rpred - Metamath Proof Explorer

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Theorem rpred 13023

Description: A positive real is a real. (Contributed by Mario Carneiro, 28-May-2016.)

**Hypothesis**
Ref	Expression
rpred.1	⊢ (𝜑 → 𝐴 ∈ ℝ⁺)

**Assertion**
Ref	Expression
rpred	⊢ (𝜑 → 𝐴 ∈ ℝ)

**Proof of Theorem rpred**
Step	Hyp	Ref	Expression
1		rpssre 12988	. 2 ⊢ ℝ⁺ ⊆ ℝ
2		rpred.1	. 2 ⊢ (𝜑 → 𝐴 ∈ ℝ⁺)
3	1, 2	sselid 3980	1 ⊢ (𝜑 → 𝐴 ∈ ℝ)

Colors of variables: wff setvar class

Syntax hints: → wi 4 ∈ wcel 2105 ℝcr 11115 ℝ⁺crp 12981

This theorem was proved from axioms: ax-mp 5 ax-1 6 ax-2 7 ax-3 8 ax-gen 1796 ax-4 1810 ax-5 1912 ax-6 1970 ax-7 2010 ax-8 2107 ax-9 2115 ax-ext 2702

This theorem depends on definitions: df-bi 206 df-an 396 df-tru 1543 df-ex 1781 df-sb 2067 df-clab 2709 df-cleq 2723 df-clel 2809 df-rab 3432 df-v 3475 df-in 3955 df-ss 3965 df-rp 12982

This theorem is referenced by: rpxrd 13024 rpcnd 13025 rpregt0d 13029 rprege0d 13030 rprene0d 13031 rprecred 13034 ltmulgt11d 13058 ltmulgt12d 13059 gt0divd 13060 ge0divd 13061 lediv12ad 13082 prodge0rd 13088 xlemul1 13276 xov1plusxeqvd 13482 ltexp2a 14138 rpexpmord 14140 expcan 14141 ltexp2 14142 leexp2a 14144 expnlbnd2 14204 expmulnbnd 14205 01sqrexlem6 15201 cau3lem 15308 rlimcld2 15529 addcn2 15545 mulcn2 15547 reccn2 15548 o1rlimmul 15570 rlimno1 15607 caucvgrlem 15626 isumrpcl 15796 isumltss 15801 expcnv 15817 mertenslem1 15837 effsumlt 16061 recoshcl 16108 eirrlem 16154 rpnnen2lem11 16174 bitsmod 16384 prmreclem3 16858 prmreclem5 16860 4sqlem7 16884 ssblex 24254 metss2lem 24340 methaus 24349 met1stc 24350 met2ndci 24351 metustto 24382 metustexhalf 24385 nlmvscnlem2 24522 nlmvscnlem1 24523 nrginvrcnlem 24528 nmoi2 24567 nghmcn 24582 reperflem 24654 iccntr 24657 icccmplem2 24659 reconnlem2 24663 opnreen 24667 metdcnlem 24672 metnrmlem3 24697 addcnlem 24700 cnheibor 24801 cnllycmp 24802 lebnumlem3 24809 lebnumii 24812 nmoleub2lem 24961 nmoleub2lem3 24962 nmoleub2lem2 24963 nmoleub3 24966 nmhmcn 24967 ipcnlem2 25092 ipcnlem1 25093 lmnn 25111 iscfil3 25121 cfilfcls 25122 iscmet3lem1 25139 iscmet3lem2 25140 bcthlem4 25175 bcthlem5 25176 minveclem3b 25276 minveclem3 25277 ivthlem2 25301 ovolgelb 25329 ovollb2lem 25337 ovolunlem1a 25345 ovolunlem1 25346 ovoliunlem1 25351 ovoliunlem2 25352 ovolscalem1 25362 ioombl1lem2 25408 ioombl1lem4 25410 uniioombllem1 25430 uniioombllem3 25434 uniioombllem4 25435 uniioombllem5 25436 opnmbllem 25450 volcn 25455 vitalilem4 25460 itg2mulclem 25596 itg2monolem3 25602 itg2cnlem2 25612 itg2cn 25613 itggt0 25693 dveflem 25831 dvferm1lem 25836 dvferm2lem 25838 lhop1lem 25866 lhop1 25867 lhop 25869 dvcnvrelem1 25870 dvcnvrelem2 25871 dvcnvre 25872 dvfsumrlim 25886 ftc1a 25892 ftc1lem4 25894 plyeq0lem 26062 aalioulem2 26185 aalioulem4 26187 aalioulem5 26188 aalioulem6 26189 aaliou 26190 aaliou2b 26193 aaliou3lem1 26194 aaliou3lem2 26195 aaliou3lem8 26197 aaliou3lem5 26199 aaliou3lem7 26201 aaliou3lem9 26202 ulmcn 26250 ulmdvlem1 26251 mtest 26255 itgulm 26259 psercn 26278 pserdvlem1 26279 pserdvlem2 26280 pserdv 26281 abelthlem7 26290 pilem2 26304 divlogrlim 26483 logcnlem3 26492 logcnlem4 26493 logccv 26511 divcxp 26535 cxplt 26542 cxple2 26545 recxpf1lem 26577 cxpcn3lem 26596 cxpaddlelem 26600 cxpaddle 26601 loglesqrt 26607 leibpi 26788 rlimcnp3 26813 cxplim 26817 rlimcxp 26819 cxp2limlem 26821 cxp2lim 26822 cxploglim 26823 cxploglim2 26824 divsqrtsumlem 26825 jensenlem2 26833 logdifbnd 26839 emcllem4 26844 harmonicbnd4 26856 fsumharmonic 26857 zetacvg 26860 lgamgulmlem2 26875 lgamgulmlem5 26878 lgamucov 26883 regamcl 26906 relgamcl 26907 ftalem1 26918 ftalem2 26919 ftalem3 26920 ftalem5 26922 basellem1 26926 basellem3 26928 basellem4 26929 basellem8 26933 chtwordi 27001 chpchtsum 27065 logfacrlim 27070 logexprlim 27071 bclbnd 27126 efexple 27127 bposlem1 27130 bposlem2 27131 bposlem6 27135 bposlem7 27136 chebbnd1lem3 27317 chebbnd1 27318 chtppilimlem1 27319 chtppilimlem2 27320 chpo1ubb 27327 rplogsumlem1 27330 rplogsumlem2 27331 dchrisum0lem1a 27332 rpvmasumlem 27333 dchrisumlem2 27336 dchrisumlem3 27337 dchrmusumlema 27339 dchrmusum2 27340 dchrvmasumlem1 27341 dchrvmasum2lem 27342 dchrvmasumlema 27346 dchrvmasumiflem1 27347 dchrisum0fno1 27357 dchrisum0lem1b 27361 dchrisum0lem1 27362 dchrisum0lem2 27364 dchrisum0lem3 27365 dchrisum0 27366 mulogsumlem 27377 logdivsum 27379 mulog2sumlem2 27381 vmalogdivsum2 27384 2vmadivsumlem 27386 log2sumbnd 27390 selberglem2 27392 selberg 27394 selberg2lem 27396 chpdifbndlem1 27399 chpdifbndlem2 27400 selberg3lem1 27403 selberg4lem1 27406 pntrsumbnd2 27413 pntrlog2bndlem2 27424 pntrlog2bndlem3 27425 pntrlog2bndlem5 27427 pntrlog2bndlem6a 27428 pntrlog2bndlem6 27429 pntrlog2bnd 27430 pntpbnd1a 27431 pntpbnd1 27432 pntpbnd2 27433 pntibndlem1 27435 pntibndlem2 27437 pntibndlem3 27438 pntibnd 27439 pntlemc 27441 pntlema 27442 pntlemb 27443 pntlemg 27444 pntlemh 27445 pntlemn 27446 pntlemq 27447 pntlemr 27448 pntlemj 27449 pntlemi 27450 pntlemf 27451 pntlemk 27452 pntlemo 27453 pntleme 27454 pntlem3 27455 pntlemp 27456 pntleml 27457 ostth2lem1 27464 ostth2lem3 27481 ostth2 27483 ostth3 27484 crctcshwlkn0lem5 29501 nrt2irr 30159 smcnlem 30383 blocnilem 30490 blocni 30491 ubthlem2 30557 minvecolem3 30562 minvecolem4 30566 minvecolem5 30567 nmcexi 31712 lnconi 31719 fsumub 32467 rpxdivcld 32533 sqsscirc1 33352 cnre2csqlem 33354 tpr2rico 33356 xrmulc1cn 33374 xrge0iifiso 33379 xrge0iifhom 33381 esumcst 33525 esumdivc 33545 dya2icoseg 33740 omssubaddlem 33762 omssubadd 33763 probmeasb 33893 sgnmulrp2 34006 signsply0 34026 logdivsqrle 34126 hgt750leme 34134 dnicn 35832 unblimceq0lem 35846 unbdqndv2lem1 35849 unbdqndv2lem2 35850 knoppndvlem18 35869 knoppndvlem21 35872 poimirlem29 36981 heicant 36987 opnmbllem0 36988 mblfinlem3 36991 itg2addnclem3 37005 itg2addnc 37006 itggt0cn 37022 ftc1cnnclem 37023 ftc1anclem6 37030 ftc1anclem7 37031 geomcau 37091 sstotbnd2 37106 isbnd3 37116 equivbnd 37122 prdsbnd2 37127 cntotbnd 37128 heibor1lem 37141 heiborlem6 37148 bfplem1 37154 bfplem2 37155 bfp 37156 rrndstprj2 37163 rrnequiv 37167 lcmineqlem21 41381 aks4d1p1p4 41403 aks4d1p1p7 41406 aks4d1p5 41412 aks4d1p6 41413 exp11nnd 41678 fltnlta 41868 irrapxlem4 42026 irrapxlem5 42027 irrapx1 42029 pell1qrgaplem 42074 pell14qrgapw 42077 pellqrexplicit 42078 pellqrex 42080 pellfundge 42083 pellfundgt1 42084 rmspecfund 42110 rmxycomplete 42119 rmxypos 42149 binomcxplemnotnn0 43578 suprltrp 44497 supxrge 44507 infrpge 44520 infleinflem1 44539 xralrple4 44542 recnnltrp 44546 rpgtrecnn 44549 cvgcaule 44661 fmul01lt1lem1 44759 fmul01lt1lem2 44760 ltmod 44813 lptre2pt 44815 addlimc 44823 0ellimcdiv 44824 limclner 44826 climleltrp 44851 climisp 44921 climxrrelem 44924 climxrre 44925 limsupgtlem 44952 liminfltlem 44979 cnrefiisplem 45004 climxlim2lem 45020 dvdivbd 45098 ioodvbdlimc1lem2 45107 ioodvbdlimc2lem 45109 itgiccshift 45155 itgperiod 45156 stoweidlem1 45176 stoweidlem3 45178 stoweidlem5 45180 stoweidlem7 45182 stoweidlem11 45186 stoweidlem13 45188 stoweidlem14 45189 stoweidlem24 45199 stoweidlem25 45200 stoweidlem26 45201 stoweidlem34 45209 stoweidlem41 45216 stoweidlem42 45217 stoweidlem49 45224 stoweidlem51 45226 stoweidlem52 45227 stoweidlem59 45234 stoweidlem60 45235 stoweidlem62 45237 stoweid 45238 wallispilem5 45244 stirlinglem1 45249 stirlinglem4 45252 stirlinglem5 45253 stirlinglem6 45254 dirkercncflem1 45278 fourierdlem30 45312 fourierdlem39 45321 fourierdlem47 45328 fourierdlem73 45354 fourierdlem81 45362 fourierdlem87 45368 fourierdlem103 45384 fourierdlem104 45385 fourierdlem107 45388 rrndistlt 45465 qndenserrnbllem 45469 sge0ltfirp 45575 sge0rpcpnf 45596 sge0xaddlem1 45608 omeiunltfirp 45694 carageniuncllem2 45697 ovnsubaddlem1 45745 hoidmvlelem1 45770 hoidmvlelem2 45771 hoidmvlelem3 45772 hoidmvlelem4 45773 hoiqssbllem1 45797 hoiqssbllem2 45798 hoiqssbllem3 45799 hspmbllem2 45802 hspmbllem3 45803 ovolval5lem1 45827 ovolval5lem2 45828 iinhoiicc 45849 vonioolem1 45855 pimrecltpos 45883 smflimlem3 45948 smfmullem1 45966 smfmullem2 45967 smfmullem3 45968 modexp2m1d 46739 dignn0flhalflem1 47463 itsclc0yqsol 47612 amgmwlem 48011 amgmw2d 48013 young2d 48014

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