Proof of Nuprl Lemma : eu-be-end-eq

Step * 1 1 1 of Lemma eu-be-end-eq

1. e : EuclideanPlane@i'
2. a : Point@i
3. b : Point@i
4. c : Point@i
5. a_b_c@i
6. ab=ac@i
7. |ac| = |ab| + |bc| ∈ {p:Point| O_X_p}
8. |ac| = |ac| + |bc| ∈ {p:Point| O_X_p}
9. |ab| = |ac| ∈ {p:Point| O_X_p}
10. ab=ac
⊢ b = c ∈ Point
BY
{ Assert ⌜|ac| + X = |ac| + |bc| ∈ {p:Point| O_X_p} ⌝⋅ }

1
.....assertion.....
1. e : EuclideanPlane@i'
2. a : Point@i
3. b : Point@i
4. c : Point@i
5. a_b_c@i
6. ab=ac@i
7. |ac| = |ab| + |bc| ∈ {p:Point| O_X_p}
8. |ac| = |ac| + |bc| ∈ {p:Point| O_X_p}
9. |ab| = |ac| ∈ {p:Point| O_X_p}
10. ab=ac
⊢ |ac| + X = |ac| + |bc| ∈ {p:Point| O_X_p}

2
1. e : EuclideanPlane@i'
2. a : Point@i
3. b : Point@i
4. c : Point@i
5. a_b_c@i
6. ab=ac@i
7. |ac| = |ab| + |bc| ∈ {p:Point| O_X_p}
8. |ac| = |ac| + |bc| ∈ {p:Point| O_X_p}
9. |ab| = |ac| ∈ {p:Point| O_X_p}
10. ab=ac
11. |ac| + X = |ac| + |bc| ∈ {p:Point| O_X_p}
⊢ b = c ∈ Point

Latex:

Latex:
1. e : EuclideanPlane@i' 2. a : Point@i 3. b : Point@i 4. c : Point@i 5. a\_b\_c@i 6. ab=ac@i 7. |ac| = |ab| + |bc| 8. |ac| = |ac| + |bc| 9. |ab| = |ac| 10. ab=ac \mvdash{} b = c By Latex: Assert \mkleeneopen{}|ac| + X = |ac| + |bc|\mkleeneclose{}\mcdot{} Home Index