Proof of Nuprl Lemma : Riemann-sum-alt-req

Step * 1 2 1 1 2 1 3 1 1 of Lemma Riemann-sum-alt-req

.....assertion.....
1. a : ℝ
2. b : ℝ
3. a ≤ b
4. f : [a, b] ⟶ℝ
5. ∀x,y:ℝ.  ((x ∈ [a, b]) ⇒ (x = y) ⇒ ((f y) = (f x)))@i
6. k : ℕ⁺
7. icompact([a, b])
8. ∀i:ℕk. (((r(k - i) * a) + (r(i) * b)/r(k)) ∈ [a, b])
9. (∀x∈full-partition([a, b];uniform-partition([a, b];k)).x ∈ [a, b])
10. i : ℤ@i
11. 0 ≤ i@i
12. i ≤ (k - 1)@i
⊢ ∀i:ℕk + 1
    ([a / (mklist(k - 1;λi.(((r(k) - r(i + 1)) * a) + (r(i + 1) * b)/r(k))) @ [b])][i]
    = ((r(k - i) * a) + (r(i) * b)/r(k)))
BY
{ ((ThinVar `i' THEN Auto) THEN CaseNat 0 `i' THEN Reduce 0) }

1
1. a : ℝ
2. b : ℝ
3. a ≤ b
4. f : [a, b] ⟶ℝ
5. ∀x,y:ℝ.  ((x ∈ [a, b]) ⇒ (x = y) ⇒ ((f y) = (f x)))@i
6. k : ℕ⁺
7. icompact([a, b])
8. ∀i:ℕk. (((r(k - i) * a) + (r(i) * b)/r(k)) ∈ [a, b])
9. (∀x∈full-partition([a, b];uniform-partition([a, b];k)).x ∈ [a, b])
10. i : ℕk + 1@i
11. i = 0 ∈ ℤ
⊢ a = ((r(k - 0) * a) + (r0 * b)/r(k))

2
1. a : ℝ
2. b : ℝ
3. a ≤ b
4. f : [a, b] ⟶ℝ
5. ∀x,y:ℝ.  ((x ∈ [a, b]) ⇒ (x = y) ⇒ ((f y) = (f x)))@i
6. k : ℕ⁺
7. icompact([a, b])
8. ∀i:ℕk. (((r(k - i) * a) + (r(i) * b)/r(k)) ∈ [a, b])
9. (∀x∈full-partition([a, b];uniform-partition([a, b];k)).x ∈ [a, b])
10. i : ℕk + 1@i
11. ¬(i = 0 ∈ ℤ)

⊢ [a / (mklist(k - 1;λi.(((r(k) - r(i + 1)) * a) + (r(i + 1) * b)/r(k))) @ [b])][i] = ((r(k - i) * a) + (r(i) * b)/r(k))

Latex:

Latex:
.....assertion..... 1. a : \mBbbR{} 2. b : \mBbbR{} 3. a \mleq{} b 4. f : [a, b] {}\mrightarrow{}\mBbbR{} 5. \mforall{}x,y:\mBbbR{}. ((x \mmember{} [a, b]) {}\mRightarrow{} (x = y) {}\mRightarrow{} ((f y) = (f x)))@i 6. k : \mBbbN{}\msupplus{} 7. icompact([a, b]) 8. \mforall{}i:\mBbbN{}k. (((r(k - i) * a) + (r(i) * b)/r(k)) \mmember{} [a, b]) 9. (\mforall{}x\mmember{}full-partition([a, b];uniform-partition([a, b];k)).x \mmember{} [a, b]) 10. i : \mBbbZ{}@i 11. 0 \mleq{} i@i 12. i \mleq{} (k - 1)@i \mvdash{} \mforall{}i:\mBbbN{}k + 1 ([a / (mklist(k - 1;\mlambda{}i.(((r(k) - r(i + 1)) * a) + (r(i + 1) * b)/r(k))) @ [b])][i] = ((r(k - i) * a) + (r(i) * b)/r(k))) By Latex: ((ThinVar `i' THEN Auto) THEN CaseNat 0 `i' THEN Reduce 0) Home Index