Step
*
1
1
of Lemma
Prop23-construction-lemma
1. e : EuclideanPlane
2. p : Point
3. q : Point
4. r : Point
5. a : Point
6. a' : Point
7. p # qr
8. a ≠ a'
9. |qr| < |qp| + |pr|
10. |pr| < |qp| + |qr|
11. |qp| < |pr| + |qr|
12. P : Point
13. a'-a-P
14. aP ≅ OX
15. b : Point
16. P-a-b
17. ab ≅ pq
18. out(a a'b)
19. c1 : Point
20. c1' : Point
21. c1'' : Point
22. c2 : Point
23. c2' : Point
24. c2'' : Point
25. pc1 ≅ pr
26. out(p qc1)
27. qc2 ≅ qr
28. out(q pc2)
29. q-p-c1'
30. pc1' ≅ pc1
31. p-q-c2'
32. qc2' ≅ qc2
33. p_q_c1''
34. qc1'' ≅ qc1
35. q_p_c2''
36. pc2'' ≅ pc2
37. p-c1-c2'
38. q-c2-c1'
39. c1'-p-c1
40. c2'-q-c2
41. c1'-c2-c2'
42. c2'-c1-c1'
43. c1'-c2-c1
44. c2'-c1-c2
⊢ ∃c1,c2:Point. (((pq ≅ ab ∧ out(a a'b)) ∧ pr ≅ ac1 ∧ bc2 > bc1) ∧ qr ≅ bc2 ∧ ac1 > ac2)
BY
{ (((gProperProlong ⌜b⌝⌜a⌝`C1\''⌜p⌝⌜c1⌝⋅ THENA Auto) THEN (gProperProlong ⌜a⌝⌜b⌝`C2\''⌜q⌝⌜c2⌝⋅ THENA Auto))
THEN ((gProperProlong ⌜C1'⌝⌜a⌝`C1'⌜C1'⌝⌜a⌝⋅ THENA Auto) THEN (gProperProlong ⌜C2'⌝⌜b⌝`C2'⌜C2'⌝⌜b⌝⋅ THENA Auto))
THEN (gProlong ⌜a⌝⌜b⌝`C1\'\''⌜b⌝⌜C1⌝⋅ THENA Auto)
THEN (gProlong ⌜b⌝⌜a⌝`C2\'\''⌜a⌝⌜C2⌝⋅ THENA Auto)
THEN ExRepD) }
1
1. e : EuclideanPlane
2. p : Point
3. q : Point
4. r : Point
5. a : Point
6. a' : Point
7. p # qr
8. a ≠ a'
9. |qr| < |qp| + |pr|
10. |pr| < |qp| + |qr|
11. |qp| < |pr| + |qr|
12. P : Point
13. a'-a-P
14. aP ≅ OX
15. b : Point
16. P-a-b
17. ab ≅ pq
18. out(a a'b)
19. c1 : Point
20. c1' : Point
21. c1'' : Point
22. c2 : Point
23. c2' : Point
24. c2'' : Point
25. pc1 ≅ pr
26. out(p qc1)
27. qc2 ≅ qr
28. out(q pc2)
29. q-p-c1'
30. pc1' ≅ pc1
31. p-q-c2'
32. qc2' ≅ qc2
33. p_q_c1''
34. qc1'' ≅ qc1
35. q_p_c2''
36. pc2'' ≅ pc2
37. p-c1-c2'
38. q-c2-c1'
39. c1'-p-c1
40. c2'-q-c2
41. c1'-c2-c2'
42. c2'-c1-c1'
43. c1'-c2-c1
44. c2'-c1-c2
45. C1' : Point
46. b-a-C1'
47. aC1' ≅ pc1
48. C2' : Point
49. a-b-C2'
50. bC2' ≅ qc2
51. C1 : Point
52. C1'-a-C1
53. aC1 ≅ C1'a
54. C2 : Point
55. C2'-b-C2
56. bC2 ≅ C2'b
57. C1'' : Point
58. a_b_C1''
59. bC1'' ≅ bC1
60. C2'' : Point
61. b_a_C2''
62. aC2'' ≅ aC2
⊢ ∃c1,c2:Point. (((pq ≅ ab ∧ out(a a'b)) ∧ pr ≅ ac1 ∧ bc2 > bc1) ∧ qr ≅ bc2 ∧ ac1 > ac2)
Latex:
Latex:
1. e : EuclideanPlane
2. p : Point
3. q : Point
4. r : Point
5. a : Point
6. a' : Point
7. p \# qr
8. a \mneq{} a'
9. |qr| < |qp| + |pr|
10. |pr| < |qp| + |qr|
11. |qp| < |pr| + |qr|
12. P : Point
13. a'-a-P
14. aP \mcong{} OX
15. b : Point
16. P-a-b
17. ab \mcong{} pq
18. out(a a'b)
19. c1 : Point
20. c1' : Point
21. c1'' : Point
22. c2 : Point
23. c2' : Point
24. c2'' : Point
25. pc1 \mcong{} pr
26. out(p qc1)
27. qc2 \mcong{} qr
28. out(q pc2)
29. q-p-c1'
30. pc1' \mcong{} pc1
31. p-q-c2'
32. qc2' \mcong{} qc2
33. p\_q\_c1''
34. qc1'' \mcong{} qc1
35. q\_p\_c2''
36. pc2'' \mcong{} pc2
37. p-c1-c2'
38. q-c2-c1'
39. c1'-p-c1
40. c2'-q-c2
41. c1'-c2-c2'
42. c2'-c1-c1'
43. c1'-c2-c1
44. c2'-c1-c2
\mvdash{} \mexists{}c1,c2:Point. (((pq \mcong{} ab \mwedge{} out(a a'b)) \mwedge{} pr \mcong{} ac1 \mwedge{} bc2 > bc1) \mwedge{} qr \mcong{} bc2 \mwedge{} ac1 > ac2)
By
Latex:
(((gProperProlong \mkleeneopen{}b\mkleeneclose{}\mkleeneopen{}a\mkleeneclose{}`C1\mbackslash{}''\mkleeneopen{}p\mkleeneclose{}\mkleeneopen{}c1\mkleeneclose{}\mcdot{} THENA Auto)
THEN (gProperProlong \mkleeneopen{}a\mkleeneclose{}\mkleeneopen{}b\mkleeneclose{}`C2\mbackslash{}''\mkleeneopen{}q\mkleeneclose{}\mkleeneopen{}c2\mkleeneclose{}\mcdot{} THENA Auto)
)
THEN ((gProperProlong \mkleeneopen{}C1'\mkleeneclose{}\mkleeneopen{}a\mkleeneclose{}`C1'\mkleeneopen{}C1'\mkleeneclose{}\mkleeneopen{}a\mkleeneclose{}\mcdot{} THENA Auto)
THEN (gProperProlong \mkleeneopen{}C2'\mkleeneclose{}\mkleeneopen{}b\mkleeneclose{}`C2'\mkleeneopen{}C2'\mkleeneclose{}\mkleeneopen{}b\mkleeneclose{}\mcdot{} THENA Auto)
)
THEN (gProlong \mkleeneopen{}a\mkleeneclose{}\mkleeneopen{}b\mkleeneclose{}`C1\mbackslash{}'\mbackslash{}''\mkleeneopen{}b\mkleeneclose{}\mkleeneopen{}C1\mkleeneclose{}\mcdot{} THENA Auto)
THEN (gProlong \mkleeneopen{}b\mkleeneclose{}\mkleeneopen{}a\mkleeneclose{}`C2\mbackslash{}'\mbackslash{}''\mkleeneopen{}a\mkleeneclose{}\mkleeneopen{}C2\mkleeneclose{}\mcdot{} THENA Auto)
THEN ExRepD)
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