Proof of Nuprl Lemma : sum-of-three-cubes-iff-1

Step * 2 1 of Lemma sum-of-three-cubes-iff-1

1. k : ℕ
2. a : ℤ
3. b : ℤ
4. c : ℤ
5. 0 ≤ (a + b)
6. (((a * a * a) + (b * b * b)) + (c * c * c)) = k ∈ ℤ
7. (((a + b) = 0 ∈ ℤ) ∧ ((c * c * c) = k ∈ ℤ))
∨ ((¬((a + b) = 0 ∈ ℤ))
  ∧ ((k - c * c * c rem a + b) = 0 ∈ ℤ)
  ∧ (((a * a) + ((b * b) - a * b)) = ((k - c * c * c) ÷ a + b) ∈ ℤ))
⊢ ∃d:ℕ
   (((a + b) = d ∈ ℤ)
   ∧ (((d = 0 ∈ ℤ) ∧ ((c * c * c) = k ∈ ℤ))
     ∨ ((¬(d = 0 ∈ ℤ))
       ∧ ((k - c * c * c rem d) = 0 ∈ ℤ)
       ∧ (((a * a) + ((b * b) - a * b)) = ((k - c * c * c) ÷ d) ∈ ℤ))))
BY
{ (D 0 With ⌜a + b⌝  THEN Auto) }

Latex:

Latex:
1. k : \mBbbN{} 2. a : \mBbbZ{} 3. b : \mBbbZ{} 4. c : \mBbbZ{} 5. 0 \mleq{} (a + b) 6. (((a * a * a) + (b * b * b)) + (c * c * c)) = k 7. (((a + b) = 0) \mwedge{} ((c * c * c) = k)) \mvee{} ((\mneg{}((a + b) = 0)) \mwedge{} ((k - c * c * c rem a + b) = 0) \mwedge{} (((a * a) + ((b * b) - a * b)) = ((k - c * c * c) \mdiv{} a + b))) \mvdash{} \mexists{}d:\mBbbN{} (((a + b) = d) \mwedge{} (((d = 0) \mwedge{} ((c * c * c) = k)) \mvee{} ((\mneg{}(d = 0)) \mwedge{} ((k - c * c * c rem d) = 0) \mwedge{} (((a * a) + ((b * b) - a * b)) = ((k - c * c * c) \mdiv{} d))))) By Latex: (D 0 With \mkleeneopen{}a + b\mkleeneclose{} THEN Auto) Home Index