ltmuldivt - Metamath Proof Explorer

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Theorem ltmuldivt 5825

Description: 'Less than' relationship between division and multiplication.

**Assertion**
Ref	Expression
ltmuldivt	⊢ (((A ∈ ℝ ⋀ B ∈ ℝ ⋀ C ∈ ℝ) ⋀ 0 < B) → ((A · B) < C ↔ A < (C / B)))

**Proof of Theorem ltmuldivt**
Step	Hyp	Ref	Expression
1		opreq1 3959	. . . . . 6 ⊢ (A = if(A ∈ ℝ, A, 0) → (A · B) = ( if(A ∈ ℝ, A, 0) · B))
2	1	breq1d 2624	. . . . 5 ⊢ (A = if(A ∈ ℝ, A, 0) → ((A · B) < C ↔ ( if(A ∈ ℝ, A, 0) · B) < C))
3		breq1 2617	. . . . 5 ⊢ (A = if(A ∈ ℝ, A, 0) → (A < (C / B) ↔ if(A ∈ ℝ, A, 0) < (C / B)))
4	2, 3	bibi12d 628	. . . 4 ⊢ (A = if(A ∈ ℝ, A, 0) → (((A · B) < C ↔ A < (C / B)) ↔ (( if(A ∈ ℝ, A, 0) · B) < C ↔ if(A ∈ ℝ, A, 0) < (C / B))))
5	4	imbi2d 611	. . 3 ⊢ (A = if(A ∈ ℝ, A, 0) → ((0 < B → ((A · B) < C ↔ A < (C / B))) ↔ (0 < B → (( if(A ∈ ℝ, A, 0) · B) < C ↔ if(A ∈ ℝ, A, 0) < (C / B)))))
6		breq2 2618	. . . 4 ⊢ (B = if(B ∈ ℝ, B, 0) → (0 < B ↔ 0 < if(B ∈ ℝ, B, 0)))
7		opreq2 3960	. . . . . 6 ⊢ (B = if(B ∈ ℝ, B, 0) → ( if(A ∈ ℝ, A, 0) · B) = ( if(A ∈ ℝ, A, 0) · if(B ∈ ℝ, B, 0)))
8	7	breq1d 2624	. . . . 5 ⊢ (B = if(B ∈ ℝ, B, 0) → (( if(A ∈ ℝ, A, 0) · B) < C ↔ ( if(A ∈ ℝ, A, 0) · if(B ∈ ℝ, B, 0)) < C))
9		opreq2 3960	. . . . . 6 ⊢ (B = if(B ∈ ℝ, B, 0) → (C / B) = (C / if(B ∈ ℝ, B, 0)))
10	9	breq2d 2625	. . . . 5 ⊢ (B = if(B ∈ ℝ, B, 0) → ( if(A ∈ ℝ, A, 0) < (C / B) ↔ if(A ∈ ℝ, A, 0) < (C / if(B ∈ ℝ, B, 0))))
11	8, 10	bibi12d 628	. . . 4 ⊢ (B = if(B ∈ ℝ, B, 0) → ((( if(A ∈ ℝ, A, 0) · B) < C ↔ if(A ∈ ℝ, A, 0) < (C / B)) ↔ (( if(A ∈ ℝ, A, 0) · if(B ∈ ℝ, B, 0)) < C ↔ if(A ∈ ℝ, A, 0) < (C / if(B ∈ ℝ, B, 0)))))
12	6, 11	imbi12d 625	. . 3 ⊢ (B = if(B ∈ ℝ, B, 0) → ((0 < B → (( if(A ∈ ℝ, A, 0) · B) < C ↔ if(A ∈ ℝ, A, 0) < (C / B))) ↔ (0 < if(B ∈ ℝ, B, 0) → (( if(A ∈ ℝ, A, 0) · if(B ∈ ℝ, B, 0)) < C ↔ if(A ∈ ℝ, A, 0) < (C / if(B ∈ ℝ, B, 0))))))
13		breq2 2618	. . . . 5 ⊢ (C = if(C ∈ ℝ, C, 0) → (( if(A ∈ ℝ, A, 0) · if(B ∈ ℝ, B, 0)) < C ↔ ( if(A ∈ ℝ, A, 0) · if(B ∈ ℝ, B, 0)) < if(C ∈ ℝ, C, 0)))
14		opreq1 3959	. . . . . 6 ⊢ (C = if(C ∈ ℝ, C, 0) → (C / if(B ∈ ℝ, B, 0)) = ( if(C ∈ ℝ, C, 0) / if(B ∈ ℝ, B, 0)))
15	14	breq2d 2625	. . . . 5 ⊢ (C = if(C ∈ ℝ, C, 0) → ( if(A ∈ ℝ, A, 0) < (C / if(B ∈ ℝ, B, 0)) ↔ if(A ∈ ℝ, A, 0) < ( if(C ∈ ℝ, C, 0) / if(B ∈ ℝ, B, 0))))
16	13, 15	bibi12d 628	. . . 4 ⊢ (C = if(C ∈ ℝ, C, 0) → ((( if(A ∈ ℝ, A, 0) · if(B ∈ ℝ, B, 0)) < C ↔ if(A ∈ ℝ, A, 0) < (C / if(B ∈ ℝ, B, 0))) ↔ (( if(A ∈ ℝ, A, 0) · if(B ∈ ℝ, B, 0)) < if(C ∈ ℝ, C, 0) ↔ if(A ∈ ℝ, A, 0) < ( if(C ∈ ℝ, C, 0) / if(B ∈ ℝ, B, 0)))))
17	16	imbi2d 611	. . 3 ⊢ (C = if(C ∈ ℝ, C, 0) → ((0 < if(B ∈ ℝ, B, 0) → (( if(A ∈ ℝ, A, 0) · if(B ∈ ℝ, B, 0)) < C ↔ if(A ∈ ℝ, A, 0) < (C / if(B ∈ ℝ, B, 0)))) ↔ (0 < if(B ∈ ℝ, B, 0) → (( if(A ∈ ℝ, A, 0) · if(B ∈ ℝ, B, 0)) < if(C ∈ ℝ, C, 0) ↔ if(A ∈ ℝ, A, 0) < ( if(C ∈ ℝ, C, 0) / if(B ∈ ℝ, B, 0))))))
18		0re 5420	. . . . 5 ⊢ 0 ∈ ℝ
19	18	elimel 2390	. . . 4 ⊢ if(A ∈ ℝ, A, 0) ∈ ℝ
20	18	elimel 2390	. . . 4 ⊢ if(C ∈ ℝ, C, 0) ∈ ℝ
21	18	elimel 2390	. . . 4 ⊢ if(B ∈ ℝ, B, 0) ∈ ℝ
22	19, 20, 21	ltmuldiv 5789	. . 3 ⊢ (0 < if(B ∈ ℝ, B, 0) → (( if(A ∈ ℝ, A, 0) · if(B ∈ ℝ, B, 0)) < if(C ∈ ℝ, C, 0) ↔ if(A ∈ ℝ, A, 0) < ( if(C ∈ ℝ, C, 0) / if(B ∈ ℝ, B, 0))))
23	5, 12, 17, 22	dedth3h 2384	. 2 ⊢ ((A ∈ ℝ ⋀ B ∈ ℝ ⋀ C ∈ ℝ) → (0 < B → ((A · B) < C ↔ A < (C / B))))
24	23	imp 350	1 ⊢ (((A ∈ ℝ ⋀ B ∈ ℝ ⋀ C ∈ ℝ) ⋀ 0 < B) → ((A · B) < C ↔ A < (C / B)))

Colors of variables: wff set class

Syntax hints: → wi 3 ↔ wb 146 ⋀ wa 223 ⋀ w3a 774 = wceq 954 ∈ wcel 956 ifcif 2357 class class class wbr 2614 (class class class)co 3954 ℝcr 5213 0cc0 5214 · cmul 5219 / cdiv 5274 < clt 5466

This theorem is referenced by: ltmuldiv2t 5826 lt2mul2divt 5830 sqr2irr 6667 sm1cnilem 8294 occllem6 9117 msra3 10511

This theorem was proved from axioms: ax-1 4 ax-2 5 ax-3 6 ax-mp 7 ax-7 960 ax-gen 961 ax-8 962 ax-9 963 ax-10 964 ax-11 965 ax-12 966 ax-13 967 ax-14 968 ax-17 969 ax-4 971 ax-5o 973 ax-6o 976 ax-9o 1121 ax-10o 1138 ax-16 1208 ax-11o 1216 ax-ext 1457 ax-rep 2688 ax-sep 2698 ax-nul 2705 ax-pow 2737 ax-pr 2774 ax-un 2861 ax-inf2 4605

This theorem depends on definitions: df-bi 147 df-or 224 df-an 225 df-3or 775 df-3an 776 df-ex 979 df-sb 1170 df-eu 1380 df-mo 1381 df-clab 1462 df-cleq 1467 df-clel 1470 df-ne 1584 df-nel 1585 df-ral 1646 df-rex 1647 df-reu 1648 df-rab 1649 df-v 1808 df-sbc 1938 df-csb 1998 df-dif 2045 df-un 2046 df-in 2047 df-ss 2049 df-pss 2051 df-nul 2277 df-if 2358 df-pw 2398 df-sn 2408 df-pr 2409 df-tp 2411 df-op 2412 df-uni 2499 df-int 2529 df-iun 2563 df-br 2615 df-opab 2662 df-tr 2676 df-eprel 2827 df-id 2830 df-po 2835 df-so 2845 df-fr 2912 df-we 2929 df-ord 2946 df-on 2947 df-lim 2948 df-suc 2949 df-om 3127 df-xp 3179 df-rel 3180 df-cnv 3181 df-co 3182 df-dm 3183 df-rn 3184 df-res 3185 df-ima 3186 df-fun 3187 df-fn 3188 df-f 3189 df-f1 3190 df-fo 3191 df-f1o 3192 df-fv 3193 df-rdg 3923 df-opr 3956 df-oprab 3957 df-1st 4069 df-2nd 4070 df-1o 4123 df-oadd 4125 df-omul 4126 df-er 4251 df-ec 4253 df-qs 4256 df-en 4357 df-dom 4358 df-sdom 4359 df-ni 4980 df-pli 4981 df-mi 4982 df-lti 4983 df-plpq 5015 df-mpq 5016 df-enq 5017 df-nq 5018 df-plq 5019 df-mq 5020 df-rq 5021 df-ltq 5022 df-1q 5023 df-np 5066 df-1p 5067 df-plp 5068 df-mp 5069 df-ltp 5070 df-plpr 5144 df-mpr 5145 df-enr 5146 df-nr 5147 df-plr 5148 df-mr 5149 df-ltr 5150 df-0r 5151 df-1r 5152 df-m1r 5153 df-c 5220 df-0 5221 df-1 5222 df-i 5223 df-r 5224 df-plus 5225 df-mul 5226 df-lt 5227 df-sub 5336 df-neg 5338 df-pnf 5467 df-mnf 5468 df-xr 5469 df-ltxr 5470 df-le 5471 df-div 5680