Proof of Nuprl Lemma : rational-truncate

Step * 1 1 1 1 of Lemma rational-truncate

1. q : ℚ
2. e : {e:ℚ| 0 < e}
3. e < 1

4. v : ∀q:ℚ. ∀e:{e:ℚ| 0 < e ∧ e < 1} .  (∃p:ℤ × ℕ⁺ [((|q - (fst(p)/snd(p))| ≤ e) ∧ (((snd(p)) * e) ≤ 2))])

5. TERMOF{rational-truncate1:o, 1:l}
= v

∈ (∀q:ℚ. ∀e:{e:ℚ| 0 < e ∧ e < 1} .  (∃p:ℤ × ℕ⁺ [((|q - (fst(p)/snd(p))| ≤ e) ∧ (((snd(p)) * e) ≤ 2))]))

⊢ v q e ∈ ∃p:ℤ × ℕ⁺ [((|q - (fst(p)/snd(p))| ≤ e) ∧ (((snd(p)) * e) ≤ 2))]
BY
{ xxx(DVar `e' THEN Auto)xxx }

Latex:

Latex:
1. q : \mBbbQ{} 2. e : \{e:\mBbbQ{}| 0 < e\} 3. e < 1 4. v : \mforall{}q:\mBbbQ{}. \mforall{}e:\{e:\mBbbQ{}| 0 < e \mwedge{} e < 1\} . (\mexists{}p:\mBbbZ{} \mtimes{} \mBbbN{}\msupplus{} [((|q - (fst(p)/snd(p))| \mleq{} e) \mwedge{} (((snd(p)) * e) \mleq{} 2))]) 5. TERMOF\{rational-truncate1:o, 1:l\} = v \mvdash{} v q e \mmember{} \mexists{}p:\mBbbZ{} \mtimes{} \mBbbN{}\msupplus{} [((|q - (fst(p)/snd(p))| \mleq{} e) \mwedge{} (((snd(p)) * e) \mleq{} 2))] By Latex: xxx(DVar `e' THEN Auto)xxx Home Index