quartlem2

Description: Closure lemmas for quart . (Contributed by Mario Carneiro, 7-May-2015)

	Ref	Expression
Hypotheses	quart.a	\|- ( ph -> A e. CC )
	quart.b	\|- ( ph -> B e. CC )
	quart.c	\|- ( ph -> C e. CC )
	quart.d	\|- ( ph -> D e. CC )
	quart.x	\|- ( ph -> X e. CC )
	quart.e	\|- ( ph -> E = -u ( A / 4 ) )
	quart.p	\|- ( ph -> P = ( B - ( ( 3 / 8 ) x. ( A ^ 2 ) ) ) )
	quart.q	\|- ( ph -> Q = ( ( C - ( ( A x. B ) / 2 ) ) + ( ( A ^ 3 ) / 8 ) ) )
	quart.r	\|- ( ph -> R = ( ( D - ( ( C x. A ) / 4 ) ) + ( ( ( ( A ^ 2 ) x. B ) / ; 1 6 ) - ( ( 3 / ; ; 2 5 6 ) x. ( A ^ 4 ) ) ) ) )
	quart.u	\|- ( ph -> U = ( ( P ^ 2 ) + ( ; 1 2 x. R ) ) )
	quart.v	\|- ( ph -> V = ( ( -u ( 2 x. ( P ^ 3 ) ) - ( ; 2 7 x. ( Q ^ 2 ) ) ) + ( ; 7 2 x. ( P x. R ) ) ) )
	quart.w	\|- ( ph -> W = ( sqrt ` ( ( V ^ 2 ) - ( 4 x. ( U ^ 3 ) ) ) ) )
Assertion	quartlem2	\|- ( ph -> ( U e. CC /\ V e. CC /\ W e. CC ) )

Proof

Step	Hyp	Ref	Expression
1		quart.a	\|- ( ph -> A e. CC )
2		quart.b	\|- ( ph -> B e. CC )
3		quart.c	\|- ( ph -> C e. CC )
4		quart.d	\|- ( ph -> D e. CC )
5		quart.x	\|- ( ph -> X e. CC )
6		quart.e	\|- ( ph -> E = -u ( A / 4 ) )
7		quart.p	\|- ( ph -> P = ( B - ( ( 3 / 8 ) x. ( A ^ 2 ) ) ) )
8		quart.q	\|- ( ph -> Q = ( ( C - ( ( A x. B ) / 2 ) ) + ( ( A ^ 3 ) / 8 ) ) )
9		quart.r	\|- ( ph -> R = ( ( D - ( ( C x. A ) / 4 ) ) + ( ( ( ( A ^ 2 ) x. B ) / ; 1 6 ) - ( ( 3 / ; ; 2 5 6 ) x. ( A ^ 4 ) ) ) ) )
10		quart.u	\|- ( ph -> U = ( ( P ^ 2 ) + ( ; 1 2 x. R ) ) )
11		quart.v	\|- ( ph -> V = ( ( -u ( 2 x. ( P ^ 3 ) ) - ( ; 2 7 x. ( Q ^ 2 ) ) ) + ( ; 7 2 x. ( P x. R ) ) ) )
12		quart.w	\|- ( ph -> W = ( sqrt ` ( ( V ^ 2 ) - ( 4 x. ( U ^ 3 ) ) ) ) )
13	1 2 3 4 7 8 9	quart1cl	\|- ( ph -> ( P e. CC /\ Q e. CC /\ R e. CC ) )
14	13	simp1d	\|- ( ph -> P e. CC )
15	14	sqcld	\|- ( ph -> ( P ^ 2 ) e. CC )
16		1nn0	\|- 1 e. NN0
17		2nn	\|- 2 e. NN
18	16 17	decnncl	\|- ; 1 2 e. NN
19	18	nncni	\|- ; 1 2 e. CC
20	13	simp3d	\|- ( ph -> R e. CC )
21		mulcl	\|- ( ( ; 1 2 e. CC /\ R e. CC ) -> ( ; 1 2 x. R ) e. CC )
22	19 20 21	sylancr	\|- ( ph -> ( ; 1 2 x. R ) e. CC )
23	15 22	addcld	\|- ( ph -> ( ( P ^ 2 ) + ( ; 1 2 x. R ) ) e. CC )
24	10 23	eqeltrd	\|- ( ph -> U e. CC )
25		2cn	\|- 2 e. CC
26		3nn0	\|- 3 e. NN0
27		expcl	\|- ( ( P e. CC /\ 3 e. NN0 ) -> ( P ^ 3 ) e. CC )
28	14 26 27	sylancl	\|- ( ph -> ( P ^ 3 ) e. CC )
29		mulcl	\|- ( ( 2 e. CC /\ ( P ^ 3 ) e. CC ) -> ( 2 x. ( P ^ 3 ) ) e. CC )
30	25 28 29	sylancr	\|- ( ph -> ( 2 x. ( P ^ 3 ) ) e. CC )
31	30	negcld	\|- ( ph -> -u ( 2 x. ( P ^ 3 ) ) e. CC )
32		2nn0	\|- 2 e. NN0
33		7nn	\|- 7 e. NN
34	32 33	decnncl	\|- ; 2 7 e. NN
35	34	nncni	\|- ; 2 7 e. CC
36	13	simp2d	\|- ( ph -> Q e. CC )
37	36	sqcld	\|- ( ph -> ( Q ^ 2 ) e. CC )
38		mulcl	\|- ( ( ; 2 7 e. CC /\ ( Q ^ 2 ) e. CC ) -> ( ; 2 7 x. ( Q ^ 2 ) ) e. CC )
39	35 37 38	sylancr	\|- ( ph -> ( ; 2 7 x. ( Q ^ 2 ) ) e. CC )
40	31 39	subcld	\|- ( ph -> ( -u ( 2 x. ( P ^ 3 ) ) - ( ; 2 7 x. ( Q ^ 2 ) ) ) e. CC )
41		7nn0	\|- 7 e. NN0
42	41 17	decnncl	\|- ; 7 2 e. NN
43	42	nncni	\|- ; 7 2 e. CC
44	14 20	mulcld	\|- ( ph -> ( P x. R ) e. CC )
45		mulcl	\|- ( ( ; 7 2 e. CC /\ ( P x. R ) e. CC ) -> ( ; 7 2 x. ( P x. R ) ) e. CC )
46	43 44 45	sylancr	\|- ( ph -> ( ; 7 2 x. ( P x. R ) ) e. CC )
47	40 46	addcld	\|- ( ph -> ( ( -u ( 2 x. ( P ^ 3 ) ) - ( ; 2 7 x. ( Q ^ 2 ) ) ) + ( ; 7 2 x. ( P x. R ) ) ) e. CC )
48	11 47	eqeltrd	\|- ( ph -> V e. CC )
49	48	sqcld	\|- ( ph -> ( V ^ 2 ) e. CC )
50		4cn	\|- 4 e. CC
51		expcl	\|- ( ( U e. CC /\ 3 e. NN0 ) -> ( U ^ 3 ) e. CC )
52	24 26 51	sylancl	\|- ( ph -> ( U ^ 3 ) e. CC )
53		mulcl	\|- ( ( 4 e. CC /\ ( U ^ 3 ) e. CC ) -> ( 4 x. ( U ^ 3 ) ) e. CC )
54	50 52 53	sylancr	\|- ( ph -> ( 4 x. ( U ^ 3 ) ) e. CC )
55	49 54	subcld	\|- ( ph -> ( ( V ^ 2 ) - ( 4 x. ( U ^ 3 ) ) ) e. CC )
56	55	sqrtcld	\|- ( ph -> ( sqrt ` ( ( V ^ 2 ) - ( 4 x. ( U ^ 3 ) ) ) ) e. CC )
57	12 56	eqeltrd	\|- ( ph -> W e. CC )
58	24 48 57	3jca	\|- ( ph -> ( U e. CC /\ V e. CC /\ W e. CC ) )

Metamath Proof Explorer

Theorem quartlem2

Proof