bposlem8

Description: Lemma for bpos . Evaluate F ( 6 4 ) and show it is less than log 2 . (Contributed by Mario Carneiro, 14-Mar-2014)

	Ref	Expression
Hypotheses	bposlem7.1	\|- F = ( n e. NN \|-> ( ( ( ( sqrt ` 2 ) x. ( G ` ( sqrt ` n ) ) ) + ( ( 9 / 4 ) x. ( G ` ( n / 2 ) ) ) ) + ( ( log ` 2 ) / ( sqrt ` ( 2 x. n ) ) ) ) )
	bposlem7.2	\|- G = ( x e. RR+ \|-> ( ( log ` x ) / x ) )
Assertion	bposlem8	\|- ( ( F ` ; 6 4 ) e. RR /\ ( F ` ; 6 4 ) < ( log ` 2 ) )

Proof

Step	Hyp	Ref	Expression
1		bposlem7.1	\|- F = ( n e. NN \|-> ( ( ( ( sqrt ` 2 ) x. ( G ` ( sqrt ` n ) ) ) + ( ( 9 / 4 ) x. ( G ` ( n / 2 ) ) ) ) + ( ( log ` 2 ) / ( sqrt ` ( 2 x. n ) ) ) ) )
2		bposlem7.2	\|- G = ( x e. RR+ \|-> ( ( log ` x ) / x ) )
3		6nn0	\|- 6 e. NN0
4		4nn	\|- 4 e. NN
5	3 4	decnncl	\|- ; 6 4 e. NN
6		fveq2	\|- ( n = ; 6 4 -> ( sqrt ` n ) = ( sqrt ` ; 6 4 ) )
7		8cn	\|- 8 e. CC
8	7	sqvali	\|- ( 8 ^ 2 ) = ( 8 x. 8 )
9		8t8e64	\|- ( 8 x. 8 ) = ; 6 4
10	8 9	eqtri	\|- ( 8 ^ 2 ) = ; 6 4
11	10	fveq2i	\|- ( sqrt ` ( 8 ^ 2 ) ) = ( sqrt ` ; 6 4 )
12		0re	\|- 0 e. RR
13		8re	\|- 8 e. RR
14		8pos	\|- 0 < 8
15	12 13 14	ltleii	\|- 0 <_ 8
16	13	sqrtsqi	\|- ( 0 <_ 8 -> ( sqrt ` ( 8 ^ 2 ) ) = 8 )
17	15 16	ax-mp	\|- ( sqrt ` ( 8 ^ 2 ) ) = 8
18	11 17	eqtr3i	\|- ( sqrt ` ; 6 4 ) = 8
19	6 18	eqtrdi	\|- ( n = ; 6 4 -> ( sqrt ` n ) = 8 )
20	19	fveq2d	\|- ( n = ; 6 4 -> ( G ` ( sqrt ` n ) ) = ( G ` 8 ) )
21		8nn	\|- 8 e. NN
22		nnrp	\|- ( 8 e. NN -> 8 e. RR+ )
23		fveq2	\|- ( x = 8 -> ( log ` x ) = ( log ` 8 ) )
24		cu2	\|- ( 2 ^ 3 ) = 8
25	24	fveq2i	\|- ( log ` ( 2 ^ 3 ) ) = ( log ` 8 )
26		2rp	\|- 2 e. RR+
27		3z	\|- 3 e. ZZ
28		relogexp	\|- ( ( 2 e. RR+ /\ 3 e. ZZ ) -> ( log ` ( 2 ^ 3 ) ) = ( 3 x. ( log ` 2 ) ) )
29	26 27 28	mp2an	\|- ( log ` ( 2 ^ 3 ) ) = ( 3 x. ( log ` 2 ) )
30	25 29	eqtr3i	\|- ( log ` 8 ) = ( 3 x. ( log ` 2 ) )
31	23 30	eqtrdi	\|- ( x = 8 -> ( log ` x ) = ( 3 x. ( log ` 2 ) ) )
32		id	\|- ( x = 8 -> x = 8 )
33	31 32	oveq12d	\|- ( x = 8 -> ( ( log ` x ) / x ) = ( ( 3 x. ( log ` 2 ) ) / 8 ) )
34		3cn	\|- 3 e. CC
35		2nn	\|- 2 e. NN
36		nnrp	\|- ( 2 e. NN -> 2 e. RR+ )
37		relogcl	\|- ( 2 e. RR+ -> ( log ` 2 ) e. RR )
38	35 36 37	mp2b	\|- ( log ` 2 ) e. RR
39	38	recni	\|- ( log ` 2 ) e. CC
40	21	nnne0i	\|- 8 =/= 0
41	34 39 7 40	div23i	\|- ( ( 3 x. ( log ` 2 ) ) / 8 ) = ( ( 3 / 8 ) x. ( log ` 2 ) )
42	33 41	eqtrdi	\|- ( x = 8 -> ( ( log ` x ) / x ) = ( ( 3 / 8 ) x. ( log ` 2 ) ) )
43		ovex	\|- ( ( 3 / 8 ) x. ( log ` 2 ) ) e. _V
44	42 2 43	fvmpt	\|- ( 8 e. RR+ -> ( G ` 8 ) = ( ( 3 / 8 ) x. ( log ` 2 ) ) )
45	21 22 44	mp2b	\|- ( G ` 8 ) = ( ( 3 / 8 ) x. ( log ` 2 ) )
46	20 45	eqtrdi	\|- ( n = ; 6 4 -> ( G ` ( sqrt ` n ) ) = ( ( 3 / 8 ) x. ( log ` 2 ) ) )
47	46	oveq2d	\|- ( n = ; 6 4 -> ( ( sqrt ` 2 ) x. ( G ` ( sqrt ` n ) ) ) = ( ( sqrt ` 2 ) x. ( ( 3 / 8 ) x. ( log ` 2 ) ) ) )
48		sqrt2re	\|- ( sqrt ` 2 ) e. RR
49	48	recni	\|- ( sqrt ` 2 ) e. CC
50	34 7 40	divcli	\|- ( 3 / 8 ) e. CC
51	49 50 39	mulassi	\|- ( ( ( sqrt ` 2 ) x. ( 3 / 8 ) ) x. ( log ` 2 ) ) = ( ( sqrt ` 2 ) x. ( ( 3 / 8 ) x. ( log ` 2 ) ) )
52		4cn	\|- 4 e. CC
53	49 52 49	mul12i	\|- ( ( sqrt ` 2 ) x. ( 4 x. ( sqrt ` 2 ) ) ) = ( 4 x. ( ( sqrt ` 2 ) x. ( sqrt ` 2 ) ) )
54		2re	\|- 2 e. RR
55		0le2	\|- 0 <_ 2
56		remsqsqrt	\|- ( ( 2 e. RR /\ 0 <_ 2 ) -> ( ( sqrt ` 2 ) x. ( sqrt ` 2 ) ) = 2 )
57	54 55 56	mp2an	\|- ( ( sqrt ` 2 ) x. ( sqrt ` 2 ) ) = 2
58	57	oveq2i	\|- ( 4 x. ( ( sqrt ` 2 ) x. ( sqrt ` 2 ) ) ) = ( 4 x. 2 )
59		4t2e8	\|- ( 4 x. 2 ) = 8
60	53 58 59	3eqtri	\|- ( ( sqrt ` 2 ) x. ( 4 x. ( sqrt ` 2 ) ) ) = 8
61	60	oveq2i	\|- ( ( ( sqrt ` 2 ) x. 3 ) / ( ( sqrt ` 2 ) x. ( 4 x. ( sqrt ` 2 ) ) ) ) = ( ( ( sqrt ` 2 ) x. 3 ) / 8 )
62	52 49	mulcli	\|- ( 4 x. ( sqrt ` 2 ) ) e. CC
63		nnrp	\|- ( 4 e. NN -> 4 e. RR+ )
64	4 63	ax-mp	\|- 4 e. RR+
65		rpsqrtcl	\|- ( 2 e. RR+ -> ( sqrt ` 2 ) e. RR+ )
66	35 36 65	mp2b	\|- ( sqrt ` 2 ) e. RR+
67		rpmulcl	\|- ( ( 4 e. RR+ /\ ( sqrt ` 2 ) e. RR+ ) -> ( 4 x. ( sqrt ` 2 ) ) e. RR+ )
68	64 66 67	mp2an	\|- ( 4 x. ( sqrt ` 2 ) ) e. RR+
69		rpne0	\|- ( ( 4 x. ( sqrt ` 2 ) ) e. RR+ -> ( 4 x. ( sqrt ` 2 ) ) =/= 0 )
70	68 69	ax-mp	\|- ( 4 x. ( sqrt ` 2 ) ) =/= 0
71		rpne0	\|- ( ( sqrt ` 2 ) e. RR+ -> ( sqrt ` 2 ) =/= 0 )
72	26 65 71	mp2b	\|- ( sqrt ` 2 ) =/= 0
73		divcan5	\|- ( ( 3 e. CC /\ ( ( 4 x. ( sqrt ` 2 ) ) e. CC /\ ( 4 x. ( sqrt ` 2 ) ) =/= 0 ) /\ ( ( sqrt ` 2 ) e. CC /\ ( sqrt ` 2 ) =/= 0 ) ) -> ( ( ( sqrt ` 2 ) x. 3 ) / ( ( sqrt ` 2 ) x. ( 4 x. ( sqrt ` 2 ) ) ) ) = ( 3 / ( 4 x. ( sqrt ` 2 ) ) ) )
74	34 73	mp3an1	\|- ( ( ( ( 4 x. ( sqrt ` 2 ) ) e. CC /\ ( 4 x. ( sqrt ` 2 ) ) =/= 0 ) /\ ( ( sqrt ` 2 ) e. CC /\ ( sqrt ` 2 ) =/= 0 ) ) -> ( ( ( sqrt ` 2 ) x. 3 ) / ( ( sqrt ` 2 ) x. ( 4 x. ( sqrt ` 2 ) ) ) ) = ( 3 / ( 4 x. ( sqrt ` 2 ) ) ) )
75	62 70 49 72 74	mp4an	\|- ( ( ( sqrt ` 2 ) x. 3 ) / ( ( sqrt ` 2 ) x. ( 4 x. ( sqrt ` 2 ) ) ) ) = ( 3 / ( 4 x. ( sqrt ` 2 ) ) )
76		4ne0	\|- 4 =/= 0
77		divdiv1	\|- ( ( 3 e. CC /\ ( 4 e. CC /\ 4 =/= 0 ) /\ ( ( sqrt ` 2 ) e. CC /\ ( sqrt ` 2 ) =/= 0 ) ) -> ( ( 3 / 4 ) / ( sqrt ` 2 ) ) = ( 3 / ( 4 x. ( sqrt ` 2 ) ) ) )
78	34 77	mp3an1	\|- ( ( ( 4 e. CC /\ 4 =/= 0 ) /\ ( ( sqrt ` 2 ) e. CC /\ ( sqrt ` 2 ) =/= 0 ) ) -> ( ( 3 / 4 ) / ( sqrt ` 2 ) ) = ( 3 / ( 4 x. ( sqrt ` 2 ) ) ) )
79	52 76 49 72 78	mp4an	\|- ( ( 3 / 4 ) / ( sqrt ` 2 ) ) = ( 3 / ( 4 x. ( sqrt ` 2 ) ) )
80	75 79	eqtr4i	\|- ( ( ( sqrt ` 2 ) x. 3 ) / ( ( sqrt ` 2 ) x. ( 4 x. ( sqrt ` 2 ) ) ) ) = ( ( 3 / 4 ) / ( sqrt ` 2 ) )
81	49 34 7 40	divassi	\|- ( ( ( sqrt ` 2 ) x. 3 ) / 8 ) = ( ( sqrt ` 2 ) x. ( 3 / 8 ) )
82	61 80 81	3eqtr3ri	\|- ( ( sqrt ` 2 ) x. ( 3 / 8 ) ) = ( ( 3 / 4 ) / ( sqrt ` 2 ) )
83	82	oveq1i	\|- ( ( ( sqrt ` 2 ) x. ( 3 / 8 ) ) x. ( log ` 2 ) ) = ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) x. ( log ` 2 ) )
84	51 83	eqtr3i	\|- ( ( sqrt ` 2 ) x. ( ( 3 / 8 ) x. ( log ` 2 ) ) ) = ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) x. ( log ` 2 ) )
85	47 84	eqtrdi	\|- ( n = ; 6 4 -> ( ( sqrt ` 2 ) x. ( G ` ( sqrt ` n ) ) ) = ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) x. ( log ` 2 ) ) )
86		oveq1	\|- ( n = ; 6 4 -> ( n / 2 ) = ( ; 6 4 / 2 ) )
87		df-6	\|- 6 = ( 5 + 1 )
88	87	oveq2i	\|- ( 2 ^ 6 ) = ( 2 ^ ( 5 + 1 ) )
89		2exp6	\|- ( 2 ^ 6 ) = ; 6 4
90		2cn	\|- 2 e. CC
91		5nn0	\|- 5 e. NN0
92		expp1	\|- ( ( 2 e. CC /\ 5 e. NN0 ) -> ( 2 ^ ( 5 + 1 ) ) = ( ( 2 ^ 5 ) x. 2 ) )
93	90 91 92	mp2an	\|- ( 2 ^ ( 5 + 1 ) ) = ( ( 2 ^ 5 ) x. 2 )
94	88 89 93	3eqtr3i	\|- ; 6 4 = ( ( 2 ^ 5 ) x. 2 )
95	94	oveq1i	\|- ( ; 6 4 / 2 ) = ( ( ( 2 ^ 5 ) x. 2 ) / 2 )
96		nnexpcl	\|- ( ( 2 e. NN /\ 5 e. NN0 ) -> ( 2 ^ 5 ) e. NN )
97	35 91 96	mp2an	\|- ( 2 ^ 5 ) e. NN
98	97	nncni	\|- ( 2 ^ 5 ) e. CC
99		2ne0	\|- 2 =/= 0
100	98 90 99	divcan4i	\|- ( ( ( 2 ^ 5 ) x. 2 ) / 2 ) = ( 2 ^ 5 )
101	95 100	eqtri	\|- ( ; 6 4 / 2 ) = ( 2 ^ 5 )
102	86 101	eqtrdi	\|- ( n = ; 6 4 -> ( n / 2 ) = ( 2 ^ 5 ) )
103	102	fveq2d	\|- ( n = ; 6 4 -> ( G ` ( n / 2 ) ) = ( G ` ( 2 ^ 5 ) ) )
104		nnrp	\|- ( ( 2 ^ 5 ) e. NN -> ( 2 ^ 5 ) e. RR+ )
105		fveq2	\|- ( x = ( 2 ^ 5 ) -> ( log ` x ) = ( log ` ( 2 ^ 5 ) ) )
106		5nn	\|- 5 e. NN
107	106	nnzi	\|- 5 e. ZZ
108		relogexp	\|- ( ( 2 e. RR+ /\ 5 e. ZZ ) -> ( log ` ( 2 ^ 5 ) ) = ( 5 x. ( log ` 2 ) ) )
109	26 107 108	mp2an	\|- ( log ` ( 2 ^ 5 ) ) = ( 5 x. ( log ` 2 ) )
110	105 109	eqtrdi	\|- ( x = ( 2 ^ 5 ) -> ( log ` x ) = ( 5 x. ( log ` 2 ) ) )
111		id	\|- ( x = ( 2 ^ 5 ) -> x = ( 2 ^ 5 ) )
112	110 111	oveq12d	\|- ( x = ( 2 ^ 5 ) -> ( ( log ` x ) / x ) = ( ( 5 x. ( log ` 2 ) ) / ( 2 ^ 5 ) ) )
113		5cn	\|- 5 e. CC
114	97	nnne0i	\|- ( 2 ^ 5 ) =/= 0
115	113 39 98 114	div23i	\|- ( ( 5 x. ( log ` 2 ) ) / ( 2 ^ 5 ) ) = ( ( 5 / ( 2 ^ 5 ) ) x. ( log ` 2 ) )
116	112 115	eqtrdi	\|- ( x = ( 2 ^ 5 ) -> ( ( log ` x ) / x ) = ( ( 5 / ( 2 ^ 5 ) ) x. ( log ` 2 ) ) )
117		ovex	\|- ( ( 5 / ( 2 ^ 5 ) ) x. ( log ` 2 ) ) e. _V
118	116 2 117	fvmpt	\|- ( ( 2 ^ 5 ) e. RR+ -> ( G ` ( 2 ^ 5 ) ) = ( ( 5 / ( 2 ^ 5 ) ) x. ( log ` 2 ) ) )
119	97 104 118	mp2b	\|- ( G ` ( 2 ^ 5 ) ) = ( ( 5 / ( 2 ^ 5 ) ) x. ( log ` 2 ) )
120	103 119	eqtrdi	\|- ( n = ; 6 4 -> ( G ` ( n / 2 ) ) = ( ( 5 / ( 2 ^ 5 ) ) x. ( log ` 2 ) ) )
121	120	oveq2d	\|- ( n = ; 6 4 -> ( ( 9 / 4 ) x. ( G ` ( n / 2 ) ) ) = ( ( 9 / 4 ) x. ( ( 5 / ( 2 ^ 5 ) ) x. ( log ` 2 ) ) ) )
122		9cn	\|- 9 e. CC
123	122 52 76	divcli	\|- ( 9 / 4 ) e. CC
124	113 98 114	divcli	\|- ( 5 / ( 2 ^ 5 ) ) e. CC
125	123 124 39	mulassi	\|- ( ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) x. ( log ` 2 ) ) = ( ( 9 / 4 ) x. ( ( 5 / ( 2 ^ 5 ) ) x. ( log ` 2 ) ) )
126	121 125	eqtr4di	\|- ( n = ; 6 4 -> ( ( 9 / 4 ) x. ( G ` ( n / 2 ) ) ) = ( ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) x. ( log ` 2 ) ) )
127	85 126	oveq12d	\|- ( n = ; 6 4 -> ( ( ( sqrt ` 2 ) x. ( G ` ( sqrt ` n ) ) ) + ( ( 9 / 4 ) x. ( G ` ( n / 2 ) ) ) ) = ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) x. ( log ` 2 ) ) + ( ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) x. ( log ` 2 ) ) ) )
128	34 52 76	divcli	\|- ( 3 / 4 ) e. CC
129	128 49 72	divcli	\|- ( ( 3 / 4 ) / ( sqrt ` 2 ) ) e. CC
130	123 124	mulcli	\|- ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) e. CC
131	129 130 39	adddiri	\|- ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) x. ( log ` 2 ) ) = ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) x. ( log ` 2 ) ) + ( ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) x. ( log ` 2 ) ) )
132	127 131	eqtr4di	\|- ( n = ; 6 4 -> ( ( ( sqrt ` 2 ) x. ( G ` ( sqrt ` n ) ) ) + ( ( 9 / 4 ) x. ( G ` ( n / 2 ) ) ) ) = ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) x. ( log ` 2 ) ) )
133		oveq2	\|- ( n = ; 6 4 -> ( 2 x. n ) = ( 2 x. ; 6 4 ) )
134	133	fveq2d	\|- ( n = ; 6 4 -> ( sqrt ` ( 2 x. n ) ) = ( sqrt ` ( 2 x. ; 6 4 ) ) )
135	5	nnrei	\|- ; 6 4 e. RR
136	5	nngt0i	\|- 0 < ; 6 4
137	12 135 136	ltleii	\|- 0 <_ ; 6 4
138	54 135 55 137	sqrtmulii	\|- ( sqrt ` ( 2 x. ; 6 4 ) ) = ( ( sqrt ` 2 ) x. ( sqrt ` ; 6 4 ) )
139	18	oveq2i	\|- ( ( sqrt ` 2 ) x. ( sqrt ` ; 6 4 ) ) = ( ( sqrt ` 2 ) x. 8 )
140	138 139	eqtri	\|- ( sqrt ` ( 2 x. ; 6 4 ) ) = ( ( sqrt ` 2 ) x. 8 )
141	134 140	eqtrdi	\|- ( n = ; 6 4 -> ( sqrt ` ( 2 x. n ) ) = ( ( sqrt ` 2 ) x. 8 ) )
142	141	oveq2d	\|- ( n = ; 6 4 -> ( ( log ` 2 ) / ( sqrt ` ( 2 x. n ) ) ) = ( ( log ` 2 ) / ( ( sqrt ` 2 ) x. 8 ) ) )
143	49 7	mulcli	\|- ( ( sqrt ` 2 ) x. 8 ) e. CC
144		rpmulcl	\|- ( ( ( sqrt ` 2 ) e. RR+ /\ 8 e. RR+ ) -> ( ( sqrt ` 2 ) x. 8 ) e. RR+ )
145	66 22 144	sylancr	\|- ( 8 e. NN -> ( ( sqrt ` 2 ) x. 8 ) e. RR+ )
146		rpne0	\|- ( ( ( sqrt ` 2 ) x. 8 ) e. RR+ -> ( ( sqrt ` 2 ) x. 8 ) =/= 0 )
147	21 145 146	mp2b	\|- ( ( sqrt ` 2 ) x. 8 ) =/= 0
148		divrec2	\|- ( ( ( log ` 2 ) e. CC /\ ( ( sqrt ` 2 ) x. 8 ) e. CC /\ ( ( sqrt ` 2 ) x. 8 ) =/= 0 ) -> ( ( log ` 2 ) / ( ( sqrt ` 2 ) x. 8 ) ) = ( ( 1 / ( ( sqrt ` 2 ) x. 8 ) ) x. ( log ` 2 ) ) )
149	39 143 147 148	mp3an	\|- ( ( log ` 2 ) / ( ( sqrt ` 2 ) x. 8 ) ) = ( ( 1 / ( ( sqrt ` 2 ) x. 8 ) ) x. ( log ` 2 ) )
150	49 7	mulcomi	\|- ( ( sqrt ` 2 ) x. 8 ) = ( 8 x. ( sqrt ` 2 ) )
151	150	oveq2i	\|- ( 1 / ( ( sqrt ` 2 ) x. 8 ) ) = ( 1 / ( 8 x. ( sqrt ` 2 ) ) )
152		recdiv2	\|- ( ( ( 8 e. CC /\ 8 =/= 0 ) /\ ( ( sqrt ` 2 ) e. CC /\ ( sqrt ` 2 ) =/= 0 ) ) -> ( ( 1 / 8 ) / ( sqrt ` 2 ) ) = ( 1 / ( 8 x. ( sqrt ` 2 ) ) ) )
153	7 40 49 72 152	mp4an	\|- ( ( 1 / 8 ) / ( sqrt ` 2 ) ) = ( 1 / ( 8 x. ( sqrt ` 2 ) ) )
154	151 153	eqtr4i	\|- ( 1 / ( ( sqrt ` 2 ) x. 8 ) ) = ( ( 1 / 8 ) / ( sqrt ` 2 ) )
155	154	oveq1i	\|- ( ( 1 / ( ( sqrt ` 2 ) x. 8 ) ) x. ( log ` 2 ) ) = ( ( ( 1 / 8 ) / ( sqrt ` 2 ) ) x. ( log ` 2 ) )
156	149 155	eqtri	\|- ( ( log ` 2 ) / ( ( sqrt ` 2 ) x. 8 ) ) = ( ( ( 1 / 8 ) / ( sqrt ` 2 ) ) x. ( log ` 2 ) )
157	142 156	eqtrdi	\|- ( n = ; 6 4 -> ( ( log ` 2 ) / ( sqrt ` ( 2 x. n ) ) ) = ( ( ( 1 / 8 ) / ( sqrt ` 2 ) ) x. ( log ` 2 ) ) )
158	132 157	oveq12d	\|- ( n = ; 6 4 -> ( ( ( ( sqrt ` 2 ) x. ( G ` ( sqrt ` n ) ) ) + ( ( 9 / 4 ) x. ( G ` ( n / 2 ) ) ) ) + ( ( log ` 2 ) / ( sqrt ` ( 2 x. n ) ) ) ) = ( ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) x. ( log ` 2 ) ) + ( ( ( 1 / 8 ) / ( sqrt ` 2 ) ) x. ( log ` 2 ) ) ) )
159	129 130	addcli	\|- ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) e. CC
160	7 40	reccli	\|- ( 1 / 8 ) e. CC
161	160 49 72	divcli	\|- ( ( 1 / 8 ) / ( sqrt ` 2 ) ) e. CC
162	159 161 39	adddiri	\|- ( ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) x. ( log ` 2 ) ) = ( ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) x. ( log ` 2 ) ) + ( ( ( 1 / 8 ) / ( sqrt ` 2 ) ) x. ( log ` 2 ) ) )
163	158 162	eqtr4di	\|- ( n = ; 6 4 -> ( ( ( ( sqrt ` 2 ) x. ( G ` ( sqrt ` n ) ) ) + ( ( 9 / 4 ) x. ( G ` ( n / 2 ) ) ) ) + ( ( log ` 2 ) / ( sqrt ` ( 2 x. n ) ) ) ) = ( ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) x. ( log ` 2 ) ) )
164		ovex	\|- ( ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) x. ( log ` 2 ) ) e. _V
165	163 1 164	fvmpt	\|- ( ; 6 4 e. NN -> ( F ` ; 6 4 ) = ( ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) x. ( log ` 2 ) ) )
166	5 165	ax-mp	\|- ( F ` ; 6 4 ) = ( ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) x. ( log ` 2 ) )
167		3re	\|- 3 e. RR
168		4re	\|- 4 e. RR
169	167 168 76	redivcli	\|- ( 3 / 4 ) e. RR
170	169 48 72	redivcli	\|- ( ( 3 / 4 ) / ( sqrt ` 2 ) ) e. RR
171		9re	\|- 9 e. RR
172	171 168 76	redivcli	\|- ( 9 / 4 ) e. RR
173		5re	\|- 5 e. RR
174	97	nnrei	\|- ( 2 ^ 5 ) e. RR
175	173 174 114	redivcli	\|- ( 5 / ( 2 ^ 5 ) ) e. RR
176	172 175	remulcli	\|- ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) e. RR
177	170 176	readdcli	\|- ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) e. RR
178	13 40	rereccli	\|- ( 1 / 8 ) e. RR
179	178 48 72	redivcli	\|- ( ( 1 / 8 ) / ( sqrt ` 2 ) ) e. RR
180	177 179	readdcli	\|- ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) e. RR
181	180 38	remulcli	\|- ( ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) x. ( log ` 2 ) ) e. RR
182	166 181	eqeltri	\|- ( F ` ; 6 4 ) e. RR
183	129 130 161	add32i	\|- ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) = ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) )
184		6cn	\|- 6 e. CC
185		ax-1cn	\|- 1 e. CC
186	184 185 7 40	divdiri	\|- ( ( 6 + 1 ) / 8 ) = ( ( 6 / 8 ) + ( 1 / 8 ) )
187		df-7	\|- 7 = ( 6 + 1 )
188	187	oveq1i	\|- ( 7 / 8 ) = ( ( 6 + 1 ) / 8 )
189		divcan5	\|- ( ( 3 e. CC /\ ( 4 e. CC /\ 4 =/= 0 ) /\ ( 2 e. CC /\ 2 =/= 0 ) ) -> ( ( 2 x. 3 ) / ( 2 x. 4 ) ) = ( 3 / 4 ) )
190	34 189	mp3an1	\|- ( ( ( 4 e. CC /\ 4 =/= 0 ) /\ ( 2 e. CC /\ 2 =/= 0 ) ) -> ( ( 2 x. 3 ) / ( 2 x. 4 ) ) = ( 3 / 4 ) )
191	52 76 90 99 190	mp4an	\|- ( ( 2 x. 3 ) / ( 2 x. 4 ) ) = ( 3 / 4 )
192		3t2e6	\|- ( 3 x. 2 ) = 6
193	34 90 192	mulcomli	\|- ( 2 x. 3 ) = 6
194	52 90 59	mulcomli	\|- ( 2 x. 4 ) = 8
195	193 194	oveq12i	\|- ( ( 2 x. 3 ) / ( 2 x. 4 ) ) = ( 6 / 8 )
196	191 195	eqtr3i	\|- ( 3 / 4 ) = ( 6 / 8 )
197	196	oveq1i	\|- ( ( 3 / 4 ) + ( 1 / 8 ) ) = ( ( 6 / 8 ) + ( 1 / 8 ) )
198	186 188 197	3eqtr4ri	\|- ( ( 3 / 4 ) + ( 1 / 8 ) ) = ( 7 / 8 )
199	198	oveq1i	\|- ( ( ( 3 / 4 ) + ( 1 / 8 ) ) / ( sqrt ` 2 ) ) = ( ( 7 / 8 ) / ( sqrt ` 2 ) )
200	128 160 49 72	divdiri	\|- ( ( ( 3 / 4 ) + ( 1 / 8 ) ) / ( sqrt ` 2 ) ) = ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) )
201		7cn	\|- 7 e. CC
202	201 7 49 40 72	divdiv32i	\|- ( ( 7 / 8 ) / ( sqrt ` 2 ) ) = ( ( 7 / ( sqrt ` 2 ) ) / 8 )
203	199 200 202	3eqtr3i	\|- ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) = ( ( 7 / ( sqrt ` 2 ) ) / 8 )
204	203	oveq1i	\|- ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) = ( ( ( 7 / ( sqrt ` 2 ) ) / 8 ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) )
205	183 204	eqtri	\|- ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) = ( ( ( 7 / ( sqrt ` 2 ) ) / 8 ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) )
206		4nn0	\|- 4 e. NN0
207		9nn0	\|- 9 e. NN0
208		0nn0	\|- 0 e. NN0
209		9lt10	\|- 9 < ; 1 0
210		4lt5	\|- 4 < 5
211	206 91 207 208 209 210	decltc	\|- ; 4 9 < ; 5 0
212		7t7e49	\|- ( 7 x. 7 ) = ; 4 9
213	57	oveq1i	\|- ( ( ( sqrt ` 2 ) x. ( sqrt ` 2 ) ) x. ( 5 x. 5 ) ) = ( 2 x. ( 5 x. 5 ) )
214	49 49 113 113	mul4i	\|- ( ( ( sqrt ` 2 ) x. ( sqrt ` 2 ) ) x. ( 5 x. 5 ) ) = ( ( ( sqrt ` 2 ) x. 5 ) x. ( ( sqrt ` 2 ) x. 5 ) )
215		5t2e10	\|- ( 5 x. 2 ) = ; 1 0
216	113 90 215	mulcomli	\|- ( 2 x. 5 ) = ; 1 0
217	216	oveq1i	\|- ( ( 2 x. 5 ) x. 5 ) = ( ; 1 0 x. 5 )
218	90 113 113	mulassi	\|- ( ( 2 x. 5 ) x. 5 ) = ( 2 x. ( 5 x. 5 ) )
219	91	dec0u	\|- ( ; 1 0 x. 5 ) = ; 5 0
220	217 218 219	3eqtr3i	\|- ( 2 x. ( 5 x. 5 ) ) = ; 5 0
221	213 214 220	3eqtr3i	\|- ( ( ( sqrt ` 2 ) x. 5 ) x. ( ( sqrt ` 2 ) x. 5 ) ) = ; 5 0
222	211 212 221	3brtr4i	\|- ( 7 x. 7 ) < ( ( ( sqrt ` 2 ) x. 5 ) x. ( ( sqrt ` 2 ) x. 5 ) )
223		7re	\|- 7 e. RR
224		7pos	\|- 0 < 7
225	12 223 224	ltleii	\|- 0 <_ 7
226		nnrp	\|- ( 5 e. NN -> 5 e. RR+ )
227	106 226	ax-mp	\|- 5 e. RR+
228		rpmulcl	\|- ( ( ( sqrt ` 2 ) e. RR+ /\ 5 e. RR+ ) -> ( ( sqrt ` 2 ) x. 5 ) e. RR+ )
229	66 227 228	mp2an	\|- ( ( sqrt ` 2 ) x. 5 ) e. RR+
230		rpge0	\|- ( ( ( sqrt ` 2 ) x. 5 ) e. RR+ -> 0 <_ ( ( sqrt ` 2 ) x. 5 ) )
231	229 230	ax-mp	\|- 0 <_ ( ( sqrt ` 2 ) x. 5 )
232		rpre	\|- ( ( ( sqrt ` 2 ) x. 5 ) e. RR+ -> ( ( sqrt ` 2 ) x. 5 ) e. RR )
233	229 232	ax-mp	\|- ( ( sqrt ` 2 ) x. 5 ) e. RR
234	223 233	lt2msqi	\|- ( ( 0 <_ 7 /\ 0 <_ ( ( sqrt ` 2 ) x. 5 ) ) -> ( 7 < ( ( sqrt ` 2 ) x. 5 ) <-> ( 7 x. 7 ) < ( ( ( sqrt ` 2 ) x. 5 ) x. ( ( sqrt ` 2 ) x. 5 ) ) ) )
235	225 231 234	mp2an	\|- ( 7 < ( ( sqrt ` 2 ) x. 5 ) <-> ( 7 x. 7 ) < ( ( ( sqrt ` 2 ) x. 5 ) x. ( ( sqrt ` 2 ) x. 5 ) ) )
236	222 235	mpbir	\|- 7 < ( ( sqrt ` 2 ) x. 5 )
237		rpgt0	\|- ( ( sqrt ` 2 ) e. RR+ -> 0 < ( sqrt ` 2 ) )
238	26 65 237	mp2b	\|- 0 < ( sqrt ` 2 )
239		ltdivmul	\|- ( ( 7 e. RR /\ 5 e. RR /\ ( ( sqrt ` 2 ) e. RR /\ 0 < ( sqrt ` 2 ) ) ) -> ( ( 7 / ( sqrt ` 2 ) ) < 5 <-> 7 < ( ( sqrt ` 2 ) x. 5 ) ) )
240	223 173 239	mp3an12	\|- ( ( ( sqrt ` 2 ) e. RR /\ 0 < ( sqrt ` 2 ) ) -> ( ( 7 / ( sqrt ` 2 ) ) < 5 <-> 7 < ( ( sqrt ` 2 ) x. 5 ) ) )
241	48 238 240	mp2an	\|- ( ( 7 / ( sqrt ` 2 ) ) < 5 <-> 7 < ( ( sqrt ` 2 ) x. 5 ) )
242	236 241	mpbir	\|- ( 7 / ( sqrt ` 2 ) ) < 5
243	223 48 72	redivcli	\|- ( 7 / ( sqrt ` 2 ) ) e. RR
244	243 173 13 14	ltdiv1ii	\|- ( ( 7 / ( sqrt ` 2 ) ) < 5 <-> ( ( 7 / ( sqrt ` 2 ) ) / 8 ) < ( 5 / 8 ) )
245	242 244	mpbi	\|- ( ( 7 / ( sqrt ` 2 ) ) / 8 ) < ( 5 / 8 )
246		divsubdir	\|- ( ( 8 e. CC /\ 3 e. CC /\ ( 8 e. CC /\ 8 =/= 0 ) ) -> ( ( 8 - 3 ) / 8 ) = ( ( 8 / 8 ) - ( 3 / 8 ) ) )
247	7 34 246	mp3an12	\|- ( ( 8 e. CC /\ 8 =/= 0 ) -> ( ( 8 - 3 ) / 8 ) = ( ( 8 / 8 ) - ( 3 / 8 ) ) )
248	7 40 247	mp2an	\|- ( ( 8 - 3 ) / 8 ) = ( ( 8 / 8 ) - ( 3 / 8 ) )
249		5p3e8	\|- ( 5 + 3 ) = 8
250	249	oveq1i	\|- ( ( 5 + 3 ) - 3 ) = ( 8 - 3 )
251	113 34	pncan3oi	\|- ( ( 5 + 3 ) - 3 ) = 5
252	250 251	eqtr3i	\|- ( 8 - 3 ) = 5
253	252	oveq1i	\|- ( ( 8 - 3 ) / 8 ) = ( 5 / 8 )
254	7 40	dividi	\|- ( 8 / 8 ) = 1
255	254	oveq1i	\|- ( ( 8 / 8 ) - ( 3 / 8 ) ) = ( 1 - ( 3 / 8 ) )
256	248 253 255	3eqtr3ri	\|- ( 1 - ( 3 / 8 ) ) = ( 5 / 8 )
257		5lt8	\|- 5 < 8
258	13 173	remulcli	\|- ( 8 x. 5 ) e. RR
259	173 13 258	ltadd2i	\|- ( 5 < 8 <-> ( ( 8 x. 5 ) + 5 ) < ( ( 8 x. 5 ) + 8 ) )
260	257 259	mpbi	\|- ( ( 8 x. 5 ) + 5 ) < ( ( 8 x. 5 ) + 8 )
261		df-9	\|- 9 = ( 8 + 1 )
262	261	oveq1i	\|- ( 9 x. 5 ) = ( ( 8 + 1 ) x. 5 )
263	7 185 113	adddiri	\|- ( ( 8 + 1 ) x. 5 ) = ( ( 8 x. 5 ) + ( 1 x. 5 ) )
264	113	mullidi	\|- ( 1 x. 5 ) = 5
265	264	oveq2i	\|- ( ( 8 x. 5 ) + ( 1 x. 5 ) ) = ( ( 8 x. 5 ) + 5 )
266	262 263 265	3eqtri	\|- ( 9 x. 5 ) = ( ( 8 x. 5 ) + 5 )
267	87	oveq2i	\|- ( 8 x. 6 ) = ( 8 x. ( 5 + 1 ) )
268	7 113 185	adddii	\|- ( 8 x. ( 5 + 1 ) ) = ( ( 8 x. 5 ) + ( 8 x. 1 ) )
269	7	mulridi	\|- ( 8 x. 1 ) = 8
270	269	oveq2i	\|- ( ( 8 x. 5 ) + ( 8 x. 1 ) ) = ( ( 8 x. 5 ) + 8 )
271	267 268 270	3eqtri	\|- ( 8 x. 6 ) = ( ( 8 x. 5 ) + 8 )
272	260 266 271	3brtr4i	\|- ( 9 x. 5 ) < ( 8 x. 6 )
273	171 173	remulcli	\|- ( 9 x. 5 ) e. RR
274		6re	\|- 6 e. RR
275	13 274	remulcli	\|- ( 8 x. 6 ) e. RR
276	168 174	remulcli	\|- ( 4 x. ( 2 ^ 5 ) ) e. RR
277	4 97	nnmulcli	\|- ( 4 x. ( 2 ^ 5 ) ) e. NN
278	277	nngt0i	\|- 0 < ( 4 x. ( 2 ^ 5 ) )
279	273 275 276 278	ltdiv1ii	\|- ( ( 9 x. 5 ) < ( 8 x. 6 ) <-> ( ( 9 x. 5 ) / ( 4 x. ( 2 ^ 5 ) ) ) < ( ( 8 x. 6 ) / ( 4 x. ( 2 ^ 5 ) ) ) )
280	272 279	mpbi	\|- ( ( 9 x. 5 ) / ( 4 x. ( 2 ^ 5 ) ) ) < ( ( 8 x. 6 ) / ( 4 x. ( 2 ^ 5 ) ) )
281	122 52 113 98 76 114	divmuldivi	\|- ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) = ( ( 9 x. 5 ) / ( 4 x. ( 2 ^ 5 ) ) )
282		nnexpcl	\|- ( ( 2 e. NN /\ 4 e. NN0 ) -> ( 2 ^ 4 ) e. NN )
283	35 206 282	mp2an	\|- ( 2 ^ 4 ) e. NN
284	283	nncni	\|- ( 2 ^ 4 ) e. CC
285	283	nnne0i	\|- ( 2 ^ 4 ) =/= 0
286		divcan5	\|- ( ( 3 e. CC /\ ( 8 e. CC /\ 8 =/= 0 ) /\ ( ( 2 ^ 4 ) e. CC /\ ( 2 ^ 4 ) =/= 0 ) ) -> ( ( ( 2 ^ 4 ) x. 3 ) / ( ( 2 ^ 4 ) x. 8 ) ) = ( 3 / 8 ) )
287	34 286	mp3an1	\|- ( ( ( 8 e. CC /\ 8 =/= 0 ) /\ ( ( 2 ^ 4 ) e. CC /\ ( 2 ^ 4 ) =/= 0 ) ) -> ( ( ( 2 ^ 4 ) x. 3 ) / ( ( 2 ^ 4 ) x. 8 ) ) = ( 3 / 8 ) )
288	7 40 284 285 287	mp4an	\|- ( ( ( 2 ^ 4 ) x. 3 ) / ( ( 2 ^ 4 ) x. 8 ) ) = ( 3 / 8 )
289		df-4	\|- 4 = ( 3 + 1 )
290	289	oveq2i	\|- ( 2 ^ 4 ) = ( 2 ^ ( 3 + 1 ) )
291		3nn0	\|- 3 e. NN0
292		expp1	\|- ( ( 2 e. CC /\ 3 e. NN0 ) -> ( 2 ^ ( 3 + 1 ) ) = ( ( 2 ^ 3 ) x. 2 ) )
293	90 291 292	mp2an	\|- ( 2 ^ ( 3 + 1 ) ) = ( ( 2 ^ 3 ) x. 2 )
294	24	oveq1i	\|- ( ( 2 ^ 3 ) x. 2 ) = ( 8 x. 2 )
295	290 293 294	3eqtri	\|- ( 2 ^ 4 ) = ( 8 x. 2 )
296	295	oveq1i	\|- ( ( 2 ^ 4 ) x. 3 ) = ( ( 8 x. 2 ) x. 3 )
297	7 90 34	mulassi	\|- ( ( 8 x. 2 ) x. 3 ) = ( 8 x. ( 2 x. 3 ) )
298	193	oveq2i	\|- ( 8 x. ( 2 x. 3 ) ) = ( 8 x. 6 )
299	296 297 298	3eqtri	\|- ( ( 2 ^ 4 ) x. 3 ) = ( 8 x. 6 )
300		4p3e7	\|- ( 4 + 3 ) = 7
301		5p2e7	\|- ( 5 + 2 ) = 7
302	113 90	addcomi	\|- ( 5 + 2 ) = ( 2 + 5 )
303	300 301 302	3eqtr2i	\|- ( 4 + 3 ) = ( 2 + 5 )
304	303	oveq2i	\|- ( 2 ^ ( 4 + 3 ) ) = ( 2 ^ ( 2 + 5 ) )
305		expadd	\|- ( ( 2 e. CC /\ 4 e. NN0 /\ 3 e. NN0 ) -> ( 2 ^ ( 4 + 3 ) ) = ( ( 2 ^ 4 ) x. ( 2 ^ 3 ) ) )
306	90 206 291 305	mp3an	\|- ( 2 ^ ( 4 + 3 ) ) = ( ( 2 ^ 4 ) x. ( 2 ^ 3 ) )
307		2nn0	\|- 2 e. NN0
308		expadd	\|- ( ( 2 e. CC /\ 2 e. NN0 /\ 5 e. NN0 ) -> ( 2 ^ ( 2 + 5 ) ) = ( ( 2 ^ 2 ) x. ( 2 ^ 5 ) ) )
309	90 307 91 308	mp3an	\|- ( 2 ^ ( 2 + 5 ) ) = ( ( 2 ^ 2 ) x. ( 2 ^ 5 ) )
310	304 306 309	3eqtr3i	\|- ( ( 2 ^ 4 ) x. ( 2 ^ 3 ) ) = ( ( 2 ^ 2 ) x. ( 2 ^ 5 ) )
311	24	oveq2i	\|- ( ( 2 ^ 4 ) x. ( 2 ^ 3 ) ) = ( ( 2 ^ 4 ) x. 8 )
312		sq2	\|- ( 2 ^ 2 ) = 4
313	312	oveq1i	\|- ( ( 2 ^ 2 ) x. ( 2 ^ 5 ) ) = ( 4 x. ( 2 ^ 5 ) )
314	310 311 313	3eqtr3i	\|- ( ( 2 ^ 4 ) x. 8 ) = ( 4 x. ( 2 ^ 5 ) )
315	299 314	oveq12i	\|- ( ( ( 2 ^ 4 ) x. 3 ) / ( ( 2 ^ 4 ) x. 8 ) ) = ( ( 8 x. 6 ) / ( 4 x. ( 2 ^ 5 ) ) )
316	288 315	eqtr3i	\|- ( 3 / 8 ) = ( ( 8 x. 6 ) / ( 4 x. ( 2 ^ 5 ) ) )
317	280 281 316	3brtr4i	\|- ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) < ( 3 / 8 )
318	167 13 40	redivcli	\|- ( 3 / 8 ) e. RR
319		1re	\|- 1 e. RR
320		ltsub2	\|- ( ( ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) e. RR /\ ( 3 / 8 ) e. RR /\ 1 e. RR ) -> ( ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) < ( 3 / 8 ) <-> ( 1 - ( 3 / 8 ) ) < ( 1 - ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) ) )
321	176 318 319 320	mp3an	\|- ( ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) < ( 3 / 8 ) <-> ( 1 - ( 3 / 8 ) ) < ( 1 - ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) )
322	317 321	mpbi	\|- ( 1 - ( 3 / 8 ) ) < ( 1 - ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) )
323	256 322	eqbrtrri	\|- ( 5 / 8 ) < ( 1 - ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) )
324	243 13 40	redivcli	\|- ( ( 7 / ( sqrt ` 2 ) ) / 8 ) e. RR
325	173 13 40	redivcli	\|- ( 5 / 8 ) e. RR
326	319 176	resubcli	\|- ( 1 - ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) e. RR
327	324 325 326	lttri	\|- ( ( ( ( 7 / ( sqrt ` 2 ) ) / 8 ) < ( 5 / 8 ) /\ ( 5 / 8 ) < ( 1 - ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) ) -> ( ( 7 / ( sqrt ` 2 ) ) / 8 ) < ( 1 - ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) )
328	245 323 327	mp2an	\|- ( ( 7 / ( sqrt ` 2 ) ) / 8 ) < ( 1 - ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) )
329	324 176 319	ltaddsubi	\|- ( ( ( ( 7 / ( sqrt ` 2 ) ) / 8 ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) < 1 <-> ( ( 7 / ( sqrt ` 2 ) ) / 8 ) < ( 1 - ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) )
330	328 329	mpbir	\|- ( ( ( 7 / ( sqrt ` 2 ) ) / 8 ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) < 1
331	205 330	eqbrtri	\|- ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) < 1
332		1lt2	\|- 1 < 2
333		rplogcl	\|- ( ( 2 e. RR /\ 1 < 2 ) -> ( log ` 2 ) e. RR+ )
334	54 332 333	mp2an	\|- ( log ` 2 ) e. RR+
335		rpgt0	\|- ( ( log ` 2 ) e. RR+ -> 0 < ( log ` 2 ) )
336	334 335	ax-mp	\|- 0 < ( log ` 2 )
337	180 319 38 336	ltmul1ii	\|- ( ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) < 1 <-> ( ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) x. ( log ` 2 ) ) < ( 1 x. ( log ` 2 ) ) )
338	331 337	mpbi	\|- ( ( ( ( ( 3 / 4 ) / ( sqrt ` 2 ) ) + ( ( 9 / 4 ) x. ( 5 / ( 2 ^ 5 ) ) ) ) + ( ( 1 / 8 ) / ( sqrt ` 2 ) ) ) x. ( log ` 2 ) ) < ( 1 x. ( log ` 2 ) )
339	39	mullidi	\|- ( 1 x. ( log ` 2 ) ) = ( log ` 2 )
340	339	eqcomi	\|- ( log ` 2 ) = ( 1 x. ( log ` 2 ) )
341	338 166 340	3brtr4i	\|- ( F ` ; 6 4 ) < ( log ` 2 )
342	182 341	pm3.2i	\|- ( ( F ` ; 6 4 ) e. RR /\ ( F ` ; 6 4 ) < ( log ` 2 ) )

Metamath Proof Explorer

Theorem bposlem8

Proof