Nuprl Lemma : alt-int-rdiv

Nuprl Lemma : alt-int-rdiv_wf

∀[x:ℝ]. ∀[k:ℕ⁺]. (alt-int-rdiv(x;k) ∈ {y:ℝ| k * y = x} )

Proof

Definitions occuring in Statement : alt-int-rdiv: alt-int-rdiv(x;k), int-rmul: k1 * a, req: x = y, real: ℝ, nat_plus: ℕ⁺, uall: ∀[x:A]. B[x], member: t ∈ T, set: {x:A| B[x]}
Definitions unfolded in proof : uall: ∀[x:A]. B[x], member: t ∈ T, alt-int-rdiv: alt-int-rdiv(x;k), nat_plus: ℕ⁺, real: ℝ, false: False, implies: P ⇒ Q, not: ¬A, all: ∀x:A. B[x], bool: 𝔹, unit: Unit, it: ⋅, btrue: tt, uiff: uiff(P;Q), and: P ∧ Q, uimplies: b supposing a, decidable: Dec(P), or: P ∨ Q, satisfiable_int_formula: satisfiable_int_formula(fmla), exists: ∃x:A. B[x], top: Top, prop: ℙ, bfalse: ff, sq_type: SQType(T), guard: {T}, bnot: ¬_bb, ifthenelse: if b then t else f fi , assert: ↑b, nequal: a ≠ b ∈ T , regular-int-seq: k-regular-seq(f), subtype_rel: A ⊆r B, so_lambda: λ₂x.t[x], so_apply: x[s], squash: ↓T, nat: ℕ, true: True, iff: P ⇐⇒ Q, rev_implies: P ⇐ Q, rev_uimplies: rev_uimplies(P;Q), ge: i ≥ j , sq_stable: SqStable(P), le: A ≤ B, bdd-diff: bdd-diff(f;g), accelerate: accelerate(k;f), int-rmul: k1 * a, has-value: (a)↓, less_than: a < b, less_than': less_than'(a;b), int_nzero: ℤ^-^o, absval: |i|
Lemmas referenced : rounding-div_wf, eq_int_wf, eqtt_to_assert, assert_of_eq_int, real-regular, nat_plus_properties, decidable__lt, full-omega-unsat, intformnot_wf, intformless_wf, itermConstant_wf, istype-int, int_formula_prop_not_lemma, istype-void, int_formula_prop_less_lemma, int_term_value_constant_lemma, int_formula_prop_wf, istype-less_than, eqff_to_assert, bool_cases_sqequal, subtype_base_sq, bool_wf, bool_subtype_base, assert-bnot, neg_assert_of_eq_int, mul_cancel_in_le, absval_wf, subtract_wf, absval_nat_plus, intformand_wf, intformeq_wf, itermVar_wf, int_formula_prop_and_lemma, int_formula_prop_eq_lemma, int_term_value_var_lemma, set_subtype_base, less_than_wf, int_subtype_base, le_wf, squash_wf, true_wf, absval_mul, subtype_rel_self, iff_weakening_equal, nat_wf, absval-non-neg, absval_pos, nat_plus_subtype_nat, istype-le, regular-int-seq_wf, nat_plus_wf, real_wf, rounding-div-property, absval-diff-symmetry, decidable__equal_int, itermMultiply_wf, itermSubtract_wf, itermAdd_wf, int_term_value_mul_lemma, int_term_value_subtract_lemma, int_term_value_add_lemma, decidable__le, intformle_wf, int_formula_prop_le_lemma, le_functionality, multiply_functionality_wrt_le, le_weakening, le_transitivity, int-triangle-inequality, add_functionality_wrt_le, add_functionality_wrt_eq, mul_preserves_le, sq_stable__le, multiply-is-int-iff, false_wf, req_wf, int-rmul_wf, int-rmul-one, req-iff-bdd-diff, accelerate-bdd-diff, subtype_rel_sets_simple, accelerate_wf, bdd-diff_functionality, bdd-diff_weakening, bdd-diff_inversion, nat_properties, value-type-has-value, int-value-type, set-value-type, istype-top, mul_nat_plus, divide_wfa, nequal_wf, div_rem_sum2, remainder_wfa, rem_bounds_absval, itermMinus_wf, int_term_value_minus_lemma, absval_sym, sq_stable__less_than, le_weakening2
Rules used in proof : sqequalSubstitution, sqequalTransitivity, computationStep, sqequalReflexivity, isect_memberFormation_alt, introduction, cut, sqequalRule, int_eqEquality, sqequalHypSubstitution, setElimination, thin, rename, hypothesisEquality, hypothesis, natural_numberEquality, lambdaEquality_alt, extract_by_obid, isectElimination, applyEquality, inhabitedIsType, dependent_set_memberEquality_alt, equalityTransitivity, equalitySymmetry, because_Cache, lambdaFormation_alt, unionElimination, equalityElimination, productElimination, independent_isectElimination, int_eqReduceTrueSq, dependent_functionElimination, approximateComputation, independent_functionElimination, dependent_pairFormation_alt, isect_memberEquality_alt, voidElimination, universeIsType, equalityIstype, promote_hyp, instantiate, cumulativity, int_eqReduceFalseSq, multiplyEquality, addEquality, independent_pairFormation, intEquality, baseClosed, sqequalBase, imageElimination, imageMemberEquality, universeEquality, axiomEquality, isectIsTypeImplies, pointwiseFunctionality, baseApply, closedConclusion, functionEquality, functionIsType, setEquality, callbyvalueReduce, sqleReflexivity, lessCases, axiomSqEquality, applyLambdaEquality, minusEquality

Latex:
\mforall{}[x:\mBbbR{}]. \mforall{}[k:\mBbbN{}\msupplus{}]. (alt-int-rdiv(x;k) \mmember{} \{y:\mBbbR{}| k * y = x\} ) Date html generated: 2019_10_29-AM-09_33_25 Last ObjectModification: 2019_02_18-PM-03_34_55 Theory : reals Home Index