atans2

Description: It suffices to show that 1 -i A and 1 + i A are in the continuity domain of log to show that A is in the continuity domain of arctangent. (Contributed by Mario Carneiro, 7-Apr-2015)

	Ref	Expression
Hypotheses	atansopn.d	\|- D = ( CC \ ( -oo (,] 0 ) )
	atansopn.s	\|- S = { y e. CC \| ( 1 + ( y ^ 2 ) ) e. D }
Assertion	atans2	\|- ( A e. S <-> ( A e. CC /\ ( 1 - ( _i x. A ) ) e. D /\ ( 1 + ( _i x. A ) ) e. D ) )

Proof

Step	Hyp	Ref	Expression
1		atansopn.d	\|- D = ( CC \ ( -oo (,] 0 ) )
2		atansopn.s	\|- S = { y e. CC \| ( 1 + ( y ^ 2 ) ) e. D }
3		sqcl	\|- ( A e. CC -> ( A ^ 2 ) e. CC )
4	3	adantr	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( A ^ 2 ) e. CC )
5	4	sqsqrtd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( ( sqrt ` ( A ^ 2 ) ) ^ 2 ) = ( A ^ 2 ) )
6	5	eqcomd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( A ^ 2 ) = ( ( sqrt ` ( A ^ 2 ) ) ^ 2 ) )
7	4	sqrtcld	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( sqrt ` ( A ^ 2 ) ) e. CC )
8		sqeqor	\|- ( ( A e. CC /\ ( sqrt ` ( A ^ 2 ) ) e. CC ) -> ( ( A ^ 2 ) = ( ( sqrt ` ( A ^ 2 ) ) ^ 2 ) <-> ( A = ( sqrt ` ( A ^ 2 ) ) \/ A = -u ( sqrt ` ( A ^ 2 ) ) ) ) )
9	7 8	syldan	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( ( A ^ 2 ) = ( ( sqrt ` ( A ^ 2 ) ) ^ 2 ) <-> ( A = ( sqrt ` ( A ^ 2 ) ) \/ A = -u ( sqrt ` ( A ^ 2 ) ) ) ) )
10	6 9	mpbid	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( A = ( sqrt ` ( A ^ 2 ) ) \/ A = -u ( sqrt ` ( A ^ 2 ) ) ) )
11		1re	\|- 1 e. RR
12	11	a1i	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> 1 e. RR )
13	4	negnegd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> -u -u ( A ^ 2 ) = ( A ^ 2 ) )
14	13	fveq2d	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( sqrt ` -u -u ( A ^ 2 ) ) = ( sqrt ` ( A ^ 2 ) ) )
15		ax-1cn	\|- 1 e. CC
16		pncan2	\|- ( ( 1 e. CC /\ ( A ^ 2 ) e. CC ) -> ( ( 1 + ( A ^ 2 ) ) - 1 ) = ( A ^ 2 ) )
17	15 4 16	sylancr	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( A ^ 2 ) ) - 1 ) = ( A ^ 2 ) )
18		simpr	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) )
19		mnfxr	\|- -oo e. RR*
20		0re	\|- 0 e. RR
21		elioc2	\|- ( ( -oo e. RR* /\ 0 e. RR ) -> ( ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) <-> ( ( 1 + ( A ^ 2 ) ) e. RR /\ -oo < ( 1 + ( A ^ 2 ) ) /\ ( 1 + ( A ^ 2 ) ) <_ 0 ) ) )
22	19 20 21	mp2an	\|- ( ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) <-> ( ( 1 + ( A ^ 2 ) ) e. RR /\ -oo < ( 1 + ( A ^ 2 ) ) /\ ( 1 + ( A ^ 2 ) ) <_ 0 ) )
23	18 22	sylib	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( A ^ 2 ) ) e. RR /\ -oo < ( 1 + ( A ^ 2 ) ) /\ ( 1 + ( A ^ 2 ) ) <_ 0 ) )
24	23	simp1d	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 + ( A ^ 2 ) ) e. RR )
25		resubcl	\|- ( ( ( 1 + ( A ^ 2 ) ) e. RR /\ 1 e. RR ) -> ( ( 1 + ( A ^ 2 ) ) - 1 ) e. RR )
26	24 11 25	sylancl	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( A ^ 2 ) ) - 1 ) e. RR )
27	17 26	eqeltrrd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( A ^ 2 ) e. RR )
28	27	renegcld	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> -u ( A ^ 2 ) e. RR )
29		0red	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> 0 e. RR )
30		0le1	\|- 0 <_ 1
31	30	a1i	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> 0 <_ 1 )
32		subneg	\|- ( ( 1 e. CC /\ ( A ^ 2 ) e. CC ) -> ( 1 - -u ( A ^ 2 ) ) = ( 1 + ( A ^ 2 ) ) )
33	15 4 32	sylancr	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 - -u ( A ^ 2 ) ) = ( 1 + ( A ^ 2 ) ) )
34	23	simp3d	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 + ( A ^ 2 ) ) <_ 0 )
35	33 34	eqbrtrd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 - -u ( A ^ 2 ) ) <_ 0 )
36		suble0	\|- ( ( 1 e. RR /\ -u ( A ^ 2 ) e. RR ) -> ( ( 1 - -u ( A ^ 2 ) ) <_ 0 <-> 1 <_ -u ( A ^ 2 ) ) )
37	11 28 36	sylancr	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 - -u ( A ^ 2 ) ) <_ 0 <-> 1 <_ -u ( A ^ 2 ) ) )
38	35 37	mpbid	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> 1 <_ -u ( A ^ 2 ) )
39	29 12 28 31 38	letrd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> 0 <_ -u ( A ^ 2 ) )
40	28 39	sqrtnegd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( sqrt ` -u -u ( A ^ 2 ) ) = ( _i x. ( sqrt ` -u ( A ^ 2 ) ) ) )
41	14 40	eqtr3d	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( sqrt ` ( A ^ 2 ) ) = ( _i x. ( sqrt ` -u ( A ^ 2 ) ) ) )
42	41	oveq2d	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( _i x. ( sqrt ` ( A ^ 2 ) ) ) = ( _i x. ( _i x. ( sqrt ` -u ( A ^ 2 ) ) ) ) )
43		ax-icn	\|- _i e. CC
44	43	a1i	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> _i e. CC )
45	28 39	resqrtcld	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( sqrt ` -u ( A ^ 2 ) ) e. RR )
46	45	recnd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( sqrt ` -u ( A ^ 2 ) ) e. CC )
47	44 44 46	mulassd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( ( _i x. _i ) x. ( sqrt ` -u ( A ^ 2 ) ) ) = ( _i x. ( _i x. ( sqrt ` -u ( A ^ 2 ) ) ) ) )
48		ixi	\|- ( _i x. _i ) = -u 1
49	48	oveq1i	\|- ( ( _i x. _i ) x. ( sqrt ` -u ( A ^ 2 ) ) ) = ( -u 1 x. ( sqrt ` -u ( A ^ 2 ) ) )
50	46	mulm1d	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( -u 1 x. ( sqrt ` -u ( A ^ 2 ) ) ) = -u ( sqrt ` -u ( A ^ 2 ) ) )
51	49 50	eqtrid	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( ( _i x. _i ) x. ( sqrt ` -u ( A ^ 2 ) ) ) = -u ( sqrt ` -u ( A ^ 2 ) ) )
52	42 47 51	3eqtr2d	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( _i x. ( sqrt ` ( A ^ 2 ) ) ) = -u ( sqrt ` -u ( A ^ 2 ) ) )
53	45	renegcld	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> -u ( sqrt ` -u ( A ^ 2 ) ) e. RR )
54	52 53	eqeltrd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( _i x. ( sqrt ` ( A ^ 2 ) ) ) e. RR )
55	12 54	readdcld	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) e. RR )
56	55	mnfltd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> -oo < ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) )
57	52	oveq2d	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) = ( 1 + -u ( sqrt ` -u ( A ^ 2 ) ) ) )
58		negsub	\|- ( ( 1 e. CC /\ ( sqrt ` -u ( A ^ 2 ) ) e. CC ) -> ( 1 + -u ( sqrt ` -u ( A ^ 2 ) ) ) = ( 1 - ( sqrt ` -u ( A ^ 2 ) ) ) )
59	15 46 58	sylancr	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 + -u ( sqrt ` -u ( A ^ 2 ) ) ) = ( 1 - ( sqrt ` -u ( A ^ 2 ) ) ) )
60	57 59	eqtrd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) = ( 1 - ( sqrt ` -u ( A ^ 2 ) ) ) )
61		sq1	\|- ( 1 ^ 2 ) = 1
62	61	a1i	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 ^ 2 ) = 1 )
63	28	recnd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> -u ( A ^ 2 ) e. CC )
64	63	sqsqrtd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( ( sqrt ` -u ( A ^ 2 ) ) ^ 2 ) = -u ( A ^ 2 ) )
65	38 62 64	3brtr4d	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 ^ 2 ) <_ ( ( sqrt ` -u ( A ^ 2 ) ) ^ 2 ) )
66	28 39	sqrtge0d	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> 0 <_ ( sqrt ` -u ( A ^ 2 ) ) )
67	12 45 31 66	le2sqd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 <_ ( sqrt ` -u ( A ^ 2 ) ) <-> ( 1 ^ 2 ) <_ ( ( sqrt ` -u ( A ^ 2 ) ) ^ 2 ) ) )
68	65 67	mpbird	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> 1 <_ ( sqrt ` -u ( A ^ 2 ) ) )
69	12 45	suble0d	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 - ( sqrt ` -u ( A ^ 2 ) ) ) <_ 0 <-> 1 <_ ( sqrt ` -u ( A ^ 2 ) ) ) )
70	68 69	mpbird	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 - ( sqrt ` -u ( A ^ 2 ) ) ) <_ 0 )
71	60 70	eqbrtrd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) <_ 0 )
72		elioc2	\|- ( ( -oo e. RR* /\ 0 e. RR ) -> ( ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) e. ( -oo (,] 0 ) <-> ( ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) e. RR /\ -oo < ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) /\ ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) <_ 0 ) ) )
73	19 20 72	mp2an	\|- ( ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) e. ( -oo (,] 0 ) <-> ( ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) e. RR /\ -oo < ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) /\ ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) <_ 0 ) )
74	55 56 71 73	syl3anbrc	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) e. ( -oo (,] 0 ) )
75		oveq2	\|- ( A = ( sqrt ` ( A ^ 2 ) ) -> ( _i x. A ) = ( _i x. ( sqrt ` ( A ^ 2 ) ) ) )
76	75	oveq2d	\|- ( A = ( sqrt ` ( A ^ 2 ) ) -> ( 1 + ( _i x. A ) ) = ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) )
77	76	eleq1d	\|- ( A = ( sqrt ` ( A ^ 2 ) ) -> ( ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) <-> ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) e. ( -oo (,] 0 ) ) )
78	74 77	syl5ibrcom	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( A = ( sqrt ` ( A ^ 2 ) ) -> ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) )
79		mulneg2	\|- ( ( _i e. CC /\ ( sqrt ` ( A ^ 2 ) ) e. CC ) -> ( _i x. -u ( sqrt ` ( A ^ 2 ) ) ) = -u ( _i x. ( sqrt ` ( A ^ 2 ) ) ) )
80	43 7 79	sylancr	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( _i x. -u ( sqrt ` ( A ^ 2 ) ) ) = -u ( _i x. ( sqrt ` ( A ^ 2 ) ) ) )
81	80	oveq2d	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 - ( _i x. -u ( sqrt ` ( A ^ 2 ) ) ) ) = ( 1 - -u ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) )
82		mulcl	\|- ( ( _i e. CC /\ ( sqrt ` ( A ^ 2 ) ) e. CC ) -> ( _i x. ( sqrt ` ( A ^ 2 ) ) ) e. CC )
83	43 7 82	sylancr	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( _i x. ( sqrt ` ( A ^ 2 ) ) ) e. CC )
84		subneg	\|- ( ( 1 e. CC /\ ( _i x. ( sqrt ` ( A ^ 2 ) ) ) e. CC ) -> ( 1 - -u ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) = ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) )
85	15 83 84	sylancr	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 - -u ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) = ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) )
86	81 85	eqtrd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 - ( _i x. -u ( sqrt ` ( A ^ 2 ) ) ) ) = ( 1 + ( _i x. ( sqrt ` ( A ^ 2 ) ) ) ) )
87	86 74	eqeltrd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( 1 - ( _i x. -u ( sqrt ` ( A ^ 2 ) ) ) ) e. ( -oo (,] 0 ) )
88		oveq2	\|- ( A = -u ( sqrt ` ( A ^ 2 ) ) -> ( _i x. A ) = ( _i x. -u ( sqrt ` ( A ^ 2 ) ) ) )
89	88	oveq2d	\|- ( A = -u ( sqrt ` ( A ^ 2 ) ) -> ( 1 - ( _i x. A ) ) = ( 1 - ( _i x. -u ( sqrt ` ( A ^ 2 ) ) ) ) )
90	89	eleq1d	\|- ( A = -u ( sqrt ` ( A ^ 2 ) ) -> ( ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) <-> ( 1 - ( _i x. -u ( sqrt ` ( A ^ 2 ) ) ) ) e. ( -oo (,] 0 ) ) )
91	87 90	syl5ibrcom	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( A = -u ( sqrt ` ( A ^ 2 ) ) -> ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) )
92	78 91	orim12d	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( ( A = ( sqrt ` ( A ^ 2 ) ) \/ A = -u ( sqrt ` ( A ^ 2 ) ) ) -> ( ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) \/ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) ) )
93	10 92	mpd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) \/ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) )
94	93	orcomd	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) \/ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) )
95	61	a1i	\|- ( A e. CC -> ( 1 ^ 2 ) = 1 )
96		sqmul	\|- ( ( _i e. CC /\ A e. CC ) -> ( ( _i x. A ) ^ 2 ) = ( ( _i ^ 2 ) x. ( A ^ 2 ) ) )
97	43 96	mpan	\|- ( A e. CC -> ( ( _i x. A ) ^ 2 ) = ( ( _i ^ 2 ) x. ( A ^ 2 ) ) )
98		i2	\|- ( _i ^ 2 ) = -u 1
99	98	oveq1i	\|- ( ( _i ^ 2 ) x. ( A ^ 2 ) ) = ( -u 1 x. ( A ^ 2 ) )
100	3	mulm1d	\|- ( A e. CC -> ( -u 1 x. ( A ^ 2 ) ) = -u ( A ^ 2 ) )
101	99 100	eqtrid	\|- ( A e. CC -> ( ( _i ^ 2 ) x. ( A ^ 2 ) ) = -u ( A ^ 2 ) )
102	97 101	eqtrd	\|- ( A e. CC -> ( ( _i x. A ) ^ 2 ) = -u ( A ^ 2 ) )
103	95 102	oveq12d	\|- ( A e. CC -> ( ( 1 ^ 2 ) - ( ( _i x. A ) ^ 2 ) ) = ( 1 - -u ( A ^ 2 ) ) )
104		mulcl	\|- ( ( _i e. CC /\ A e. CC ) -> ( _i x. A ) e. CC )
105	43 104	mpan	\|- ( A e. CC -> ( _i x. A ) e. CC )
106		subsq	\|- ( ( 1 e. CC /\ ( _i x. A ) e. CC ) -> ( ( 1 ^ 2 ) - ( ( _i x. A ) ^ 2 ) ) = ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) )
107	15 105 106	sylancr	\|- ( A e. CC -> ( ( 1 ^ 2 ) - ( ( _i x. A ) ^ 2 ) ) = ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) )
108	15 3 32	sylancr	\|- ( A e. CC -> ( 1 - -u ( A ^ 2 ) ) = ( 1 + ( A ^ 2 ) ) )
109	103 107 108	3eqtr3d	\|- ( A e. CC -> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) = ( 1 + ( A ^ 2 ) ) )
110	109	adantr	\|- ( ( A e. CC /\ ( ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) \/ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) ) -> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) = ( 1 + ( A ^ 2 ) ) )
111		2cn	\|- 2 e. CC
112	111	a1i	\|- ( A e. CC -> 2 e. CC )
113	15	a1i	\|- ( A e. CC -> 1 e. CC )
114	112 113 105	subsubd	\|- ( A e. CC -> ( 2 - ( 1 - ( _i x. A ) ) ) = ( ( 2 - 1 ) + ( _i x. A ) ) )
115		2m1e1	\|- ( 2 - 1 ) = 1
116	115	oveq1i	\|- ( ( 2 - 1 ) + ( _i x. A ) ) = ( 1 + ( _i x. A ) )
117	114 116	eqtrdi	\|- ( A e. CC -> ( 2 - ( 1 - ( _i x. A ) ) ) = ( 1 + ( _i x. A ) ) )
118	117	adantr	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 2 - ( 1 - ( _i x. A ) ) ) = ( 1 + ( _i x. A ) ) )
119		2re	\|- 2 e. RR
120		simpr	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) )
121		elioc2	\|- ( ( -oo e. RR* /\ 0 e. RR ) -> ( ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) <-> ( ( 1 - ( _i x. A ) ) e. RR /\ -oo < ( 1 - ( _i x. A ) ) /\ ( 1 - ( _i x. A ) ) <_ 0 ) ) )
122	19 20 121	mp2an	\|- ( ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) <-> ( ( 1 - ( _i x. A ) ) e. RR /\ -oo < ( 1 - ( _i x. A ) ) /\ ( 1 - ( _i x. A ) ) <_ 0 ) )
123	120 122	sylib	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 - ( _i x. A ) ) e. RR /\ -oo < ( 1 - ( _i x. A ) ) /\ ( 1 - ( _i x. A ) ) <_ 0 ) )
124	123	simp1d	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 1 - ( _i x. A ) ) e. RR )
125		resubcl	\|- ( ( 2 e. RR /\ ( 1 - ( _i x. A ) ) e. RR ) -> ( 2 - ( 1 - ( _i x. A ) ) ) e. RR )
126	119 124 125	sylancr	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 2 - ( 1 - ( _i x. A ) ) ) e. RR )
127	118 126	eqeltrrd	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 1 + ( _i x. A ) ) e. RR )
128	127 124	remulcld	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) e. RR )
129	128	mnfltd	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> -oo < ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) )
130	123	simp3d	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 1 - ( _i x. A ) ) <_ 0 )
131		0red	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> 0 e. RR )
132	119	a1i	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> 2 e. RR )
133		2pos	\|- 0 < 2
134	133	a1i	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> 0 < 2 )
135	111	subid1i	\|- ( 2 - 0 ) = 2
136	124 131 132 130	lesub2dd	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 2 - 0 ) <_ ( 2 - ( 1 - ( _i x. A ) ) ) )
137	135 136	eqbrtrrid	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> 2 <_ ( 2 - ( 1 - ( _i x. A ) ) ) )
138	137 118	breqtrd	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> 2 <_ ( 1 + ( _i x. A ) ) )
139	131 132 127 134 138	ltletrd	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> 0 < ( 1 + ( _i x. A ) ) )
140		lemul2	\|- ( ( ( 1 - ( _i x. A ) ) e. RR /\ 0 e. RR /\ ( ( 1 + ( _i x. A ) ) e. RR /\ 0 < ( 1 + ( _i x. A ) ) ) ) -> ( ( 1 - ( _i x. A ) ) <_ 0 <-> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) <_ ( ( 1 + ( _i x. A ) ) x. 0 ) ) )
141	124 131 127 139 140	syl112anc	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 - ( _i x. A ) ) <_ 0 <-> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) <_ ( ( 1 + ( _i x. A ) ) x. 0 ) ) )
142	130 141	mpbid	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) <_ ( ( 1 + ( _i x. A ) ) x. 0 ) )
143		addcl	\|- ( ( 1 e. CC /\ ( _i x. A ) e. CC ) -> ( 1 + ( _i x. A ) ) e. CC )
144	15 105 143	sylancr	\|- ( A e. CC -> ( 1 + ( _i x. A ) ) e. CC )
145	144	adantr	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 1 + ( _i x. A ) ) e. CC )
146	145	mul01d	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( _i x. A ) ) x. 0 ) = 0 )
147	142 146	breqtrd	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) <_ 0 )
148		elioc2	\|- ( ( -oo e. RR* /\ 0 e. RR ) -> ( ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) e. ( -oo (,] 0 ) <-> ( ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) e. RR /\ -oo < ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) /\ ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) <_ 0 ) ) )
149	19 20 148	mp2an	\|- ( ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) e. ( -oo (,] 0 ) <-> ( ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) e. RR /\ -oo < ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) /\ ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) <_ 0 ) )
150	128 129 147 149	syl3anbrc	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) e. ( -oo (,] 0 ) )
151		simpr	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) )
152		elioc2	\|- ( ( -oo e. RR* /\ 0 e. RR ) -> ( ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) <-> ( ( 1 + ( _i x. A ) ) e. RR /\ -oo < ( 1 + ( _i x. A ) ) /\ ( 1 + ( _i x. A ) ) <_ 0 ) ) )
153	19 20 152	mp2an	\|- ( ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) <-> ( ( 1 + ( _i x. A ) ) e. RR /\ -oo < ( 1 + ( _i x. A ) ) /\ ( 1 + ( _i x. A ) ) <_ 0 ) )
154	151 153	sylib	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( _i x. A ) ) e. RR /\ -oo < ( 1 + ( _i x. A ) ) /\ ( 1 + ( _i x. A ) ) <_ 0 ) )
155	154	simp1d	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 1 + ( _i x. A ) ) e. RR )
156	112 113 105	subsub4d	\|- ( A e. CC -> ( ( 2 - 1 ) - ( _i x. A ) ) = ( 2 - ( 1 + ( _i x. A ) ) ) )
157	115	oveq1i	\|- ( ( 2 - 1 ) - ( _i x. A ) ) = ( 1 - ( _i x. A ) )
158	156 157	eqtr3di	\|- ( A e. CC -> ( 2 - ( 1 + ( _i x. A ) ) ) = ( 1 - ( _i x. A ) ) )
159	158	adantr	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 2 - ( 1 + ( _i x. A ) ) ) = ( 1 - ( _i x. A ) ) )
160		resubcl	\|- ( ( 2 e. RR /\ ( 1 + ( _i x. A ) ) e. RR ) -> ( 2 - ( 1 + ( _i x. A ) ) ) e. RR )
161	119 155 160	sylancr	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 2 - ( 1 + ( _i x. A ) ) ) e. RR )
162	159 161	eqeltrrd	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 1 - ( _i x. A ) ) e. RR )
163	155 162	remulcld	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) e. RR )
164	163	mnfltd	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> -oo < ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) )
165	154	simp3d	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 1 + ( _i x. A ) ) <_ 0 )
166		0red	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> 0 e. RR )
167	119	a1i	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> 2 e. RR )
168	133	a1i	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> 0 < 2 )
169	155 166 167 165	lesub2dd	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 2 - 0 ) <_ ( 2 - ( 1 + ( _i x. A ) ) ) )
170	135 169	eqbrtrrid	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> 2 <_ ( 2 - ( 1 + ( _i x. A ) ) ) )
171	170 159	breqtrd	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> 2 <_ ( 1 - ( _i x. A ) ) )
172	166 167 162 168 171	ltletrd	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> 0 < ( 1 - ( _i x. A ) ) )
173		lemul1	\|- ( ( ( 1 + ( _i x. A ) ) e. RR /\ 0 e. RR /\ ( ( 1 - ( _i x. A ) ) e. RR /\ 0 < ( 1 - ( _i x. A ) ) ) ) -> ( ( 1 + ( _i x. A ) ) <_ 0 <-> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) <_ ( 0 x. ( 1 - ( _i x. A ) ) ) ) )
174	155 166 162 172 173	syl112anc	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( _i x. A ) ) <_ 0 <-> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) <_ ( 0 x. ( 1 - ( _i x. A ) ) ) ) )
175	165 174	mpbid	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) <_ ( 0 x. ( 1 - ( _i x. A ) ) ) )
176	162	recnd	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 1 - ( _i x. A ) ) e. CC )
177	176	mul02d	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( 0 x. ( 1 - ( _i x. A ) ) ) = 0 )
178	175 177	breqtrd	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) <_ 0 )
179	163 164 178 149	syl3anbrc	\|- ( ( A e. CC /\ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) -> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) e. ( -oo (,] 0 ) )
180	150 179	jaodan	\|- ( ( A e. CC /\ ( ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) \/ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) ) -> ( ( 1 + ( _i x. A ) ) x. ( 1 - ( _i x. A ) ) ) e. ( -oo (,] 0 ) )
181	110 180	eqeltrrd	\|- ( ( A e. CC /\ ( ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) \/ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) ) -> ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) )
182	94 181	impbida	\|- ( A e. CC -> ( ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) <-> ( ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) \/ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) ) )
183	182	notbid	\|- ( A e. CC -> ( -. ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) <-> -. ( ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) \/ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) ) )
184		ioran	\|- ( -. ( ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) \/ ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) <-> ( -. ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) /\ -. ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) )
185	183 184	bitrdi	\|- ( A e. CC -> ( -. ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) <-> ( -. ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) /\ -. ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) ) )
186		addcl	\|- ( ( 1 e. CC /\ ( A ^ 2 ) e. CC ) -> ( 1 + ( A ^ 2 ) ) e. CC )
187	15 3 186	sylancr	\|- ( A e. CC -> ( 1 + ( A ^ 2 ) ) e. CC )
188	1	eleq2i	\|- ( ( 1 + ( A ^ 2 ) ) e. D <-> ( 1 + ( A ^ 2 ) ) e. ( CC \ ( -oo (,] 0 ) ) )
189		eldif	\|- ( ( 1 + ( A ^ 2 ) ) e. ( CC \ ( -oo (,] 0 ) ) <-> ( ( 1 + ( A ^ 2 ) ) e. CC /\ -. ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) )
190	188 189	bitri	\|- ( ( 1 + ( A ^ 2 ) ) e. D <-> ( ( 1 + ( A ^ 2 ) ) e. CC /\ -. ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) )
191	190	baib	\|- ( ( 1 + ( A ^ 2 ) ) e. CC -> ( ( 1 + ( A ^ 2 ) ) e. D <-> -. ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) )
192	187 191	syl	\|- ( A e. CC -> ( ( 1 + ( A ^ 2 ) ) e. D <-> -. ( 1 + ( A ^ 2 ) ) e. ( -oo (,] 0 ) ) )
193		subcl	\|- ( ( 1 e. CC /\ ( _i x. A ) e. CC ) -> ( 1 - ( _i x. A ) ) e. CC )
194	15 105 193	sylancr	\|- ( A e. CC -> ( 1 - ( _i x. A ) ) e. CC )
195	1	eleq2i	\|- ( ( 1 - ( _i x. A ) ) e. D <-> ( 1 - ( _i x. A ) ) e. ( CC \ ( -oo (,] 0 ) ) )
196		eldif	\|- ( ( 1 - ( _i x. A ) ) e. ( CC \ ( -oo (,] 0 ) ) <-> ( ( 1 - ( _i x. A ) ) e. CC /\ -. ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) )
197	195 196	bitri	\|- ( ( 1 - ( _i x. A ) ) e. D <-> ( ( 1 - ( _i x. A ) ) e. CC /\ -. ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) )
198	197	baib	\|- ( ( 1 - ( _i x. A ) ) e. CC -> ( ( 1 - ( _i x. A ) ) e. D <-> -. ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) )
199	194 198	syl	\|- ( A e. CC -> ( ( 1 - ( _i x. A ) ) e. D <-> -. ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) ) )
200	1	eleq2i	\|- ( ( 1 + ( _i x. A ) ) e. D <-> ( 1 + ( _i x. A ) ) e. ( CC \ ( -oo (,] 0 ) ) )
201		eldif	\|- ( ( 1 + ( _i x. A ) ) e. ( CC \ ( -oo (,] 0 ) ) <-> ( ( 1 + ( _i x. A ) ) e. CC /\ -. ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) )
202	200 201	bitri	\|- ( ( 1 + ( _i x. A ) ) e. D <-> ( ( 1 + ( _i x. A ) ) e. CC /\ -. ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) )
203	202	baib	\|- ( ( 1 + ( _i x. A ) ) e. CC -> ( ( 1 + ( _i x. A ) ) e. D <-> -. ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) )
204	144 203	syl	\|- ( A e. CC -> ( ( 1 + ( _i x. A ) ) e. D <-> -. ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) )
205	199 204	anbi12d	\|- ( A e. CC -> ( ( ( 1 - ( _i x. A ) ) e. D /\ ( 1 + ( _i x. A ) ) e. D ) <-> ( -. ( 1 - ( _i x. A ) ) e. ( -oo (,] 0 ) /\ -. ( 1 + ( _i x. A ) ) e. ( -oo (,] 0 ) ) ) )
206	185 192 205	3bitr4d	\|- ( A e. CC -> ( ( 1 + ( A ^ 2 ) ) e. D <-> ( ( 1 - ( _i x. A ) ) e. D /\ ( 1 + ( _i x. A ) ) e. D ) ) )
207	206	pm5.32i	\|- ( ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. D ) <-> ( A e. CC /\ ( ( 1 - ( _i x. A ) ) e. D /\ ( 1 + ( _i x. A ) ) e. D ) ) )
208	1 2	atans	\|- ( A e. S <-> ( A e. CC /\ ( 1 + ( A ^ 2 ) ) e. D ) )
209		3anass	\|- ( ( A e. CC /\ ( 1 - ( _i x. A ) ) e. D /\ ( 1 + ( _i x. A ) ) e. D ) <-> ( A e. CC /\ ( ( 1 - ( _i x. A ) ) e. D /\ ( 1 + ( _i x. A ) ) e. D ) ) )
210	207 208 209	3bitr4i	\|- ( A e. S <-> ( A e. CC /\ ( 1 - ( _i x. A ) ) e. D /\ ( 1 + ( _i x. A ) ) e. D ) )

Metamath Proof Explorer

Theorem atans2

Proof