Proof of Nuprl Lemma : eu-add-length-between-iff

Step * 2 1 2 1 1 1 2 1 1 of Lemma eu-add-length-between-iff

1. e : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. |ac| = |ab| + |bc| ∈ {p:Point| O_X_p}
6. ¬(b = a ∈ Point)
7. ¬(c = a ∈ Point)
8. z : Point
9. c_a_z
10. az=ab
11. x : Point
12. z_a_x
13. ax=ab
14. ¬a_b_c
15. ¬(b = c ∈ Point)
16. ¬a_c_x
17. ¬((¬a_c_x) ∧ (¬a_x_c))
⊢ a_x_c
BY
{ (EuContradiction THEN D -2) }

1
1. e : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. |ac| = |ab| + |bc| ∈ {p:Point| O_X_p}
6. ¬(b = a ∈ Point)
7. ¬(c = a ∈ Point)
8. z : Point
9. c_a_z
10. az=ab
11. x : Point
12. z_a_x
13. ax=ab
14. ¬a_b_c
15. ¬(b = c ∈ Point)
16. ¬a_c_x
17. ¬a_x_c
⊢ (¬a_c_x) ∧ (¬a_x_c)

Latex:

Latex:
1. e : EuclideanPlane 2. a : Point 3. b : Point 4. c : Point 5. |ac| = |ab| + |bc| 6. \mneg{}(b = a) 7. \mneg{}(c = a) 8. z : Point 9. c\_a\_z 10. az=ab 11. x : Point 12. z\_a\_x 13. ax=ab 14. \mneg{}a\_b\_c 15. \mneg{}(b = c) 16. \mneg{}a\_c\_x 17. \mneg{}((\mneg{}a\_c\_x) \mwedge{} (\mneg{}a\_x\_c)) \mvdash{} a\_x\_c By Latex: (EuContradiction THEN D -2) Home Index