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Theorem ffn 6646

Description: A mapping is a function with domain. (Contributed by NM, 2-Aug-1994.)

**Assertion**
Ref	Expression
ffn	⊢ (𝐹:𝐴⟶𝐵 → 𝐹 Fn 𝐴)

**Proof of Theorem ffn**
Step	Hyp	Ref	Expression
1		df-f 6480	. 2 ⊢ (𝐹:𝐴⟶𝐵 ↔ (𝐹 Fn 𝐴 ∧ ran 𝐹 ⊆ 𝐵))
2	1	simplbi 497	1 ⊢ (𝐹:𝐴⟶𝐵 → 𝐹 Fn 𝐴)

Colors of variables: wff setvar class

Syntax hints: → wi 4 ⊆ wss 3897 ran crn 5612 Fn wfn 6471 ⟶wf 6472

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

This theorem depends on definitions: df-bi 207 df-an 396 df-f 6480

This theorem is referenced by: ffnd 6647 ffun 6649 frel 6651 fdm 6655 ffrn 6659 fresin 6687 fresaun 6689 fresaunres2 6690 fcoi1 6692 feu 6694 f0bi 6701 dffo2 6734 fimadmfo 6739 fdmeu 6873 feqmptdf 6887 fimarab 6891 fvco3 6916 ffvelcdm 7009 dff2 7027 dffo3 7030 dffo4 7031 dffo5 7032 dffo3f 7034 f1ompt 7039 ffnfv 7047 fcdmssb 7050 fcompt 7061 fsn2 7064 fprb 7123 fconst2g 7132 fpr2g 7140 fex 7155 dff13 7183 nvocnv 7210 soisores 7256 fdmexb 7832 resf1extb 7859 fo1stres 7942 fo2ndres 7943 1stcof 7946 2ndcof 7947 curry1f 8031 curry2f 8033 fparlem1 8037 fparlem2 8038 fo2ndf 8046 soseq 8084 tposf2 8175 smo11 8279 fsetexb 8783 mapsnd 8805 pw2f1olem 8989 mapen 9049 mapunen 9054 fissuni 9236 fipreima 9237 indexfi 9239 mapfien 9287 oismo 9421 cantnflt 9557 cantnfp1lem3 9565 cantnflem4 9577 tcrank 9772 updjudhcoinlf 9820 updjudhcoinrg 9821 updjud 9822 infpwfien 9948 cardinfima 9983 dfacacn 10028 cfflb 10145 cofsmo 10155 cfcoflem 10158 coftr 10159 fin23lem40 10237 axdc3lem2 10337 ac6num 10365 ac6c4 10367 ac6s2 10372 ttukeylem6 10400 iunfo 10425 pwcfsdom 10469 fpwwe2lem5 10521 fpwwe2lem7 10523 pwfseqlem3 10546 inar1 10661 tskcard 10667 tskuni 10669 tskurn 10675 gruima 10688 nqerrel 10818 recmulnq 10850 dmrecnq 10854 axpre-sup 11055 ofsubeq0 12117 dfz2 12482 uzn0 12744 rpnnen1lem3 12872 rpnnen1lem5 12874 unirnioo 13344 dfioo2 13345 ioorebas 13346 fseq1p1m1 13493 2ffzeq 13544 fvinim0ffz 13684 injresinjlem 13685 fsequb2 13878 fseqsupcl 13879 fseqsupubi 13880 ser0f 13957 hashgval 14235 hashinf 14237 hashresfn 14242 ffz0hash 14349 fnfzo0hash 14352 wrdred1hash 14463 revlen 14664 revrev 14669 repswlen 14678 repsdf2 14680 cshword 14693 0csh0 14695 lenco 14734 s1co 14735 cshco 14738 swrdco 14739 s7f1o 14868 ofccat 14871 shftf 14981 uzin2 15247 rexanuz 15248 limsuple 15380 limsupval2 15382 rlimres 15460 lo1res 15461 rlimresb 15467 isercolllem2 15568 isercolllem3 15569 isercoll 15570 supcvg 15758 prodf1f 15794 eff2 16003 reeff1 16024 tanval 16032 ruclem4 16138 ruclem12 16145 prmreclem6 16828 1arithlem4 16833 1arith 16834 vdwmc 16885 vdwlem1 16888 vdwlem8 16895 vdwlem13 16900 ramval 16915 0ram 16927 0ram2 16928 0ramcl 16930 ramcl 16936 fsets 17075 firest 17331 0ssc 17739 0subcat 17740 isfull2 17815 arwhoma 17947 gsumval2a 18588 isgrpinv 18901 kerf1ghm 19154 f1omvdconj 19353 pmtrmvd 19363 pmtrfinv 19368 pmtrdifellem4 19386 efgsfo 19646 efgredlem 19654 efgcpbllemb 19662 frgpup3lem 19684 0frgp 19686 gexex 19760 torsubg 19761 gsumval3 19814 gsumzres 19816 gsummptmhm 19847 gsumzoppg 19851 dprdf1o 19941 dprd2db 19952 zrinitorngc 20552 zrtermorngc 20553 zrtermoringc 20585 srngf1o 20758 lmhmima 20976 lmhmpreima 20977 lmhmrnlss 20979 lspextmo 20985 pwssplit1 20988 cnfldadd 21292 cnfldmul 21294 dfcnfldOLD 21302 cnfldplusf 21328 cnfldsub 21329 chrrhm 21463 znunit 21495 psgnevpmb 21519 psgndiflemB 21532 mpofrlmd 21709 frlmipval 21711 frlmphl 21713 frlmlbs 21729 frlmup4 21733 ellspd 21734 lindfmm 21759 lsslindf 21762 psrbaglefi 21858 psrlidm 21894 mplmonmul 21966 evlseu 22013 mpfconst 22031 mpfproj 22032 mpfsubrg 22033 coe1sclmulfv 22192 pf1const 22256 pf1id 22257 pf1subrg 22258 mpfpf1 22261 pf1mpf 22262 mamuass 22312 mamudi 22313 mamudir 22314 mamuvs1 22315 mamuvs2 22316 1mavmul 22458 mavmulass 22459 mdetunilem7 22528 madutpos 22552 lecldbas 23129 lmbr2 23169 cncnpi 23188 cncnp 23190 cnpdis 23203 lmff 23211 pnrmopn 23253 dnsconst 23288 cmpsub 23310 tgcmp 23311 hauscmplem 23316 2ndcctbss 23365 2ndcomap 23368 2ndcsep 23369 1stccnp 23372 kgenidm 23457 iskgen2 23458 1stckgen 23464 kgen2cn 23469 ptpjpre1 23481 pttop 23492 ptuni 23504 ptval2 23511 tx1cn 23519 tx2cn 23520 ptpjcn 23521 ptpjopn 23522 ptclsg 23525 ptcnplem 23531 upxp 23533 txcnmpt 23534 uptx 23535 txcmplem2 23552 txkgen 23562 xkoptsub 23564 xkopt 23565 xkococnlem 23569 xkococn 23570 ptcmpfi 23723 zfbas 23806 uzrest 23807 rnelfmlem 23862 rnelfm 23863 fmfnfmlem2 23865 fmfnfm 23868 lmflf 23915 alexsubALT 23961 clssubg 24019 qustgplem 24031 tsmsres 24054 tsmsxplem1 24063 ucncn 24194 xmettpos 24259 imasdsf1olem 24283 blrnps 24318 blrn 24319 xmeterval 24342 tmslem 24392 tmsxms 24396 imasf1oxms 24399 prdsxms 24440 blval2 24472 metuel2 24475 isngp2 24507 isngp3 24508 tngngp2 24562 isnghm 24633 qtopbaslem 24668 qdensere 24679 cnbl0 24683 cnblcld 24684 cnfldms 24685 blssioo 24705 tgioo 24706 tgqioo 24710 xrtgioo 24717 xrsdsre 24721 xrge0tsms 24745 iimulcnOLD 24857 bndth 24879 lebnumlem3 24884 nmhmcn 25042 cphsqrtcl 25106 lmmbr2 25181 caucfil 25205 causs 25220 lmcau 25235 bcth3 25253 cncms 25277 cnfldcusp 25279 rrxmvallem 25326 ivthicc 25381 ovolfioo 25390 ovolficc 25391 ovolficcss 25392 ovollb2lem 25411 ovoliunlem2 25426 ovolshftlem1 25432 ovolicc2 25445 ismbl 25449 voliunlem2 25474 volsup 25479 ioorf 25496 ioorinv 25499 ioorcl 25500 uniiccdif 25501 uniioovol 25502 uniiccvol 25503 uniioombllem2 25506 uniioombllem4 25509 dyaddisj 25519 dyadmax 25521 dyadmbllem 25522 dyadmbl 25523 opnmbllem 25524 opnmblALT 25526 volsup2 25528 mbfdm 25549 mbfima 25553 mbfid 25558 ismbfd 25562 mbfres2 25568 mbfposr 25575 mbfimaopnlem 25578 mbflimsup 25589 0plef 25595 i1f1lem 25612 itg11 25614 itg1addlem4 25622 i1fpos 25629 itg1le 25636 itg1climres 25637 mbfi1fseqlem5 25642 mbfi1flimlem 25645 xrge0f 25654 itg2ge0 25658 itg2seq 25665 itg2i1fseqle 25677 itg2i1fseq2 25679 itg2addlem 25681 itg2gt0 25683 limciun 25817 dvres 25834 dvres3a 25837 cpnres 25861 dvfre 25877 dvmptres3 25882 dvlip2 25922 dvgt0lem2 25930 deg1fvi 26012 uc1pmon1p 26079 fta1g 26097 ig1peu 26102 ig1pdvds 26107 plyco0 26119 plypf1 26139 dgrlem 26156 dgrub 26161 dgrlb 26163 coemulc 26182 plyreres 26212 plydivlem3 26225 plydivlem4 26226 plydiveu 26228 plyremlem 26234 fta1lem 26237 fta1 26238 vieta1lem2 26241 plyexmo 26243 elaa 26246 elqaalem3 26251 aannenlem1 26258 pserulm 26353 psercnlem2 26356 psercnlem1 26357 psercn 26358 abelth 26373 reeff1o 26379 pilem1 26383 recosf1o 26466 resinf1o 26467 efif1olem3 26475 efif1olem4 26476 efifo 26478 eff1olem 26479 ellogrn 26490 logcn 26578 dvloglem 26579 logf1o2 26581 efopnlem1 26587 efopnlem2 26588 efopn 26589 logtayl 26591 cxpcn3lem 26679 cxpcn3 26680 resqrtcn 26681 asinneg 26818 areambl 26890 emcllem7 26934 lgamgulm2 26968 basellem4 27016 sqff1o 27114 mpodvdsmulf1o 27126 fsumdvdsmul 27127 dvdsmulf1o 27128 fsumdvdsmulOLD 27129 ostthlem1 27560 ostth 27572 noetasuplem4 27670 madeval2 27789 elold 27809 old1 27815 madeoldsuc 27825 tglnfn 28520 f1otrg 28844 axlowdimlem6 28920 axlowdimlem8 28922 axlowdimlem9 28923 axlowdimlem11 28925 axlowdimlem12 28926 axlowdimlem17 28931 elntg2 28958 dfpth2 29702 cyclnumvtx 29773 crctcshlem4 29793 clwlkclwwlklem2 29972 eucrct2eupth 30217 ex-fpar 30434 cnnvm 30654 sspmlem 30704 nvo00 30733 nmlno0lem 30765 phoeqi 30829 ubthlem1 30842 hhip 31149 hhssabloilem 31233 hhssnv 31236 hhsssh 31241 occllem 31275 shsel 31286 chscllem2 31610 df0op2 31724 hoeq 31732 hocofni 31739 hoaddfni 31742 hosubfni 31743 hon0 31765 ho01i 31800 hoeq1 31802 elnlfn 31900 nmlnop0iALT 31967 lnopco0i 31976 imaelshi 32030 nlelchi 32033 rnbra 32079 cnvbraval 32082 kbass5 32092 hmopidmchi 32123 hmopidmpji 32124 foresf1o 32476 fcomptf 32632 ofpreima 32639 resf1o 32705 maprnin 32706 fpwrelmapffslem 32707 hashgt1 32782 indpi1 32833 indpreima 32838 s3clhash 32921 gsumpart 33029 xrge0tsmsd 33034 tocyc01 33079 cyc3evpm 33111 cycpmgcl 33114 cycpmconjslem2 33116 cyc3conja 33118 kerunit 33282 1arithidomlem1 33492 1arithidomlem2 33493 1arithidom 33494 dimval 33605 dimvalfi 33606 ply1degltdimlem 33627 ply1degltdim 33628 elirng 33691 txomap 33839 locfinreflem 33845 hauseqcn 33903 xpinpreima 33911 xpinpreima2 33912 tpr2rico 33917 mndpluscn 33931 raddcn 33934 xrge0pluscn 33945 xrge0tmdALT 33951 rge0scvg 33954 pl1cn 33960 elzrhunit 33982 qqhf 33991 cnrrext 34015 qqhre 34025 1stmbfm 34265 2ndmbfm 34266 mbfmcnt 34273 omssubadd 34305 carsggect 34323 eulerpartlemsv2 34363 eulerpartlems 34365 eulerpartlemv 34369 eulerpartlemb 34373 eulerpartlemf 34375 eulerpartlemt 34376 eulerpartlemmf 34380 eulerpartlemgvv 34381 eulerpartlemgh 34383 eulerpartlemgs2 34385 sseqmw 34396 sseqf 34397 sseqp1 34400 fiblem 34403 fibp1 34406 plymul02 34551 signsvtn0 34575 signstres 34580 signshlen 34595 reprinrn 34623 circlemethhgt 34648 txsconnlem 35276 iccllysconn 35286 rellysconn 35287 cvmseu 35312 cvmliftmolem2 35318 cvmliftlem6 35326 cvmliftlem7 35327 cvmliftlem8 35328 cvmliftlem9 35329 cvmliftlem11 35331 cvmliftlem15 35334 cvmlift2lem7 35345 cvmlift2lem10 35348 cvmlift3lem8 35362 cvmlift3lem9 35363 mvrsfpw 35542 mrsubff1 35550 msrid 35581 msrfo 35582 elmsta 35584 mtyf 35588 msubff1 35592 vhmcls 35602 mclsax 35605 elmthm 35612 mthmblem 35616 mclsppslem 35619 iprodefisumlem 35776 fullfunfnv 35980 fullfunfv 35981 tailfb 36411 filnetlem4 36415 taupilem3 37353 icoreresf 37386 icoreelrnab 37388 relowlssretop 37397 relowlpssretop 37398 unccur 37643 matunitlindflem1 37656 matunitlindflem2 37657 ptrecube 37660 poimirlem28 37688 poimirlem32 37692 heicant 37695 opnmbllem0 37696 mblfinlem1 37697 mblfinlem2 37698 volsupnfl 37705 cnambfre 37708 dvtan 37710 itg2addnclem 37711 itg2addnclem2 37712 ftc1anclem3 37735 ftc1anclem5 37737 ftc1anclem7 37739 ftc1anclem8 37740 ftc1anc 37741 areacirc 37753 indexdom 37774 sdclem2 37782 sstotbnd2 37814 sstotbnd 37815 isbndx 37822 isbnd3b 37825 prdsbnd 37833 prdstotbnd 37834 ismtyhmeolem 37844 heibor1lem 37849 heiborlem1 37851 heibor 37861 rrnequiv 37875 keridl 38072 ellkr 39128 lkr0f 39133 cdleme50rnlem 40583 aks6d1c2lem4 42160 aks6d1c5 42172 sticksstones11 42189 sticksstones19 42198 sticksstones22 42201 aks6d1c6lem4 42206 aks6d1c6isolem2 42208 fsuppind 42623 elrfirn 42728 ismrcd2 42732 isnacs2 42739 nacsfix 42745 mapfzcons1 42750 mzpcompact2lem 42784 eq0rabdioph 42809 eldioph4b 42844 diophren 42846 pw2f1ocnv 43070 pw2f1o2val2 43073 lmhmfgsplit 43119 pwssplit4 43122 hbt 43163 mpaaeu 43183 mendring 43221 proot1mul 43227 proot1hash 43228 proot1ex 43229 deg1mhm 43233 fgraphopab 43236 hausgraph 43238 nvocnvb 43455 ofsubid 44357 expgrowthi 44366 expgrowth 44368 binomcxplemdvbinom 44386 binomcxplemcvg 44387 binomcxplemnotnn0 44389 relpfrlem 44986 rfcnpre1 45056 rfcnpre2 45068 cncmpmax 45069 rfcnpre3 45070 rfcnpre4 45071 elixpconstg 45126 ffi 45210 islptre 45659 resincncf 45913 dvcosre 45950 dvresntr 45956 volioof 46025 stoweidlem48 46086 fourierdlem12 46157 fourierdlem15 46160 fourierdlem41 46186 fourierdlem42 46187 fourierdlem46 46190 fourierdlem48 46192 fourierdlem49 46193 fourierdlem54 46198 fourierdlem56 46200 fourierdlem62 46206 fourierdlem64 46208 fourierdlem65 46209 fourierdlem73 46217 fourierdlem74 46218 fourierdlem75 46219 fourierdlem102 46246 fourierdlem103 46247 fourierdlem104 46248 fourierdlem114 46258 sge0split 46447 elhoi 46580 mbfresmf 46777 cjnpoly 46920 cfsetsnfsetf1 47090 cfsetsnfsetfo 47091 focofob 47111 f1ocof1ob 47112 fafvelcdm 47201 ffnafv 47202 fafv2elcdm 47265 fafv2elrnb 47266 imarnf1pr 47313 2ffzoeq 47358 fundcmpsurbijinjpreimafv 47438 fundcmpsurinjimaid 47442 fargshiftfv 47470 fargshiftf 47471 fargshiftf1 47472 fargshiftfo 47473 cycl3grtri 47978 fdmdifeqresdif 48373 fdivmpt 48572 fdivmptf 48573 refdivmptf 48574 1arymaptf1 48674 2arymaptf1 48685 ackfnnn0 48717 homf0 49041 aacllem 49833

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