Proof of Nuprl Lemma : rectangle-sides-cong

Step * 1 1 3 7 1 1 1 1 1 of Lemma rectangle-sides-cong

1. g : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. e : Point
7. f : Point
8. e # ac
9. f # eb
10. ac ⊥b be
11. df ⊥e eb
12. d-e-f
13. a-b-c
14. ab ≅ eb
15. bc ≅ eb
16. de ≅ eb
17. ef ≅ eb
18. ae ≅ ce
19. db ≅ fb
20. db ≅ ae
21. feb ≅_a deb
22. abe ≅_a cbe
23. a leftof eb
24. f leftof be
25. x : Point
26. Colinear(e;b;x)
27. a-x-f
28. B(exb)
29. e # b
30. x # b
31. x # e
32. axb ≅_a fxe
33. Reba
34. Rbef
35. xba ≅_a xef
36. bx ≅ ex ∧ xa ≅ xf ∧ xab ≅_a xfe
37. fex ≅_a dex
38. x # fd
39. fx ≅ dx
40. cbx ≅_a abx
41. x # ac
42. cx ≅ ax
⊢ ad ≅ fc ∧ dc ≅ fa
BY

{ (((gProperProlong ⌜d⌝⌜x⌝`C'⌜d⌝⌜x⌝⋅ THENA Auto) THEN ExRepD) THEN Assert ⌜C ≡ c⌝⋅) }

1
.....assertion.....
1. g : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. e : Point
7. f : Point
8. e # ac
9. f # eb
10. ac  ⊥b be
11. df  ⊥e eb
12. d-e-f
13. a-b-c
14. ab ≅ eb
15. bc ≅ eb
16. de ≅ eb
17. ef ≅ eb
18. ae ≅ ce
19. db ≅ fb
20. db ≅ ae
21. feb ≅_a deb
22. abe ≅_a cbe
23. a leftof eb
24. f leftof be
25. x : Point
26. Colinear(e;b;x)
27. a-x-f
28. B(exb)
29. e # b
30. x # b
31. x # e
32. axb ≅_a fxe
33. Reba
34. Rbef
35. xba ≅_a xef
36. bx ≅ ex
37. xa ≅ xf
38. xab ≅_a xfe
39. fex ≅_a dex
40. x # fd
41. fx ≅ dx
42. cbx ≅_a abx
43. x # ac
44. cx ≅ ax
45. C : Point
46. d-x-C
47. xC ≅ dx
⊢ C ≡ c

2
1. g : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. e : Point
7. f : Point
8. e # ac
9. f # eb
10. ac  ⊥b be
11. df  ⊥e eb
12. d-e-f
13. a-b-c
14. ab ≅ eb
15. bc ≅ eb
16. de ≅ eb
17. ef ≅ eb
18. ae ≅ ce
19. db ≅ fb
20. db ≅ ae
21. feb ≅_a deb
22. abe ≅_a cbe
23. a leftof eb
24. f leftof be
25. x : Point
26. Colinear(e;b;x)
27. a-x-f
28. B(exb)
29. e # b
30. x # b
31. x # e
32. axb ≅_a fxe
33. Reba
34. Rbef
35. xba ≅_a xef
36. bx ≅ ex
37. xa ≅ xf
38. xab ≅_a xfe
39. fex ≅_a dex
40. x # fd
41. fx ≅ dx
42. cbx ≅_a abx
43. x # ac
44. cx ≅ ax
45. C : Point
46. d-x-C
47. xC ≅ dx
48. C ≡ c
⊢ ad ≅ fc ∧ dc ≅ fa

Latex:

Latex:
1. g : EuclideanPlane 2. a : Point 3. b : Point 4. c : Point 5. d : Point 6. e : Point 7. f : Point 8. e \# ac 9. f \# eb 10. ac \mbot{}b be 11. df \mbot{}e eb 12. d-e-f 13. a-b-c 14. ab \mcong{} eb 15. bc \mcong{} eb 16. de \mcong{} eb 17. ef \mcong{} eb 18. ae \mcong{} ce 19. db \mcong{} fb 20. db \mcong{} ae 21. feb \mcong{}\msuba{} deb 22. abe \mcong{}\msuba{} cbe 23. a leftof eb 24. f leftof be 25. x : Point 26. Colinear(e;b;x) 27. a-x-f 28. B(exb) 29. e \# b 30. x \# b 31. x \# e 32. axb \mcong{}\msuba{} fxe 33. Reba 34. Rbef 35. xba \mcong{}\msuba{} xef 36. bx \mcong{} ex \mwedge{} xa \mcong{} xf \mwedge{} xab \mcong{}\msuba{} xfe 37. fex \mcong{}\msuba{} dex 38. x \# fd 39. fx \mcong{} dx 40. cbx \mcong{}\msuba{} abx 41. x \# ac 42. cx \mcong{} ax \mvdash{} ad \mcong{} fc \mwedge{} dc \mcong{} fa By Latex: (((gProperProlong \mkleeneopen{}d\mkleeneclose{}\mkleeneopen{}x\mkleeneclose{}`C'\mkleeneopen{}d\mkleeneclose{}\mkleeneopen{}x\mkleeneclose{}\mcdot{} THENA Auto) THEN ExRepD) THEN Assert \mkleeneopen{}C \mequiv{} c\mkleeneclose{}\mcdot{}) Home Index