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| Mirrors > Home > ILE Home > Th. List > 1re | GIF version | ||
| Description: 1 is a real number. (Contributed by Jim Kingdon, 13-Jan-2020.) |
| Ref | Expression |
|---|---|
| 1re | ⊢ 1 ∈ ℝ |
| Step | Hyp | Ref | Expression |
|---|---|---|---|
| 1 | ax-1re 8104 | 1 ⊢ 1 ∈ ℝ |
| Colors of variables: wff set class |
| Syntax hints: ∈ wcel 2200 ℝcr 8009 1c1 8011 |
| This theorem was proved from axioms: ax-1re 8104 |
| This theorem is referenced by: 0re 8157 1red 8172 1xr 8216 0lt1 8284 peano2re 8293 peano2rem 8424 0reALT 8454 0le1 8639 1le1 8730 inelr 8742 1ap0 8748 eqneg 8890 ltp1 9002 ltm1 9004 recgt0 9008 mulgt1 9021 ltmulgt11 9022 lemulge11 9024 reclt1 9054 recgt1 9055 recgt1i 9056 recp1lt1 9057 recreclt 9058 sup3exmid 9115 cju 9119 peano5nni 9124 nnssre 9125 1nn 9132 nnge1 9144 nnle1eq1 9145 nngt0 9146 nnnlt1 9147 nn1gt1 9155 nngt1ne1 9156 nnrecre 9158 nnrecgt0 9159 nnsub 9160 2re 9191 3re 9195 4re 9198 5re 9200 6re 9202 7re 9204 8re 9206 9re 9208 0le2 9211 2pos 9212 3pos 9215 4pos 9218 5pos 9221 6pos 9222 7pos 9223 8pos 9224 9pos 9225 neg1rr 9227 neg1lt0 9229 1lt2 9291 1lt3 9293 1lt4 9296 1lt5 9300 1lt6 9305 1lt7 9311 1lt8 9318 1lt9 9326 1ne2 9328 1ap2 9329 1le2 9330 1le3 9333 halflt1 9339 iap0 9345 addltmul 9359 elnnnn0c 9425 nn0ge2m1nn 9440 elnnz1 9480 zltp1le 9512 zleltp1 9513 recnz 9551 gtndiv 9553 3halfnz 9555 1lt10 9727 eluzp1m1 9758 eluzp1p1 9760 eluz2b2 9810 1rp 9865 divlt1lt 9932 divle1le 9933 nnledivrp 9974 0elunit 10194 1elunit 10195 divelunit 10210 lincmb01cmp 10211 iccf1o 10212 unitssre 10213 fzpreddisj 10279 fznatpl1 10284 fztpval 10291 qbtwnxr 10489 flqbi2 10523 fldiv4p1lem1div2 10537 flqdiv 10555 seqf1oglem1 10753 reexpcl 10790 reexpclzap 10793 expge0 10809 expge1 10810 expgt1 10811 bernneq 10894 bernneq2 10895 expnbnd 10897 expnlbnd 10898 expnlbnd2 10899 nn0ltexp2 10943 facwordi 10974 faclbnd3 10977 faclbnd6 10978 facavg 10980 lsw0 11132 cjexp 11419 re1 11423 im1 11424 rei 11425 imi 11426 caucvgre 11507 sqrt1 11572 sqrt2gt1lt2 11575 abs1 11598 caubnd2 11643 mulcn2 11838 reccn2ap 11839 expcnvap0 12028 geo2sum 12040 cvgratnnlemrate 12056 fprodge0 12163 fprodge1 12165 fprodle 12166 ere 12196 ege2le3 12197 efgt1 12223 resin4p 12244 recos4p 12245 sinbnd 12278 cosbnd 12279 sinbnd2 12280 cosbnd2 12281 ef01bndlem 12282 sin01bnd 12283 cos01bnd 12284 cos1bnd 12285 cos2bnd 12286 sinltxirr 12287 sin01gt0 12288 cos01gt0 12289 sin02gt0 12290 sincos1sgn 12291 cos12dec 12294 ene1 12311 eap1 12312 3dvds 12390 halfleoddlt 12420 flodddiv4 12462 isprm3 12655 sqnprm 12673 coprm 12681 phibndlem 12753 pythagtriplem3 12805 fldivp1 12886 pockthi 12896 exmidunben 13012 basendxnmulrndx 13182 starvndxnbasendx 13190 scandxnbasendx 13202 vscandxnbasendx 13207 ipndxnbasendx 13220 basendxnocndx 13261 setsmsbasg 15168 tgioo 15243 dveflem 15415 reeff1olem 15460 reeff1o 15462 cosz12 15469 sinhalfpilem 15480 tangtx 15527 sincos4thpi 15529 pigt3 15533 coskpi 15537 cos0pilt1 15541 ioocosf1o 15543 loge 15556 logrpap0b 15565 logdivlti 15570 2logb9irrALT 15663 sqrt2cxp2logb9e3 15664 perfectlem2 15689 lgsdir 15729 lgsne0 15732 lgsabs1 15733 lgsdinn0 15742 gausslemma2dlem0i 15751 lgseisen 15768 2lgslem3 15795 ex-fl 16144 cvgcmp2nlemabs 16460 iooref1o 16462 trilpolemclim 16464 trilpolemcl 16465 trilpolemisumle 16466 trilpolemeq1 16468 trilpolemlt1 16469 apdiff 16476 nconstwlpolemgt0 16492 |
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