pjhthlem1

Description: Lemma for pjhth . (Contributed by NM, 10-Oct-1999) (Revised by Mario Carneiro, 15-May-2014) (Proof shortened by AV, 10-Jul-2022) (New usage is discouraged.)

	Ref	Expression
Hypotheses	pjhth.1	$⊢ H \in C_{ℋ}$
	pjhth.2	$⊢ φ \to A \in ℋ$
	pjhth.3	$⊢ φ \to B \in H$
	pjhth.4	$⊢ φ \to C \in H$
	pjhth.5	$⊢ φ \to \forall x \in H {norm}_{ℎ} (A -_{ℎ} B) \leq {norm}_{ℎ} (A -_{ℎ} x)$
	pjhth.6	$⊢ T = \frac{(A -_{ℎ} B) \cdot_{ih} C}{(C \cdot_{ih} C) + 1}$
Assertion	pjhthlem1	$⊢ φ \to (A -_{ℎ} B) \cdot_{ih} C = 0$

Proof

Step	Hyp	Ref	Expression
1		pjhth.1	$⊢ H \in C_{ℋ}$
2		pjhth.2	$⊢ φ \to A \in ℋ$
3		pjhth.3	$⊢ φ \to B \in H$
4		pjhth.4	$⊢ φ \to C \in H$
5		pjhth.5	$⊢ φ \to \forall x \in H {norm}_{ℎ} (A -_{ℎ} B) \leq {norm}_{ℎ} (A -_{ℎ} x)$
6		pjhth.6	$⊢ T = \frac{(A -_{ℎ} B) \cdot_{ih} C}{(C \cdot_{ih} C) + 1}$
7	1	cheli	$⊢ B \in H \to B \in ℋ$
8	3 7	syl	$⊢ φ \to B \in ℋ$
9		hvsubcl	$⊢ (A \in ℋ \land B \in ℋ) \to A -_{ℎ} B \in ℋ$
10	2 8 9	syl2anc	$⊢ φ \to A -_{ℎ} B \in ℋ$
11	1	cheli	$⊢ C \in H \to C \in ℋ$
12	4 11	syl	$⊢ φ \to C \in ℋ$
13		hicl	$⊢ (A -_{ℎ} B \in ℋ \land C \in ℋ) \to (A -_{ℎ} B) \cdot_{ih} C \in ℂ$
14	10 12 13	syl2anc	$⊢ φ \to (A -_{ℎ} B) \cdot_{ih} C \in ℂ$
15	14	abscld	$⊢ φ \to \|(A -_{ℎ} B) \cdot_{ih} C\| \in ℝ$
16	15	recnd	$⊢ φ \to \|(A -_{ℎ} B) \cdot_{ih} C\| \in ℂ$
17	15	resqcld	$⊢ φ \to {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} \in ℝ$
18	17	renegcld	$⊢ φ \to - {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} \in ℝ$
19		hiidrcl	$⊢ C \in ℋ \to C \cdot_{ih} C \in ℝ$
20	12 19	syl	$⊢ φ \to C \cdot_{ih} C \in ℝ$
21		2re	$⊢ 2 \in ℝ$
22		readdcl	$⊢ (C \cdot_{ih} C \in ℝ \land 2 \in ℝ) \to (C \cdot_{ih} C) + 2 \in ℝ$
23	20 21 22	sylancl	$⊢ φ \to (C \cdot_{ih} C) + 2 \in ℝ$
24		0red	$⊢ φ \to 0 \in ℝ$
25		peano2re	$⊢ C \cdot_{ih} C \in ℝ \to (C \cdot_{ih} C) + 1 \in ℝ$
26	20 25	syl	$⊢ φ \to (C \cdot_{ih} C) + 1 \in ℝ$
27		hiidge0	$⊢ C \in ℋ \to 0 \leq C \cdot_{ih} C$
28	12 27	syl	$⊢ φ \to 0 \leq C \cdot_{ih} C$
29	20	ltp1d	$⊢ φ \to C \cdot_{ih} C < (C \cdot_{ih} C) + 1$
30	24 20 26 28 29	lelttrd	$⊢ φ \to 0 < (C \cdot_{ih} C) + 1$
31	26	ltp1d	$⊢ φ \to (C \cdot_{ih} C) + 1 < (C \cdot_{ih} C) + 1 + 1$
32		df-2	$⊢ 2 = 1 + 1$
33	32	oveq2i	$⊢ (C \cdot_{ih} C) + 2 = (C \cdot_{ih} C) + 1 + 1$
34	20	recnd	$⊢ φ \to C \cdot_{ih} C \in ℂ$
35		ax-1cn	$⊢ 1 \in ℂ$
36		addass	$⊢ (C \cdot_{ih} C \in ℂ \land 1 \in ℂ \land 1 \in ℂ) \to (C \cdot_{ih} C) + 1 + 1 = (C \cdot_{ih} C) + 1 + 1$
37	35 35 36	mp3an23	$⊢ C \cdot_{ih} C \in ℂ \to (C \cdot_{ih} C) + 1 + 1 = (C \cdot_{ih} C) + 1 + 1$
38	34 37	syl	$⊢ φ \to (C \cdot_{ih} C) + 1 + 1 = (C \cdot_{ih} C) + 1 + 1$
39	33 38	eqtr4id	$⊢ φ \to (C \cdot_{ih} C) + 2 = (C \cdot_{ih} C) + 1 + 1$
40	31 39	breqtrrd	$⊢ φ \to (C \cdot_{ih} C) + 1 < (C \cdot_{ih} C) + 2$
41	24 26 23 30 40	lttrd	$⊢ φ \to 0 < (C \cdot_{ih} C) + 2$
42	23 41	elrpd	$⊢ φ \to (C \cdot_{ih} C) + 2 \in ℝ^{+}$
43		oveq2	$⊢ x = B +_{ℎ} (T \cdot_{ℎ} C) \to A -_{ℎ} x = A -_{ℎ} (B +_{ℎ} (T \cdot_{ℎ} C))$
44	43	fveq2d	$⊢ x = B +_{ℎ} (T \cdot_{ℎ} C) \to {norm}_{ℎ} (A -_{ℎ} x) = {norm}_{ℎ} (A -_{ℎ} (B +_{ℎ} (T \cdot_{ℎ} C)))$
45	44	breq2d	$⊢ x = B +_{ℎ} (T \cdot_{ℎ} C) \to ({norm}_{ℎ} (A -_{ℎ} B) \leq {norm}_{ℎ} (A -_{ℎ} x) \leftrightarrow {norm}_{ℎ} (A -_{ℎ} B) \leq {norm}_{ℎ} (A -_{ℎ} (B +_{ℎ} (T \cdot_{ℎ} C))))$
46	1	chshii	$⊢ H \in S_{ℋ}$
47	46	a1i	$⊢ φ \to H \in S_{ℋ}$
48	26	recnd	$⊢ φ \to (C \cdot_{ih} C) + 1 \in ℂ$
49	20 28	ge0p1rpd	$⊢ φ \to (C \cdot_{ih} C) + 1 \in ℝ^{+}$
50	49	rpne0d	$⊢ φ \to (C \cdot_{ih} C) + 1 \neq 0$
51	14 48 50	divcld	$⊢ φ \to \frac{(A -_{ℎ} B) \cdot_{ih} C}{(C \cdot_{ih} C) + 1} \in ℂ$
52	6 51	eqeltrid	$⊢ φ \to T \in ℂ$
53		shmulcl	$⊢ (H \in S_{ℋ} \land T \in ℂ \land C \in H) \to T \cdot_{ℎ} C \in H$
54	47 52 4 53	syl3anc	$⊢ φ \to T \cdot_{ℎ} C \in H$
55		shaddcl	$⊢ (H \in S_{ℋ} \land B \in H \land T \cdot_{ℎ} C \in H) \to B +_{ℎ} (T \cdot_{ℎ} C) \in H$
56	47 3 54 55	syl3anc	$⊢ φ \to B +_{ℎ} (T \cdot_{ℎ} C) \in H$
57	45 5 56	rspcdva	$⊢ φ \to {norm}_{ℎ} (A -_{ℎ} B) \leq {norm}_{ℎ} (A -_{ℎ} (B +_{ℎ} (T \cdot_{ℎ} C)))$
58	1	cheli	$⊢ T \cdot_{ℎ} C \in H \to T \cdot_{ℎ} C \in ℋ$
59	54 58	syl	$⊢ φ \to T \cdot_{ℎ} C \in ℋ$
60		hvsubass	$⊢ (A \in ℋ \land B \in ℋ \land T \cdot_{ℎ} C \in ℋ) \to (A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C) = A -_{ℎ} (B +_{ℎ} (T \cdot_{ℎ} C))$
61	2 8 59 60	syl3anc	$⊢ φ \to (A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C) = A -_{ℎ} (B +_{ℎ} (T \cdot_{ℎ} C))$
62	61	fveq2d	$⊢ φ \to {norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) = {norm}_{ℎ} (A -_{ℎ} (B +_{ℎ} (T \cdot_{ℎ} C)))$
63	57 62	breqtrrd	$⊢ φ \to {norm}_{ℎ} (A -_{ℎ} B) \leq {norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))$
64		normcl	$⊢ A -_{ℎ} B \in ℋ \to {norm}_{ℎ} (A -_{ℎ} B) \in ℝ$
65	10 64	syl	$⊢ φ \to {norm}_{ℎ} (A -_{ℎ} B) \in ℝ$
66		hvsubcl	$⊢ (A -_{ℎ} B \in ℋ \land T \cdot_{ℎ} C \in ℋ) \to (A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C) \in ℋ$
67	10 59 66	syl2anc	$⊢ φ \to (A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C) \in ℋ$
68		normcl	$⊢ (A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C) \in ℋ \to {norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) \in ℝ$
69	67 68	syl	$⊢ φ \to {norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) \in ℝ$
70		normge0	$⊢ A -_{ℎ} B \in ℋ \to 0 \leq {norm}_{ℎ} (A -_{ℎ} B)$
71	10 70	syl	$⊢ φ \to 0 \leq {norm}_{ℎ} (A -_{ℎ} B)$
72	24 65 69 71 63	letrd	$⊢ φ \to 0 \leq {norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))$
73	65 69 71 72	le2sqd	$⊢ φ \to ({norm}_{ℎ} (A -_{ℎ} B) \leq {norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) \leftrightarrow {{norm}_{ℎ} (A -_{ℎ} B)}^{2} \leq {{norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))}^{2})$
74	63 73	mpbid	$⊢ φ \to {{norm}_{ℎ} (A -_{ℎ} B)}^{2} \leq {{norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))}^{2}$
75	69	resqcld	$⊢ φ \to {{norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))}^{2} \in ℝ$
76	65	resqcld	$⊢ φ \to {{norm}_{ℎ} (A -_{ℎ} B)}^{2} \in ℝ$
77	75 76	subge0d	$⊢ φ \to (0 \leq {{norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))}^{2} - {{norm}_{ℎ} (A -_{ℎ} B)}^{2} \leftrightarrow {{norm}_{ℎ} (A -_{ℎ} B)}^{2} \leq {{norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))}^{2})$
78	74 77	mpbird	$⊢ φ \to 0 \leq {{norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))}^{2} - {{norm}_{ℎ} (A -_{ℎ} B)}^{2}$
79		2z	$⊢ 2 \in ℤ$
80		rpexpcl	$⊢ ((C \cdot_{ih} C) + 1 \in ℝ^{+} \land 2 \in ℤ) \to {((C \cdot_{ih} C) + 1)}^{2} \in ℝ^{+}$
81	49 79 80	sylancl	$⊢ φ \to {((C \cdot_{ih} C) + 1)}^{2} \in ℝ^{+}$
82	17 81	rerpdivcld	$⊢ φ \to \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}} \in ℝ$
83	82 23	remulcld	$⊢ φ \to (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2) \in ℝ$
84	83	recnd	$⊢ φ \to (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2) \in ℂ$
85	84	negcld	$⊢ φ \to - (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2) \in ℂ$
86		hicl	$⊢ (A -_{ℎ} B \in ℋ \land A -_{ℎ} B \in ℋ) \to (A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B) \in ℂ$
87	10 10 86	syl2anc	$⊢ φ \to (A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B) \in ℂ$
88	85 87	pncand	$⊢ φ \to (- (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2)) + ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) - ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) = - (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2)$
89		normsq	$⊢ (A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C) \in ℋ \to {{norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))}^{2} = ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))$
90	67 89	syl	$⊢ φ \to {{norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))}^{2} = ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))$
91		his2sub	$⊢ (A -_{ℎ} B \in ℋ \land T \cdot_{ℎ} C \in ℋ \land (A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C) \in ℋ) \to ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) = ((A -_{ℎ} B) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))) - ((T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)))$
92	10 59 67 91	syl3anc	$⊢ φ \to ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) = ((A -_{ℎ} B) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))) - ((T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)))$
93		his2sub2	$⊢ (A -_{ℎ} B \in ℋ \land A -_{ℎ} B \in ℋ \land T \cdot_{ℎ} C \in ℋ) \to (A -_{ℎ} B) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) = ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) - ((A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C))$
94	10 10 59 93	syl3anc	$⊢ φ \to (A -_{ℎ} B) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) = ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) - ((A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C))$
95	94	oveq1d	$⊢ φ \to ((A -_{ℎ} B) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))) - ((T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))) = ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) - ((A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C)) - ((T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)))$
96		hicl	$⊢ (A -_{ℎ} B \in ℋ \land T \cdot_{ℎ} C \in ℋ) \to (A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C) \in ℂ$
97	10 59 96	syl2anc	$⊢ φ \to (A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C) \in ℂ$
98		his2sub2	$⊢ (T \cdot_{ℎ} C \in ℋ \land A -_{ℎ} B \in ℋ \land T \cdot_{ℎ} C \in ℋ) \to (T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) = ((T \cdot_{ℎ} C) \cdot_{ih} (A -_{ℎ} B)) - ((T \cdot_{ℎ} C) \cdot_{ih} (T \cdot_{ℎ} C))$
99	59 10 59 98	syl3anc	$⊢ φ \to (T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) = ((T \cdot_{ℎ} C) \cdot_{ih} (A -_{ℎ} B)) - ((T \cdot_{ℎ} C) \cdot_{ih} (T \cdot_{ℎ} C))$
100		hicl	$⊢ (T \cdot_{ℎ} C \in ℋ \land A -_{ℎ} B \in ℋ) \to (T \cdot_{ℎ} C) \cdot_{ih} (A -_{ℎ} B) \in ℂ$
101	59 10 100	syl2anc	$⊢ φ \to (T \cdot_{ℎ} C) \cdot_{ih} (A -_{ℎ} B) \in ℂ$
102		hicl	$⊢ (T \cdot_{ℎ} C \in ℋ \land T \cdot_{ℎ} C \in ℋ) \to (T \cdot_{ℎ} C) \cdot_{ih} (T \cdot_{ℎ} C) \in ℂ$
103	59 59 102	syl2anc	$⊢ φ \to (T \cdot_{ℎ} C) \cdot_{ih} (T \cdot_{ℎ} C) \in ℂ$
104	101 103	subcld	$⊢ φ \to ((T \cdot_{ℎ} C) \cdot_{ih} (A -_{ℎ} B)) - ((T \cdot_{ℎ} C) \cdot_{ih} (T \cdot_{ℎ} C)) \in ℂ$
105	99 104	eqeltrd	$⊢ φ \to (T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) \in ℂ$
106	87 97 105	subsub4d	$⊢ φ \to ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) - ((A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C)) - ((T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))) = ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) - (((A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C)) + ((T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))))$
107	82	recnd	$⊢ φ \to \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}} \in ℂ$
108	35	a1i	$⊢ φ \to 1 \in ℂ$
109	107 48 108	adddid	$⊢ φ \to (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 1 + 1) = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 1) + (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) \cdot 1$
110	39	oveq2d	$⊢ φ \to (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2) = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 1 + 1)$
111		his5	$⊢ (T \in ℂ \land A -_{ℎ} B \in ℋ \land C \in ℋ) \to (A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C) = \overline{T} ((A -_{ℎ} B) \cdot_{ih} C)$
112	52 10 12 111	syl3anc	$⊢ φ \to (A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C) = \overline{T} ((A -_{ℎ} B) \cdot_{ih} C)$
113	52	cjcld	$⊢ φ \to \overline{T} \in ℂ$
114	113 14	mulcomd	$⊢ φ \to \overline{T} ((A -_{ℎ} B) \cdot_{ih} C) = ((A -_{ℎ} B) \cdot_{ih} C) \overline{T}$
115	14	cjcld	$⊢ φ \to \overline{(A -_{ℎ} B) \cdot_{ih} C} \in ℂ$
116	14 115 48 50	divassd	$⊢ φ \to \frac{((A -_{ℎ} B) \cdot_{ih} C) \overline{(A -_{ℎ} B) \cdot_{ih} C}}{(C \cdot_{ih} C) + 1} = ((A -_{ℎ} B) \cdot_{ih} C) (\frac{\overline{(A -_{ℎ} B) \cdot_{ih} C}}{(C \cdot_{ih} C) + 1})$
117	14	absvalsqd	$⊢ φ \to {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} = ((A -_{ℎ} B) \cdot_{ih} C) \overline{(A -_{ℎ} B) \cdot_{ih} C}$
118	117	oveq1d	$⊢ φ \to \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{(C \cdot_{ih} C) + 1} = \frac{((A -_{ℎ} B) \cdot_{ih} C) \overline{(A -_{ℎ} B) \cdot_{ih} C}}{(C \cdot_{ih} C) + 1}$
119	6	fveq2i	$⊢ \overline{T} = \overline{\frac{(A -_{ℎ} B) \cdot_{ih} C}{(C \cdot_{ih} C) + 1}}$
120	14 48 50	cjdivd	$⊢ φ \to \overline{\frac{(A -_{ℎ} B) \cdot_{ih} C}{(C \cdot_{ih} C) + 1}} = \frac{\overline{(A -_{ℎ} B) \cdot_{ih} C}}{\overline{(C \cdot_{ih} C) + 1}}$
121	26	cjred	$⊢ φ \to \overline{(C \cdot_{ih} C) + 1} = (C \cdot_{ih} C) + 1$
122	121	oveq2d	$⊢ φ \to \frac{\overline{(A -_{ℎ} B) \cdot_{ih} C}}{\overline{(C \cdot_{ih} C) + 1}} = \frac{\overline{(A -_{ℎ} B) \cdot_{ih} C}}{(C \cdot_{ih} C) + 1}$
123	120 122	eqtrd	$⊢ φ \to \overline{\frac{(A -_{ℎ} B) \cdot_{ih} C}{(C \cdot_{ih} C) + 1}} = \frac{\overline{(A -_{ℎ} B) \cdot_{ih} C}}{(C \cdot_{ih} C) + 1}$
124	119 123	syl5eq	$⊢ φ \to \overline{T} = \frac{\overline{(A -_{ℎ} B) \cdot_{ih} C}}{(C \cdot_{ih} C) + 1}$
125	124	oveq2d	$⊢ φ \to ((A -_{ℎ} B) \cdot_{ih} C) \overline{T} = ((A -_{ℎ} B) \cdot_{ih} C) (\frac{\overline{(A -_{ℎ} B) \cdot_{ih} C}}{(C \cdot_{ih} C) + 1})$
126	116 118 125	3eqtr4rd	$⊢ φ \to ((A -_{ℎ} B) \cdot_{ih} C) \overline{T} = \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{(C \cdot_{ih} C) + 1}$
127	112 114 126	3eqtrd	$⊢ φ \to (A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C) = \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{(C \cdot_{ih} C) + 1}$
128	17	recnd	$⊢ φ \to {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} \in ℂ$
129	128 48	mulcomd	$⊢ φ \to {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} ((C \cdot_{ih} C) + 1) = ((C \cdot_{ih} C) + 1) {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}$
130	48	sqvald	$⊢ φ \to {((C \cdot_{ih} C) + 1)}^{2} = ((C \cdot_{ih} C) + 1) ((C \cdot_{ih} C) + 1)$
131	129 130	oveq12d	$⊢ φ \to \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} ((C \cdot_{ih} C) + 1)}{{((C \cdot_{ih} C) + 1)}^{2}} = \frac{((C \cdot_{ih} C) + 1) {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{((C \cdot_{ih} C) + 1) ((C \cdot_{ih} C) + 1)}$
132	128 48 48 50 50	divcan5d	$⊢ φ \to \frac{((C \cdot_{ih} C) + 1) {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{((C \cdot_{ih} C) + 1) ((C \cdot_{ih} C) + 1)} = \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{(C \cdot_{ih} C) + 1}$
133	131 132	eqtr2d	$⊢ φ \to \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{(C \cdot_{ih} C) + 1} = \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} ((C \cdot_{ih} C) + 1)}{{((C \cdot_{ih} C) + 1)}^{2}}$
134	26	resqcld	$⊢ φ \to {((C \cdot_{ih} C) + 1)}^{2} \in ℝ$
135	134	recnd	$⊢ φ \to {((C \cdot_{ih} C) + 1)}^{2} \in ℂ$
136	81	rpne0d	$⊢ φ \to {((C \cdot_{ih} C) + 1)}^{2} \neq 0$
137	128 48 135 136	div23d	$⊢ φ \to \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} ((C \cdot_{ih} C) + 1)}{{((C \cdot_{ih} C) + 1)}^{2}} = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 1)$
138	127 133 137	3eqtrd	$⊢ φ \to (A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C) = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 1)$
139	82 26	remulcld	$⊢ φ \to (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 1) \in ℝ$
140	138 139	eqeltrd	$⊢ φ \to (A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C) \in ℝ$
141		hire	$⊢ (A -_{ℎ} B \in ℋ \land T \cdot_{ℎ} C \in ℋ) \to ((A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C) \in ℝ \leftrightarrow (A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C) = (T \cdot_{ℎ} C) \cdot_{ih} (A -_{ℎ} B))$
142	10 59 141	syl2anc	$⊢ φ \to ((A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C) \in ℝ \leftrightarrow (A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C) = (T \cdot_{ℎ} C) \cdot_{ih} (A -_{ℎ} B))$
143	140 142	mpbid	$⊢ φ \to (A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C) = (T \cdot_{ℎ} C) \cdot_{ih} (A -_{ℎ} B)$
144	143 138	eqtr3d	$⊢ φ \to (T \cdot_{ℎ} C) \cdot_{ih} (A -_{ℎ} B) = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 1)$
145		his35	$⊢ ((T \in ℂ \land T \in ℂ) \land (C \in ℋ \land C \in ℋ)) \to (T \cdot_{ℎ} C) \cdot_{ih} (T \cdot_{ℎ} C) = T \overline{T} (C \cdot_{ih} C)$
146	52 52 12 12 145	syl22anc	$⊢ φ \to (T \cdot_{ℎ} C) \cdot_{ih} (T \cdot_{ℎ} C) = T \overline{T} (C \cdot_{ih} C)$
147	6	fveq2i	$⊢ \|T\| = \|\frac{(A -_{ℎ} B) \cdot_{ih} C}{(C \cdot_{ih} C) + 1}\|$
148	14 48 50	absdivd	$⊢ φ \to \|\frac{(A -_{ℎ} B) \cdot_{ih} C}{(C \cdot_{ih} C) + 1}\| = \frac{\|(A -_{ℎ} B) \cdot_{ih} C\|}{\|(C \cdot_{ih} C) + 1\|}$
149	49	rpge0d	$⊢ φ \to 0 \leq (C \cdot_{ih} C) + 1$
150	26 149	absidd	$⊢ φ \to \|(C \cdot_{ih} C) + 1\| = (C \cdot_{ih} C) + 1$
151	150	oveq2d	$⊢ φ \to \frac{\|(A -_{ℎ} B) \cdot_{ih} C\|}{\|(C \cdot_{ih} C) + 1\|} = \frac{\|(A -_{ℎ} B) \cdot_{ih} C\|}{(C \cdot_{ih} C) + 1}$
152	148 151	eqtrd	$⊢ φ \to \|\frac{(A -_{ℎ} B) \cdot_{ih} C}{(C \cdot_{ih} C) + 1}\| = \frac{\|(A -_{ℎ} B) \cdot_{ih} C\|}{(C \cdot_{ih} C) + 1}$
153	147 152	syl5eq	$⊢ φ \to \|T\| = \frac{\|(A -_{ℎ} B) \cdot_{ih} C\|}{(C \cdot_{ih} C) + 1}$
154	153	oveq1d	$⊢ φ \to {\|T\|}^{2} = {(\frac{\|(A -_{ℎ} B) \cdot_{ih} C\|}{(C \cdot_{ih} C) + 1})}^{2}$
155	52	absvalsqd	$⊢ φ \to {\|T\|}^{2} = T \overline{T}$
156	16 48 50	sqdivd	$⊢ φ \to {(\frac{\|(A -_{ℎ} B) \cdot_{ih} C\|}{(C \cdot_{ih} C) + 1})}^{2} = \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}$
157	154 155 156	3eqtr3d	$⊢ φ \to T \overline{T} = \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}$
158	157	oveq1d	$⊢ φ \to T \overline{T} (C \cdot_{ih} C) = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) (C \cdot_{ih} C)$
159	146 158	eqtrd	$⊢ φ \to (T \cdot_{ℎ} C) \cdot_{ih} (T \cdot_{ℎ} C) = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) (C \cdot_{ih} C)$
160	144 159	oveq12d	$⊢ φ \to ((T \cdot_{ℎ} C) \cdot_{ih} (A -_{ℎ} B)) - ((T \cdot_{ℎ} C) \cdot_{ih} (T \cdot_{ℎ} C)) = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 1) - (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) (C \cdot_{ih} C)$
161		pncan2	$⊢ (C \cdot_{ih} C \in ℂ \land 1 \in ℂ) \to (C \cdot_{ih} C) + 1 - (C \cdot_{ih} C) = 1$
162	34 35 161	sylancl	$⊢ φ \to (C \cdot_{ih} C) + 1 - (C \cdot_{ih} C) = 1$
163	162	oveq2d	$⊢ φ \to (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 1 - (C \cdot_{ih} C)) = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) \cdot 1$
164	107 48 34	subdid	$⊢ φ \to (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 1 - (C \cdot_{ih} C)) = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 1) - (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) (C \cdot_{ih} C)$
165	163 164	eqtr3d	$⊢ φ \to (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) \cdot 1 = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 1) - (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) (C \cdot_{ih} C)$
166	160 99 165	3eqtr4d	$⊢ φ \to (T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)) = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) \cdot 1$
167	138 166	oveq12d	$⊢ φ \to ((A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C)) + ((T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))) = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 1) + (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) \cdot 1$
168	109 110 167	3eqtr4rd	$⊢ φ \to ((A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C)) + ((T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))) = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2)$
169	168	oveq2d	$⊢ φ \to ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) - (((A -_{ℎ} B) \cdot_{ih} (T \cdot_{ℎ} C)) + ((T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C)))) = ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) - (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2)$
170	95 106 169	3eqtrd	$⊢ φ \to ((A -_{ℎ} B) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))) - ((T \cdot_{ℎ} C) \cdot_{ih} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))) = ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) - (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2)$
171	90 92 170	3eqtrd	$⊢ φ \to {{norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))}^{2} = ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) - (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2)$
172	87 84	negsubd	$⊢ φ \to ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) + (- (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2)) = ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) - (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2)$
173	87 85	addcomd	$⊢ φ \to ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) + (- (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2)) = - (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2) + ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B))$
174	171 172 173	3eqtr2d	$⊢ φ \to {{norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))}^{2} = - (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2) + ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B))$
175		normsq	$⊢ A -_{ℎ} B \in ℋ \to {{norm}_{ℎ} (A -_{ℎ} B)}^{2} = (A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)$
176	10 175	syl	$⊢ φ \to {{norm}_{ℎ} (A -_{ℎ} B)}^{2} = (A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)$
177	174 176	oveq12d	$⊢ φ \to {{norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))}^{2} - {{norm}_{ℎ} (A -_{ℎ} B)}^{2} = (- (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2)) + ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B)) - ((A -_{ℎ} B) \cdot_{ih} (A -_{ℎ} B))$
178	23	renegcld	$⊢ φ \to - ((C \cdot_{ih} C) + 2) \in ℝ$
179	178	recnd	$⊢ φ \to - ((C \cdot_{ih} C) + 2) \in ℂ$
180	128 179 135 136	div23d	$⊢ φ \to \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} (- ((C \cdot_{ih} C) + 2))}{{((C \cdot_{ih} C) + 1)}^{2}} = (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) (- ((C \cdot_{ih} C) + 2))$
181	23	recnd	$⊢ φ \to (C \cdot_{ih} C) + 2 \in ℂ$
182	107 181	mulneg2d	$⊢ φ \to (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) (- ((C \cdot_{ih} C) + 2)) = - (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2)$
183	180 182	eqtrd	$⊢ φ \to \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} (- ((C \cdot_{ih} C) + 2))}{{((C \cdot_{ih} C) + 1)}^{2}} = - (\frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}}{{((C \cdot_{ih} C) + 1)}^{2}}) ((C \cdot_{ih} C) + 2)$
184	88 177 183	3eqtr4rd	$⊢ φ \to \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} (- ((C \cdot_{ih} C) + 2))}{{((C \cdot_{ih} C) + 1)}^{2}} = {{norm}_{ℎ} ((A -_{ℎ} B) -_{ℎ} (T \cdot_{ℎ} C))}^{2} - {{norm}_{ℎ} (A -_{ℎ} B)}^{2}$
185	78 184	breqtrrd	$⊢ φ \to 0 \leq \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} (- ((C \cdot_{ih} C) + 2))}{{((C \cdot_{ih} C) + 1)}^{2}}$
186	17 178	remulcld	$⊢ φ \to {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} (- ((C \cdot_{ih} C) + 2)) \in ℝ$
187	186 81	ge0divd	$⊢ φ \to (0 \leq {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} (- ((C \cdot_{ih} C) + 2)) \leftrightarrow 0 \leq \frac{{\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} (- ((C \cdot_{ih} C) + 2))}{{((C \cdot_{ih} C) + 1)}^{2}})$
188	185 187	mpbird	$⊢ φ \to 0 \leq {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} (- ((C \cdot_{ih} C) + 2))$
189		mulneg12	$⊢ ({\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} \in ℂ \land (C \cdot_{ih} C) + 2 \in ℂ) \to (- {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}) ((C \cdot_{ih} C) + 2) = {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} (- ((C \cdot_{ih} C) + 2))$
190	128 181 189	syl2anc	$⊢ φ \to (- {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}) ((C \cdot_{ih} C) + 2) = {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} (- ((C \cdot_{ih} C) + 2))$
191	188 190	breqtrrd	$⊢ φ \to 0 \leq (- {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}) ((C \cdot_{ih} C) + 2)$
192	18 42 191	prodge0ld	$⊢ φ \to 0 \leq - {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}$
193	17	le0neg1d	$⊢ φ \to ({\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} \leq 0 \leftrightarrow 0 \leq - {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2})$
194	192 193	mpbird	$⊢ φ \to {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} \leq 0$
195	15	sqge0d	$⊢ φ \to 0 \leq {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}$
196		0re	$⊢ 0 \in ℝ$
197		letri3	$⊢ ({\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} \in ℝ \land 0 \in ℝ) \to ({\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} = 0 \leftrightarrow ({\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} \leq 0 \land 0 \leq {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}))$
198	17 196 197	sylancl	$⊢ φ \to ({\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} = 0 \leftrightarrow ({\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} \leq 0 \land 0 \leq {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2}))$
199	194 195 198	mpbir2and	$⊢ φ \to {\|(A -_{ℎ} B) \cdot_{ih} C\|}^{2} = 0$
200	16 199	sqeq0d	$⊢ φ \to \|(A -_{ℎ} B) \cdot_{ih} C\| = 0$
201	14 200	abs00d	$⊢ φ \to (A -_{ℎ} B) \cdot_{ih} C = 0$

Metamath Proof Explorer

Theorem pjhthlem1

Proof