Proof of Nuprl Lemma : greatest-cevian-is-farthest-from-perp

Step * 3 1 4 4 1 2 of Lemma greatest-cevian-is-farthest-from-perp

1. e : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. a # bc
7. ad  ⊥d bc
8. x : {x:Point| Colinear(b;c;x)}
9. y : {x:Point| Colinear(b;c;x)}
10. d-x-y
11. a # dx
12. a' : Point
13. a-d-a'
14. da' ≅ ad
15. a'x ≅ ax
16. a'y ≅ ay
17. y leftof ad
18. |a'x| + |ax| < |ay| + |ya'| ∧ aya' < axa'
⊢ |ax| < |ay|
BY
{ ((Subst' |a'x| + |ax| = |ax| + |ax| ∈ Length -1 THEN Auto)
   THEN Subst' |ay| + |ya'| = |ay| + |ay| ∈ Length -2
   THEN Auto) }

1
1. e : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. a # bc
7. ad  ⊥d bc
8. x : {x:Point| Colinear(b;c;x)}
9. y : {x:Point| Colinear(b;c;x)}
10. d-x-y
11. a # dx
12. a' : Point
13. a-d-a'
14. da' ≅ ad
15. a'x ≅ ax
16. a'y ≅ ay
17. y leftof ad
18. |ax| + |ax| < |ay| + |ay|
19. aya' < axa'
⊢ |ax| < |ay|

Latex:

Latex:
1. e : EuclideanPlane 2. a : Point 3. b : Point 4. c : Point 5. d : Point 6. a \# bc 7. ad \mbot{}d bc 8. x : \{x:Point| Colinear(b;c;x)\} 9. y : \{x:Point| Colinear(b;c;x)\} 10. d-x-y 11. a \# dx 12. a' : Point 13. a-d-a' 14. da' \mcong{} ad 15. a'x \mcong{} ax 16. a'y \mcong{} ay 17. y leftof ad 18. |a'x| + |ax| < |ay| + |ya'| \mwedge{} aya' < axa' \mvdash{} |ax| < |ay| By Latex: ((Subst' |a'x| + |ax| = |ax| + |ax| -1 THEN Auto) THEN Subst' |ay| + |ya'| = |ay| + |ay| -2 THEN Auto) Home Index