Proof of Nuprl Lemma : rroot-exists-part1

Step * 1 1 1 1 1 1 1 1 of Lemma rroot-exists-part1

1. i : {2...}
2. x : {x:ℝ| (↑isEven(i)) ⇒ (r0 ≤ x)}
3. k : ℕ⁺
4. p : ℤ
5. p = (x (2 * k)) ∈ ℤ
6. |(r(p)/r(4 * k)) - x| ≤ (r1/r(2 * k))
7. ((r(p)/r(4 * k)) < (r(-1)/r(2 * k))) ∨ ((r1/r(2 * k)) < (r(p)/r(4 * k)))
8. (r0 ≤ (r(p)/r(4 * k))) ∨ (↑isOdd(i))
9. a : ℤ
10. b : ℕ⁺
11. (0 ≤ p) ⇒ (0 ≤ a)
12. (0 ≤ p) ⇐ 0 ≤ a
13. |(r(a))/b^i - (r(p)/r(4 * k))| < (r1/r(2 * k))
⊢ ((r1/r(2 * k)) + (r1/r(2 * k))) ≤ (r1/r(k))
BY
{ (RWW "radd-rdiv radd-int" 0 THEN Auto) }

Latex:

Latex:
1. i : \{2...\} 2. x : \{x:\mBbbR{}| (\muparrow{}isEven(i)) {}\mRightarrow{} (r0 \mleq{} x)\} 3. k : \mBbbN{}\msupplus{} 4. p : \mBbbZ{} 5. p = (x (2 * k)) 6. |(r(p)/r(4 * k)) - x| \mleq{} (r1/r(2 * k)) 7. ((r(p)/r(4 * k)) < (r(-1)/r(2 * k))) \mvee{} ((r1/r(2 * k)) < (r(p)/r(4 * k))) 8. (r0 \mleq{} (r(p)/r(4 * k))) \mvee{} (\muparrow{}isOdd(i)) 9. a : \mBbbZ{} 10. b : \mBbbN{}\msupplus{} 11. (0 \mleq{} p) {}\mRightarrow{} (0 \mleq{} a) 12. (0 \mleq{} p) \mLeftarrow{}{} 0 \mleq{} a 13. |(r(a))/b\^{}i - (r(p)/r(4 * k))| < (r1/r(2 * k)) \mvdash{} ((r1/r(2 * k)) + (r1/r(2 * k))) \mleq{} (r1/r(k)) By Latex: (RWW "radd-rdiv radd-int" 0 THEN Auto) Home Index