Proof of Nuprl Lemma : eu-eq

Step * 1 1 2 2 3 2 1 of Lemma eu-eq_dist-axiomA10

1. G : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. e : Point
7. f : Point
8. g : Point
9. D(a;b;c;d;e;f)
10. D(c;d;e;f;a;b)
11. |ab| < |cd| + |ef|
12. e ≠ f
13. |ef| < |ab| + |cd|
14. a ≠ b
15. |ab| ≠ |cd| + |ef|
16. |ef| ≠ |ab| + |cd|
17. |ab| + |cd| ≠ |cd| + |ef|
18. |cd| + |ef| ≠ |ab| + |cd|
19. X ≠ |ef|
20. X_|ab| + |cd|_|cd| + |ef|
21. |ef| < |cd| + |ef|
⊢ c ≠ d
BY
{ ((Assert |gg| + |ef| < |cd| + |ef| BY
          Auto)
   THEN (FLemma `geo-add-length-cancel-right-lt` [-1] THEN Auto)
   THEN FLemma `geo-lt-sep` [-1]
   THEN Auto) }

Latex:

Latex:
1. G : EuclideanPlane 2. a : Point 3. b : Point 4. c : Point 5. d : Point 6. e : Point 7. f : Point 8. g : Point 9. D(a;b;c;d;e;f) 10. D(c;d;e;f;a;b) 11. |ab| < |cd| + |ef| 12. e \mneq{} f 13. |ef| < |ab| + |cd| 14. a \mneq{} b 15. |ab| \mneq{} |cd| + |ef| 16. |ef| \mneq{} |ab| + |cd| 17. |ab| + |cd| \mneq{} |cd| + |ef| 18. |cd| + |ef| \mneq{} |ab| + |cd| 19. X \mneq{} |ef| 20. X\_|ab| + |cd|\_|cd| + |ef| 21. |ef| < |cd| + |ef| \mvdash{} c \mneq{} d By Latex: ((Assert |gg| + |ef| < |cd| + |ef| BY Auto) THEN (FLemma `geo-add-length-cancel-right-lt` [-1] THEN Auto) THEN FLemma `geo-lt-sep` [-1] THEN Auto) Home Index