Proof of Nuprl Lemma : Euclid-drop-perp-0

Step * 1 1 1 2 1 of Lemma Euclid-drop-perp-0

1. e : EuclideanPlane
2. a : Point
3. b : {b:Point| a # b}
4. c : Point
5. a # b
6. u : Point
7. v : Point
8. Colinear(a;b;u)
9. Colinear(a;b;v)
10. u # v
11. cu ≅ cv
12. x : Point
13. y : Point
14. ux ≅ uv
15. uy ≅ uv
16. vx ≅ vu
17. vy ≅ vu
18. x leftof uv
19. y leftof vu
20. x # ab
21. y # ab
22. x # y
23. x # c
24. m : {x1:Point| Colinear(v;u;x1) ∧ B(yx1x)}
25. SqStable(u=m=v)
26. u=m=v
27. uv ⊥m mx
⊢ Colinear(m;x;c)
BY

{ (D -2 THEN DSetVars THEN Unhide THEN Auto THEN Using [`x',⌜u⌝;`y',⌜v⌝] (BLemma  `upper-dimension-axiom`)⋅ THEN Auto) }

Latex:

Latex:
1. e : EuclideanPlane 2. a : Point 3. b : \{b:Point| a \# b\} 4. c : Point 5. a \# b 6. u : Point 7. v : Point 8. Colinear(a;b;u) 9. Colinear(a;b;v) 10. u \# v 11. cu \mcong{} cv 12. x : Point 13. y : Point 14. ux \mcong{} uv 15. uy \mcong{} uv 16. vx \mcong{} vu 17. vy \mcong{} vu 18. x leftof uv 19. y leftof vu 20. x \# ab 21. y \# ab 22. x \# y 23. x \# c 24. m : \{x1:Point| Colinear(v;u;x1) \mwedge{} B(yx1x)\} 25. SqStable(u=m=v) 26. u=m=v 27. uv \mbot{}m mx \mvdash{} Colinear(m;x;c) By Latex: (D -2 THEN DSetVars THEN Unhide THEN Auto THEN Using [`x',\mkleeneopen{}u\mkleeneclose{};`y',\mkleeneopen{}v\mkleeneclose{}] (BLemma `upper-dimension-axiom`)\mcdot{} THEN Auto) Home Index