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Theorem ffn 6705

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 6534	. 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 3926 ran crn 5655 Fn wfn 6525 ⟶wf 6526

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 6534

This theorem is referenced by: ffnd 6706 ffun 6708 frel 6710 fdm 6714 ffrn 6718 fresin 6746 fresaun 6748 fresaunres2 6749 fcoi1 6751 feu 6753 f0bi 6760 dffo2 6793 fimadmfo 6798 fdmeu 6934 feqmptdf 6948 fimarab 6952 fvco3 6977 ffvelcdm 7070 dff2 7088 dffo3 7091 dffo4 7092 dffo5 7093 dffo3f 7095 f1ompt 7100 ffnfv 7108 fcdmssb 7111 fcompt 7122 fsn2 7125 fprb 7185 fconst2g 7194 fpr2g 7202 fex 7217 dff13 7246 nvocnv 7273 soisores 7319 fdmexb 7901 resf1extb 7928 fo1stres 8012 fo2ndres 8013 1stcof 8016 2ndcof 8017 curry1f 8103 curry2f 8105 fparlem1 8109 fparlem2 8110 fo2ndf 8118 soseq 8156 tposf2 8247 smo11 8376 fsetexb 8876 mapsnd 8898 pw2f1olem 9088 mapen 9153 mapunen 9158 fissuni 9367 fipreima 9368 indexfi 9370 mapfien 9418 oismo 9552 cantnflt 9684 cantnfp1lem3 9692 cantnflem4 9704 tcrank 9896 updjudhcoinlf 9944 updjudhcoinrg 9945 updjud 9946 infpwfien 10074 cardinfima 10109 dfacacn 10154 cfflb 10271 cofsmo 10281 cfcoflem 10284 coftr 10285 fin23lem40 10363 axdc3lem2 10463 ac6num 10491 ac6c4 10493 ac6s2 10498 ttukeylem6 10526 iunfo 10551 pwcfsdom 10595 fpwwe2lem5 10647 fpwwe2lem7 10649 pwfseqlem3 10672 inar1 10787 tskcard 10793 tskuni 10795 tskurn 10801 gruima 10814 nqerrel 10944 recmulnq 10976 dmrecnq 10980 axpre-sup 11181 ofsubeq0 12235 dfz2 12605 uzn0 12867 rpnnen1lem3 12993 rpnnen1lem5 12995 unirnioo 13464 dfioo2 13465 ioorebas 13466 fseq1p1m1 13613 2ffzeq 13664 fvinim0ffz 13800 injresinjlem 13801 fsequb2 13992 fseqsupcl 13993 fseqsupubi 13994 ser0f 14071 hashgval 14349 hashinf 14351 hashresfn 14356 ffz0hash 14463 fnfzo0hash 14466 wrdred1hash 14577 revlen 14778 revrev 14783 repswlen 14792 repsdf2 14794 cshword 14807 0csh0 14809 lenco 14849 s1co 14850 cshco 14853 swrdco 14854 s7f1o 14983 ofccat 14986 shftf 15096 uzin2 15361 rexanuz 15362 limsuple 15492 limsupval2 15494 rlimres 15572 lo1res 15573 rlimresb 15579 isercolllem2 15680 isercolllem3 15681 isercoll 15682 supcvg 15870 prodf1f 15906 eff2 16115 reeff1 16136 tanval 16144 ruclem4 16250 ruclem12 16257 prmreclem6 16939 1arithlem4 16944 1arith 16945 vdwmc 16996 vdwlem1 16999 vdwlem8 17006 vdwlem13 17011 ramval 17026 0ram 17038 0ram2 17039 0ramcl 17041 ramcl 17047 fsets 17186 firest 17444 0ssc 17848 0subcat 17849 isfull2 17924 arwhoma 18056 gsumval2a 18661 isgrpinv 18974 kerf1ghm 19228 f1omvdconj 19425 pmtrmvd 19435 pmtrfinv 19440 pmtrdifellem4 19458 efgsfo 19718 efgredlem 19726 efgcpbllemb 19734 frgpup3lem 19756 0frgp 19758 gexex 19832 torsubg 19833 gsumval3 19886 gsumzres 19888 gsummptmhm 19919 gsumzoppg 19923 dprdf1o 20013 dprd2db 20024 zrinitorngc 20600 zrtermorngc 20601 zrtermoringc 20633 srngf1o 20806 lmhmima 21003 lmhmpreima 21004 lmhmrnlss 21006 lspextmo 21012 pwssplit1 21015 cnfldadd 21319 cnfldmul 21321 dfcnfldOLD 21329 cnfldplusf 21357 cnfldsub 21358 chrrhm 21490 znunit 21522 psgnevpmb 21545 psgndiflemB 21558 mpofrlmd 21735 frlmipval 21737 frlmphl 21739 frlmlbs 21755 frlmup4 21759 ellspd 21760 lindfmm 21785 lsslindf 21788 psrbaglefi 21884 psrlidm 21920 mplmonmul 21992 evlseu 22039 mpfconst 22057 mpfproj 22058 mpfsubrg 22059 coe1sclmulfv 22218 pf1const 22282 pf1id 22283 pf1subrg 22284 mpfpf1 22287 pf1mpf 22288 mamuass 22338 mamudi 22339 mamudir 22340 mamuvs1 22341 mamuvs2 22342 1mavmul 22484 mavmulass 22485 mdetunilem7 22554 madutpos 22578 lecldbas 23155 lmbr2 23195 cncnpi 23214 cncnp 23216 cnpdis 23229 lmff 23237 pnrmopn 23279 dnsconst 23314 cmpsub 23336 tgcmp 23337 hauscmplem 23342 2ndcctbss 23391 2ndcomap 23394 2ndcsep 23395 1stccnp 23398 kgenidm 23483 iskgen2 23484 1stckgen 23490 kgen2cn 23495 ptpjpre1 23507 pttop 23518 ptuni 23530 ptval2 23537 tx1cn 23545 tx2cn 23546 ptpjcn 23547 ptpjopn 23548 ptclsg 23551 ptcnplem 23557 upxp 23559 txcnmpt 23560 uptx 23561 txcmplem2 23578 txkgen 23588 xkoptsub 23590 xkopt 23591 xkococnlem 23595 xkococn 23596 ptcmpfi 23749 zfbas 23832 uzrest 23833 rnelfmlem 23888 rnelfm 23889 fmfnfmlem2 23891 fmfnfm 23894 lmflf 23941 alexsubALT 23987 clssubg 24045 qustgplem 24057 tsmsres 24080 tsmsxplem1 24089 ucncn 24221 xmettpos 24286 imasdsf1olem 24310 blrnps 24345 blrn 24346 xmeterval 24369 tmslem 24419 tmsxms 24423 imasf1oxms 24426 prdsxms 24467 blval2 24499 metuel2 24502 isngp2 24534 isngp3 24535 tngngp2 24589 isnghm 24660 qtopbaslem 24695 qdensere 24706 cnbl0 24710 cnblcld 24711 cnfldms 24712 blssioo 24732 tgioo 24733 tgqioo 24737 xrtgioo 24744 xrsdsre 24748 xrge0tsms 24772 iimulcnOLD 24884 bndth 24906 lebnumlem3 24911 nmhmcn 25069 cphsqrtcl 25134 lmmbr2 25209 caucfil 25233 causs 25248 lmcau 25263 bcth3 25281 cncms 25305 cnfldcusp 25307 rrxmvallem 25354 ivthicc 25409 ovolfioo 25418 ovolficc 25419 ovolficcss 25420 ovollb2lem 25439 ovoliunlem2 25454 ovolshftlem1 25460 ovolicc2 25473 ismbl 25477 voliunlem2 25502 volsup 25507 ioorf 25524 ioorinv 25527 ioorcl 25528 uniiccdif 25529 uniioovol 25530 uniiccvol 25531 uniioombllem2 25534 uniioombllem4 25537 dyaddisj 25547 dyadmax 25549 dyadmbllem 25550 dyadmbl 25551 opnmbllem 25552 opnmblALT 25554 volsup2 25556 mbfdm 25577 mbfima 25581 mbfid 25586 ismbfd 25590 mbfres2 25596 mbfposr 25603 mbfimaopnlem 25606 mbflimsup 25617 0plef 25623 i1f1lem 25640 itg11 25642 itg1addlem4 25650 i1fpos 25657 itg1le 25664 itg1climres 25665 mbfi1fseqlem5 25670 mbfi1flimlem 25673 xrge0f 25682 itg2ge0 25686 itg2seq 25693 itg2i1fseqle 25705 itg2i1fseq2 25707 itg2addlem 25709 itg2gt0 25711 limciun 25845 dvres 25862 dvres3a 25865 cpnres 25889 dvfre 25905 dvmptres3 25910 dvlip2 25950 dvgt0lem2 25958 deg1fvi 26040 uc1pmon1p 26107 fta1g 26125 ig1peu 26130 ig1pdvds 26135 plyco0 26147 plypf1 26167 dgrlem 26184 dgrub 26189 dgrlb 26191 coemulc 26210 plyreres 26240 plydivlem3 26253 plydivlem4 26254 plydiveu 26256 plyremlem 26262 fta1lem 26265 fta1 26266 vieta1lem2 26269 plyexmo 26271 elaa 26274 elqaalem3 26279 aannenlem1 26286 pserulm 26381 psercnlem2 26384 psercnlem1 26385 psercn 26386 abelth 26401 reeff1o 26407 pilem1 26411 recosf1o 26494 resinf1o 26495 efif1olem3 26503 efif1olem4 26504 efifo 26506 eff1olem 26507 ellogrn 26518 logcn 26606 dvloglem 26607 logf1o2 26609 efopnlem1 26615 efopnlem2 26616 efopn 26617 logtayl 26619 cxpcn3lem 26707 cxpcn3 26708 resqrtcn 26709 asinneg 26846 areambl 26918 emcllem7 26962 lgamgulm2 26996 basellem4 27044 sqff1o 27142 mpodvdsmulf1o 27154 fsumdvdsmul 27155 dvdsmulf1o 27156 fsumdvdsmulOLD 27157 ostthlem1 27588 ostth 27600 noetasuplem4 27698 madeval2 27809 elold 27825 old1 27831 madeoldsuc 27840 tglnfn 28472 f1otrg 28796 axlowdimlem6 28872 axlowdimlem8 28874 axlowdimlem9 28875 axlowdimlem11 28877 axlowdimlem12 28878 axlowdimlem17 28883 elntg2 28910 dfpth2 29657 cyclnumvtx 29728 crctcshlem4 29748 clwlkclwwlklem2 29927 eucrct2eupth 30172 ex-fpar 30389 cnnvm 30609 sspmlem 30659 nvo00 30688 nmlno0lem 30720 phoeqi 30784 ubthlem1 30797 hhip 31104 hhssabloilem 31188 hhssnv 31191 hhsssh 31196 occllem 31230 shsel 31241 chscllem2 31565 df0op2 31679 hoeq 31687 hocofni 31694 hoaddfni 31697 hosubfni 31698 hon0 31720 ho01i 31755 hoeq1 31757 elnlfn 31855 nmlnop0iALT 31922 lnopco0i 31931 imaelshi 31985 nlelchi 31988 rnbra 32034 cnvbraval 32037 kbass5 32047 hmopidmchi 32078 hmopidmpji 32079 foresf1o 32431 fcomptf 32582 ofpreima 32589 resf1o 32653 maprnin 32654 fpwrelmapffslem 32655 hashgt1 32733 indpi1 32783 indpreima 32788 s3clhash 32869 gsumpart 32997 xrge0tsmsd 33002 tocyc01 33075 cyc3evpm 33107 cycpmgcl 33110 cycpmconjslem2 33112 cyc3conja 33114 kerunit 33287 1arithidomlem1 33496 1arithidomlem2 33497 1arithidom 33498 dimval 33586 dimvalfi 33587 ply1degltdimlem 33608 ply1degltdim 33609 elirng 33673 txomap 33811 locfinreflem 33817 hauseqcn 33875 xpinpreima 33883 xpinpreima2 33884 tpr2rico 33889 mndpluscn 33903 raddcn 33906 xrge0pluscn 33917 xrge0tmdALT 33923 rge0scvg 33926 pl1cn 33932 elzrhunit 33954 qqhf 33963 cnrrext 33987 qqhre 33997 1stmbfm 34238 2ndmbfm 34239 mbfmcnt 34246 omssubadd 34278 carsggect 34296 eulerpartlemsv2 34336 eulerpartlems 34338 eulerpartlemv 34342 eulerpartlemb 34346 eulerpartlemf 34348 eulerpartlemt 34349 eulerpartlemmf 34353 eulerpartlemgvv 34354 eulerpartlemgh 34356 eulerpartlemgs2 34358 sseqmw 34369 sseqf 34370 sseqp1 34373 fiblem 34376 fibp1 34379 plymul02 34524 signsvtn0 34548 signstres 34553 signshlen 34568 reprinrn 34596 circlemethhgt 34621 txsconnlem 35208 iccllysconn 35218 rellysconn 35219 cvmseu 35244 cvmliftmolem2 35250 cvmliftlem6 35258 cvmliftlem7 35259 cvmliftlem8 35260 cvmliftlem9 35261 cvmliftlem11 35263 cvmliftlem15 35266 cvmlift2lem7 35277 cvmlift2lem10 35280 cvmlift3lem8 35294 cvmlift3lem9 35295 mvrsfpw 35474 mrsubff1 35482 msrid 35513 msrfo 35514 elmsta 35516 mtyf 35520 msubff1 35524 vhmcls 35534 mclsax 35537 elmthm 35544 mthmblem 35548 mclsppslem 35551 iprodefisumlem 35703 fullfunfnv 35910 fullfunfv 35911 tailfb 36341 filnetlem4 36345 taupilem3 37283 icoreresf 37316 icoreelrnab 37318 relowlssretop 37327 relowlpssretop 37328 unccur 37573 matunitlindflem1 37586 matunitlindflem2 37587 ptrecube 37590 poimirlem28 37618 poimirlem32 37622 heicant 37625 opnmbllem0 37626 mblfinlem1 37627 mblfinlem2 37628 volsupnfl 37635 cnambfre 37638 dvtan 37640 itg2addnclem 37641 itg2addnclem2 37642 ftc1anclem3 37665 ftc1anclem5 37667 ftc1anclem7 37669 ftc1anclem8 37670 ftc1anc 37671 areacirc 37683 indexdom 37704 sdclem2 37712 sstotbnd2 37744 sstotbnd 37745 isbndx 37752 isbnd3b 37755 prdsbnd 37763 prdstotbnd 37764 ismtyhmeolem 37774 heibor1lem 37779 heiborlem1 37781 heibor 37791 rrnequiv 37805 keridl 38002 ellkr 39053 lkr0f 39058 cdleme50rnlem 40509 aks6d1c2lem4 42086 aks6d1c5 42098 sticksstones11 42115 sticksstones19 42124 sticksstones22 42127 aks6d1c6lem4 42132 aks6d1c6isolem2 42134 fsuppind 42560 elrfirn 42665 ismrcd2 42669 isnacs2 42676 nacsfix 42682 mapfzcons1 42687 mzpcompact2lem 42721 eq0rabdioph 42746 eldioph4b 42781 diophren 42783 pw2f1ocnv 43008 pw2f1o2val2 43011 lmhmfgsplit 43057 pwssplit4 43060 hbt 43101 mpaaeu 43121 mendring 43159 proot1mul 43165 proot1hash 43166 proot1ex 43167 deg1mhm 43171 fgraphopab 43174 hausgraph 43176 nvocnvb 43393 ofsubid 44296 expgrowthi 44305 expgrowth 44307 binomcxplemdvbinom 44325 binomcxplemcvg 44326 binomcxplemnotnn0 44328 relpfrlem 44926 rfcnpre1 44991 rfcnpre2 45003 cncmpmax 45004 rfcnpre3 45005 rfcnpre4 45006 elixpconstg 45061 ffi 45145 islptre 45596 resincncf 45852 dvcosre 45889 dvresntr 45895 volioof 45964 stoweidlem48 46025 fourierdlem12 46096 fourierdlem15 46099 fourierdlem41 46125 fourierdlem42 46126 fourierdlem46 46129 fourierdlem48 46131 fourierdlem49 46132 fourierdlem54 46137 fourierdlem56 46139 fourierdlem62 46145 fourierdlem64 46147 fourierdlem65 46148 fourierdlem73 46156 fourierdlem74 46157 fourierdlem75 46158 fourierdlem102 46185 fourierdlem103 46186 fourierdlem104 46187 fourierdlem114 46197 sge0split 46386 elhoi 46519 mbfresmf 46716 cfsetsnfsetf1 47036 cfsetsnfsetfo 47037 focofob 47057 f1ocof1ob 47058 fafvelcdm 47147 ffnafv 47148 fafv2elcdm 47211 fafv2elrnb 47212 imarnf1pr 47259 2ffzoeq 47304 fundcmpsurbijinjpreimafv 47369 fundcmpsurinjimaid 47373 fargshiftfv 47401 fargshiftf 47402 fargshiftf1 47403 fargshiftfo 47404 cycl3grtri 47907 fdmdifeqresdif 48265 fdivmpt 48468 fdivmptf 48469 refdivmptf 48470 1arymaptf1 48570 2arymaptf1 48581 ackfnnn0 48613 homf0 48932 aacllem 49613

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