Proof of Nuprl Lemma : not-ip-triangle

Step * 1 1 3 1 of Lemma not-ip-triangle

1. rv : InnerProductSpace
2. a : Point(rv)
3. b : Point(rv)
4. c : Point(rv)
5. a # b
6. c # b
7. (||a - b|| * ||c - b||) ≤ |a - b ⋅ c - b|
8. |a - b ⋅ c - b| ≤ (||a - b|| * ||c - b||)
9. |a - b ⋅ c - b| = (||a - b|| * ||c - b||)
10. t : ℝ
11. c - b ≡ t*a - b
⊢ r0 < |t|
BY
{ (Assert r0 < ||c - b|| BY
EAuto 2) }

1
1. rv : InnerProductSpace
2. a : Point(rv)
3. b : Point(rv)
4. c : Point(rv)
5. a # b
6. c # b
7. (||a - b|| * ||c - b||) ≤ |a - b ⋅ c - b|
8. |a - b ⋅ c - b| ≤ (||a - b|| * ||c - b||)
9. |a - b ⋅ c - b| = (||a - b|| * ||c - b||)
10. t : ℝ
11. c - b ≡ t*a - b
12. r0 < ||c - b||
⊢ r0 < |t|

Latex:

Latex:
1. rv : InnerProductSpace 2. a : Point(rv) 3. b : Point(rv) 4. c : Point(rv) 5. a \# b 6. c \# b 7. (||a - b|| * ||c - b||) \mleq{} |a - b \mcdot{} c - b| 8. |a - b \mcdot{} c - b| \mleq{} (||a - b|| * ||c - b||) 9. |a - b \mcdot{} c - b| = (||a - b|| * ||c - b||) 10. t : \mBbbR{} 11. c - b \mequiv{} t*a - b \mvdash{} r0 < |t| By Latex: (Assert r0 < ||c - b|| BY EAuto 2) Home Index