Proof of Nuprl Lemma : rv-midpoint-unique

Step * 1 1 of Lemma rv-midpoint-unique

1. rv : InnerProductSpace
2. a : Point(rv)
3. b : Point(rv)
4. m : Point(rv)
5. ||m - b|| = ||b - m||
6. a' : Point(rv)
7. m - a = a' ∈ Point(rv)
8. b' : Point(rv)
9. b - m = b' ∈ Point(rv)
10. ||a'|| = (||b - a||/r(2))
11. ||b'|| = (||b - a||/r(2))
⊢ m ≡ (r1/r(2))*a + b
BY
{ Assert ⌜a' - b' ≡ 0⌝⋅ }

1
.....assertion.....
1. rv : InnerProductSpace
2. a : Point(rv)
3. b : Point(rv)
4. m : Point(rv)
5. ||m - b|| = ||b - m||
6. a' : Point(rv)
7. m - a = a' ∈ Point(rv)
8. b' : Point(rv)
9. b - m = b' ∈ Point(rv)
10. ||a'|| = (||b - a||/r(2))
11. ||b'|| = (||b - a||/r(2))
⊢ a' - b' ≡ 0

2
1. rv : InnerProductSpace
2. a : Point(rv)
3. b : Point(rv)
4. m : Point(rv)
5. ||m - b|| = ||b - m||
6. a' : Point(rv)
7. m - a = a' ∈ Point(rv)
8. b' : Point(rv)
9. b - m = b' ∈ Point(rv)
10. ||a'|| = (||b - a||/r(2))
11. ||b'|| = (||b - a||/r(2))
12. a' - b' ≡ 0
⊢ m ≡ (r1/r(2))*a + b

Latex:

Latex:
1. rv : InnerProductSpace 2. a : Point(rv) 3. b : Point(rv) 4. m : Point(rv) 5. ||m - b|| = ||b - m|| 6. a' : Point(rv) 7. m - a = a' 8. b' : Point(rv) 9. b - m = b' 10. ||a'|| = (||b - a||/r(2)) 11. ||b'|| = (||b - a||/r(2)) \mvdash{} m \mequiv{} (r1/r(2))*a + b By Latex: Assert \mkleeneopen{}a' - b' \mequiv{} 0\mkleeneclose{}\mcdot{} Home Index