2itscp

Description: A condition for a quadratic equation with real coefficients (for the intersection points of a line with a circle) to have (exactly) two different real solutions. (Contributed by AV, 5-Mar-2023) (Revised by AV, 16-May-2023)

	Ref	Expression
Hypotheses	2itscp.a	\|- ( ph -> A e. RR )
	2itscp.b	\|- ( ph -> B e. RR )
	2itscp.x	\|- ( ph -> X e. RR )
	2itscp.y	\|- ( ph -> Y e. RR )
	2itscp.d	\|- D = ( X - A )
	2itscp.e	\|- E = ( B - Y )
	2itscp.c	\|- C = ( ( D x. B ) + ( E x. A ) )
	2itscp.r	\|- ( ph -> R e. RR )
	2itscp.l	\|- ( ph -> ( ( A ^ 2 ) + ( B ^ 2 ) ) < ( R ^ 2 ) )
	2itscp.n	\|- ( ph -> ( B =/= Y \/ A =/= X ) )
	2itscp.q	\|- Q = ( ( E ^ 2 ) + ( D ^ 2 ) )
	2itscp.s	\|- S = ( ( ( R ^ 2 ) x. Q ) - ( C ^ 2 ) )
Assertion	2itscp	\|- ( ph -> 0 < S )

Proof

Step	Hyp	Ref	Expression
1		2itscp.a	\|- ( ph -> A e. RR )
2		2itscp.b	\|- ( ph -> B e. RR )
3		2itscp.x	\|- ( ph -> X e. RR )
4		2itscp.y	\|- ( ph -> Y e. RR )
5		2itscp.d	\|- D = ( X - A )
6		2itscp.e	\|- E = ( B - Y )
7		2itscp.c	\|- C = ( ( D x. B ) + ( E x. A ) )
8		2itscp.r	\|- ( ph -> R e. RR )
9		2itscp.l	\|- ( ph -> ( ( A ^ 2 ) + ( B ^ 2 ) ) < ( R ^ 2 ) )
10		2itscp.n	\|- ( ph -> ( B =/= Y \/ A =/= X ) )
11		2itscp.q	\|- Q = ( ( E ^ 2 ) + ( D ^ 2 ) )
12		2itscp.s	\|- S = ( ( ( R ^ 2 ) x. Q ) - ( C ^ 2 ) )
13	2	recnd	\|- ( ph -> B e. CC )
14	13	adantr	\|- ( ( ph /\ B =/= Y ) -> B e. CC )
15	4	recnd	\|- ( ph -> Y e. CC )
16	15	adantr	\|- ( ( ph /\ B =/= Y ) -> Y e. CC )
17		simpr	\|- ( ( ph /\ B =/= Y ) -> B =/= Y )
18	14 16 17	subne0d	\|- ( ( ph /\ B =/= Y ) -> ( B - Y ) =/= 0 )
19	18	ex	\|- ( ph -> ( B =/= Y -> ( B - Y ) =/= 0 ) )
20	3	recnd	\|- ( ph -> X e. CC )
21	20	adantr	\|- ( ( ph /\ A =/= X ) -> X e. CC )
22	1	recnd	\|- ( ph -> A e. CC )
23	22	adantr	\|- ( ( ph /\ A =/= X ) -> A e. CC )
24		simpr	\|- ( ( ph /\ A =/= X ) -> A =/= X )
25	24	necomd	\|- ( ( ph /\ A =/= X ) -> X =/= A )
26	21 23 25	subne0d	\|- ( ( ph /\ A =/= X ) -> ( X - A ) =/= 0 )
27	26	ex	\|- ( ph -> ( A =/= X -> ( X - A ) =/= 0 ) )
28	6	neeq1i	\|- ( E =/= 0 <-> ( B - Y ) =/= 0 )
29	5	neeq1i	\|- ( D =/= 0 <-> ( X - A ) =/= 0 )
30	28 29	anbi12i	\|- ( ( E =/= 0 /\ D =/= 0 ) <-> ( ( B - Y ) =/= 0 /\ ( X - A ) =/= 0 ) )
31		2re	\|- 2 e. RR
32	31	a1i	\|- ( ph -> 2 e. RR )
33	3 1	resubcld	\|- ( ph -> ( X - A ) e. RR )
34	5 33	eqeltrid	\|- ( ph -> D e. RR )
35	34 1	remulcld	\|- ( ph -> ( D x. A ) e. RR )
36	2 4	resubcld	\|- ( ph -> ( B - Y ) e. RR )
37	6 36	eqeltrid	\|- ( ph -> E e. RR )
38	37 2	remulcld	\|- ( ph -> ( E x. B ) e. RR )
39	35 38	remulcld	\|- ( ph -> ( ( D x. A ) x. ( E x. B ) ) e. RR )
40	32 39	remulcld	\|- ( ph -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) e. RR )
41	40	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) e. RR )
42	37	resqcld	\|- ( ph -> ( E ^ 2 ) e. RR )
43	2	resqcld	\|- ( ph -> ( B ^ 2 ) e. RR )
44	42 43	remulcld	\|- ( ph -> ( ( E ^ 2 ) x. ( B ^ 2 ) ) e. RR )
45	34	resqcld	\|- ( ph -> ( D ^ 2 ) e. RR )
46	1	resqcld	\|- ( ph -> ( A ^ 2 ) e. RR )
47	45 46	remulcld	\|- ( ph -> ( ( D ^ 2 ) x. ( A ^ 2 ) ) e. RR )
48	44 47	readdcld	\|- ( ph -> ( ( ( E ^ 2 ) x. ( B ^ 2 ) ) + ( ( D ^ 2 ) x. ( A ^ 2 ) ) ) e. RR )
49	48	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( ( ( E ^ 2 ) x. ( B ^ 2 ) ) + ( ( D ^ 2 ) x. ( A ^ 2 ) ) ) e. RR )
50	8	resqcld	\|- ( ph -> ( R ^ 2 ) e. RR )
51	50 46	resubcld	\|- ( ph -> ( ( R ^ 2 ) - ( A ^ 2 ) ) e. RR )
52	42 51	remulcld	\|- ( ph -> ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) e. RR )
53	50 43	resubcld	\|- ( ph -> ( ( R ^ 2 ) - ( B ^ 2 ) ) e. RR )
54	45 53	remulcld	\|- ( ph -> ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) e. RR )
55	52 54	readdcld	\|- ( ph -> ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) e. RR )
56	55	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) e. RR )
57	35 38	resubcld	\|- ( ph -> ( ( D x. A ) - ( E x. B ) ) e. RR )
58	57	sqge0d	\|- ( ph -> 0 <_ ( ( ( D x. A ) - ( E x. B ) ) ^ 2 ) )
59	1 2 3 4 5 6	2itscplem1	\|- ( ph -> ( ( ( ( E ^ 2 ) x. ( B ^ 2 ) ) + ( ( D ^ 2 ) x. ( A ^ 2 ) ) ) - ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) ) = ( ( ( D x. A ) - ( E x. B ) ) ^ 2 ) )
60	58 59	breqtrrd	\|- ( ph -> 0 <_ ( ( ( ( E ^ 2 ) x. ( B ^ 2 ) ) + ( ( D ^ 2 ) x. ( A ^ 2 ) ) ) - ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) ) )
61	48 40	subge0d	\|- ( ph -> ( 0 <_ ( ( ( ( E ^ 2 ) x. ( B ^ 2 ) ) + ( ( D ^ 2 ) x. ( A ^ 2 ) ) ) - ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) ) <-> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) <_ ( ( ( E ^ 2 ) x. ( B ^ 2 ) ) + ( ( D ^ 2 ) x. ( A ^ 2 ) ) ) ) )
62	60 61	mpbid	\|- ( ph -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) <_ ( ( ( E ^ 2 ) x. ( B ^ 2 ) ) + ( ( D ^ 2 ) x. ( A ^ 2 ) ) ) )
63	62	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) <_ ( ( ( E ^ 2 ) x. ( B ^ 2 ) ) + ( ( D ^ 2 ) x. ( A ^ 2 ) ) ) )
64	44	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( ( E ^ 2 ) x. ( B ^ 2 ) ) e. RR )
65	47	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( ( D ^ 2 ) x. ( A ^ 2 ) ) e. RR )
66	52	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) e. RR )
67	54	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) e. RR )
68	43	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( B ^ 2 ) e. RR )
69	51	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( ( R ^ 2 ) - ( A ^ 2 ) ) e. RR )
70		simpl	\|- ( ( E =/= 0 /\ D =/= 0 ) -> E =/= 0 )
71		sqn0rp	\|- ( ( E e. RR /\ E =/= 0 ) -> ( E ^ 2 ) e. RR+ )
72	37 70 71	syl2an	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( E ^ 2 ) e. RR+ )
73	46 43 50	ltaddsub2d	\|- ( ph -> ( ( ( A ^ 2 ) + ( B ^ 2 ) ) < ( R ^ 2 ) <-> ( B ^ 2 ) < ( ( R ^ 2 ) - ( A ^ 2 ) ) ) )
74	9 73	mpbid	\|- ( ph -> ( B ^ 2 ) < ( ( R ^ 2 ) - ( A ^ 2 ) ) )
75	74	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( B ^ 2 ) < ( ( R ^ 2 ) - ( A ^ 2 ) ) )
76	68 69 72 75	ltmul2dd	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( ( E ^ 2 ) x. ( B ^ 2 ) ) < ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) )
77	46	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( A ^ 2 ) e. RR )
78	53	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( ( R ^ 2 ) - ( B ^ 2 ) ) e. RR )
79		simpr	\|- ( ( E =/= 0 /\ D =/= 0 ) -> D =/= 0 )
80		sqn0rp	\|- ( ( D e. RR /\ D =/= 0 ) -> ( D ^ 2 ) e. RR+ )
81	34 79 80	syl2an	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( D ^ 2 ) e. RR+ )
82	46 43 50	ltaddsubd	\|- ( ph -> ( ( ( A ^ 2 ) + ( B ^ 2 ) ) < ( R ^ 2 ) <-> ( A ^ 2 ) < ( ( R ^ 2 ) - ( B ^ 2 ) ) ) )
83	9 82	mpbid	\|- ( ph -> ( A ^ 2 ) < ( ( R ^ 2 ) - ( B ^ 2 ) ) )
84	83	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( A ^ 2 ) < ( ( R ^ 2 ) - ( B ^ 2 ) ) )
85	77 78 81 84	ltmul2dd	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( ( D ^ 2 ) x. ( A ^ 2 ) ) < ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) )
86	64 65 66 67 76 85	lt2addd	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( ( ( E ^ 2 ) x. ( B ^ 2 ) ) + ( ( D ^ 2 ) x. ( A ^ 2 ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) )
87	41 49 56 63 86	lelttrd	\|- ( ( ph /\ ( E =/= 0 /\ D =/= 0 ) ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) )
88	87	ex	\|- ( ph -> ( ( E =/= 0 /\ D =/= 0 ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) ) )
89	30 88	syl5bir	\|- ( ph -> ( ( ( B - Y ) =/= 0 /\ ( X - A ) =/= 0 ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) ) )
90	19 27 89	syl2and	\|- ( ph -> ( ( B =/= Y /\ A =/= X ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) ) )
91	90	imp	\|- ( ( ph /\ ( B =/= Y /\ A =/= X ) ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) )
92		nne	\|- ( -. A =/= X <-> A = X )
93		eqcom	\|- ( A = X <-> X = A )
94	20 22	subeq0ad	\|- ( ph -> ( ( X - A ) = 0 <-> X = A ) )
95	94	biimprd	\|- ( ph -> ( X = A -> ( X - A ) = 0 ) )
96	93 95	syl5bi	\|- ( ph -> ( A = X -> ( X - A ) = 0 ) )
97	92 96	syl5bi	\|- ( ph -> ( -. A =/= X -> ( X - A ) = 0 ) )
98	5	eqeq1i	\|- ( D = 0 <-> ( X - A ) = 0 )
99	28 98	anbi12i	\|- ( ( E =/= 0 /\ D = 0 ) <-> ( ( B - Y ) =/= 0 /\ ( X - A ) = 0 ) )
100		0red	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> 0 e. RR )
101	44	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( ( E ^ 2 ) x. ( B ^ 2 ) ) e. RR )
102	52	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) e. RR )
103	37	sqge0d	\|- ( ph -> 0 <_ ( E ^ 2 ) )
104	2	sqge0d	\|- ( ph -> 0 <_ ( B ^ 2 ) )
105	42 43 103 104	mulge0d	\|- ( ph -> 0 <_ ( ( E ^ 2 ) x. ( B ^ 2 ) ) )
106	105	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> 0 <_ ( ( E ^ 2 ) x. ( B ^ 2 ) ) )
107	43	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( B ^ 2 ) e. RR )
108	51	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( ( R ^ 2 ) - ( A ^ 2 ) ) e. RR )
109		simprl	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> E =/= 0 )
110	37 109 71	syl2an2r	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( E ^ 2 ) e. RR+ )
111	74	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( B ^ 2 ) < ( ( R ^ 2 ) - ( A ^ 2 ) ) )
112	107 108 110 111	ltmul2dd	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( ( E ^ 2 ) x. ( B ^ 2 ) ) < ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) )
113	100 101 102 106 112	lelttrd	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> 0 < ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) )
114		oveq1	\|- ( D = 0 -> ( D x. A ) = ( 0 x. A ) )
115	114	adantl	\|- ( ( E =/= 0 /\ D = 0 ) -> ( D x. A ) = ( 0 x. A ) )
116	22	mul02d	\|- ( ph -> ( 0 x. A ) = 0 )
117	115 116	sylan9eqr	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( D x. A ) = 0 )
118	117	oveq1d	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( ( D x. A ) x. ( E x. B ) ) = ( 0 x. ( E x. B ) ) )
119	38	recnd	\|- ( ph -> ( E x. B ) e. CC )
120	119	mul02d	\|- ( ph -> ( 0 x. ( E x. B ) ) = 0 )
121	120	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( 0 x. ( E x. B ) ) = 0 )
122	118 121	eqtrd	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( ( D x. A ) x. ( E x. B ) ) = 0 )
123	122	oveq2d	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) = ( 2 x. 0 ) )
124		2t0e0	\|- ( 2 x. 0 ) = 0
125	123 124	eqtrdi	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) = 0 )
126		sq0i	\|- ( D = 0 -> ( D ^ 2 ) = 0 )
127	126	adantl	\|- ( ( E =/= 0 /\ D = 0 ) -> ( D ^ 2 ) = 0 )
128	127	adantl	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( D ^ 2 ) = 0 )
129	128	oveq1d	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) = ( 0 x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) )
130	53	recnd	\|- ( ph -> ( ( R ^ 2 ) - ( B ^ 2 ) ) e. CC )
131	130	mul02d	\|- ( ph -> ( 0 x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) = 0 )
132	131	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( 0 x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) = 0 )
133	129 132	eqtrd	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) = 0 )
134	133	oveq2d	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) = ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + 0 ) )
135	52	recnd	\|- ( ph -> ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) e. CC )
136	135	addid1d	\|- ( ph -> ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + 0 ) = ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) )
137	136	adantr	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + 0 ) = ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) )
138	134 137	eqtrd	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) = ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) )
139	113 125 138	3brtr4d	\|- ( ( ph /\ ( E =/= 0 /\ D = 0 ) ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) )
140	139	ex	\|- ( ph -> ( ( E =/= 0 /\ D = 0 ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) ) )
141	99 140	syl5bir	\|- ( ph -> ( ( ( B - Y ) =/= 0 /\ ( X - A ) = 0 ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) ) )
142	19 97 141	syl2and	\|- ( ph -> ( ( B =/= Y /\ -. A =/= X ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) ) )
143	142	imp	\|- ( ( ph /\ ( B =/= Y /\ -. A =/= X ) ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) )
144		nne	\|- ( -. B =/= Y <-> B = Y )
145	13 15	subeq0ad	\|- ( ph -> ( ( B - Y ) = 0 <-> B = Y ) )
146	145	biimprd	\|- ( ph -> ( B = Y -> ( B - Y ) = 0 ) )
147	144 146	syl5bi	\|- ( ph -> ( -. B =/= Y -> ( B - Y ) = 0 ) )
148	6	eqeq1i	\|- ( E = 0 <-> ( B - Y ) = 0 )
149	148 29	anbi12i	\|- ( ( E = 0 /\ D =/= 0 ) <-> ( ( B - Y ) = 0 /\ ( X - A ) =/= 0 ) )
150		0red	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> 0 e. RR )
151	47	adantr	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( ( D ^ 2 ) x. ( A ^ 2 ) ) e. RR )
152	54	adantr	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) e. RR )
153	34	sqge0d	\|- ( ph -> 0 <_ ( D ^ 2 ) )
154	1	sqge0d	\|- ( ph -> 0 <_ ( A ^ 2 ) )
155	45 46 153 154	mulge0d	\|- ( ph -> 0 <_ ( ( D ^ 2 ) x. ( A ^ 2 ) ) )
156	155	adantr	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> 0 <_ ( ( D ^ 2 ) x. ( A ^ 2 ) ) )
157	46	adantr	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( A ^ 2 ) e. RR )
158	53	adantr	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( ( R ^ 2 ) - ( B ^ 2 ) ) e. RR )
159		simprr	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> D =/= 0 )
160	34 159 80	syl2an2r	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( D ^ 2 ) e. RR+ )
161	43	recnd	\|- ( ph -> ( B ^ 2 ) e. CC )
162	46	recnd	\|- ( ph -> ( A ^ 2 ) e. CC )
163	161 162	addcomd	\|- ( ph -> ( ( B ^ 2 ) + ( A ^ 2 ) ) = ( ( A ^ 2 ) + ( B ^ 2 ) ) )
164	163 9	eqbrtrd	\|- ( ph -> ( ( B ^ 2 ) + ( A ^ 2 ) ) < ( R ^ 2 ) )
165	43 46 50	ltaddsub2d	\|- ( ph -> ( ( ( B ^ 2 ) + ( A ^ 2 ) ) < ( R ^ 2 ) <-> ( A ^ 2 ) < ( ( R ^ 2 ) - ( B ^ 2 ) ) ) )
166	164 165	mpbid	\|- ( ph -> ( A ^ 2 ) < ( ( R ^ 2 ) - ( B ^ 2 ) ) )
167	166	adantr	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( A ^ 2 ) < ( ( R ^ 2 ) - ( B ^ 2 ) ) )
168	157 158 160 167	ltmul2dd	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( ( D ^ 2 ) x. ( A ^ 2 ) ) < ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) )
169	150 151 152 156 168	lelttrd	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> 0 < ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) )
170		oveq1	\|- ( E = 0 -> ( E x. B ) = ( 0 x. B ) )
171	170	adantr	\|- ( ( E = 0 /\ D =/= 0 ) -> ( E x. B ) = ( 0 x. B ) )
172	13	mul02d	\|- ( ph -> ( 0 x. B ) = 0 )
173	171 172	sylan9eqr	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( E x. B ) = 0 )
174	173	oveq2d	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( ( D x. A ) x. ( E x. B ) ) = ( ( D x. A ) x. 0 ) )
175	34	adantr	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> D e. RR )
176	175	recnd	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> D e. CC )
177	22	adantr	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> A e. CC )
178	176 177	mulcld	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( D x. A ) e. CC )
179	178	mul01d	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( ( D x. A ) x. 0 ) = 0 )
180	174 179	eqtrd	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( ( D x. A ) x. ( E x. B ) ) = 0 )
181	180	oveq2d	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) = ( 2 x. 0 ) )
182	181 124	eqtrdi	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) = 0 )
183		sq0i	\|- ( E = 0 -> ( E ^ 2 ) = 0 )
184	183	adantr	\|- ( ( E = 0 /\ D =/= 0 ) -> ( E ^ 2 ) = 0 )
185	184	adantl	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( E ^ 2 ) = 0 )
186	185	oveq1d	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) = ( 0 x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) )
187	51	recnd	\|- ( ph -> ( ( R ^ 2 ) - ( A ^ 2 ) ) e. CC )
188	187	mul02d	\|- ( ph -> ( 0 x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) = 0 )
189	188	adantr	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( 0 x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) = 0 )
190	186 189	eqtrd	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) = 0 )
191	190	oveq1d	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) = ( 0 + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) )
192	54	recnd	\|- ( ph -> ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) e. CC )
193	192	addid2d	\|- ( ph -> ( 0 + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) = ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) )
194	193	adantr	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( 0 + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) = ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) )
195	191 194	eqtrd	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) = ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) )
196	169 182 195	3brtr4d	\|- ( ( ph /\ ( E = 0 /\ D =/= 0 ) ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) )
197	196	ex	\|- ( ph -> ( ( E = 0 /\ D =/= 0 ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) ) )
198	149 197	syl5bir	\|- ( ph -> ( ( ( B - Y ) = 0 /\ ( X - A ) =/= 0 ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) ) )
199	147 27 198	syl2and	\|- ( ph -> ( ( -. B =/= Y /\ A =/= X ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) ) )
200	199	imp	\|- ( ( ph /\ ( -. B =/= Y /\ A =/= X ) ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) )
201		ioran	\|- ( -. ( B =/= Y \/ A =/= X ) <-> ( -. B =/= Y /\ -. A =/= X ) )
202	10	pm2.24d	\|- ( ph -> ( -. ( B =/= Y \/ A =/= X ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) ) )
203	201 202	syl5bir	\|- ( ph -> ( ( -. B =/= Y /\ -. A =/= X ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) ) )
204	203	imp	\|- ( ( ph /\ ( -. B =/= Y /\ -. A =/= X ) ) -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) )
205	91 143 200 204	4casesdan	\|- ( ph -> ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) )
206	40 55	posdifd	\|- ( ph -> ( ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) < ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) <-> 0 < ( ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) - ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) ) ) )
207	205 206	mpbid	\|- ( ph -> 0 < ( ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) - ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) ) )
208	1 2 3 4 5 6 7 8 11 12	2itscplem3	\|- ( ph -> S = ( ( ( ( E ^ 2 ) x. ( ( R ^ 2 ) - ( A ^ 2 ) ) ) + ( ( D ^ 2 ) x. ( ( R ^ 2 ) - ( B ^ 2 ) ) ) ) - ( 2 x. ( ( D x. A ) x. ( E x. B ) ) ) ) )
209	207 208	breqtrrd	\|- ( ph -> 0 < S )

Metamath Proof Explorer

Theorem 2itscp

Proof