Proof of Nuprl Lemma : r2-equidistant-implies

Step * of Lemma r2-equidistant-implies

∀a,b:ℝ^2.  (a ≠ b ⇒ (∀x:ℝ^2. (ax=bx ⇒ (∃t:ℝ. req-vec(2;x;vec-midpoint(a;b) + t*r2-perp(b - a))))))
BY
{ (RepeatFor 3 ((D 0 THENA Auto))
   THEN (Assert r0 < ||b - a|| BY
               (Fold `real-vec-dist` 0 THEN RWO "real-vec-dist-symmetry" 0 THEN Auto))
   THEN Auto
   THEN Assert ⌜x - vec-midpoint(a;b)⋅b - a = r0⌝⋅) }

1
.....assertion.....
1. a : ℝ^2
2. b : ℝ^2
3. a ≠ b
4. r0 < ||b - a||
5. x : ℝ^2
6. ax=bx
⊢ x - vec-midpoint(a;b)⋅b - a = r0

2
1. a : ℝ^2
2. b : ℝ^2
3. a ≠ b
4. r0 < ||b - a||
5. x : ℝ^2
6. ax=bx
7. x - vec-midpoint(a;b)⋅b - a = r0
⊢ ∃t:ℝ. req-vec(2;x;vec-midpoint(a;b) + t*r2-perp(b - a))

Latex:

Latex:
\mforall{}a,b:\mBbbR{}\^{}2. (a \mneq{} b {}\mRightarrow{} (\mforall{}x:\mBbbR{}\^{}2. (ax=bx {}\mRightarrow{} (\mexists{}t:\mBbbR{}. req-vec(2;x;vec-midpoint(a;b) + t*r2-perp(b - a)))))) By Latex: (RepeatFor 3 ((D 0 THENA Auto)) THEN (Assert r0 < ||b - a|| BY (Fold `real-vec-dist` 0 THEN RWO "real-vec-dist-symmetry" 0 THEN Auto)) THEN Auto THEN Assert \mkleeneopen{}x - vec-midpoint(a;b)\mcdot{}b - a = r0\mkleeneclose{}\mcdot{}) Home Index