Proof of Nuprl Lemma : r2-circle-circle

Step * 2 1 of Lemma r2-circle-circle

1. c : ℝ^2
2. d : ℝ^2
3. a : ℝ^2
4. b : ℝ^2
5. p : {p:ℝ^2| cd=cp}
6. q : {q:ℝ^2| ab=aq}
7. y : {x:ℝ^2| ap=ax ∧ (¬(a ≠ x ∧ x ≠ b ∧ (¬a-x-b)))}
8. x : {y:ℝ^2| cq=cy ∧ (¬(c ≠ y ∧ y ≠ d ∧ (¬c-y-d)))}
9. c ≠ a
10. u : {p:ℝ^2| cd=cp ∧ ab=ap}
11. v : {p:ℝ^2| cd=cp ∧ ab=ap}
12. y ≠ b
13. x ≠ d
14. d(c;x) < d(c;d)
⊢ d(a;y) < d(a;b)
BY
{ (Assert real-vec-be(2;a;y;b) BY
(BLemma `rv-non-strict-between-iff` THEN Auto)) }

1
.....aux.....
1. c : ℝ^2
2. d : ℝ^2
3. a : ℝ^2
4. b : ℝ^2
5. p : {p:ℝ^2| cd=cp}
6. q : {q:ℝ^2| ab=aq}
7. y : {x:ℝ^2| ap=ax ∧ (¬(a ≠ x ∧ x ≠ b ∧ (¬a-x-b)))}
8. x : {y:ℝ^2| cq=cy ∧ (¬(c ≠ y ∧ y ≠ d ∧ (¬c-y-d)))}
9. c ≠ a
10. u : {p:ℝ^2| cd=cp ∧ ab=ap}
11. v : {p:ℝ^2| cd=cp ∧ ab=ap}
12. y ≠ b
13. x ≠ d
14. d(c;x) < d(c;d)
⊢ a ≠ b

2
1. c : ℝ^2
2. d : ℝ^2
3. a : ℝ^2
4. b : ℝ^2
5. p : {p:ℝ^2| cd=cp}
6. q : {q:ℝ^2| ab=aq}
7. y : {x:ℝ^2| ap=ax ∧ (¬(a ≠ x ∧ x ≠ b ∧ (¬a-x-b)))}
8. x : {y:ℝ^2| cq=cy ∧ (¬(c ≠ y ∧ y ≠ d ∧ (¬c-y-d)))}
9. c ≠ a
10. u : {p:ℝ^2| cd=cp ∧ ab=ap}
11. v : {p:ℝ^2| cd=cp ∧ ab=ap}
12. y ≠ b
13. x ≠ d
14. d(c;x) < d(c;d)
15. real-vec-be(2;a;y;b)
⊢ d(a;y) < d(a;b)

Latex:

Latex:
1. c : \mBbbR{}\^{}2 2. d : \mBbbR{}\^{}2 3. a : \mBbbR{}\^{}2 4. b : \mBbbR{}\^{}2 5. p : \{p:\mBbbR{}\^{}2| cd=cp\} 6. q : \{q:\mBbbR{}\^{}2| ab=aq\} 7. y : \{x:\mBbbR{}\^{}2| ap=ax \mwedge{} (\mneg{}(a \mneq{} x \mwedge{} x \mneq{} b \mwedge{} (\mneg{}a-x-b)))\} 8. x : \{y:\mBbbR{}\^{}2| cq=cy \mwedge{} (\mneg{}(c \mneq{} y \mwedge{} y \mneq{} d \mwedge{} (\mneg{}c-y-d)))\} 9. c \mneq{} a 10. u : \{p:\mBbbR{}\^{}2| cd=cp \mwedge{} ab=ap\} 11. v : \{p:\mBbbR{}\^{}2| cd=cp \mwedge{} ab=ap\} 12. y \mneq{} b 13. x \mneq{} d 14. d(c;x) < d(c;d) \mvdash{} d(a;y) < d(a;b) By Latex: (Assert real-vec-be(2;a;y;b) BY (BLemma `rv-non-strict-between-iff` THEN Auto)) Home Index