sstrdi - Metamath Proof Explorer

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Theorem sstrdi 3956

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 3954	1 ⊢ (𝜑 → 𝐴 ⊆ 𝐶)

Colors of variables: wff setvar class

Syntax hints: → wi 4 ⊆ wss 3911

This theorem was proved from axioms: ax-mp 5 ax-1 6 ax-2 7 ax-3 8 ax-gen 1795 ax-4 1809

This theorem depends on definitions: df-bi 207 df-an 396 df-ss 3928

This theorem is referenced by: difss2 4097 rintn0 5068 eqbrrdva 5823 ssxpb 6135 resssxp 6231 relfld 6236 funssxp 6698 dff2 7053 dff3 7054 fliftf 7272 1stcof 7977 2ndcof 7978 frxp2 8100 frxp3 8107 frrlem13 8254 nnunifi 9214 elfiun 9357 marypha1lem 9360 marypha1 9361 ordtypelem7 9453 tcmin 9670 unwf 9739 rankfu 9806 tcrank 9813 aceq3lem 10049 dfac12lem2 10074 ackbij1lem9 10156 ackbij1lem10 10157 ackbij1lem16 10163 fin23lem26 10254 fin23lem27 10257 fin1a2lem6 10334 itunitc 10350 axdc3lem2 10380 ttukeylem5 10442 fpwwe2lem12 10571 canthwelem 10579 pwfseqlem4 10591 wunex2 10667 wunex3 10670 inar1 10704 inatsk 10707 gruina 10747 suprfinzcl 12624 suprzub 12874 uzsupss 12875 uzwo3 12878 rpnnen1lem4 12915 rpnnen1lem5 12916 supxrre 13263 infxrre 13273 ioodisj 13419 supicclub2 13441 fzssnn 13505 fzossnn0 13627 elfzom1elp1fzo 13669 injresinjlem 13724 uzindi 13923 ssnn0fi 13926 seqcoll 14405 seqcoll2 14406 reltrclfv 14959 relexpdmg 14984 relexpdm 14985 relexprng 14988 relexprn 14989 relexpfld 14991 relexpaddg 14995 limsupval2 15422 limsupgre 15423 limsupbnd2 15425 rlimuni 15492 rlimcld2 15520 rlimno1 15596 isercolllem2 15608 isercoll 15610 summolem2a 15657 summolem2 15658 fsumsers 15670 fsumcvg3 15671 prodmolem2a 15876 prodmolem2 15877 zprod 15879 lcmfnnval 16570 lcmfnncl 16575 prmdvdsbc 16672 4sqlem11 16902 vdwlem8 16935 vdwlem11 16938 ramub2 16961 0ram 16967 0ram2 16968 0ramcl 16970 ramub1lem2 16974 prmgaplem3 17000 prmgaplem4 17001 isohom 17714 funcres2c 17841 resscntz 19241 cntzidss 19248 cntzmhm2 19250 pgpssslw 19520 cntzspan 19750 gsumval3 19813 gsum2d 19878 dprdspan 19935 dprdres 19936 subdrgint 20688 sdrgint 20689 primefld 20690 lssintcl 20846 lbsextlem2 21045 lbsextlem3 21046 lbsextlem4 21047 islinds3 21719 fctop 22867 cctop 22869 neitr 23043 ordtbas2 23054 ordtopn1 23057 ordtopn2 23058 lmss 23161 clsconn 23293 2ndcdisj 23319 2ndcomap 23321 ptbasfi 23444 txcmplem2 23505 hausdiag 23508 txkgen 23515 basqtop 23574 alexsubb 23909 alexsubALTlem4 23913 tsmsres 24007 tsmsxplem1 24016 tsmsxp 24018 ustrel 24075 utop3cls 24115 prdsmet 24234 metustrel 24416 icccmplem2 24688 xrge0tsms 24699 cnmptre 24797 icchmeo 24814 icchmeoOLD 24815 bndth 24833 lebnumlem2 24837 cfilresi 25171 causs 25174 bcthlem5 25204 evthicc 25336 ovolficcss 25346 ovolmge0 25354 ovolgelb 25357 ovollb2lem 25365 ovollb2 25366 ovolunlem1a 25373 ovolunlem1 25374 ovoliunlem1 25379 ovoliunlem2 25380 ovoliun 25382 ovolscalem1 25390 ovolicc1 25393 ovolicc2lem4 25397 ovolicc2 25399 voliunlem2 25428 voliunlem3 25429 ioombl1lem2 25436 ioombl1lem4 25438 uniioovol 25456 uniiccvol 25457 uniioombllem1 25458 uniioombllem2 25460 uniioombllem3 25462 uniioombllem4 25463 uniioombllem6 25465 dyadmbllem 25476 dyadmbl 25477 volcn 25483 vitalilem4 25488 vitalilem5 25489 cnmbf 25536 i1fmul 25573 itg1addlem4 25576 itg2seq 25619 dvbssntr 25777 dvreslem 25786 dvcjbr 25829 dvferm1 25865 dvferm2 25867 cmvth 25871 cmvthOLD 25872 dvlip 25874 lhop1lem 25894 lhop2 25896 lhop 25897 dvcnvrelem2 25899 dvcnvre 25900 dvfsumle 25902 dvfsumleOLD 25903 dvfsumge 25904 dvfsumabs 25905 dvfsumlem2 25909 dvfsumlem2OLD 25910 ftc1a 25920 ftc1lem3 25921 ftc1lem6 25924 itgsubstlem 25931 itgpowd 25933 mdegleb 25945 mdeglt 25946 mdegldg 25947 mdegxrcl 25948 mdegcl 25950 deg1mul3le 25998 ig1pdvds 26061 plyeq0lem 26091 aannenlem2 26213 aalioulem3 26218 taylf 26244 taylthlem2 26258 taylthlem2OLD 26259 pserulm 26307 psercn2 26308 psercn2OLD 26309 psercn 26312 reeff1olem 26332 efcvx 26335 loglesqrt 26647 rlimcnp 26851 xrlimcnp 26854 jensen 26875 wilthlem2 26955 vmadivsumb 27370 pntrsumo1 27452 pntlem3 27496 noseqrdgfn 28176 perpln2 28614 axcontlem10 28876 usgrexmplef 29162 dfpth2 29632 nmoxr 30668 nmooge0 30669 nmoolb 30673 nmoubi 30674 ubthlem1 30772 shmodi 31292 nmopxr 31768 nmfnxr 31781 nmoplb 31809 nmopub 31810 nmfnlb 31826 nmfnleub 31827 nmopun 31916 branmfn 32007 mdslj1i 32221 hatomistici 32264 xppreima2 32548 fsuppcurry1 32621 fsuppcurry2 32622 fpwrelmap 32629 infxrge0gelb 32662 gsumpart 32970 xrge0tsmsd 32975 pmtrcnel2 33020 cyc3genpm 33082 elrgspnsubrunlem1 33171 elrgspnsubrunlem2 33172 1fldgenq 33245 ssdifidllem 33400 ssmxidllem 33417 zarcmplem 33844 metideq 33856 metider 33857 pstmfval 33859 esumgect 34053 esum2d 34056 sigaclci 34095 insiga 34100 omssubadd 34264 eulerpartlemgs2 34344 ballotlemsima 34480 signsply0 34515 iblidicc 34556 fsum2dsub 34571 reprsuc 34579 reprgt 34585 bnj1145 34956 bnj1137 34958 bnj1136 34960 resconn 35206 cvmliftlem8 35252 cvmlift3lem6 35284 mclsssvlem 35522 mclsind 35530 mclsppslem 35543 ivthALT 36296 neibastop1 36320 topjoin 36326 bj-imdirco 37151 ptrecube 37587 poimirlem6 37593 poimirlem15 37602 heicant 37622 mblfinlem2 37625 mblfinlem3 37626 mblfinlem4 37627 ismblfin 37628 itg2gt0cn 37642 ftc1cnnc 37659 ftc1anclem3 37662 ftc1anclem7 37666 ftc1anclem8 37667 ftc1anc 37668 areacirclem2 37676 areacirclem3 37677 areacirclem4 37678 totbndbnd 37756 prdsbnd 37760 heiborlem1 37778 rrnequiv 37802 reheibor 37806 iccbnd 37807 pmapssbaN 39727 2polssN 39882 paddunN 39894 poldmj1N 39895 ispsubcl2N 39914 psubclinN 39915 paddatclN 39916 poml4N 39920 diaglbN 41022 diaintclN 41025 dibglbN 41133 dibintclN 41134 dicssdvh 41153 dihvalrel 41246 dochexmidlem4 41430 infdesc 42604 rmxyelqirrOLD 42872 ttac 42998 hbtlem6 43091 hbt 43092 cnvssb 43548 cnvrcl0 43587 cnvtrrel 43632 relexpaddss 43680 cotrcltrcl 43687 cotrclrcl 43704 frege96d 43711 frege97d 43714 frege109d 43719 frege131d 43726 rfovcnvf1od 43966 isotone2 44011 gneispace 44096 k0004ss1 44113 grumnudlem 44247 uzfissfz 45295 suplesup 45308 ssrexr 45401 limciccioolb 45592 limcicciooub 45608 limcleqr 45615 cnrefiisplem 45800 cncfiooicclem1 45864 ibliccsinexp 45922 iblioosinexp 45924 itgcoscmulx 45940 itgsincmulx 45945 itgsubsticclem 45946 itgiccshift 45951 itgperiod 45952 itgsbtaddcnst 45953 stoweidlem34 46005 stoweidlem59 46030 dirkeritg 46073 dirkercncflem2 46075 fourierdlem20 46098 fourierdlem31 46109 fourierdlem39 46117 fourierdlem42 46120 fourierdlem46 46123 fourierdlem52 46129 fourierdlem53 46130 fourierdlem60 46137 fourierdlem61 46138 fourierdlem62 46139 fourierdlem68 46145 fourierdlem76 46153 fourierdlem85 46162 fourierdlem88 46165 fourierdlem89 46166 fourierdlem90 46167 fourierdlem91 46168 fourierdlem93 46170 fourierdlem94 46171 fourierdlem103 46180 fourierdlem104 46181 fourierdlem111 46188 fouriersw 46202 etransclem46 46251 etransclem48 46253 sge0less 46363 sge0resplit 46377 sge0isum 46398 pimdecfgtioo 46688 pimincfltioo 46689 iccpartipre 47395 bgoldbtbndlem2 47780 setrec1lem4 49652 setrec2fun 49654

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