Proof of Nuprl Lemma : rv-circle-circle-lemma3

Step * of Lemma rv-circle-circle-lemma3

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∀n:{2...}. ∀a,b,c,d:ℝ^n. ∀p:{p:ℝ^n| ab=ap} . ∀q:{q:ℝ^n| cd=cq} . ∀x:{x:ℝ^n| cp=cx ∧ (¬(c ≠ x ∧ x ≠ d ∧ (¬c-x-d)))} .

∀y:{y:ℝ^n| aq=ay ∧ (¬(a ≠ y ∧ y ≠ b ∧ (¬a-y-b)))} .
  (a ≠ c ⇒ (∃u,v:{p:ℝ^n| ab=ap ∧ cd=cp} . (((d(a;y) < d(a;b)) ∧ (d(c;x) < d(c;d))) ⇒ u ≠ v)))
BY
{ (Auto
   THEN RenameVar `o' (-2)
   THEN RenameVar `i' (-3)
   THEN (Assert cp=ci ∧ (¬(c ≠ i ∧ i ≠ d ∧ (¬c-i-d))) BY
               (DVar `i' THEN Unhide THEN Auto THEN Unfold `rv-congruent` 0 THEN Auto))
   THEN (Assert aq=ao ∧ (¬(a ≠ o ∧ o ≠ b ∧ (¬a-o-b))) BY
               (DVar `o' THEN Unhide THEN Auto THEN Unfold `rv-congruent` 0 THEN Auto))) }

1
1. n : {2...}
2. a : ℝ^n
3. b : ℝ^n
4. c : ℝ^n
5. d : ℝ^n
6. p : {p:ℝ^n| ab=ap}
7. q : {q:ℝ^n| cd=cq}
8. i : {x:ℝ^n| cp=cx ∧ (¬(c ≠ x ∧ x ≠ d ∧ (¬c-x-d)))}
9. o : {y:ℝ^n| aq=ay ∧ (¬(a ≠ y ∧ y ≠ b ∧ (¬a-y-b)))}
10. a ≠ c
11. cp=ci ∧ (¬(c ≠ i ∧ i ≠ d ∧ (¬c-i-d)))
12. aq=ao ∧ (¬(a ≠ o ∧ o ≠ b ∧ (¬a-o-b)))
⊢ ∃u,v:{p:ℝ^n| ab=ap ∧ cd=cp} . (((d(a;o) < d(a;b)) ∧ (d(c;i) < d(c;d))) ⇒ u ≠ v)

Latex:

Latex:
No Annotations \mforall{}n:\{2...\}. \mforall{}a,b,c,d:\mBbbR{}\^{}n. \mforall{}p:\{p:\mBbbR{}\^{}n| ab=ap\} . \mforall{}q:\{q:\mBbbR{}\^{}n| cd=cq\} . \mforall{}x:\{x:\mBbbR{}\^{}n| cp=cx \mwedge{} (\mneg{}(c \mneq{} x \mwedge{} x \mneq{} d \mwedge{} (\mneg{}c-x-d)))\} \000C. \mforall{}y:\{y:\mBbbR{}\^{}n| aq=ay \mwedge{} (\mneg{}(a \mneq{} y \mwedge{} y \mneq{} b \mwedge{} (\mneg{}a-y-b)))\} . (a \mneq{} c {}\mRightarrow{} (\mexists{}u,v:\{p:\mBbbR{}\^{}n| ab=ap \mwedge{} cd=cp\} . (((d(a;y) < d(a;b)) \mwedge{} (d(c;x) < d(c;d))) {}\mRightarrow{} u \mneq{} v))) By Latex: (Auto THEN RenameVar `o' (-2) THEN RenameVar `i' (-3) THEN (Assert cp=ci \mwedge{} (\mneg{}(c \mneq{} i \mwedge{} i \mneq{} d \mwedge{} (\mneg{}c-i-d))) BY (DVar `i' THEN Unhide THEN Auto THEN Unfold `rv-congruent` 0 THEN Auto)) THEN (Assert aq=ao \mwedge{} (\mneg{}(a \mneq{} o \mwedge{} o \mneq{} b \mwedge{} (\mneg{}a-o-b))) BY (DVar `o' THEN Unhide THEN Auto THEN Unfold `rv-congruent` 0 THEN Auto))) Home Index