Proof of Nuprl Lemma : geo-midpoint-diagonals-congruent

Step * 1 1 1 1 1 1 1 1 2 of Lemma geo-midpoint-diagonals-congruent

1. e : BasicGeometry
2. q : Point
3. A : Point
4. P : Point
5. Q : Point
6. p : Point
7. B(qAP)
8. qA ≅ AP
9. B(qAQ)
10. qA ≅ AQ
11. A # P
12. A # Q
13. X : Point
14. B(APX)
15. PX ≅ AQ
16. x : Point
17. B(Aqx)
18. qx ≅ AQ
19. Y : Point
20. B(AQY)
21. QY ≅ AP
22. y : Point
23. B(Aqy)
24. qy ≅ AP
25. x=A=X
26. y=A=Y
27. Ax ≅ Ay
28. XA ≅ yA
29. Ax ≅ AY
30. xy ≅ YX
31. P # Q
32. p ≡ q
⊢ PQ ≅ qq
BY

{ (InstLemma `seg-midpoints-equal` [⌜e⌝;⌜P⌝;⌜Q⌝;⌜A⌝;⌜q⌝]⋅ THENA (Auto THEN D 0 THEN Auto)) }

1
1. e : BasicGeometry
2. q : Point
3. A : Point
4. P : Point
5. Q : Point
6. p : Point
7. B(qAP)
8. qA ≅ AP
9. B(qAQ)
10. qA ≅ AQ
11. A # P
12. A # Q
13. X : Point
14. B(APX)
15. PX ≅ AQ
16. x : Point
17. B(Aqx)
18. qx ≅ AQ
19. Y : Point
20. B(AQY)
21. QY ≅ AP
22. y : Point
23. B(Aqy)
24. qy ≅ AP
25. x=A=X
26. y=A=Y
27. Ax ≅ Ay
28. XA ≅ yA
29. Ax ≅ AY
30. xy ≅ YX
31. P # Q
32. p ≡ q
33. P ≡ Q
⊢ PQ ≅ qq

Latex:

Latex:
1. e : BasicGeometry 2. q : Point 3. A : Point 4. P : Point 5. Q : Point 6. p : Point 7. B(qAP) 8. qA \mcong{} AP 9. B(qAQ) 10. qA \mcong{} AQ 11. A \# P 12. A \# Q 13. X : Point 14. B(APX) 15. PX \mcong{} AQ 16. x : Point 17. B(Aqx) 18. qx \mcong{} AQ 19. Y : Point 20. B(AQY) 21. QY \mcong{} AP 22. y : Point 23. B(Aqy) 24. qy \mcong{} AP 25. x=A=X 26. y=A=Y 27. Ax \mcong{} Ay 28. XA \mcong{} yA 29. Ax \mcong{} AY 30. xy \mcong{} YX 31. P \# Q 32. p \mequiv{} q \mvdash{} PQ \mcong{} qq By Latex: (InstLemma `seg-midpoints-equal` [\mkleeneopen{}e\mkleeneclose{};\mkleeneopen{}P\mkleeneclose{};\mkleeneopen{}Q\mkleeneclose{};\mkleeneopen{}A\mkleeneclose{};\mkleeneopen{}q\mkleeneclose{}]\mcdot{} THENA (Auto THEN D 0 THEN Auto)) Home Index