Proof of Nuprl Lemma : converges-to-rexp

Step * 1 2 1 1 2 1 of Lemma converges-to-rexp

1. m : ℤ
2. 0 < m
3. e^r(m - 1) ≤ r(3^m - 1)
4. e^r(m) = (e^r(m - 1) * e^r1)
⊢ (e^r(m - 1) * e^r1) ≤ r(3^m)
BY
{ (RWO "-2" 0 THENA Auto) }

1
.....rw func antecedent.....
1. m : ℤ
2. 0 < m
3. e^r(m - 1) ≤ r(3^m - 1)
4. e^r(m) = (e^r(m - 1) * e^r1)
⊢ ((r0 ≤ e^r(m - 1)) ∧ (r0 ≤ e^r1)) ∨ ((r0 ≤ e^r1) ∧ (r0 ≤ r(3^m - 1)))

2
1. m : ℤ
2. 0 < m
3. e^r(m - 1) ≤ r(3^m - 1)
4. e^r(m) = (e^r(m - 1) * e^r1)
⊢ (r(3^m - 1) * e^r1) ≤ r(3^m)

Latex:

Latex:
1. m : \mBbbZ{} 2. 0 < m 3. e\^{}r(m - 1) \mleq{} r(3\^{}m - 1) 4. e\^{}r(m) = (e\^{}r(m - 1) * e\^{}r1) \mvdash{} (e\^{}r(m - 1) * e\^{}r1) \mleq{} r(3\^{}m) By Latex: (RWO "-2" 0 THENA Auto) Home Index