Nuprl Lemma : qmul_ident

[r:ℚ]. ((1 r) r ∈ ℚ)


Proof




Definitions occuring in Statement :  qmul: s rationals: uall: [x:A]. B[x] natural_number: $n equal: t ∈ T
Definitions unfolded in proof :  uall: [x:A]. B[x] member: t ∈ T subtype_rel: A ⊆B uiff: uiff(P;Q) and: P ∧ Q rev_uimplies: rev_uimplies(P;Q) uimplies: supposing a all: x:A. B[x] exists: x:A. B[x] nat_plus: + cand: c∧ B not: ¬A prop: qdiv: (r/s) top: Top ifthenelse: if then else fi  btrue: tt mk-rational: mk-rational(a;b) int_nzero: -o nequal: a ≠ b ∈  implies:  Q satisfiable_int_formula: satisfiable_int_formula(fmla) false: False bfalse: ff decidable: Dec(P) or: P ∨ Q
Lemmas referenced :  assert-qeq qmul_wf q-elim nat_plus_properties int-subtype-rationals assert_wf qeq_wf2 not_wf equal-wf-base rationals_wf int_subtype_base qinv-elim qmul-elim isint-int mk-rational_wf satisfiable-full-omega-tt intformand_wf intformeq_wf itermVar_wf itermConstant_wf intformless_wf int_formula_prop_and_lemma int_formula_prop_eq_lemma int_term_value_var_lemma int_term_value_constant_lemma int_formula_prop_less_lemma int_formula_prop_wf nequal_wf qeq-elim assert_of_eq_int decidable__equal_int intformnot_wf itermMultiply_wf int_formula_prop_not_lemma int_term_value_mul_lemma
Rules used in proof :  sqequalSubstitution sqequalTransitivity computationStep sqequalReflexivity isect_memberFormation cut introduction extract_by_obid sqequalHypSubstitution isectElimination thin natural_numberEquality hypothesis applyEquality because_Cache sqequalRule hypothesisEquality productElimination independent_pairFormation independent_isectElimination dependent_functionElimination setElimination rename addLevel impliesFunctionality baseClosed isect_memberEquality voidElimination voidEquality dependent_set_memberEquality lambdaFormation dependent_pairFormation lambdaEquality int_eqEquality intEquality computeAll multiplyEquality isintReduceTrue unionElimination hyp_replacement equalitySymmetry Error :applyLambdaEquality

Latex:
\mforall{}[r:\mBbbQ{}].  ((1  *  r)  =  r)



Date html generated: 2016_10_25-AM-11_50_48
Last ObjectModification: 2016_07_12-AM-07_47_24

Theory : rationals


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