Nuprl Lemma : rv-ip-mul

∀[rv:InnerProductSpace]. ∀[a:ℝ]. ∀[x,y:Point]. (a*x ⋅ y = (a * x ⋅ y))

Proof

Definitions occuring in Statement : rv-ip: x ⋅ y, inner-product-space: InnerProductSpace, rv-mul: a*x, ss-point: Point, req: x = y, rmul: a * b, real: ℝ, uall: ∀[x:A]. B[x]
Definitions unfolded in proof : uimplies: b supposing a, sq_stable: SqStable(P), squash: ↓T, rv-ip: x ⋅ y, exists: ∃x:A. B[x], all: ∀x:A. B[x], so_apply: x[s], prop: ℙ, implies: P ⇒ Q, so_lambda: λ₂x.t[x], and: P ∧ Q, guard: {T}, btrue: tt, ifthenelse: if b then t else f fi , eq_atom: x =a y, subtype_rel: A ⊆r B, record-select: r.x, record+: record+, inner-product-space: InnerProductSpace, member: t ∈ T, uall: ∀[x:A]. B[x]
Lemmas referenced : separation-space_wf, real-vector-space_wf, inner-product-space_wf, subtype_rel_transitivity, inner-product-space_subtype, rv-ip_wf, req_witness, sq_stable__req, exists_wf, int-to-real_wf, rless_wf, rv-0_wf, ss-sep_wf, rmul_wf, rv-mul_wf, radd_wf, rv-add_wf, req_wf, ss-eq_wf, all_wf, real_wf, real-vector-space_subtype1, ss-point_wf, subtype_rel_self
Rules used in proof : dependent_functionElimination, isect_memberEquality, independent_isectElimination, instantiate, productElimination, independent_functionElimination, imageElimination, baseClosed, imageMemberEquality, Error :applyLambdaEquality, rename, setElimination, natural_numberEquality, functionExtensionality, hypothesisEquality, lambdaEquality, productEquality, because_Cache, equalitySymmetry, equalityTransitivity, functionEquality, setEquality, isectElimination, extract_by_obid, tokenEquality, applyEquality, hypothesis, thin, dependentIntersectionEqElimination, sqequalRule, dependentIntersectionElimination, sqequalHypSubstitution, cut, introduction, isect_memberFormation, sqequalReflexivity, computationStep, sqequalTransitivity, sqequalSubstitution

Latex:
\mforall{}[rv:InnerProductSpace]. \mforall{}[a:\mBbbR{}]. \mforall{}[x,y:Point]. (a*x \mcdot{} y = (a * x \mcdot{} y)) Date html generated: 2016_11_08-AM-09_14_56 Last ObjectModification: 2016_10_31-PM-04_26_37 Theory : inner!product!spaces Home Index