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| Mirrors > Home > ILE Home > Th. List > 3bitr4g | Unicode version | ||
| Description: More general version of 3bitr4i 212. Useful for converting definitions in a formula. (Contributed by NM, 5-Aug-1993.) |
| Ref | Expression |
|---|---|
| 3bitr4g.1 |
     
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| 3bitr4g.2 |
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| 3bitr4g.3 |
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| Ref | Expression |
|---|---|
| 3bitr4g |
|
| Step | Hyp | Ref | Expression |
|---|---|---|---|
| 1 | 3bitr4g.2 |
. . 3
| |
| 2 | 3bitr4g.1 |
. . 3
| |
| 3 | 1, 2 | bitrid 192 |
. 2
|
| 4 | 3bitr4g.3 |
. 2
| |
| 5 | 3, 4 | bitr4di 198 |
1
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| Colors of variables: wff set class |
| Syntax hints: wi 4
wb 105 |
| This theorem was proved from axioms: ax-mp 5 ax-1 6 ax-2 7 ax-ia1 106 ax-ia2 107 ax-ia3 108 |
| This theorem depends on definitions: df-bi 117 |
| This theorem is referenced by: bibi1d 233 pm5.32rd 451 orbi1d 793 stbid 834 dcbid 840 pm4.14dc 892 orbididc 956 3orbi123d 1324 3anbi123d 1325 xorbi2d 1400 xorbi1d 1401 nfbidf 1563 drnf1 1757 drnf2 1758 drsb1 1823 sbal2 2049 eubidh 2061 eubid 2062 mobidh 2089 mobid 2090 eqeq1 2213 eqeq2 2216 eleq1w 2267 eleq2w 2268 eleq1 2269 eleq2 2270 cbvabw 2329 eqabdv 2335 nfceqdf 2348 drnfc1 2366 drnfc2 2367 neeq1 2390 neeq2 2391 neleq1 2476 neleq2 2477 dfrex2dc 2498 ralbida 2501 rexbida 2502 ralbidv2 2509 rexbidv2 2510 ralbid2 2511 rexbid2 2512 r19.21t 2582 r19.23t 2614 reubida 2689 rmobida 2694 raleqf 2699 rexeqf 2700 reueq1f 2701 rmoeq1f 2702 cbvraldva2 2746 cbvrexdva2 2747 dfsbcq 3004 sbceqbid 3009 sbcbi2 3053 sbcbid 3060 eqsbc2 3063 sbcabel 3084 sbnfc2 3158 ssconb 3310 uneq1 3324 ineq1 3371 difin2 3439 reuun2 3460 reldisj 3516 undif4 3527 disjssun 3528 sbcssg 3573 eltpg 3683 raltpg 3691 rextpg 3692 r19.12sn 3704 opeq1 3825 opeq2 3826 intmin4 3919 dfiun2g 3965 iindif2m 4001 iinin2m 4002 breq 4053 breq1 4054 breq2 4055 treq 4156 opthg2 4291 poeq1 4354 soeq1 4370 frforeq1 4398 freq1 4399 frforeq2 4400 freq2 4401 frforeq3 4402 weeq1 4411 weeq2 4412 ordeq 4427 limeq 4432 rabxfrd 4524 iunpw 4535 opthprc 4734 releq 4765 sbcrel 4769 eqrel 4772 eqrelrel 4784 xpiindim 4823 brcnvg 4867 brresg 4976 resieq 4978 xpcanm 5131 xpcan2m 5132 dmsnopg 5163 dfco2a 5192 cnvpom 5234 cnvsom 5235 iotaeq 5249 sniota 5271 sbcfung 5304 fneq1 5371 fneq2 5372 feq1 5418 feq2 5419 feq3 5420 sbcfng 5433 sbcfg 5434 f1eq1 5488 f1eq2 5489 f1eq3 5490 foeq1 5506 foeq2 5507 foeq3 5508 f1oeq1 5522 f1oeq2 5523 f1oeq3 5524 fun11iun 5555 mpteqb 5683 dffo3 5740 fmptco 5759 dff13 5850 f1imaeq 5857 f1eqcocnv 5873 fliftcnv 5877 isoeq1 5883 isoeq2 5884 isoeq3 5885 isoeq4 5886 isoeq5 5887 isocnv2 5894 acexmid 5956 fnotovb 6001 mpoeq123 6017 ottposg 6354 dmtpos 6355 smoeq 6389 nnacan 6611 nnmcan 6618 ereq1 6640 ereq2 6641 elecg 6673 ereldm 6678 ixpiinm 6824 enfi 6985 elfi2 7089 fipwssg 7096 ctssdccl 7228 tapeq1 7384 tapeq2 7385 creur 9052 eqreznegel 9755 ltxr 9917 icoshftf1o 10133 elfzm11 10233 elfzomelpfzo 10382 nn0ennn 10600 nnesq 10826 rexfiuz 11375 cau4 11502 sumeq2 11745 fisumcom2 11824 fprodcom2fi 12012 dvdsflip 12237 bitsmod 12342 bitscmp 12344 divgcdcoprm0 12498 hashdvds 12618 4sqlem12 12800 imasaddfnlemg 13221 issgrpv 13311 issgrpn0 13312 mndpropd 13347 ismhm 13368 mhmpropd 13373 issubm2 13380 grppropd 13424 grpinvcnv 13475 conjghm 13687 conjnmzb 13691 ghmpropd 13694 cmnpropd 13706 ablpropd 13707 eqgabl 13741 rngpropd 13792 issrg 13802 ringpropd 13875 crngpropd 13876 opprnzrbg 14022 subrngpropd 14053 resrhm2b 14086 subrgpropd 14090 rhmpropd 14091 opprdomnbg 14111 lmodprop2d 14185 islssm 14194 islssmg 14195 lsspropdg 14268 df2idl2rng 14345 tpspropd 14583 tgss2 14626 lmbr2 14761 txcnmpt 14820 txhmeo 14866 blininf 14971 blres 14981 xmeterval 14982 xmspropd 15024 mspropd 15025 metequiv 15042 xmetxpbl 15055 limcdifap 15209 lgsquadlem1 15629 lgsquadlem2 15630 cbvrald 15863 bj-indeq 16003 |
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