Proof of Nuprl Lemma : q-geometric-series-converges

Step * 2 1 of Lemma q-geometric-series-converges

.....equality.....
1. a : {a:ℚ| |a| < 1}
2. e : {e:ℚ| 0 < e ∧ (e ≤ 1)}
3. ¬((1 - a) = 0 ∈ ℚ)
4. |a| ∈ {q:ℚ| (0 ≤ q) ∧ q < 1}
5. e' : {e:ℚ| 0 < e}
6. e' = (|1 - a| * e) ∈ {e:ℚ| 0 < e}
7. v : ℕ⁺
8. |a| ↑ v < e'
9. m : ℕ
10. v ≤ m
⊢ |Σ0 ≤ i < m. a ↑ i - (1/1 - a)| = (|a| ↑ m/|1 - a|) ∈ ℚ
BY
{ (RWO "q-geometric-series" 0 THEN Auto)⋅ }

1
1. a : {a:ℚ| |a| < 1}
2. e : {e:ℚ| 0 < e ∧ (e ≤ 1)}
3. ¬((1 - a) = 0 ∈ ℚ)
4. |a| ∈ {q:ℚ| (0 ≤ q) ∧ q < 1}
5. e' : {e:ℚ| 0 < e}
6. e' = (|1 - a| * e) ∈ {e:ℚ| 0 < e}
7. v : ℕ⁺
8. |a| ↑ v < e'
9. m : ℕ
10. v ≤ m
⊢ ¬(|1 - a| = 0 ∈ ℚ)

2
1. a : {a:ℚ| |a| < 1}
2. e : {e:ℚ| 0 < e ∧ (e ≤ 1)}
3. ¬((1 - a) = 0 ∈ ℚ)
4. |a| ∈ {q:ℚ| (0 ≤ q) ∧ q < 1}
5. e' : {e:ℚ| 0 < e}
6. e' = (|1 - a| * e) ∈ {e:ℚ| 0 < e}
7. v : ℕ⁺
8. |a| ↑ v < e'
9. m : ℕ
10. v ≤ m

⊢ |if qeq(a;1) then m else (1 - a ↑ m/1 - a) fi  - (1/1 - a)| = (|a| ↑ m/|1 - a|) ∈ ℚ

Latex:

Latex:
.....equality..... 1. a : \{a:\mBbbQ{}| |a| < 1\} 2. e : \{e:\mBbbQ{}| 0 < e \mwedge{} (e \mleq{} 1)\} 3. \mneg{}((1 - a) = 0) 4. |a| \mmember{} \{q:\mBbbQ{}| (0 \mleq{} q) \mwedge{} q < 1\} 5. e' : \{e:\mBbbQ{}| 0 < e\} 6. e' = (|1 - a| * e) 7. v : \mBbbN{}\msupplus{} 8. |a| \muparrow{} v < e' 9. m : \mBbbN{} 10. v \mleq{} m \mvdash{} |\mSigma{}0 \mleq{} i < m. a \muparrow{} i - (1/1 - a)| = (|a| \muparrow{} m/|1 - a|) By Latex: (RWO "q-geometric-series" 0 THEN Auto)\mcdot{} Home Index