Proof of Nuprl Lemma : Euclid-Prop19-lemma2

Step * 2 of Lemma Euclid-Prop19-lemma2_1

1. e : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. f : Point
7. a # bc
8. abd ≅_a cbd
9. a=d=c
10. a-f-c
11. cbf < abf
12. p : Point
13. a-p-f
14. abp ≅_a cbf
15. f # d
⊢ abd < abf
BY
{ (Assert B(cfd) BY
((Assert Colinear(c;f;d) BY Auto) THEN gColinearCases (-1))) }

1
.....aux.....
1. e : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. f : Point
7. a # bc
8. abd ≅_a cbd
9. a=d=c
10. a-f-c
11. cbf < abf
12. p : Point
13. a-p-f
14. abp ≅_a cbf
15. f # d
16. Colinear(c;f;d)
17. c ≡ f
⊢ B(cfd)

2
.....aux.....
1. e : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. f : Point
7. a # bc
8. abd ≅_a cbd
9. a=d=c
10. a-f-c
11. cbf < abf
12. p : Point
13. a-p-f
14. abp ≅_a cbf
15. f # d
16. Colinear(c;f;d)
17. d ≡ c
⊢ B(cfd)

3
.....aux.....
1. e : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. f : Point
7. a # bc
8. abd ≅_a cbd
9. a=d=c
10. a-f-c
11. cbf < abf
12. p : Point
13. a-p-f
14. abp ≅_a cbf
15. f # d
16. Colinear(c;f;d)
17. f-d-c
⊢ B(cfd)

4
.....aux.....
1. e : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. f : Point
7. a # bc
8. abd ≅_a cbd
9. a=d=c
10. a-f-c
11. cbf < abf
12. p : Point
13. a-p-f
14. abp ≅_a cbf
15. f # d
16. Colinear(c;f;d)
17. d-c-f
⊢ B(cfd)

5
1. e : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. f : Point
7. a # bc
8. abd ≅_a cbd
9. a=d=c
10. a-f-c
11. cbf < abf
12. p : Point
13. a-p-f
14. abp ≅_a cbf
15. f # d
16. B(cfd)
⊢ abd < abf

Latex:

Latex:
1. e : EuclideanPlane 2. a : Point 3. b : Point 4. c : Point 5. d : Point 6. f : Point 7. a \# bc 8. abd \mcong{}\msuba{} cbd 9. a=d=c 10. a-f-c 11. cbf < abf 12. p : Point 13. a-p-f 14. abp \mcong{}\msuba{} cbf 15. f \# d \mvdash{} abd < abf By Latex: (Assert B(cfd) BY ((Assert Colinear(c;f;d) BY Auto) THEN gColinearCases (-1))) Home Index