Proof of Nuprl Lemma : harmonic-series-diverges-to-infinity

Step * 2 1 1 1 1 1 2 1 1 of Lemma harmonic-series-diverges-to-infinity

1. n : ℤ
2. ¬2 * 2^n - 1 < 2^n - 1 + 1
3. 0 < n

4. Σ{(r1/r(2 * 2^n - 1)) | 2^n - 1 + 1≤i≤2 * 2^n - 1} ≤ Σ{(r1/r(i)) | 2^n - 1 + 1≤i≤2 * 2^n - 1}

5. 1 ≤ 2^n - 1
⊢ (r1 + (r(n)/r(2))) ≤ ((r1 + (r(n - 1)/r(2))) + ((r1/r(2 * 2^n - 1)) * r(2^n - 1)))
BY
{ (MoveToConcl (-1) THEN (GenConcl ⌜2^n - 1 = N ∈ ℤ⌝⋅ THENA Auto)) }

1
1. n : ℤ
2. ¬2 * 2^n - 1 < 2^n - 1 + 1
3. 0 < n

4. Σ{(r1/r(2 * 2^n - 1)) | 2^n - 1 + 1≤i≤2 * 2^n - 1} ≤ Σ{(r1/r(i)) | 2^n - 1 + 1≤i≤2 * 2^n - 1}

5. N : ℤ
6. 2^n - 1 = N ∈ ℤ
⊢ (1 ≤ N) ⇒ ((r1 + (r(n)/r(2))) ≤ ((r1 + (r(n - 1)/r(2))) + ((r1/r(2 * N)) * r(N))))

Latex:

Latex:
1. n : \mBbbZ{} 2. \mneg{}2 * 2\^{}n - 1 < 2\^{}n - 1 + 1 3. 0 < n 4. \mSigma{}\{(r1/r(2 * 2\^{}n - 1)) | 2\^{}n - 1 + 1\mleq{}i\mleq{}2 * 2\^{}n - 1\} \mleq{} \mSigma{}\{(r1/r(i)) | 2\^{}n - 1 + 1\mleq{}i\mleq{}2 * 2\^{}n - 1\} 5. 1 \mleq{} 2\^{}n - 1 \mvdash{} (r1 + (r(n)/r(2))) \mleq{} ((r1 + (r(n - 1)/r(2))) + ((r1/r(2 * 2\^{}n - 1)) * r(2\^{}n - 1))) By Latex: (MoveToConcl (-1) THEN (GenConcl \mkleeneopen{}2\^{}n - 1 = N\mkleeneclose{}\mcdot{} THENA Auto)) Home Index