Proof of Nuprl Lemma : rsqrt2-repels-rationals

Step * 2 1 1 1 1 2 1 of Lemma rsqrt2-repels-rationals

1. n : ℕ⁺
2. m : ℤ
3. (2 * m) ≤ (3 * n)
4. (|(r(n) * rsqrt(r(2))) - r(m)| * |(r(n) * rsqrt(r(2))) + r(m)|) = r(|(2 * n * n) - m * m|)
5. n ≤ m
6. r1 ≤ (|(r(n) * rsqrt(r(2))) - r(m)| * |(r(n) * rsqrt(r(2))) + r(m)|)
⊢ (r1/r(3 * n * n)) ≤ |rsqrt(r(2)) - (r(m)/r(n))|
BY
{ nRMul ⌜r(3 * n * n)⌝ 0⋅ }

1
1. n : ℕ⁺
2. m : ℤ
3. (2 * m) ≤ (3 * n)
4. (|(r(n) * rsqrt(r(2))) - r(m)| * |(r(n) * rsqrt(r(2))) + r(m)|) = r(|(2 * n * n) - m * m|)
5. n ≤ m
6. r1 ≤ (|(r(n) * rsqrt(r(2))) - r(m)| * |(r(n) * rsqrt(r(2))) + r(m)|)
⊢ r1 ≤ (r(3) * r(n) * r(n) * |rsqrt(r(2)) + (-(r(m))/r(n))|)

Latex:

Latex:
1. n : \mBbbN{}\msupplus{} 2. m : \mBbbZ{} 3. (2 * m) \mleq{} (3 * n) 4. (|(r(n) * rsqrt(r(2))) - r(m)| * |(r(n) * rsqrt(r(2))) + r(m)|) = r(|(2 * n * n) - m * m|) 5. n \mleq{} m 6. r1 \mleq{} (|(r(n) * rsqrt(r(2))) - r(m)| * |(r(n) * rsqrt(r(2))) + r(m)|) \mvdash{} (r1/r(3 * n * n)) \mleq{} |rsqrt(r(2)) - (r(m)/r(n))| By Latex: nRMul \mkleeneopen{}r(3 * n * n)\mkleeneclose{} 0\mcdot{} Home Index