Proof of Nuprl Lemma : ip-line-circle-lemma

Step * 2 1 1 2 1 2 of Lemma ip-line-circle-lemma

1. rv : InnerProductSpace
2. r : ℝ
3. p : Point
4. ||p|| ≤ r
5. v : Point
6. r0 < ||v||
7. r0 ≤ (p ⋅ v^2 - ||v||^2 * (||p||^2 - r^2))
8. r0 ≤ (((r(2) * p ⋅ v) * r(2) * p ⋅ v) - r(4) * ||v||^2 * (||p||^2 - r^2))
9. r0 < ||v||^2
10. ∀t:ℝ. (||p + t*v|| = r ⇐⇒ ((v^2 * t^2) + ((r(2) * p ⋅ v) * t) + (||p||^2 - r^2)) = r0)
⊢ (||p + quadratic1(||v||^2;r(2) * p ⋅ v;||p||^2 - r^2)*v|| = r)
∧ (||p + quadratic2(||v||^2;r(2) * p ⋅ v;||p||^2 - r^2)*v|| = r)
BY
{ ((RWO  "rv-norm-squared<" (-1) THENA Auto) THEN (RWO "-1" 0 THENA Auto)) }

1
1. rv : InnerProductSpace
2. r : ℝ
3. p : Point
4. ||p|| ≤ r
5. v : Point
6. r0 < ||v||
7. r0 ≤ (p ⋅ v^2 - ||v||^2 * (||p||^2 - r^2))
8. r0 ≤ (((r(2) * p ⋅ v) * r(2) * p ⋅ v) - r(4) * ||v||^2 * (||p||^2 - r^2))
9. r0 < ||v||^2
10. ∀t:ℝ. (||p + t*v|| = r ⇐⇒ ((||v||^2 * t^2) + ((r(2) * p ⋅ v) * t) + (||p||^2 - r^2)) = r0)
⊢ (((||v||^2 * quadratic1(||v||^2;r(2) * p ⋅ v;||p||^2 - r^2)^2)
+ ((r(2) * p ⋅ v) * quadratic1(||v||^2;r(2) * p ⋅ v;||p||^2 - r^2))
+ (||p||^2 - r^2))
= r0)
∧ (((||v||^2 * quadratic2(||v||^2;r(2) * p ⋅ v;||p||^2 - r^2)^2)
  + ((r(2) * p ⋅ v) * quadratic2(||v||^2;r(2) * p ⋅ v;||p||^2 - r^2))
  + (||p||^2 - r^2))
  = r0)

Latex:

Latex:
1. rv : InnerProductSpace 2. r : \mBbbR{} 3. p : Point 4. ||p|| \mleq{} r 5. v : Point 6. r0 < ||v|| 7. r0 \mleq{} (p \mcdot{} v\^{}2 - ||v||\^{}2 * (||p||\^{}2 - r\^{}2)) 8. r0 \mleq{} (((r(2) * p \mcdot{} v) * r(2) * p \mcdot{} v) - r(4) * ||v||\^{}2 * (||p||\^{}2 - r\^{}2)) 9. r0 < ||v||\^{}2 10. \mforall{}t:\mBbbR{}. (||p + t*v|| = r \mLeftarrow{}{}\mRightarrow{} ((v\^{}2 * t\^{}2) + ((r(2) * p \mcdot{} v) * t) + (||p||\^{}2 - r\^{}2)) = r0) \mvdash{} (||p + quadratic1(||v||\^{}2;r(2) * p \mcdot{} v;||p||\^{}2 - r\^{}2)*v|| = r) \mwedge{} (||p + quadratic2(||v||\^{}2;r(2) * p \mcdot{} v;||p||\^{}2 - r\^{}2)*v|| = r) By Latex: ((RWO "rv-norm-squared<" (-1) THENA Auto) THEN (RWO "-1" 0 THENA Auto)) Home Index