Proof of Nuprl Lemma : rdiv-factorial-lemma3

Step * 1 of Lemma rdiv-factorial-lemma3

1. x : ℝ
2. b : ℕ
3. (x * x) ≤ r(b * b)
4. n : ℕ
5. (b ÷ 2) ≤ n
6. (x * x) ≤ (r((2 * (n + 1))!)/r((2 * n)!))
⊢ (r((2 * (n + 1))!)/r((2 * n)!)) ≤ (r(((2 * (n + 1)) + 1)!)/r(((2 * n) + 1)!))
BY
{ Assert ⌜(((2 * n) + 1)! * (2 * (n + 1))!) ≤ ((2 * n)! * ((2 * (n + 1)) + 1)!)⌝⋅ }

1
.....assertion.....
1. x : ℝ
2. b : ℕ
3. (x * x) ≤ r(b * b)
4. n : ℕ
5. (b ÷ 2) ≤ n
6. (x * x) ≤ (r((2 * (n + 1))!)/r((2 * n)!))
⊢ (((2 * n) + 1)! * (2 * (n + 1))!) ≤ ((2 * n)! * ((2 * (n + 1)) + 1)!)

2
1. x : ℝ
2. b : ℕ
3. (x * x) ≤ r(b * b)
4. n : ℕ
5. (b ÷ 2) ≤ n
6. (x * x) ≤ (r((2 * (n + 1))!)/r((2 * n)!))
7. (((2 * n) + 1)! * (2 * (n + 1))!) ≤ ((2 * n)! * ((2 * (n + 1)) + 1)!)
⊢ (r((2 * (n + 1))!)/r((2 * n)!)) ≤ (r(((2 * (n + 1)) + 1)!)/r(((2 * n) + 1)!))

Latex:

Latex:
1. x : \mBbbR{} 2. b : \mBbbN{} 3. (x * x) \mleq{} r(b * b) 4. n : \mBbbN{} 5. (b \mdiv{} 2) \mleq{} n 6. (x * x) \mleq{} (r((2 * (n + 1))!)/r((2 * n)!)) \mvdash{} (r((2 * (n + 1))!)/r((2 * n)!)) \mleq{} (r(((2 * (n + 1)) + 1)!)/r(((2 * n) + 1)!)) By Latex: Assert \mkleeneopen{}(((2 * n) + 1)! * (2 * (n + 1))!) \mleq{} ((2 * n)! * ((2 * (n + 1)) + 1)!)\mkleeneclose{}\mcdot{} Home Index