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Theorem ffn 6655

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 6489	. 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 3883 ran crn 5619 Fn wfn 6480 ⟶wf 6481

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 208 df-an 397 df-f 6489

This theorem is referenced by: ffnd 6656 ffun 6658 frel 6660 fdm 6664 ffrn 6668 fresin 6696 fresaun 6698 fresaunres2 6699 fcoi1 6701 feu 6703 f0bi 6710 dffo2 6743 fimadmfo 6748 fdmeu 6883 feqmptdf 6897 fimarab 6901 fvco3 6927 ffvelcdm 7022 dff2 7040 dffo3 7043 dffo4 7044 dffo5 7045 dffo3f 7047 f1ompt 7052 ffnfv 7060 fcdmssb 7063 fcompt 7075 fsn2 7078 fprb 7138 fconst2g 7147 fpr2g 7155 fex 7170 dff13 7198 nvocnv 7225 soisores 7271 fdmexb 7847 resf1extb 7874 fo1stres 7957 fo2ndres 7958 1stcof 7961 2ndcof 7962 curry1f 8045 curry2f 8047 fparlem1 8051 fparlem2 8052 fo2ndf 8060 soseq 8099 tposf2 8190 smo11 8294 fsetexb 8801 mapsnd 8824 pw2f1olem 9009 mapen 9069 mapunen 9074 fissuni 9257 fipreima 9258 indexfi 9260 mapfien 9311 oismo 9445 cantnflt 9584 cantnfp1lem3 9592 cantnflem4 9604 tcrank 9799 updjudhcoinlf 9847 updjudhcoinrg 9848 updjud 9849 infpwfien 9975 cardinfima 10010 dfacacn 10055 cfflb 10172 cofsmo 10182 cfcoflem 10185 coftr 10186 fin23lem40 10264 axdc3lem2 10364 ac6num 10392 ac6c4 10394 ac6s2 10399 ttukeylem6 10427 iunfo 10452 pwcfsdom 10497 fpwwe2lem5 10549 fpwwe2lem7 10551 pwfseqlem3 10574 inar1 10689 tskcard 10695 tskuni 10697 tskurn 10703 gruima 10716 nqerrel 10846 recmulnq 10878 dmrecnq 10882 axpre-sup 11083 ofsubeq0 12147 indpi1 12164 dfz2 12534 uzn0 12796 rpnnen1lem3 12920 rpnnen1lem5 12922 unirnioo 13393 dfioo2 13394 ioorebas 13395 fseq1p1m1 13543 2ffzeq 13594 fvinim0ffz 13735 injresinjlem 13736 fsequb2 13929 fseqsupcl 13930 fseqsupubi 13931 ser0f 14008 hashgval 14286 hashinf 14288 hashresfn 14293 ffz0hash 14400 fnfzo0hash 14403 wrdred1hash 14514 revlen 14715 revrev 14720 repswlen 14729 repsdf2 14731 cshword 14744 0csh0 14746 lenco 14785 s1co 14786 cshco 14789 swrdco 14790 s7f1o 14919 ofccat 14922 shftf 15032 uzin2 15298 rexanuz 15299 limsuple 15431 limsupval2 15433 rlimres 15511 lo1res 15512 rlimresb 15518 isercolllem2 15619 isercolllem3 15620 isercoll 15621 supcvg 15812 prodf1f 15848 eff2 16057 reeff1 16078 tanval 16086 ruclem4 16192 ruclem12 16199 prmreclem6 16883 1arithlem4 16888 1arith 16889 vdwmc 16940 vdwlem1 16943 vdwlem8 16950 vdwlem13 16955 ramval 16970 0ram 16982 0ram2 16983 0ramcl 16985 ramcl 16991 fsets 17130 firest 17386 0ssc 17795 0subcat 17796 isfull2 17871 arwhoma 18003 gsumval2a 18644 isgrpinv 18960 kerf1ghm 19213 f1omvdconj 19412 pmtrmvd 19422 pmtrfinv 19427 pmtrdifellem4 19445 efgsfo 19705 efgredlem 19713 efgcpbllemb 19721 frgpup3lem 19743 0frgp 19745 gexex 19819 torsubg 19820 gsumval3 19873 gsumzres 19875 gsummptmhm 19906 gsumzoppg 19910 dprdf1o 20000 dprd2db 20011 zrinitorngc 20614 zrtermorngc 20615 zrtermoringc 20647 srngf1o 20820 lmhmima 21037 lmhmpreima 21038 lmhmrnlss 21040 lspextmo 21046 pwssplit1 21049 cnfldadd 21353 cnfldmul 21355 cnfldplusf 21374 cnfldsub 21375 chrrhm 21506 znunit 21538 psgnevpmb 21562 psgndiflemB 21575 mpofrlmd 21752 frlmipval 21754 frlmphl 21756 frlmlbs 21772 frlmup4 21776 ellspd 21777 lindfmm 21802 lsslindf 21805 psrbaglefi 21901 psrlidm 21936 mplmonmul 22012 evlseu 22059 mpfconst 22085 mpfproj 22086 mpfsubrg 22087 coe1sclmulfv 22269 pf1const 22332 pf1id 22333 pf1subrg 22334 mpfpf1 22337 pf1mpf 22338 mamuass 22385 mamudi 22386 mamudir 22387 mamuvs1 22388 mamuvs2 22389 1mavmul 22531 mavmulass 22532 mdetunilem7 22601 madutpos 22625 lecldbas 23202 lmbr2 23242 cncnpi 23261 cncnp 23263 cnpdis 23276 lmff 23284 pnrmopn 23326 dnsconst 23361 cmpsub 23383 tgcmp 23384 hauscmplem 23389 2ndcctbss 23438 2ndcomap 23441 2ndcsep 23442 1stccnp 23445 kgenidm 23530 iskgen2 23531 1stckgen 23537 kgen2cn 23542 ptpjpre1 23554 pttop 23565 ptuni 23577 ptval2 23584 tx1cn 23592 tx2cn 23593 ptpjcn 23594 ptpjopn 23595 ptclsg 23598 ptcnplem 23604 upxp 23606 txcnmpt 23607 uptx 23608 txcmplem2 23625 txkgen 23635 xkoptsub 23637 xkopt 23638 xkococnlem 23642 xkococn 23643 ptcmpfi 23796 zfbas 23879 uzrest 23880 rnelfmlem 23935 rnelfm 23936 fmfnfmlem2 23938 fmfnfm 23941 lmflf 23988 alexsubALT 24034 clssubg 24092 qustgplem 24104 tsmsres 24127 tsmsxplem1 24136 ucncn 24267 xmettpos 24332 imasdsf1olem 24356 blrnps 24391 blrn 24392 xmeterval 24415 tmslem 24465 tmsxms 24469 imasf1oxms 24472 prdsxms 24513 blval2 24545 metuel2 24548 isngp2 24580 isngp3 24581 tngngp2 24635 isnghm 24706 qtopbaslem 24741 qdensere 24752 cnbl0 24756 cnblcld 24757 cnfldms 24758 blssioo 24778 tgioo 24779 tgqioo 24783 xrtgioo 24790 xrsdsre 24794 xrge0tsms 24818 bndth 24943 lebnumlem3 24948 nmhmcn 25105 cphsqrtcl 25169 lmmbr2 25244 caucfil 25268 causs 25283 lmcau 25298 bcth3 25316 cncms 25340 cnfldcusp 25342 rrxmvallem 25389 ivthicc 25443 ovolfioo 25452 ovolficc 25453 ovolficcss 25454 ovollb2lem 25473 ovoliunlem2 25488 ovolshftlem1 25494 ovolicc2 25507 ismbl 25511 voliunlem2 25536 volsup 25541 ioorf 25558 ioorinv 25561 ioorcl 25562 uniiccdif 25563 uniioovol 25564 uniiccvol 25565 uniioombllem2 25568 uniioombllem4 25571 dyaddisj 25581 dyadmax 25583 dyadmbllem 25584 dyadmbl 25585 opnmbllem 25586 opnmblALT 25588 volsup2 25590 mbfdm 25611 mbfima 25615 mbfid 25620 ismbfd 25624 mbfres2 25630 mbfposr 25637 mbfimaopnlem 25640 mbflimsup 25651 0plef 25657 i1f1lem 25674 itg11 25676 itg1addlem4 25684 i1fpos 25691 itg1le 25698 itg1climres 25699 mbfi1fseqlem5 25704 mbfi1flimlem 25707 xrge0f 25716 itg2ge0 25720 itg2seq 25727 itg2i1fseqle 25739 itg2i1fseq2 25741 itg2addlem 25743 itg2gt0 25745 limciun 25879 dvres 25896 dvres3a 25899 cpnres 25922 dvfre 25936 dvmptres3 25941 dvlip2 25980 dvgt0lem2 25988 deg1fvi 26068 uc1pmon1p 26135 fta1g 26153 ig1peu 26158 ig1pdvds 26163 plyco0 26175 plypf1 26195 dgrlem 26212 dgrub 26217 dgrlb 26219 coemulc 26238 plyreres 26267 plydivlem3 26279 plydivlem4 26280 plydiveu 26282 plyremlem 26288 fta1lem 26291 fta1 26292 vieta1lem2 26295 plyexmo 26297 elaa 26300 elqaalem3 26305 aannenlem1 26312 pserulm 26405 psercnlem2 26407 psercnlem1 26408 psercn 26409 abelth 26424 reeff1o 26430 pilem1 26434 recosf1o 26517 resinf1o 26518 efif1olem3 26526 efif1olem4 26527 efifo 26529 eff1olem 26530 ellogrn 26541 logcn 26629 dvloglem 26630 logf1o2 26632 efopnlem1 26638 efopnlem2 26639 efopn 26640 logtayl 26642 cxpcn3lem 26729 cxpcn3 26730 resqrtcn 26731 asinneg 26868 areambl 26940 emcllem7 26983 lgamgulm2 27017 basellem4 27065 sqff1o 27163 mpodvdsmulf1o 27175 fsumdvdsmul 27176 dvdsmulf1o 27177 ostthlem1 27608 ostth 27620 noetasuplem4 27718 madeval2 27843 elold 27869 old1 27875 madeoldsuc 27895 tglnfn 28633 f1otrg 28957 axlowdimlem6 29034 axlowdimlem8 29036 axlowdimlem9 29037 axlowdimlem11 29039 axlowdimlem12 29040 axlowdimlem17 29045 elntg2 29072 dfpth2 29815 cyclnumvtx 29886 crctcshlem4 29906 clwlkclwwlklem2 30088 eucrct2eupth 30333 ex-fpar 30550 cnnvm 30771 sspmlem 30821 nvo00 30850 nmlno0lem 30882 phoeqi 30946 ubthlem1 30959 hhip 31266 hhssabloilem 31350 hhssnv 31353 hhsssh 31358 occllem 31392 shsel 31403 chscllem2 31727 df0op2 31841 hoeq 31849 hocofni 31856 hoaddfni 31859 hosubfni 31860 hon0 31882 ho01i 31917 hoeq1 31919 elnlfn 32017 nmlnop0iALT 32084 lnopco0i 32093 imaelshi 32147 nlelchi 32150 rnbra 32196 cnvbraval 32199 kbass5 32209 hmopidmchi 32240 hmopidmpji 32241 foresf1o 32592 fcomptf 32750 ofpreima 32757 resf1o 32822 maprnin 32823 fpwrelmapffslem 32824 hashgt1 32900 indpreima 32944 s3clhash 33027 gsumpart 33144 xrge0tsmsd 33154 tocyc01 33199 cyc3evpm 33231 cycpmgcl 33234 cycpmconjslem2 33236 cyc3conja 33238 kerunit 33408 1arithidomlem1 33618 1arithidomlem2 33619 1arithidom 33620 psrmonmul 33734 dimval 33785 dimvalfi 33786 ply1degltdimlem 33806 ply1degltdim 33807 elirng 33870 txomap 34018 locfinreflem 34024 hauseqcn 34082 xpinpreima 34090 xpinpreima2 34091 tpr2rico 34096 mndpluscn 34110 raddcn 34113 xrge0pluscn 34124 xrge0tmdALT 34130 rge0scvg 34133 pl1cn 34139 elzrhunit 34161 qqhf 34170 cnrrext 34194 qqhre 34204 1stmbfm 34444 2ndmbfm 34445 mbfmcnt 34452 omssubadd 34484 carsggect 34502 eulerpartlemsv2 34542 eulerpartlems 34544 eulerpartlemv 34548 eulerpartlemb 34552 eulerpartlemf 34554 eulerpartlemt 34555 eulerpartlemmf 34559 eulerpartlemgvv 34560 eulerpartlemgh 34562 eulerpartlemgs2 34564 sseqmw 34575 sseqf 34576 sseqp1 34579 fiblem 34582 fibp1 34585 plymul02 34730 signsvtn0 34754 signstres 34759 signshlen 34774 reprinrn 34802 circlemethhgt 34827 txsconnlem 35468 iccllysconn 35478 rellysconn 35479 cvmseu 35504 cvmliftmolem2 35510 cvmliftlem6 35518 cvmliftlem7 35519 cvmliftlem8 35520 cvmliftlem9 35521 cvmliftlem11 35523 cvmliftlem15 35526 cvmlift2lem7 35537 cvmlift2lem10 35540 cvmlift3lem8 35554 cvmlift3lem9 35555 mvrsfpw 35734 mrsubff1 35742 msrid 35773 msrfo 35774 elmsta 35776 mtyf 35780 msubff1 35784 vhmcls 35794 mclsax 35797 elmthm 35804 mthmblem 35808 mclsppslem 35811 iprodefisumlem 35968 fullfunfnv 36174 fullfunfv 36175 tailfb 36605 filnetlem4 36609 regsfromunir1 36768 taupilem3 37679 icoreresf 37714 icoreelrnab 37716 relowlssretop 37725 relowlpssretop 37726 unccur 37970 matunitlindflem1 37983 matunitlindflem2 37984 ptrecube 37987 poimirlem28 38015 poimirlem32 38019 heicant 38022 opnmbllem0 38023 mblfinlem1 38024 mblfinlem2 38025 volsupnfl 38032 cnambfre 38035 dvtan 38037 itg2addnclem 38038 itg2addnclem2 38039 ftc1anclem3 38062 ftc1anclem5 38064 ftc1anclem7 38066 ftc1anclem8 38067 ftc1anc 38068 areacirc 38080 indexdom 38101 sdclem2 38109 sstotbnd2 38141 sstotbnd 38142 isbndx 38149 isbnd3b 38152 prdsbnd 38160 prdstotbnd 38161 ismtyhmeolem 38171 heibor1lem 38176 heiborlem1 38178 heibor 38188 rrnequiv 38202 keridl 38399 ellkr 39581 lkr0f 39586 cdleme50rnlem 41036 aks6d1c2lem4 42612 aks6d1c5 42624 sticksstones11 42641 sticksstones19 42650 sticksstones22 42653 aks6d1c6lem4 42658 aks6d1c6isolem2 42660 fsuppind 43040 elrfirn 43144 ismrcd2 43148 isnacs2 43155 nacsfix 43161 mapfzcons1 43166 mzpcompact2lem 43200 eq0rabdioph 43225 eldioph4b 43256 diophren 43258 pw2f1ocnv 43482 pw2f1o2val2 43485 lmhmfgsplit 43531 pwssplit4 43534 hbt 43575 mpaaeu 43595 mendring 43633 proot1mul 43639 proot1hash 43640 proot1ex 43641 deg1mhm 43645 fgraphopab 43648 hausgraph 43650 nvocnvb 43866 ofsubid 44768 expgrowthi 44777 expgrowth 44779 binomcxplemdvbinom 44797 binomcxplemcvg 44798 binomcxplemnotnn0 44800 relpfrlem 45397 rfcnpre1 45467 rfcnpre2 45479 cncmpmax 45480 rfcnpre3 45481 rfcnpre4 45482 elixpconstg 45536 ffi 45620 islptre 46064 resincncf 46318 dvcosre 46355 dvresntr 46361 volioof 46430 stoweidlem48 46491 fourierdlem12 46562 fourierdlem15 46565 fourierdlem41 46591 fourierdlem42 46592 fourierdlem46 46595 fourierdlem48 46597 fourierdlem49 46598 fourierdlem54 46603 fourierdlem56 46605 fourierdlem62 46611 fourierdlem64 46613 fourierdlem65 46614 fourierdlem73 46622 fourierdlem74 46623 fourierdlem75 46624 fourierdlem102 46651 fourierdlem103 46652 fourierdlem104 46653 fourierdlem114 46663 sge0split 46852 elhoi 46985 mbfresmf 47182 cjnpoly 47352 cfsetsnfsetf1 47522 cfsetsnfsetfo 47523 focofob 47543 f1ocof1ob 47544 fafvelcdm 47633 ffnafv 47634 fafv2elcdm 47697 fafv2elrnb 47698 imarnf1pr 47745 2ffzoeq 47791 fundcmpsurbijinjpreimafv 47882 fundcmpsurinjimaid 47886 fargshiftfv 47914 fargshiftf 47915 fargshiftf1 47916 fargshiftfo 47917 cycl3grtri 48438 fdmdifeqresdif 48833 fdivmpt 49031 fdivmptf 49032 refdivmptf 49033 1arymaptf1 49133 2arymaptf1 49144 ackfnnn0 49176 homf0 49499 aacllem 50291

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