Proof of Nuprl Lemma : rsum-positive-implies

Step * 1 2 2 2 of Lemma rsum-positive-implies

1. n : ℤ
2. m : ℤ
3. x : {n..m + 1^-} ⟶ ℝ
4. r0 < Σ{x[i] | n≤i≤m}
5. k : ℕ⁺
6. (r1/r(k)) < Σ{x[i] | n≤i≤m}
7. ¬m < n
8. ∀i:{n..m + 1^-}. ((r0 < |x[i]|) ∨ (|x[i]| < (r1/r(k * (1 + (m - n))))))
9. ¬(∀i:{n..m + 1^-}. (|x[i]| < (r1/r(k * (1 + (m - n))))))
⊢ ∃i:{n..m + 1^-}. (r0 < |x[i]|)
BY
{ (Assert ∀i:{n..m + 1^-}. ((|x[i]| < (r1/r(k * (1 + (m - n))))) ∨ (r0 < |x[i]|)) BY
((ParallelOp -2 THENM D -1) THEN Auto)) }

1
1. n : ℤ
2. m : ℤ
3. x : {n..m + 1^-} ⟶ ℝ
4. r0 < Σ{x[i] | n≤i≤m}
5. k : ℕ⁺
6. (r1/r(k)) < Σ{x[i] | n≤i≤m}
7. ¬m < n
8. ∀i:{n..m + 1^-}. ((r0 < |x[i]|) ∨ (|x[i]| < (r1/r(k * (1 + (m - n))))))
9. ¬(∀i:{n..m + 1^-}. (|x[i]| < (r1/r(k * (1 + (m - n))))))
10. ∀i:{n..m + 1^-}. ((|x[i]| < (r1/r(k * (1 + (m - n))))) ∨ (r0 < |x[i]|))
⊢ ∃i:{n..m + 1^-}. (r0 < |x[i]|)

Latex:

Latex:
1. n : \mBbbZ{} 2. m : \mBbbZ{} 3. x : \{n..m + 1\msupminus{}\} {}\mrightarrow{} \mBbbR{} 4. r0 < \mSigma{}\{x[i] | n\mleq{}i\mleq{}m\} 5. k : \mBbbN{}\msupplus{} 6. (r1/r(k)) < \mSigma{}\{x[i] | n\mleq{}i\mleq{}m\} 7. \mneg{}m < n 8. \mforall{}i:\{n..m + 1\msupminus{}\}. ((r0 < |x[i]|) \mvee{} (|x[i]| < (r1/r(k * (1 + (m - n)))))) 9. \mneg{}(\mforall{}i:\{n..m + 1\msupminus{}\}. (|x[i]| < (r1/r(k * (1 + (m - n)))))) \mvdash{} \mexists{}i:\{n..m + 1\msupminus{}\}. (r0 < |x[i]|) By Latex: (Assert \mforall{}i:\{n..m + 1\msupminus{}\}. ((|x[i]| < (r1/r(k * (1 + (m - n))))) \mvee{} (r0 < |x[i]|)) BY ((ParallelOp -2 THENM D -1) THEN Auto)) Home Index