Proof of Nuprl Lemma : rational-lower-approx-property

Step * 2 1 1 1 of Lemma rational-lower-approx-property

1. x : ℝ
2. n : ℕ⁺
3. a : ℤ
4. (x (2 * n)) = a ∈ ℤ
5. (r(a - 2))/2 * 2 * n = ((r(a))/2 * 2 * n - (r1/r(2 * n)))
6. r : ℝ
7. (r(a))/2 * 2 * n = r ∈ ℝ
8. (r - (r1/r(2 * n))) ≤ x
9. x ≤ (r + (r1/r(2 * n)))
10. (r - (r1/r(2 * n))) ≤ x
⊢ (r + (r1/r(2 * n))) ≤ ((r - (r1/r(2 * n))) + (r1/r(n)))
BY
{ (Assert ((r1/r(2 * n)) + (r1/r(2 * n))) = (r1/r(n)) BY
(RWW "radd-rdiv radd-int" 0 THEN Auto)) }

1
1. x : ℝ
2. n : ℕ⁺
3. a : ℤ
4. (x (2 * n)) = a ∈ ℤ
5. (r(a - 2))/2 * 2 * n = ((r(a))/2 * 2 * n - (r1/r(2 * n)))
6. r : ℝ
7. (r(a))/2 * 2 * n = r ∈ ℝ
8. (r - (r1/r(2 * n))) ≤ x
9. x ≤ (r + (r1/r(2 * n)))
10. (r - (r1/r(2 * n))) ≤ x
11. ((r1/r(2 * n)) + (r1/r(2 * n))) = (r1/r(n))
⊢ (r + (r1/r(2 * n))) ≤ ((r - (r1/r(2 * n))) + (r1/r(n)))

Latex:

Latex:
1. x : \mBbbR{} 2. n : \mBbbN{}\msupplus{} 3. a : \mBbbZ{} 4. (x (2 * n)) = a 5. (r(a - 2))/2 * 2 * n = ((r(a))/2 * 2 * n - (r1/r(2 * n))) 6. r : \mBbbR{} 7. (r(a))/2 * 2 * n = r 8. (r - (r1/r(2 * n))) \mleq{} x 9. x \mleq{} (r + (r1/r(2 * n))) 10. (r - (r1/r(2 * n))) \mleq{} x \mvdash{} (r + (r1/r(2 * n))) \mleq{} ((r - (r1/r(2 * n))) + (r1/r(n))) By Latex: (Assert ((r1/r(2 * n)) + (r1/r(2 * n))) = (r1/r(n)) BY (RWW "radd-rdiv radd-int" 0 THEN Auto)) Home Index