Proof of Nuprl Lemma : rabs-Riemann-integral

Step * 3 of Lemma rabs-Riemann-integral

1. a : ℝ
2. b : {b:ℝ| a ≤ b}
3. f : {f:[a, b] ⟶ℝ| ifun(f;[a, b])}
4. ∀c1,c2:ℝ.

     ((c1 * (b - a)) ≤ ∫ f[x] dx on [a, b]) ∧ (∫ f[x] dx on [a, b] ≤ (c2 * (b - a)))

supposing ∀x:ℝ. ((x ∈ [a, b]) ⇒ ((c1 ≤ f[x]) ∧ (f[x] ≤ c2)))
5. (-(||f[x]||_x:[a, b]) * (b - a)) ≤ ∫ f[x] dx on [a, b]
6. ∫ f[x] dx on [a, b] ≤ (||f[x]||_x:[a, b] * (b - a))
⊢ |∫ f[x] dx on [a, b]| ≤ (||f[x]||_x:[a, b] * (b - a))
BY
{ ((RWO "rabs-as-rmax" 0 THENA Auto) THEN BLemma `rmax_lb` THEN Auto) }

Latex:

Latex:
1. a : \mBbbR{} 2. b : \{b:\mBbbR{}| a \mleq{} b\} 3. f : \{f:[a, b] {}\mrightarrow{}\mBbbR{}| ifun(f;[a, b])\} 4. \mforall{}c1,c2:\mBbbR{}. ((c1 * (b - a)) \mleq{} \mint{} f[x] dx on [a, b]) \mwedge{} (\mint{} f[x] dx on [a, b] \mleq{} (c2 * (b - a))) supposing \mforall{}x:\mBbbR{}. ((x \mmember{} [a, b]) {}\mRightarrow{} ((c1 \mleq{} f[x]) \mwedge{} (f[x] \mleq{} c2))) 5. (-(||f[x]||\_x:[a, b]) * (b - a)) \mleq{} \mint{} f[x] dx on [a, b] 6. \mint{} f[x] dx on [a, b] \mleq{} (||f[x]||\_x:[a, b] * (b - a)) \mvdash{} |\mint{} f[x] dx on [a, b]| \mleq{} (||f[x]||\_x:[a, b] * (b - a)) By Latex: ((RWO "rabs-as-rmax" 0 THENA Auto) THEN BLemma `rmax\_lb` THEN Auto) Home Index