sstrdi - Metamath Proof Explorer

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Theorem sstrdi 3934

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 3932	1 ⊢ (𝜑 → 𝐴 ⊆ 𝐶)

Colors of variables: wff setvar class

Syntax hints: → wi 4 ⊆ wss 3888

This theorem was proved from axioms: ax-mp 5 ax-1 6 ax-2 7 ax-3 8 ax-gen 1798 ax-4 1812 ax-5 1914 ax-6 1972 ax-7 2012 ax-8 2109 ax-9 2117 ax-ext 2710

This theorem depends on definitions: df-bi 206 df-an 397 df-tru 1542 df-ex 1783 df-sb 2069 df-clab 2717 df-cleq 2731 df-clel 2817 df-v 3435 df-in 3895 df-ss 3905

This theorem is referenced by: difss2 4069 rintn0 5039 eqbrrdva 5781 ssxpb 6082 resssxp 6177 relfld 6182 funssxp 6638 dff2 6984 dff3 6985 fliftf 7195 1stcof 7870 2ndcof 7871 frrlem13 8123 nnunifi 9074 elfiun 9198 marypha1lem 9201 marypha1 9202 ordtypelem7 9292 tcmin 9508 unwf 9577 rankfu 9644 tcrank 9651 aceq3lem 9885 dfac12lem2 9909 ackbij1lem9 9993 ackbij1lem10 9994 ackbij1lem16 10000 fin23lem26 10090 fin23lem27 10093 fin1a2lem6 10170 itunitc 10186 axdc3lem2 10216 ttukeylem5 10278 fpwwe2lem12 10407 canthwelem 10415 pwfseqlem4 10427 wunex2 10503 wunex3 10506 inar1 10540 inatsk 10543 gruina 10583 suprfinzcl 12445 suprzub 12688 uzsupss 12689 uzwo3 12692 rpnnen1lem4 12729 rpnnen1lem5 12730 supxrre 13070 infxrre 13079 ioodisj 13223 supicclub2 13245 fzssnn 13309 fzossnn0 13427 elfzom1elp1fzo 13463 injresinjlem 13516 uzindi 13711 ssnn0fi 13714 seqcoll 14187 seqcoll2 14188 reltrclfv 14737 relexpdmg 14762 relexpdm 14763 relexprng 14766 relexprn 14767 relexpfld 14769 relexpaddg 14773 limsupval2 15198 limsupgre 15199 limsupbnd2 15201 rlimuni 15268 rlimcld2 15296 rlimno1 15374 isercolllem2 15386 isercoll 15388 summolem2a 15436 summolem2 15437 fsumsers 15449 fsumcvg3 15450 prodmolem2a 15653 prodmolem2 15654 zprod 15656 lcmfnnval 16338 lcmfnncl 16343 4sqlem11 16665 vdwlem8 16698 vdwlem11 16701 ramub2 16724 0ram 16730 0ram2 16731 0ramcl 16733 ramub1lem2 16737 prmgaplem3 16763 prmgaplem4 16764 isohom 17497 funcres2c 17626 resscntz 18947 cntzidss 18953 cntzmhm2 18955 pgpssslw 19228 cntzspan 19454 gsumval3 19517 gsum2d 19582 dprdspan 19639 dprdres 19640 subdrgint 20080 sdrgint 20081 primefld 20082 lssintcl 20235 lbsextlem2 20430 lbsextlem3 20431 lbsextlem4 20432 islinds3 21050 fctop 22163 cctop 22165 neitr 22340 ordtbas2 22351 ordtopn1 22354 ordtopn2 22355 lmss 22458 clsconn 22590 2ndcdisj 22616 2ndcomap 22618 ptbasfi 22741 txcmplem2 22802 hausdiag 22805 txkgen 22812 basqtop 22871 alexsubb 23206 alexsubALTlem4 23210 tsmsres 23304 tsmsxplem1 23313 tsmsxp 23315 ustrel 23372 utop3cls 23412 prdsmet 23532 metustrel 23717 icccmplem2 23995 xrge0tsms 24006 cnmptre 24099 icchmeo 24113 bndth 24130 lebnumlem2 24134 cfilresi 24468 causs 24471 bcthlem5 24501 evthicc 24632 ovolficcss 24642 ovolmge0 24650 ovolgelb 24653 ovollb2lem 24661 ovollb2 24662 ovolunlem1a 24669 ovolunlem1 24670 ovoliunlem1 24675 ovoliunlem2 24676 ovoliun 24678 ovolscalem1 24686 ovolicc1 24689 ovolicc2lem4 24693 ovolicc2 24695 voliunlem2 24724 voliunlem3 24725 ioombl1lem2 24732 ioombl1lem4 24734 uniioovol 24752 uniiccvol 24753 uniioombllem1 24754 uniioombllem2 24756 uniioombllem3 24758 uniioombllem4 24759 uniioombllem6 24761 dyadmbllem 24772 dyadmbl 24773 volcn 24779 vitalilem4 24784 vitalilem5 24785 cnmbf 24832 i1fmul 24869 itg1addlem4 24872 itg1addlem4OLD 24873 itg2seq 24916 dvbssntr 25073 dvreslem 25082 dvcjbr 25122 dvferm1 25158 dvferm2 25160 cmvth 25164 dvlip 25166 lhop1lem 25186 lhop2 25188 lhop 25189 dvcnvrelem2 25191 dvcnvre 25192 dvfsumle 25194 dvfsumge 25195 dvfsumabs 25196 dvfsumlem2 25200 ftc1a 25210 ftc1lem3 25211 ftc1lem6 25214 itgsubstlem 25221 itgpowd 25223 mdegleb 25238 mdeglt 25239 mdegldg 25240 mdegxrcl 25241 mdegcl 25243 deg1mul3le 25290 ig1pdvds 25350 plyeq0lem 25380 aannenlem2 25498 aalioulem3 25503 taylf 25529 taylthlem2 25542 pserulm 25590 psercn2 25591 psercn 25594 reeff1olem 25614 efcvx 25617 loglesqrt 25920 rlimcnp 26124 xrlimcnp 26127 jensen 26147 wilthlem2 26227 vmadivsumb 26640 pntrsumo1 26722 pntlem3 26766 perpln2 27081 axcontlem10 27350 usgrexmplef 27635 nmoxr 29137 nmooge0 29138 nmoolb 29142 nmoubi 29143 ubthlem1 29241 shmodi 29761 nmopxr 30237 nmfnxr 30250 nmoplb 30278 nmopub 30279 nmfnlb 30295 nmfnleub 30296 nmopun 30385 branmfn 30476 mdslj1i 30690 hatomistici 30733 xppreima2 30997 fsuppcurry1 31069 fsuppcurry2 31070 fpwrelmap 31077 infxrge0gelb 31098 prmdvdsbc 31139 gsumpart 31324 xrge0tsmsd 31326 pmtrcnel2 31368 cyc3genpm 31428 ssmxidllem 31650 zarcmplem 31840 metideq 31852 metider 31853 pstmfval 31855 esumgect 32067 esum2d 32070 sigaclci 32109 insiga 32114 omssubadd 32276 eulerpartlemgs2 32356 ballotlemsima 32491 signsply0 32539 iblidicc 32581 fsum2dsub 32596 reprsuc 32604 reprgt 32610 bnj1145 32982 bnj1137 32984 bnj1136 32986 resconn 33217 cvmliftlem8 33263 cvmlift3lem6 33295 mclsssvlem 33533 mclsind 33541 mclsppslem 33554 frxp2 33800 frxp3 33806 ivthALT 34533 neibastop1 34557 topjoin 34563 bj-imdirco 35370 ptrecube 35786 poimirlem6 35792 poimirlem15 35801 heicant 35821 mblfinlem2 35824 mblfinlem3 35825 mblfinlem4 35826 ismblfin 35827 itg2gt0cn 35841 ftc1cnnc 35858 ftc1anclem3 35861 ftc1anclem7 35865 ftc1anclem8 35866 ftc1anc 35867 areacirclem2 35875 areacirclem3 35876 areacirclem4 35877 totbndbnd 35956 prdsbnd 35960 heiborlem1 35978 rrnequiv 36002 reheibor 36006 iccbnd 36007 pmapssbaN 37781 2polssN 37936 paddunN 37948 poldmj1N 37949 ispsubcl2N 37968 psubclinN 37969 paddatclN 37970 poml4N 37974 diaglbN 39076 diaintclN 39079 dibglbN 39187 dibintclN 39188 dicssdvh 39207 dihvalrel 39300 dochexmidlem4 39484 infdesc 40487 rmxyelqirr 40739 ttac 40865 hbtlem6 40961 hbt 40962 cnvssb 41201 cnvrcl0 41240 cnvtrrel 41285 relexpaddss 41333 cotrcltrcl 41340 cotrclrcl 41357 frege96d 41364 frege97d 41367 frege109d 41372 frege131d 41379 rfovcnvf1od 41619 isotone2 41666 gneispace 41751 k0004ss1 41768 grumnudlem 41910 uzfissfz 42872 suplesup 42885 ssrexr 42979 limciccioolb 43169 limcicciooub 43185 limcleqr 43192 cnrefiisplem 43377 cncfiooicclem1 43441 ibliccsinexp 43499 iblioosinexp 43501 itgcoscmulx 43517 itgsincmulx 43522 itgsubsticclem 43523 itgiccshift 43528 itgperiod 43529 itgsbtaddcnst 43530 stoweidlem34 43582 stoweidlem59 43607 dirkeritg 43650 dirkercncflem2 43652 fourierdlem20 43675 fourierdlem31 43686 fourierdlem39 43694 fourierdlem42 43697 fourierdlem46 43700 fourierdlem52 43706 fourierdlem53 43707 fourierdlem60 43714 fourierdlem61 43715 fourierdlem62 43716 fourierdlem68 43722 fourierdlem76 43730 fourierdlem85 43739 fourierdlem88 43742 fourierdlem89 43743 fourierdlem90 43744 fourierdlem91 43745 fourierdlem93 43747 fourierdlem94 43748 fourierdlem103 43757 fourierdlem104 43758 fourierdlem111 43765 fouriersw 43779 etransclem46 43828 etransclem48 43830 sge0less 43937 sge0resplit 43951 sge0isum 43972 pimdecfgtioo 44262 pimincfltioo 44263 iccpartipre 44884 bgoldbtbndlem2 45269 setrec1lem4 46407 setrec2fun 46409

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