ffn - Metamath Proof Explorer

	Metamath Proof Explorer		< Previous Next > Nearby theorems
Mirrors > Home > MPE Home > Th. List > ffn		Structured version Visualization version GIF version

Theorem ffn 6663

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 6497	. 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 3902 ran crn 5626 Fn wfn 6488 ⟶wf 6489

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 6497

This theorem is referenced by: ffnd 6664 ffun 6666 frel 6668 fdm 6672 ffrn 6676 fresin 6704 fresaun 6706 fresaunres2 6707 fcoi1 6709 feu 6711 f0bi 6718 dffo2 6751 fimadmfo 6756 fdmeu 6891 feqmptdf 6905 fimarab 6909 fvco3 6934 ffvelcdm 7028 dff2 7046 dffo3 7049 dffo4 7050 dffo5 7051 dffo3f 7053 f1ompt 7058 ffnfv 7066 fcdmssb 7069 fcompt 7080 fsn2 7083 fprb 7142 fconst2g 7151 fpr2g 7159 fex 7174 dff13 7202 nvocnv 7229 soisores 7275 fdmexb 7851 resf1extb 7878 fo1stres 7961 fo2ndres 7962 1stcof 7965 2ndcof 7966 curry1f 8050 curry2f 8052 fparlem1 8056 fparlem2 8057 fo2ndf 8065 soseq 8103 tposf2 8194 smo11 8298 fsetexb 8805 mapsnd 8828 pw2f1olem 9013 mapen 9073 mapunen 9078 fissuni 9261 fipreima 9262 indexfi 9264 mapfien 9315 oismo 9449 cantnflt 9585 cantnfp1lem3 9593 cantnflem4 9605 tcrank 9800 updjudhcoinlf 9848 updjudhcoinrg 9849 updjud 9850 infpwfien 9976 cardinfima 10011 dfacacn 10056 cfflb 10173 cofsmo 10183 cfcoflem 10186 coftr 10187 fin23lem40 10265 axdc3lem2 10365 ac6num 10393 ac6c4 10395 ac6s2 10400 ttukeylem6 10428 iunfo 10453 pwcfsdom 10498 fpwwe2lem5 10550 fpwwe2lem7 10552 pwfseqlem3 10575 inar1 10690 tskcard 10696 tskuni 10698 tskurn 10704 gruima 10717 nqerrel 10847 recmulnq 10879 dmrecnq 10883 axpre-sup 11084 ofsubeq0 12146 dfz2 12511 uzn0 12772 rpnnen1lem3 12896 rpnnen1lem5 12898 unirnioo 13369 dfioo2 13370 ioorebas 13371 fseq1p1m1 13518 2ffzeq 13569 fvinim0ffz 13709 injresinjlem 13710 fsequb2 13903 fseqsupcl 13904 fseqsupubi 13905 ser0f 13982 hashgval 14260 hashinf 14262 hashresfn 14267 ffz0hash 14374 fnfzo0hash 14377 wrdred1hash 14488 revlen 14689 revrev 14694 repswlen 14703 repsdf2 14705 cshword 14718 0csh0 14720 lenco 14759 s1co 14760 cshco 14763 swrdco 14764 s7f1o 14893 ofccat 14896 shftf 15006 uzin2 15272 rexanuz 15273 limsuple 15405 limsupval2 15407 rlimres 15485 lo1res 15486 rlimresb 15492 isercolllem2 15593 isercolllem3 15594 isercoll 15595 supcvg 15783 prodf1f 15819 eff2 16028 reeff1 16049 tanval 16057 ruclem4 16163 ruclem12 16170 prmreclem6 16853 1arithlem4 16858 1arith 16859 vdwmc 16910 vdwlem1 16913 vdwlem8 16920 vdwlem13 16925 ramval 16940 0ram 16952 0ram2 16953 0ramcl 16955 ramcl 16961 fsets 17100 firest 17356 0ssc 17765 0subcat 17766 isfull2 17841 arwhoma 17973 gsumval2a 18614 isgrpinv 18927 kerf1ghm 19180 f1omvdconj 19379 pmtrmvd 19389 pmtrfinv 19394 pmtrdifellem4 19412 efgsfo 19672 efgredlem 19680 efgcpbllemb 19688 frgpup3lem 19710 0frgp 19712 gexex 19786 torsubg 19787 gsumval3 19840 gsumzres 19842 gsummptmhm 19873 gsumzoppg 19877 dprdf1o 19967 dprd2db 19978 zrinitorngc 20579 zrtermorngc 20580 zrtermoringc 20612 srngf1o 20785 lmhmima 21003 lmhmpreima 21004 lmhmrnlss 21006 lspextmo 21012 pwssplit1 21015 cnfldadd 21319 cnfldmul 21321 dfcnfldOLD 21329 cnfldplusf 21355 cnfldsub 21356 chrrhm 21490 znunit 21522 psgnevpmb 21546 psgndiflemB 21559 mpofrlmd 21736 frlmipval 21738 frlmphl 21740 frlmlbs 21756 frlmup4 21760 ellspd 21761 lindfmm 21786 lsslindf 21789 psrbaglefi 21886 psrlidm 21921 mplmonmul 21995 evlseu 22042 mpfconst 22068 mpfproj 22069 mpfsubrg 22070 coe1sclmulfv 22229 pf1const 22294 pf1id 22295 pf1subrg 22296 mpfpf1 22299 pf1mpf 22300 mamuass 22350 mamudi 22351 mamudir 22352 mamuvs1 22353 mamuvs2 22354 1mavmul 22496 mavmulass 22497 mdetunilem7 22566 madutpos 22590 lecldbas 23167 lmbr2 23207 cncnpi 23226 cncnp 23228 cnpdis 23241 lmff 23249 pnrmopn 23291 dnsconst 23326 cmpsub 23348 tgcmp 23349 hauscmplem 23354 2ndcctbss 23403 2ndcomap 23406 2ndcsep 23407 1stccnp 23410 kgenidm 23495 iskgen2 23496 1stckgen 23502 kgen2cn 23507 ptpjpre1 23519 pttop 23530 ptuni 23542 ptval2 23549 tx1cn 23557 tx2cn 23558 ptpjcn 23559 ptpjopn 23560 ptclsg 23563 ptcnplem 23569 upxp 23571 txcnmpt 23572 uptx 23573 txcmplem2 23590 txkgen 23600 xkoptsub 23602 xkopt 23603 xkococnlem 23607 xkococn 23608 ptcmpfi 23761 zfbas 23844 uzrest 23845 rnelfmlem 23900 rnelfm 23901 fmfnfmlem2 23903 fmfnfm 23906 lmflf 23953 alexsubALT 23999 clssubg 24057 qustgplem 24069 tsmsres 24092 tsmsxplem1 24101 ucncn 24232 xmettpos 24297 imasdsf1olem 24321 blrnps 24356 blrn 24357 xmeterval 24380 tmslem 24430 tmsxms 24434 imasf1oxms 24437 prdsxms 24478 blval2 24510 metuel2 24513 isngp2 24545 isngp3 24546 tngngp2 24600 isnghm 24671 qtopbaslem 24706 qdensere 24717 cnbl0 24721 cnblcld 24722 cnfldms 24723 blssioo 24743 tgioo 24744 tgqioo 24748 xrtgioo 24755 xrsdsre 24759 xrge0tsms 24783 iimulcnOLD 24895 bndth 24917 lebnumlem3 24922 nmhmcn 25080 cphsqrtcl 25144 lmmbr2 25219 caucfil 25243 causs 25258 lmcau 25273 bcth3 25291 cncms 25315 cnfldcusp 25317 rrxmvallem 25364 ivthicc 25419 ovolfioo 25428 ovolficc 25429 ovolficcss 25430 ovollb2lem 25449 ovoliunlem2 25464 ovolshftlem1 25470 ovolicc2 25483 ismbl 25487 voliunlem2 25512 volsup 25517 ioorf 25534 ioorinv 25537 ioorcl 25538 uniiccdif 25539 uniioovol 25540 uniiccvol 25541 uniioombllem2 25544 uniioombllem4 25547 dyaddisj 25557 dyadmax 25559 dyadmbllem 25560 dyadmbl 25561 opnmbllem 25562 opnmblALT 25564 volsup2 25566 mbfdm 25587 mbfima 25591 mbfid 25596 ismbfd 25600 mbfres2 25606 mbfposr 25613 mbfimaopnlem 25616 mbflimsup 25627 0plef 25633 i1f1lem 25650 itg11 25652 itg1addlem4 25660 i1fpos 25667 itg1le 25674 itg1climres 25675 mbfi1fseqlem5 25680 mbfi1flimlem 25683 xrge0f 25692 itg2ge0 25696 itg2seq 25703 itg2i1fseqle 25715 itg2i1fseq2 25717 itg2addlem 25719 itg2gt0 25721 limciun 25855 dvres 25872 dvres3a 25875 cpnres 25899 dvfre 25915 dvmptres3 25920 dvlip2 25960 dvgt0lem2 25968 deg1fvi 26050 uc1pmon1p 26117 fta1g 26135 ig1peu 26140 ig1pdvds 26145 plyco0 26157 plypf1 26177 dgrlem 26194 dgrub 26199 dgrlb 26201 coemulc 26220 plyreres 26250 plydivlem3 26263 plydivlem4 26264 plydiveu 26266 plyremlem 26272 fta1lem 26275 fta1 26276 vieta1lem2 26279 plyexmo 26281 elaa 26284 elqaalem3 26289 aannenlem1 26296 pserulm 26391 psercnlem2 26394 psercnlem1 26395 psercn 26396 abelth 26411 reeff1o 26417 pilem1 26421 recosf1o 26504 resinf1o 26505 efif1olem3 26513 efif1olem4 26514 efifo 26516 eff1olem 26517 ellogrn 26528 logcn 26616 dvloglem 26617 logf1o2 26619 efopnlem1 26625 efopnlem2 26626 efopn 26627 logtayl 26629 cxpcn3lem 26717 cxpcn3 26718 resqrtcn 26719 asinneg 26856 areambl 26928 emcllem7 26972 lgamgulm2 27006 basellem4 27054 sqff1o 27152 mpodvdsmulf1o 27164 fsumdvdsmul 27165 dvdsmulf1o 27166 fsumdvdsmulOLD 27167 ostthlem1 27598 ostth 27610 noetasuplem4 27708 madeval2 27831 elold 27851 old1 27857 madeoldsuc 27867 tglnfn 28602 f1otrg 28926 axlowdimlem6 29003 axlowdimlem8 29005 axlowdimlem9 29006 axlowdimlem11 29008 axlowdimlem12 29009 axlowdimlem17 29014 elntg2 29041 dfpth2 29785 cyclnumvtx 29856 crctcshlem4 29876 clwlkclwwlklem2 30058 eucrct2eupth 30303 ex-fpar 30520 cnnvm 30740 sspmlem 30790 nvo00 30819 nmlno0lem 30851 phoeqi 30915 ubthlem1 30928 hhip 31235 hhssabloilem 31319 hhssnv 31322 hhsssh 31327 occllem 31361 shsel 31372 chscllem2 31696 df0op2 31810 hoeq 31818 hocofni 31825 hoaddfni 31828 hosubfni 31829 hon0 31851 ho01i 31886 hoeq1 31888 elnlfn 31986 nmlnop0iALT 32053 lnopco0i 32062 imaelshi 32116 nlelchi 32119 rnbra 32165 cnvbraval 32168 kbass5 32178 hmopidmchi 32209 hmopidmpji 32210 foresf1o 32561 fcomptf 32718 ofpreima 32725 resf1o 32790 maprnin 32791 fpwrelmapffslem 32792 hashgt1 32869 indpi1 32922 indpreima 32928 s3clhash 33011 gsumpart 33127 xrge0tsmsd 33136 tocyc01 33181 cyc3evpm 33213 cycpmgcl 33216 cycpmconjslem2 33218 cyc3conja 33220 kerunit 33387 1arithidomlem1 33597 1arithidomlem2 33598 1arithidom 33599 dimval 33738 dimvalfi 33739 ply1degltdimlem 33760 ply1degltdim 33761 elirng 33824 txomap 33972 locfinreflem 33978 hauseqcn 34036 xpinpreima 34044 xpinpreima2 34045 tpr2rico 34050 mndpluscn 34064 raddcn 34067 xrge0pluscn 34078 xrge0tmdALT 34084 rge0scvg 34087 pl1cn 34093 elzrhunit 34115 qqhf 34124 cnrrext 34148 qqhre 34158 1stmbfm 34398 2ndmbfm 34399 mbfmcnt 34406 omssubadd 34438 carsggect 34456 eulerpartlemsv2 34496 eulerpartlems 34498 eulerpartlemv 34502 eulerpartlemb 34506 eulerpartlemf 34508 eulerpartlemt 34509 eulerpartlemmf 34513 eulerpartlemgvv 34514 eulerpartlemgh 34516 eulerpartlemgs2 34518 sseqmw 34529 sseqf 34530 sseqp1 34533 fiblem 34536 fibp1 34539 plymul02 34684 signsvtn0 34708 signstres 34713 signshlen 34728 reprinrn 34756 circlemethhgt 34781 txsconnlem 35415 iccllysconn 35425 rellysconn 35426 cvmseu 35451 cvmliftmolem2 35457 cvmliftlem6 35465 cvmliftlem7 35466 cvmliftlem8 35467 cvmliftlem9 35468 cvmliftlem11 35470 cvmliftlem15 35473 cvmlift2lem7 35484 cvmlift2lem10 35487 cvmlift3lem8 35501 cvmlift3lem9 35502 mvrsfpw 35681 mrsubff1 35689 msrid 35720 msrfo 35721 elmsta 35723 mtyf 35727 msubff1 35731 vhmcls 35741 mclsax 35744 elmthm 35751 mthmblem 35755 mclsppslem 35758 iprodefisumlem 35915 fullfunfnv 36121 fullfunfv 36122 tailfb 36552 filnetlem4 36556 taupilem3 37495 icoreresf 37528 icoreelrnab 37530 relowlssretop 37539 relowlpssretop 37540 unccur 37775 matunitlindflem1 37788 matunitlindflem2 37789 ptrecube 37792 poimirlem28 37820 poimirlem32 37824 heicant 37827 opnmbllem0 37828 mblfinlem1 37829 mblfinlem2 37830 volsupnfl 37837 cnambfre 37840 dvtan 37842 itg2addnclem 37843 itg2addnclem2 37844 ftc1anclem3 37867 ftc1anclem5 37869 ftc1anclem7 37871 ftc1anclem8 37872 ftc1anc 37873 areacirc 37885 indexdom 37906 sdclem2 37914 sstotbnd2 37946 sstotbnd 37947 isbndx 37954 isbnd3b 37957 prdsbnd 37965 prdstotbnd 37966 ismtyhmeolem 37976 heibor1lem 37981 heiborlem1 37983 heibor 37993 rrnequiv 38007 keridl 38204 ellkr 39386 lkr0f 39391 cdleme50rnlem 40841 aks6d1c2lem4 42418 aks6d1c5 42430 sticksstones11 42447 sticksstones19 42456 sticksstones22 42459 aks6d1c6lem4 42464 aks6d1c6isolem2 42466 fsuppind 42869 elrfirn 42973 ismrcd2 42977 isnacs2 42984 nacsfix 42990 mapfzcons1 42995 mzpcompact2lem 43029 eq0rabdioph 43054 eldioph4b 43089 diophren 43091 pw2f1ocnv 43315 pw2f1o2val2 43318 lmhmfgsplit 43364 pwssplit4 43367 hbt 43408 mpaaeu 43428 mendring 43466 proot1mul 43472 proot1hash 43473 proot1ex 43474 deg1mhm 43478 fgraphopab 43481 hausgraph 43483 nvocnvb 43699 ofsubid 44601 expgrowthi 44610 expgrowth 44612 binomcxplemdvbinom 44630 binomcxplemcvg 44631 binomcxplemnotnn0 44633 relpfrlem 45230 rfcnpre1 45300 rfcnpre2 45312 cncmpmax 45313 rfcnpre3 45314 rfcnpre4 45315 elixpconstg 45369 ffi 45453 islptre 45901 resincncf 46155 dvcosre 46192 dvresntr 46198 volioof 46267 stoweidlem48 46328 fourierdlem12 46399 fourierdlem15 46402 fourierdlem41 46428 fourierdlem42 46429 fourierdlem46 46432 fourierdlem48 46434 fourierdlem49 46435 fourierdlem54 46440 fourierdlem56 46442 fourierdlem62 46448 fourierdlem64 46450 fourierdlem65 46451 fourierdlem73 46459 fourierdlem74 46460 fourierdlem75 46461 fourierdlem102 46488 fourierdlem103 46489 fourierdlem104 46490 fourierdlem114 46500 sge0split 46689 elhoi 46822 mbfresmf 47019 cjnpoly 47171 cfsetsnfsetf1 47341 cfsetsnfsetfo 47342 focofob 47362 f1ocof1ob 47363 fafvelcdm 47452 ffnafv 47453 fafv2elcdm 47516 fafv2elrnb 47517 imarnf1pr 47564 2ffzoeq 47609 fundcmpsurbijinjpreimafv 47689 fundcmpsurinjimaid 47693 fargshiftfv 47721 fargshiftf 47722 fargshiftf1 47723 fargshiftfo 47724 cycl3grtri 48229 fdmdifeqresdif 48624 fdivmpt 48822 fdivmptf 48823 refdivmptf 48824 1arymaptf1 48924 2arymaptf1 48935 ackfnnn0 48967 homf0 49290 aacllem 50082

Copyright terms: Public domain