Proof of Nuprl Lemma : egyptian-fraction

Step * 1 1 2 2 1 of Lemma egyptian-fraction

1. a : ℕ
2. ∀a1:ℕa. ∀b:ℕ. ((0 ≤ a1) ⇒ a1 < b ⇒ (∃L:ℕ⁺ List [((a1/b) = Σ0 ≤ i < ||L||. (1/L[i]) ∈ ℚ)]))
3. ¬(a = 0 ∈ ℤ)
4. b : ℕ
5. 0 ≤ a
6. a < b
7. n : ℕ
8. b ≤ (a * n)
9. a * n < a + b
10. 0 < n
11. n * a < n * b
12. ∃L:ℕ⁺ List [(((a * n) - b/b * n) = Σ0 ≤ i < ||L||. (1/L[i]) ∈ ℚ)]
⊢ ∃L:ℕ⁺ List [((a/b) = Σ0 ≤ i < ||L||. (1/L[i]) ∈ ℚ)]
BY
{ xxx(D -1 THEN With ⌜L @ [n]⌝ (D 0)⋅ THEN Auto)xxx }

1
1. a : ℕ
2. ∀a1:ℕa. ∀b:ℕ. ((0 ≤ a1) ⇒ a1 < b ⇒ (∃L:ℕ⁺ List [((a1/b) = Σ0 ≤ i < ||L||. (1/L[i]) ∈ ℚ)]))
3. ¬(a = 0 ∈ ℤ)
4. b : ℕ
5. 0 ≤ a
6. a < b
7. n : ℕ
8. b ≤ (a * n)
9. a * n < a + b
10. 0 < n
11. n * a < n * b
12. L : ℕ⁺ List
13. ((a * n) - b/b * n) = Σ0 ≤ i < ||L||. (1/L[i]) ∈ ℚ
⊢ (a/b) = Σ0 ≤ i < ||L|| + 1. (1/L @ [n][i]) ∈ ℚ

Latex:

Latex:
1. a : \mBbbN{} 2. \mforall{}a1:\mBbbN{}a. \mforall{}b:\mBbbN{}. ((0 \mleq{} a1) {}\mRightarrow{} a1 < b {}\mRightarrow{} (\mexists{}L:\mBbbN{}\msupplus{} List [((a1/b) = \mSigma{}0 \mleq{} i < ||L||. (1/L[i]))])) 3. \mneg{}(a = 0) 4. b : \mBbbN{} 5. 0 \mleq{} a 6. a < b 7. n : \mBbbN{} 8. b \mleq{} (a * n) 9. a * n < a + b 10. 0 < n 11. n * a < n * b 12. \mexists{}L:\mBbbN{}\msupplus{} List [(((a * n) - b/b * n) = \mSigma{}0 \mleq{} i < ||L||. (1/L[i]))] \mvdash{} \mexists{}L:\mBbbN{}\msupplus{} List [((a/b) = \mSigma{}0 \mleq{} i < ||L||. (1/L[i]))] By Latex: xxx(D -1 THEN With \mkleeneopen{}L @ [n]\mkleeneclose{} (D 0)\mcdot{} THEN Auto)xxx Home Index