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Axiom ax-gen 1817
Description: Rule of (universal) generalization. In our axiomatization, this is the only postulated (that is, axiomatic) rule of inference of predicate calculus (together with the rule of modus ponens ax-mp 5 of propositional calculus). See, e.g., Rule 2 of [Hamilton] p. 74. This rule says that if something is unconditionally true, then it is true for all values of a variable. For example, if we have proved 𝑥 = 𝑥, then we can conclude 𝑥𝑥 = 𝑥 or even 𝑦𝑥 = 𝑥. Theorem altru 1829 shows the special case 𝑥. The converse rule of inference spi 2221 (universal instantiation, or universal specialization) shows that we can also go the other way: in other words, we can add or remove universal quantifiers from the beginning of any theorem as required. Note that the closed form (𝜑 → ∀𝑥𝜑) need not hold (but may hold in special cases, see ax-5 1932). (Contributed by NM, 3-Jan-1993.)
Hypothesis
Ref Expression
ax-gen.1 𝜑
Assertion
Ref Expression
ax-gen 𝑥𝜑

Detailed syntax breakdown of Axiom ax-gen
StepHypRef Expression
1 wph . 2 wff 𝜑
2 vx . 2 setvar 𝑥
31, 2wal 1560 1 wff 𝑥𝜑
Colors of variables: wff setvar class
This axiom is referenced by:  gen2  1818  mpg  1819  mpgbi  1820  mpgbir  1821  hbth  1825  altru  1829  alfal  1830  stdpc6  2050  sbtlem  2096  ax13dgen3  2175  ceqsalg  3491  vtoclegft  3550  elabg  3637  mosub  3678  sbcth  3761  sbciegf  3784  sbcg  3818  csbiegf  3887  sbcnestgw  4379  csbnestgw  4380  sbcnestg  4384  csbnestg  4385  csbnest1g  4388  al0ssb  5260  intidg  5426  ssopab2i  5523  relssi  5761  xpidtr  6111  funcnvsn  6573  caovmo  7635  trom  7857  peano1  7871  abrexexg  7944  tfrlem7  8356  1onn  8612  2onn  8614  findcard  9134  findcard2  9135  pssnn  9139  ssfi  9143  fiint  9273  inf0  9578  axinf2  9597  trcl  9685  axac3  10423  brdom3  10487  axpowndlem4  10560  axregndlem2  10563  axinfnd  10566  wfgru  10776  nqerf  10890  uzrdgfni  13973  ltweuz  13976  trclfvcotr  15024  fclim  15582  letsr  18627  cnsubrglem  21471  distop  23057  fctop  23066  cctop  23068  ulmdm  26458  upgr0eopALT  29319  bnj1023  35078  bnj1109  35084  bnj907  35264  axnulALT2  35379  funen1cnv  35384  tz9.1regs  35434  axsepg2  35440  axsepg4  35443  axnulg  35445  axpowg2  35447  axpowg3  35448  loop1cycl  35492  umgr2cycl  35496  hbimg  36162  fnsingle  36272  funimage  36281  funpartfun  36298  hftr  36537  itgeq12i  36571  filnetlem3  36745  bj-genr  37055  bj-genl  37056  bj-genan  37057  bj-mpgs  37058  bj-alimii  37065  bj-almpig  37068  bj-ax12v  37133  bj-ceqsalg0  37378  bj-ceqsalgALT  37380  bj-ceqsalgvALT  37382  bj-vtoclgfALT  37549  bj-rep  37563  bj-axseprep  37564  bj-axreprepsep  37565  vtoclefex  37833  rdgeqoa  37869  exrecfnpw  37880  riscer  38492  trressn  39039  disjALTV0  39358  ax12eq  39570  cdleme32fva  41066  sbalexi  42835  unielss  43800  tfsconcatlem  43918  eu0  44101  dfrcl2  44255  rr-grothprim  44881  rr-grothshort  44885  pm11.11  44955  sbc3orgVD  45431  ordelordALTVD  45447  trsbcVD  45457  undif3VD  45462  sbcssgVD  45463  csbingVD  45464  onfrALTlem1VD  45470  onfrALTVD  45471  csbsngVD  45473  csbxpgVD  45474  csbresgVD  45475  csbrngVD  45476  csbima12gALTVD  45477  csbunigVD  45478  csbfv12gALTVD  45479  19.41rgVD  45482  unisnALT  45506  wfaxrep  45575  permaxsep  45588  permaxnul  45589  permaxpow  45590  permaxpr  45591  permaxun  45592  permaxinf2lem  45593  refsum2cnlem1  45622  dvnprodlem3  46527  sge00  46955  quantgodel  47453  quantgodelALT  47454  sinnpoly  47490  eusnsn  47625  aiota0def  47695  sprssspr  48092  spcdvw  50305  setrec2lem2  50320  onsetrec  50334
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