Proof of Nuprl Lemma : rv-ge-dist

Step * 1 1 1 1 1 1 2 of Lemma rv-ge-dist

1. n : ℕ
2. a : ℝ^n
3. b : ℝ^n
4. c : ℝ^n
5. p : ℝ^n
6. d(a;b) ≤ d(c;p)
7. r0 < d(a;b)
8. q : ℝ^n
9. a + (d(c;p)/d(a;b))*b - a = q ∈ ℝ^n
10. r0 < d(c;p)
11. req-vec(n;b;(d(c;p) - d(a;b)/d(c;p))*a + r1 - (d(c;p) - d(a;b)/d(c;p))*q)
⊢ ∃w:ℝ^n. (a_b_w ∧ ab=ab ∧ cp=aw)
BY
{ Assert ⌜a_b_q⌝⋅ }

1
.....assertion.....
1. n : ℕ
2. a : ℝ^n
3. b : ℝ^n
4. c : ℝ^n
5. p : ℝ^n
6. d(a;b) ≤ d(c;p)
7. r0 < d(a;b)
8. q : ℝ^n
9. a + (d(c;p)/d(a;b))*b - a = q ∈ ℝ^n
10. r0 < d(c;p)
11. req-vec(n;b;(d(c;p) - d(a;b)/d(c;p))*a + r1 - (d(c;p) - d(a;b)/d(c;p))*q)
⊢ a_b_q

2
1. n : ℕ
2. a : ℝ^n
3. b : ℝ^n
4. c : ℝ^n
5. p : ℝ^n
6. d(a;b) ≤ d(c;p)
7. r0 < d(a;b)
8. q : ℝ^n
9. a + (d(c;p)/d(a;b))*b - a = q ∈ ℝ^n
10. r0 < d(c;p)
11. req-vec(n;b;(d(c;p) - d(a;b)/d(c;p))*a + r1 - (d(c;p) - d(a;b)/d(c;p))*q)
12. a_b_q
⊢ ∃w:ℝ^n. (a_b_w ∧ ab=ab ∧ cp=aw)

Latex:

Latex:
1. n : \mBbbN{} 2. a : \mBbbR{}\^{}n 3. b : \mBbbR{}\^{}n 4. c : \mBbbR{}\^{}n 5. p : \mBbbR{}\^{}n 6. d(a;b) \mleq{} d(c;p) 7. r0 < d(a;b) 8. q : \mBbbR{}\^{}n 9. a + (d(c;p)/d(a;b))*b - a = q 10. r0 < d(c;p) 11. req-vec(n;b;(d(c;p) - d(a;b)/d(c;p))*a + r1 - (d(c;p) - d(a;b)/d(c;p))*q) \mvdash{} \mexists{}w:\mBbbR{}\^{}n. (a\_b\_w \mwedge{} ab=ab \mwedge{} cp=aw) By Latex: Assert \mkleeneopen{}a\_b\_q\mkleeneclose{}\mcdot{} Home Index