Proof of Nuprl Lemma : sup-iff-closure

Step * 1 1 1 1 1 1 of Lemma sup-iff-closure

1. A : Set(ℝ)
2. x : ℝ
3. A ≤ x
4. ∀e:ℝ. ((r0 < e) ⇒ (∃x@0:ℝ. ((x@0 ∈ A) ∧ ((x - e) < x@0))))
5. ∀n:ℕ⁺. ∃z:ℝ. ((z ∈ A) ∧ ((x - (r1/r(n))) < z))
6. z : n:ℕ⁺ ⟶ ℝ
7. ∀n:ℕ⁺. ((z n ∈ A) ∧ ((x - (r1/r(n))) < (z n)))
8. k : ℕ⁺
9. n : ℕ
10. k ≤ n
11. (z (n + 1) ∈ A) ∧ ((x - (r1/r(n + 1))) < (z (n + 1)))
⊢ |(z (n + 1)) - x| ≤ (r1/r(k))
BY
{ (RWO "rabs-difference-symmetry" 0 THEN Auto) }

1
1. A : Set(ℝ)
2. x : ℝ
3. A ≤ x
4. ∀e:ℝ. ((r0 < e) ⇒ (∃x@0:ℝ. ((x@0 ∈ A) ∧ ((x - e) < x@0))))
5. ∀n:ℕ⁺. ∃z:ℝ. ((z ∈ A) ∧ ((x - (r1/r(n))) < z))
6. z : n:ℕ⁺ ⟶ ℝ
7. ∀n:ℕ⁺. ((z n ∈ A) ∧ ((x - (r1/r(n))) < (z n)))
8. k : ℕ⁺
9. n : ℕ
10. k ≤ n
11. z (n + 1) ∈ A
12. (x - (r1/r(n + 1))) < (z (n + 1))
⊢ |x - z (n + 1)| ≤ (r1/r(k))

Latex:

Latex:
1. A : Set(\mBbbR{}) 2. x : \mBbbR{} 3. A \mleq{} x 4. \mforall{}e:\mBbbR{}. ((r0 < e) {}\mRightarrow{} (\mexists{}x@0:\mBbbR{}. ((x@0 \mmember{} A) \mwedge{} ((x - e) < x@0)))) 5. \mforall{}n:\mBbbN{}\msupplus{}. \mexists{}z:\mBbbR{}. ((z \mmember{} A) \mwedge{} ((x - (r1/r(n))) < z)) 6. z : n:\mBbbN{}\msupplus{} {}\mrightarrow{} \mBbbR{} 7. \mforall{}n:\mBbbN{}\msupplus{}. ((z n \mmember{} A) \mwedge{} ((x - (r1/r(n))) < (z n))) 8. k : \mBbbN{}\msupplus{} 9. n : \mBbbN{} 10. k \mleq{} n 11. (z (n + 1) \mmember{} A) \mwedge{} ((x - (r1/r(n + 1))) < (z (n + 1))) \mvdash{} |(z (n + 1)) - x| \mleq{} (r1/r(k)) By Latex: (RWO "rabs-difference-symmetry" 0 THEN Auto) Home Index