Proof of Nuprl Lemma : euclid-P3

Step * 1 1 1 1 2 of Lemma euclid-P3

1. e : EuclideanPlane
2. A : Point
3. B : Point
4. C1 : Point
5. C2 : Point
6. [%] : (¬(C1 = C2 ∈ Point)) ∧ |C1C2| < |AB|
7. X : Point
8. B_A_X
9. AX=C1C2
10. E : Point
11. X_A_E
12. AE=C1C2
13. ¬((¬A_E_B) ∧ (¬A_B_E))
⊢ A_E_B
BY
{ (EuContradiction THEN D -2 THEN D 0 THEN Try (Trivial)) }

1
1. e : EuclideanPlane
2. A : Point
3. B : Point
4. C1 : Point
5. C2 : Point
6. (¬(C1 = C2 ∈ Point)) ∧ |C1C2| < |AB|
7. X : Point
8. B_A_X
9. AX=C1C2
10. E : Point
11. X_A_E
12. AE=C1C2
13. ¬A_E_B
⊢ ¬A_B_E

Latex:

Latex:
1. e : EuclideanPlane 2. A : Point 3. B : Point 4. C1 : Point 5. C2 : Point 6. [\%] : (\mneg{}(C1 = C2)) \mwedge{} |C1C2| < |AB| 7. X : Point 8. B\_A\_X 9. AX=C1C2 10. E : Point 11. X\_A\_E 12. AE=C1C2 13. \mneg{}((\mneg{}A\_E\_B) \mwedge{} (\mneg{}A\_B\_E)) \mvdash{} A\_E\_B By Latex: (EuContradiction THEN D -2 THEN D 0 THEN Try (Trivial)) Home Index