Proof of Nuprl Lemma : geo-inner-three-segment

Step * 1 1 2 of Lemma geo-inner-three-segment

.....antecedent.....
1. e : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point

5. ∀[d,A,B,C,D:Point].  (bd ≅ BD) supposing (cd ≅ CD and ad ≅ AD and bc ≅ BC and ac ≅ AC and B(ABC) and B(abc))

6. A : Point
7. B : Point
8. C : Point

9. ∀[D:Point]. (ba ≅ BD) supposing (ca ≅ CD and aa ≅ AD and bc ≅ BC and ac ≅ AC and B(ABC) and B(abc))

10. B(abc)
11. B(ABC)
12. ac ≅ AC
13. bc ≅ BC
⊢ ca ≅ CA
BY
{ ((Assert ca ≅ ac BY
          Auto)
   THEN (FLemma `geo-congruent-transitivity` [-1;-3] THENA Auto)
   THEN (Assert AC ≅ CA BY
               Auto)
   THEN FLemma `geo-congruent-transitivity` [-1;-2]
   THEN Auto) }

Latex:

Latex:
.....antecedent..... 1. e : EuclideanPlane 2. a : Point 3. b : Point 4. c : Point 5. \mforall{}[d,A,B,C,D:Point]. (bd \mcong{} BD) supposing (cd \mcong{} CD and ad \mcong{} AD and bc \mcong{} BC and ac \mcong{} AC and B(ABC) and B(abc)) 6. A : Point 7. B : Point 8. C : Point 9. \mforall{}[D:Point] (ba \mcong{} BD) supposing (ca \mcong{} CD and aa \mcong{} AD and bc \mcong{} BC and ac \mcong{} AC and B(ABC) and B(abc)) 10. B(abc) 11. B(ABC) 12. ac \mcong{} AC 13. bc \mcong{} BC \mvdash{} ca \mcong{} CA By Latex: ((Assert ca \mcong{} ac BY Auto) THEN (FLemma `geo-congruent-transitivity` [-1;-3] THENA Auto) THEN (Assert AC \mcong{} CA BY Auto) THEN FLemma `geo-congruent-transitivity` [-1;-2] THEN Auto) Home Index