \dots N) (A (i) - C (i)) (B (j) - C (j)) = (A (j) - C (j)) (B (i) - C (i)) \leftrightarrow \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)))$
10	9	anbi2d	$⊢ (C \in 𝔼 (N) \land A \in 𝔼 (N) \land B \in 𝔼 (N)) \to ((\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (A (i) - C (i)) (B (j) - C (j)) = (A (j) - C (j)) (B (i) - C (i))) \leftrightarrow (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))))$
11	8 10	bitrd	$⊢ (C \in 𝔼 (N) \land A \in 𝔼 (N) \land B \in 𝔼 (N)) \to (C Btwn ⟨A, B⟩ \leftrightarrow (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))))$
12	11	3coml	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (C Btwn ⟨A, B⟩ \leftrightarrow (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))))$
13	1 7 12	3orbi123d	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to ((A Btwn ⟨B, C⟩ \lor B Btwn ⟨C, A⟩ \lor C Btwn ⟨A, B⟩) \leftrightarrow ((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)))))$
14		fveecn	$⊢ (B \in 𝔼 (N) \land i \in (1 \dots N)) \to B (i) \in ℂ$
15		fveecn	$⊢ (C \in 𝔼 (N) \land i \in (1 \dots N)) \to C (i) \in ℂ$
16		subid	$⊢ C (i) \in ℂ \to C (i) - C (i) = 0$
17	16	oveq2d	$⊢ C (i) \in ℂ \to (B (i) - C (i)) (C (i) - C (i)) = (B (i) - C (i)) \cdot 0$
18	17	adantl	$⊢ (B (i) \in ℂ \land C (i) \in ℂ) \to (B (i) - C (i)) (C (i) - C (i)) = (B (i) - C (i)) \cdot 0$
19		subcl	$⊢ (B (i) \in ℂ \land C (i) \in ℂ) \to B (i) - C (i) \in ℂ$
20	19	mul01d	$⊢ (B (i) \in ℂ \land C (i) \in ℂ) \to (B (i) - C (i)) \cdot 0 = 0$
21	18 20	eqtrd	$⊢ (B (i) \in ℂ \land C (i) \in ℂ) \to (B (i) - C (i)) (C (i) - C (i)) = 0$
22	14 15 21	syl2an	$⊢ ((B \in 𝔼 (N) \land i \in (1 \dots N)) \land (C \in 𝔼 (N) \land i \in (1 \dots N))) \to (B (i) - C (i)) (C (i) - C (i)) = 0$
23	22	anandirs	$⊢ ((B \in 𝔼 (N) \land C \in 𝔼 (N)) \land i \in (1 \dots N)) \to (B (i) - C (i)) (C (i) - C (i)) = 0$
24		0le0	$⊢ 0 \leq 0$
25	23 24	eqbrtrdi	$⊢ ((B \in 𝔼 (N) \land C \in 𝔼 (N)) \land i \in (1 \dots N)) \to (B (i) - C (i)) (C (i) - C (i)) \leq 0$
26	25	ralrimiva	$⊢ (B \in 𝔼 (N) \land C \in 𝔼 (N)) \to \forall i \in (1 \dots N) (B (i) - C (i)) (C (i) - C (i)) \leq 0$
27	26	3adant1	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to \forall i \in (1 \dots N) (B (i) - C (i)) (C (i) - C (i)) \leq 0$
28		fveq1	$⊢ C = A \to C (i) = A (i)$
29	28	oveq2d	$⊢ C = A \to B (i) - C (i) = B (i) - A (i)$
30	28	oveq2d	$⊢ C = A \to C (i) - C (i) = C (i) - A (i)$
31	29 30	oveq12d	$⊢ C = A \to (B (i) - C (i)) (C (i) - C (i)) = (B (i) - A (i)) (C (i) - A (i))$
32	31	breq1d	$⊢ C = A \to ((B (i) - C (i)) (C (i) - C (i)) \leq 0 \leftrightarrow (B (i) - A (i)) (C (i) - A (i)) \leq 0)$
33	32	ralbidv	$⊢ C = A \to (\forall i \in (1 \dots N) (B (i) - C (i)) (C (i) - C (i)) \leq 0 \leftrightarrow \forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0)$
34	27 33	syl5ibcom	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (C = A \to \forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0)$
35		3mix1	$⊢ \forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0)$
36	34 35	syl6	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (C = A \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0))$
37	36	a1dd	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (C = A \to (\forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0)))$
38		simp3	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to C \in 𝔼 (N)$
39		simp1	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to A \in 𝔼 (N)$
40		eqeefv	$⊢ (C \in 𝔼 (N) \land A \in 𝔼 (N)) \to (C = A \leftrightarrow \forall p \in (1 \dots N) C (p) = A (p))$
41	38 39 40	syl2anc	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (C = A \leftrightarrow \forall p \in (1 \dots N) C (p) = A (p))$
42	41	necon3abid	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (C \neq A \leftrightarrow \neg \forall p \in (1 \dots N) C (p) = A (p))$
43		df-ne	$⊢ C (p) \neq A (p) \leftrightarrow \neg C (p) = A (p)$
44	43	rexbii	$⊢ \exists p \in (1 \dots N) C (p) \neq A (p) \leftrightarrow \exists p \in (1 \dots N) \neg C (p) = A (p)$
45		rexnal	$⊢ \exists p \in (1 \dots N) \neg C (p) = A (p) \leftrightarrow \neg \forall p \in (1 \dots N) C (p) = A (p)$
46	44 45	bitr2i	$⊢ \neg \forall p \in (1 \dots N) C (p) = A (p) \leftrightarrow \exists p \in (1 \dots N) C (p) \neq A (p)$
47	42 46	bitrdi	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (C \neq A \leftrightarrow \exists p \in (1 \dots N) C (p) \neq A (p))$
48		ralcom	$⊢ \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)) \leftrightarrow \forall j \in (1 \dots N) \forall i \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))$
49		fveq2	$⊢ j = p \to C (j) = C (p)$
50		fveq2	$⊢ j = p \to A (j) = A (p)$
51	49 50	oveq12d	$⊢ j = p \to C (j) - A (j) = C (p) - A (p)$
52	51	oveq2d	$⊢ j = p \to (B (i) - A (i)) (C (j) - A (j)) = (B (i) - A (i)) (C (p) - A (p))$
53		fveq2	$⊢ j = p \to B (j) = B (p)$
54	53 50	oveq12d	$⊢ j = p \to B (j) - A (j) = B (p) - A (p)$
55	54	oveq1d	$⊢ j = p \to (B (j) - A (j)) (C (i) - A (i)) = (B (p) - A (p)) (C (i) - A (i))$
56	52 55	eqeq12d	$⊢ j = p \to ((B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)) \leftrightarrow (B (i) - A (i)) (C (p) - A (p)) = (B (p) - A (p)) (C (i) - A (i)))$
57	56	ralbidv	$⊢ j = p \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)) \leftrightarrow \forall i \in (1 \dots N) (B (i) - A (i)) (C (p) - A (p)) = (B (p) - A (p)) (C (i) - A (i)))$
58	57	rspcv	$⊢ p \in (1 \dots N) \to (\forall j \in (1 \dots N) \forall i \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)) \to \forall i \in (1 \dots N) (B (i) - A (i)) (C (p) - A (p)) = (B (p) - A (p)) (C (i) - A (i)))$
59	58	ad2antrl	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land (p \in (1 \dots N) \land C (p) \neq A (p))) \to (\forall j \in (1 \dots N) \forall i \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)) \to \forall i \in (1 \dots N) (B (i) - A (i)) (C (p) - A (p)) = (B (p) - A (p)) (C (i) - A (i)))$
60		fveere	$⊢ (A \in 𝔼 (N) \land p \in (1 \dots N)) \to A (p) \in ℝ$
61	60	3ad2antl1	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land p \in (1 \dots N)) \to A (p) \in ℝ$
62		fveere	$⊢ (B \in 𝔼 (N) \land p \in (1 \dots N)) \to B (p) \in ℝ$
63	62	3ad2antl2	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land p \in (1 \dots N)) \to B (p) \in ℝ$
64		fveere	$⊢ (C \in 𝔼 (N) \land p \in (1 \dots N)) \to C (p) \in ℝ$
65	64	3ad2antl3	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land p \in (1 \dots N)) \to C (p) \in ℝ$
66	61 63 65	3jca	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land p \in (1 \dots N)) \to (A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ)$
67	66	anim1i	$⊢ (((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land p \in (1 \dots N)) \land C (p) \neq A (p)) \to ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p))$
68	67	anasss	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land (p \in (1 \dots N) \land C (p) \neq A (p))) \to ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p))$
69		fveecn	$⊢ (A \in 𝔼 (N) \land i \in (1 \dots N)) \to A (i) \in ℂ$
70	69	3ad2antl1	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land i \in (1 \dots N)) \to A (i) \in ℂ$
71	14	3ad2antl2	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land i \in (1 \dots N)) \to B (i) \in ℂ$
72	15	3ad2antl3	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land i \in (1 \dots N)) \to C (i) \in ℂ$
73	70 71 72	3jca	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land i \in (1 \dots N)) \to (A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ)$
74	73	adantlr	$⊢ (((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p))) \land i \in (1 \dots N)) \to (A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ)$
75		recn	$⊢ A (p) \in ℝ \to A (p) \in ℂ$
76		recn	$⊢ B (p) \in ℝ \to B (p) \in ℂ$
77		recn	$⊢ C (p) \in ℝ \to C (p) \in ℂ$
78	75 76 77	3anim123i	$⊢ (A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \to (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ)$
79	78	adantr	$⊢ ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p)) \to (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ)$
80	79	ad2antlr	$⊢ (((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p))) \land i \in (1 \dots N)) \to (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ)$
81		simplrr	$⊢ (((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p))) \land i \in (1 \dots N)) \to C (p) \neq A (p)$
82		eqcom	$⊢ B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \leftrightarrow (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) = B (i)$
83		simp12	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to B (i) \in ℂ$
84		simp11	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to A (i) \in ℂ$
85		simp22	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to B (p) \in ℂ$
86		simp21	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to A (p) \in ℂ$
87	85 86	subcld	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to B (p) - A (p) \in ℂ$
88		simp23	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to C (p) \in ℂ$
89	88 86	subcld	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to C (p) - A (p) \in ℂ$
90		simpr3	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ)) \to C (p) \in ℂ$
91		simpr1	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ)) \to A (p) \in ℂ$
92	90 91	subeq0ad	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ)) \to (C (p) - A (p) = 0 \leftrightarrow C (p) = A (p))$
93	92	necon3bid	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ)) \to (C (p) - A (p) \neq 0 \leftrightarrow C (p) \neq A (p))$
94	93	biimp3ar	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to C (p) - A (p) \neq 0$
95	87 89 94	divcld	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to \frac{B (p) - A (p)}{C (p) - A (p)} \in ℂ$
96		simp13	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to C (i) \in ℂ$
97	96 84	subcld	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to C (i) - A (i) \in ℂ$
98	95 97	mulcld	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) \in ℂ$
99		subadd2	$⊢ (B (i) \in ℂ \land A (i) \in ℂ \land (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) \in ℂ) \to (B (i) - A (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) \leftrightarrow (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) = B (i))$
100	99	bicomd	$⊢ (B (i) \in ℂ \land A (i) \in ℂ \land (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) \in ℂ) \to ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) = B (i) \leftrightarrow B (i) - A (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)))$
101	83 84 98 100	syl3anc	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) = B (i) \leftrightarrow B (i) - A (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)))$
102	87 97 89 94	div23d	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to \frac{(B (p) - A (p)) (C (i) - A (i))}{C (p) - A (p)} = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i))$
103	102	eqeq2d	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to (B (i) - A (i) = \frac{(B (p) - A (p)) (C (i) - A (i))}{C (p) - A (p)} \leftrightarrow B (i) - A (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)))$
104		eqcom	$⊢ B (i) - A (i) = \frac{(B (p) - A (p)) (C (i) - A (i))}{C (p) - A (p)} \leftrightarrow \frac{(B (p) - A (p)) (C (i) - A (i))}{C (p) - A (p)} = B (i) - A (i)$
105	87 97	mulcld	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to (B (p) - A (p)) (C (i) - A (i)) \in ℂ$
106	83 84	subcld	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to B (i) - A (i) \in ℂ$
107	105 89 106 94	divmuld	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to (\frac{(B (p) - A (p)) (C (i) - A (i))}{C (p) - A (p)} = B (i) - A (i) \leftrightarrow (C (p) - A (p)) (B (i) - A (i)) = (B (p) - A (p)) (C (i) - A (i)))$
108	89 106	mulcomd	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to (C (p) - A (p)) (B (i) - A (i)) = (B (i) - A (i)) (C (p) - A (p))$
109	108	eqeq1d	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to ((C (p) - A (p)) (B (i) - A (i)) = (B (p) - A (p)) (C (i) - A (i)) \leftrightarrow (B (i) - A (i)) (C (p) - A (p)) = (B (p) - A (p)) (C (i) - A (i)))$
110	107 109	bitrd	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to (\frac{(B (p) - A (p)) (C (i) - A (i))}{C (p) - A (p)} = B (i) - A (i) \leftrightarrow (B (i) - A (i)) (C (p) - A (p)) = (B (p) - A (p)) (C (i) - A (i)))$
111	104 110	bitrid	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to (B (i) - A (i) = \frac{(B (p) - A (p)) (C (i) - A (i))}{C (p) - A (p)} \leftrightarrow (B (i) - A (i)) (C (p) - A (p)) = (B (p) - A (p)) (C (i) - A (i)))$
112	101 103 111	3bitr2d	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) = B (i) \leftrightarrow (B (i) - A (i)) (C (p) - A (p)) = (B (p) - A (p)) (C (i) - A (i)))$
113	82 112	bitrid	$⊢ ((A (i) \in ℂ \land B (i) \in ℂ \land C (i) \in ℂ) \land (A (p) \in ℂ \land B (p) \in ℂ \land C (p) \in ℂ) \land C (p) \neq A (p)) \to (B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \leftrightarrow (B (i) - A (i)) (C (p) - A (p)) = (B (p) - A (p)) (C (i) - A (i)))$
114	74 80 81 113	syl3anc	$⊢ (((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p))) \land i \in (1 \dots N)) \to (B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \leftrightarrow (B (i) - A (i)) (C (p) - A (p)) = (B (p) - A (p)) (C (i) - A (i)))$
115	114	ralbidva	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p))) \to (\forall i \in (1 \dots N) B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \leftrightarrow \forall i \in (1 \dots N) (B (i) - A (i)) (C (p) - A (p)) = (B (p) - A (p)) (C (i) - A (i)))$
116		3simpb	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (A \in 𝔼 (N) \land C \in 𝔼 (N))$
117		simpl2	$⊢ ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p)) \to B (p) \in ℝ$
118		simpl1	$⊢ ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p)) \to A (p) \in ℝ$
119	117 118	resubcld	$⊢ ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p)) \to B (p) - A (p) \in ℝ$
120		simpl3	$⊢ ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p)) \to C (p) \in ℝ$
121	120 118	resubcld	$⊢ ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p)) \to C (p) - A (p) \in ℝ$
122		simp3	$⊢ (A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \to C (p) \in ℝ$
123	122	recnd	$⊢ (A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \to C (p) \in ℂ$
124	75	3ad2ant1	$⊢ (A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \to A (p) \in ℂ$
125	123 124	subeq0ad	$⊢ (A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \to (C (p) - A (p) = 0 \leftrightarrow C (p) = A (p))$
126	125	necon3bid	$⊢ (A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \to (C (p) - A (p) \neq 0 \leftrightarrow C (p) \neq A (p))$
127	126	biimpar	$⊢ ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p)) \to C (p) - A (p) \neq 0$
128	119 121 127	redivcld	$⊢ ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p)) \to \frac{B (p) - A (p)}{C (p) - A (p)} \in ℝ$
129		colinearalglem4	$⊢ ((A \in 𝔼 (N) \land C \in 𝔼 (N)) \land \frac{B (p) - A (p)}{C (p) - A (p)} \in ℝ) \to (\forall i \in (1 \dots N) ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) (A (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - C (i)) \leq 0)$
130		oveq1	$⊢ B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to B (i) - A (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - A (i)$
131	130	oveq1d	$⊢ B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to (B (i) - A (i)) (C (i) - A (i)) = ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - A (i)) (C (i) - A (i))$
132	131	breq1d	$⊢ B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to ((B (i) - A (i)) (C (i) - A (i)) \leq 0 \leftrightarrow ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - A (i)) (C (i) - A (i)) \leq 0)$
133	132	ralimi	$⊢ \forall i \in (1 \dots N) B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to \forall i \in (1 \dots N) ((B (i) - A (i)) (C (i) - A (i)) \leq 0 \leftrightarrow ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - A (i)) (C (i) - A (i)) \leq 0)$
134		ralbi	$⊢ \forall i \in (1 \dots N) ((B (i) - A (i)) (C (i) - A (i)) \leq 0 \leftrightarrow ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - A (i)) (C (i) - A (i)) \leq 0) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \leftrightarrow \forall i \in (1 \dots N) ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - A (i)) (C (i) - A (i)) \leq 0)$
135	133 134	syl	$⊢ \forall i \in (1 \dots N) B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \leftrightarrow \forall i \in (1 \dots N) ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - A (i)) (C (i) - A (i)) \leq 0)$
136		oveq2	$⊢ B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to C (i) - B (i) = C (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))$
137		oveq2	$⊢ B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to A (i) - B (i) = A (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))$
138	136 137	oveq12d	$⊢ B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to (C (i) - B (i)) (A (i) - B (i)) = (C (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) (A (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i)))$
139	138	breq1d	$⊢ B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to ((C (i) - B (i)) (A (i) - B (i)) \leq 0 \leftrightarrow (C (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) (A (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) \leq 0)$
140	139	ralimi	$⊢ \forall i \in (1 \dots N) B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to \forall i \in (1 \dots N) ((C (i) - B (i)) (A (i) - B (i)) \leq 0 \leftrightarrow (C (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) (A (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) \leq 0)$
141		ralbi	$⊢ \forall i \in (1 \dots N) ((C (i) - B (i)) (A (i) - B (i)) \leq 0 \leftrightarrow (C (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) (A (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) \leq 0) \to (\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \leftrightarrow \forall i \in (1 \dots N) (C (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) (A (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) \leq 0)$
142	140 141	syl	$⊢ \forall i \in (1 \dots N) B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to (\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \leftrightarrow \forall i \in (1 \dots N) (C (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) (A (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) \leq 0)$
143		oveq1	$⊢ B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to B (i) - C (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - C (i)$
144	143	oveq2d	$⊢ B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to (A (i) - C (i)) (B (i) - C (i)) = (A (i) - C (i)) ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - C (i))$
145	144	breq1d	$⊢ B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to ((A (i) - C (i)) (B (i) - C (i)) \leq 0 \leftrightarrow (A (i) - C (i)) ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - C (i)) \leq 0)$
146	145	ralimi	$⊢ \forall i \in (1 \dots N) B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to \forall i \in (1 \dots N) ((A (i) - C (i)) (B (i) - C (i)) \leq 0 \leftrightarrow (A (i) - C (i)) ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - C (i)) \leq 0)$
147		ralbi	$⊢ \forall i \in (1 \dots N) ((A (i) - C (i)) (B (i) - C (i)) \leq 0 \leftrightarrow (A (i) - C (i)) ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - C (i)) \leq 0) \to (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \leftrightarrow \forall i \in (1 \dots N) (A (i) - C (i)) ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - C (i)) \leq 0)$
148	146 147	syl	$⊢ \forall i \in (1 \dots N) B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \leftrightarrow \forall i \in (1 \dots N) (A (i) - C (i)) ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - C (i)) \leq 0)$
149	135 142 148	3orbi123d	$⊢ \forall i \in (1 \dots N) B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to ((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0) \leftrightarrow (\forall i \in (1 \dots N) ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) (A (i) - ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i))) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) ((\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) - C (i)) \leq 0))$
150	129 149	syl5ibrcom	$⊢ ((A \in 𝔼 (N) \land C \in 𝔼 (N)) \land \frac{B (p) - A (p)}{C (p) - A (p)} \in ℝ) \to (\forall i \in (1 \dots N) B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0))$
151	116 128 150	syl2an	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p))) \to (\forall i \in (1 \dots N) B (i) = (\frac{B (p) - A (p)}{C (p) - A (p)}) (C (i) - A (i)) + A (i) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0))$
152	115 151	sylbird	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land ((A (p) \in ℝ \land B (p) \in ℝ \land C (p) \in ℝ) \land C (p) \neq A (p))) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (p) - A (p)) = (B (p) - A (p)) (C (i) - A (i)) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0))$
153	68 152	syldan	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land (p \in (1 \dots N) \land C (p) \neq A (p))) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (p) - A (p)) = (B (p) - A (p)) (C (i) - A (i)) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0))$
154	59 153	syld	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land (p \in (1 \dots N) \land C (p) \neq A (p))) \to (\forall j \in (1 \dots N) \forall i \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0))$
155	48 154	biimtrid	$⊢ ((A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \land (p \in (1 \dots N) \land C (p) \neq A (p))) \to (\forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0))$
156	155	rexlimdvaa	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (\exists p \in (1 \dots N) C (p) \neq A (p) \to (\forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0)))$
157	47 156	sylbid	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (C \neq A \to (\forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0)))$
158	37 157	pm2.61dne	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (\forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)) \to (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0))$
159	158	pm4.71rd	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (\forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)) \leftrightarrow ((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0) \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))))$
160		andir	$⊢ ((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0) \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \leftrightarrow ((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))))$
161	160	orbi1i	$⊢ (((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0) \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)))) \leftrightarrow (((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)))) \lor (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))))$
162		df-3or	$⊢ (\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0) \leftrightarrow ((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0) \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0)$
163	162	anbi1i	$⊢ ((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0) \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \leftrightarrow (((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0) \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0) \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)))$
164		andir	$⊢ (((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0) \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0) \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \leftrightarrow (((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0) \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))))$
165	163 164	bitri	$⊢ ((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0) \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \leftrightarrow (((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0) \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))))$
166		df-3or	$⊢ ((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)))) \leftrightarrow (((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)))) \lor (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))))$
167	161 165 166	3bitr4i	$⊢ ((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \lor \forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \lor \forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0) \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \leftrightarrow ((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))))$
168	159 167	bitr2di	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to (((\forall i \in (1 \dots N) (B (i) - A (i)) (C (i) - A (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (C (i) - B (i)) (A (i) - B (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i))) \lor (\forall i \in (1 \dots N) (A (i) - C (i)) (B (i) - C (i)) \leq 0 \land \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)))) \leftrightarrow \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)))$
169	13 168	bitrd	$⊢ (A \in 𝔼 (N) \land B \in 𝔼 (N) \land C \in 𝔼 (N)) \to ((A Btwn ⟨B, C⟩ \lor B Btwn ⟨C, A⟩ \lor C Btwn ⟨A, B⟩) \leftrightarrow \forall i \in (1 \dots N) \forall j \in (1 \dots N) (B (i) - A (i)) (C (j) - A (j)) = (B (j) - A (j)) (C (i) - A (i)))$

Metamath Proof Explorer

Theorem colinearalg

Proof