sstrdi - Metamath Proof Explorer

	Metamath Proof Explorer		< Previous Next > Nearby theorems
Mirrors > Home > MPE Home > Th. List > sstrdi		Structured version Visualization version GIF version

Theorem sstrdi 3995

Description: Subclass transitivity deduction. (Contributed by Jonathan Ben-Naim, 3-Jun-2011.)

**Hypotheses**
Ref	Expression
sstrdi.1	⊢ (𝜑 → 𝐴 ⊆ 𝐵)
sstrdi.2	⊢ 𝐵 ⊆ 𝐶

**Assertion**
Ref	Expression
sstrdi	⊢ (𝜑 → 𝐴 ⊆ 𝐶)

**Proof of Theorem sstrdi**
Step	Hyp	Ref	Expression
1		sstrdi.1	. 2 ⊢ (𝜑 → 𝐴 ⊆ 𝐵)
2		sstrdi.2	. . 3 ⊢ 𝐵 ⊆ 𝐶
3	2	a1i 11	. 2 ⊢ (𝜑 → 𝐵 ⊆ 𝐶)
4	1, 3	sstrd 3993	1 ⊢ (𝜑 → 𝐴 ⊆ 𝐶)

Colors of variables: wff setvar class

Syntax hints: → wi 4 ⊆ wss 3950

This theorem was proved from axioms: ax-mp 5 ax-1 6 ax-2 7 ax-3 8 ax-gen 1794 ax-4 1808

This theorem depends on definitions: df-bi 207 df-an 396 df-ss 3967

This theorem is referenced by: difss2 4137 rintn0 5108 eqbrrdva 5879 ssxpb 6193 resssxp 6289 relfld 6294 funssxp 6763 dff2 7118 dff3 7119 fliftf 7336 1stcof 8045 2ndcof 8046 frxp2 8170 frxp3 8177 frrlem13 8324 nnunifi 9328 elfiun 9471 marypha1lem 9474 marypha1 9475 ordtypelem7 9565 tcmin 9782 unwf 9851 rankfu 9918 tcrank 9925 aceq3lem 10161 dfac12lem2 10186 ackbij1lem9 10268 ackbij1lem10 10269 ackbij1lem16 10275 fin23lem26 10366 fin23lem27 10369 fin1a2lem6 10446 itunitc 10462 axdc3lem2 10492 ttukeylem5 10554 fpwwe2lem12 10683 canthwelem 10691 pwfseqlem4 10703 wunex2 10779 wunex3 10782 inar1 10816 inatsk 10819 gruina 10859 suprfinzcl 12734 suprzub 12982 uzsupss 12983 uzwo3 12986 rpnnen1lem4 13023 rpnnen1lem5 13024 supxrre 13370 infxrre 13379 ioodisj 13523 supicclub2 13545 fzssnn 13609 fzossnn0 13731 elfzom1elp1fzo 13772 injresinjlem 13827 uzindi 14024 ssnn0fi 14027 seqcoll 14504 seqcoll2 14505 reltrclfv 15057 relexpdmg 15082 relexpdm 15083 relexprng 15086 relexprn 15087 relexpfld 15089 relexpaddg 15093 limsupval2 15517 limsupgre 15518 limsupbnd2 15520 rlimuni 15587 rlimcld2 15615 rlimno1 15691 isercolllem2 15703 isercoll 15705 summolem2a 15752 summolem2 15753 fsumsers 15765 fsumcvg3 15766 prodmolem2a 15971 prodmolem2 15972 zprod 15974 lcmfnnval 16662 lcmfnncl 16667 prmdvdsbc 16764 4sqlem11 16994 vdwlem8 17027 vdwlem11 17030 ramub2 17053 0ram 17059 0ram2 17060 0ramcl 17062 ramub1lem2 17066 prmgaplem3 17092 prmgaplem4 17093 isohom 17821 funcres2c 17949 resscntz 19352 cntzidss 19359 cntzmhm2 19361 pgpssslw 19633 cntzspan 19863 gsumval3 19926 gsum2d 19991 dprdspan 20048 dprdres 20049 subdrgint 20805 sdrgint 20806 primefld 20807 lssintcl 20963 lbsextlem2 21162 lbsextlem3 21163 lbsextlem4 21164 islinds3 21855 fctop 23012 cctop 23014 neitr 23189 ordtbas2 23200 ordtopn1 23203 ordtopn2 23204 lmss 23307 clsconn 23439 2ndcdisj 23465 2ndcomap 23467 ptbasfi 23590 txcmplem2 23651 hausdiag 23654 txkgen 23661 basqtop 23720 alexsubb 24055 alexsubALTlem4 24059 tsmsres 24153 tsmsxplem1 24162 tsmsxp 24164 ustrel 24221 utop3cls 24261 prdsmet 24381 metustrel 24566 icccmplem2 24846 xrge0tsms 24857 cnmptre 24955 icchmeo 24972 icchmeoOLD 24973 bndth 24991 lebnumlem2 24995 cfilresi 25330 causs 25333 bcthlem5 25363 evthicc 25495 ovolficcss 25505 ovolmge0 25513 ovolgelb 25516 ovollb2lem 25524 ovollb2 25525 ovolunlem1a 25532 ovolunlem1 25533 ovoliunlem1 25538 ovoliunlem2 25539 ovoliun 25541 ovolscalem1 25549 ovolicc1 25552 ovolicc2lem4 25556 ovolicc2 25558 voliunlem2 25587 voliunlem3 25588 ioombl1lem2 25595 ioombl1lem4 25597 uniioovol 25615 uniiccvol 25616 uniioombllem1 25617 uniioombllem2 25619 uniioombllem3 25621 uniioombllem4 25622 uniioombllem6 25624 dyadmbllem 25635 dyadmbl 25636 volcn 25642 vitalilem4 25647 vitalilem5 25648 cnmbf 25695 i1fmul 25732 itg1addlem4 25735 itg2seq 25778 dvbssntr 25936 dvreslem 25945 dvcjbr 25988 dvferm1 26024 dvferm2 26026 cmvth 26030 cmvthOLD 26031 dvlip 26033 lhop1lem 26053 lhop2 26055 lhop 26056 dvcnvrelem2 26058 dvcnvre 26059 dvfsumle 26061 dvfsumleOLD 26062 dvfsumge 26063 dvfsumabs 26064 dvfsumlem2 26068 dvfsumlem2OLD 26069 ftc1a 26079 ftc1lem3 26080 ftc1lem6 26083 itgsubstlem 26090 itgpowd 26092 mdegleb 26104 mdeglt 26105 mdegldg 26106 mdegxrcl 26107 mdegcl 26109 deg1mul3le 26157 ig1pdvds 26220 plyeq0lem 26250 aannenlem2 26372 aalioulem3 26377 taylf 26403 taylthlem2 26417 taylthlem2OLD 26418 pserulm 26466 psercn2 26467 psercn2OLD 26468 psercn 26471 reeff1olem 26491 efcvx 26494 loglesqrt 26805 rlimcnp 27009 xrlimcnp 27012 jensen 27033 wilthlem2 27113 vmadivsumb 27528 pntrsumo1 27610 pntlem3 27654 noseqrdgfn 28313 perpln2 28720 axcontlem10 28989 usgrexmplef 29277 dfpth2 29750 nmoxr 30786 nmooge0 30787 nmoolb 30791 nmoubi 30792 ubthlem1 30890 shmodi 31410 nmopxr 31886 nmfnxr 31899 nmoplb 31927 nmopub 31928 nmfnlb 31944 nmfnleub 31945 nmopun 32034 branmfn 32125 mdslj1i 32339 hatomistici 32382 xppreima2 32662 fsuppcurry1 32737 fsuppcurry2 32738 fpwrelmap 32745 infxrge0gelb 32771 gsumpart 33061 xrge0tsmsd 33066 pmtrcnel2 33111 cyc3genpm 33173 elrgspnsubrunlem1 33252 elrgspnsubrunlem2 33253 1fldgenq 33325 ssdifidllem 33485 ssmxidllem 33502 zarcmplem 33881 metideq 33893 metider 33894 pstmfval 33896 esumgect 34092 esum2d 34095 sigaclci 34134 insiga 34139 omssubadd 34303 eulerpartlemgs2 34383 ballotlemsima 34519 signsply0 34567 iblidicc 34608 fsum2dsub 34623 reprsuc 34631 reprgt 34637 bnj1145 35008 bnj1137 35010 bnj1136 35012 resconn 35252 cvmliftlem8 35298 cvmlift3lem6 35330 mclsssvlem 35568 mclsind 35576 mclsppslem 35589 ivthALT 36337 neibastop1 36361 topjoin 36367 bj-imdirco 37192 ptrecube 37628 poimirlem6 37634 poimirlem15 37643 heicant 37663 mblfinlem2 37666 mblfinlem3 37667 mblfinlem4 37668 ismblfin 37669 itg2gt0cn 37683 ftc1cnnc 37700 ftc1anclem3 37703 ftc1anclem7 37707 ftc1anclem8 37708 ftc1anc 37709 areacirclem2 37717 areacirclem3 37718 areacirclem4 37719 totbndbnd 37797 prdsbnd 37801 heiborlem1 37819 rrnequiv 37843 reheibor 37847 iccbnd 37848 pmapssbaN 39763 2polssN 39918 paddunN 39930 poldmj1N 39931 ispsubcl2N 39950 psubclinN 39951 paddatclN 39952 poml4N 39956 diaglbN 41058 diaintclN 41061 dibglbN 41169 dibintclN 41170 dicssdvh 41189 dihvalrel 41282 dochexmidlem4 41466 infdesc 42658 rmxyelqirrOLD 42927 ttac 43053 hbtlem6 43146 hbt 43147 cnvssb 43604 cnvrcl0 43643 cnvtrrel 43688 relexpaddss 43736 cotrcltrcl 43743 cotrclrcl 43760 frege96d 43767 frege97d 43770 frege109d 43775 frege131d 43782 rfovcnvf1od 44022 isotone2 44067 gneispace 44152 k0004ss1 44169 grumnudlem 44309 uzfissfz 45342 suplesup 45355 ssrexr 45448 limciccioolb 45641 limcicciooub 45657 limcleqr 45664 cnrefiisplem 45849 cncfiooicclem1 45913 ibliccsinexp 45971 iblioosinexp 45973 itgcoscmulx 45989 itgsincmulx 45994 itgsubsticclem 45995 itgiccshift 46000 itgperiod 46001 itgsbtaddcnst 46002 stoweidlem34 46054 stoweidlem59 46079 dirkeritg 46122 dirkercncflem2 46124 fourierdlem20 46147 fourierdlem31 46158 fourierdlem39 46166 fourierdlem42 46169 fourierdlem46 46172 fourierdlem52 46178 fourierdlem53 46179 fourierdlem60 46186 fourierdlem61 46187 fourierdlem62 46188 fourierdlem68 46194 fourierdlem76 46202 fourierdlem85 46211 fourierdlem88 46214 fourierdlem89 46215 fourierdlem90 46216 fourierdlem91 46217 fourierdlem93 46219 fourierdlem94 46220 fourierdlem103 46229 fourierdlem104 46230 fourierdlem111 46237 fouriersw 46251 etransclem46 46300 etransclem48 46302 sge0less 46412 sge0resplit 46426 sge0isum 46447 pimdecfgtioo 46737 pimincfltioo 46738 iccpartipre 47413 bgoldbtbndlem2 47798 setrec1lem4 49264 setrec2fun 49266

Copyright terms: Public domain