Step
*
1
1
2
of Lemma
plane-sep-imp-Opasch_left
1. e : EuclideanPlane
2. d : Point
3. a : Point
4. b : Point
5. c : Point
6. x : Point
7. y : Point
8. x leftof ab
9. a leftof bx
10. b leftof xa
11. B(abd)
12. b-x-y
13. d leftof xa
14. y leftof ax
15. Colinear(a;x;d)
16. B(ydd)
17. c ≡ d
⊢ B(axd)
BY
{ (((FLemma `left-not-colinear` [13] THEN Auto) THEN Assert ⌜Colinear(d;a;x)⌝⋅) THEN Auto) }
Latex:
Latex:
1. e : EuclideanPlane
2. d : Point
3. a : Point
4. b : Point
5. c : Point
6. x : Point
7. y : Point
8. x leftof ab
9. a leftof bx
10. b leftof xa
11. B(abd)
12. b-x-y
13. d leftof xa
14. y leftof ax
15. Colinear(a;x;d)
16. B(ydd)
17. c \mequiv{} d
\mvdash{} B(axd)
By
Latex:
(((FLemma `left-not-colinear` [13] THEN Auto) THEN Assert \mkleeneopen{}Colinear(d;a;x)\mkleeneclose{}\mcdot{}) THEN Auto)
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