Proof of Nuprl Lemma : geo-intersect-points-iff

Step * 2 1 1 1 1 2 of Lemma geo-intersect-points-iff

1. e : EuclideanPlane
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. a ≠ b
7. x : {z:Point| Colinear(z;a;b)}
8. y : {z:Point| Colinear(z;a;b)}
9. x leftof cd
10. y leftof dc
11. v : {x1:Point| Colinear(c;d;x1) ∧ x_x1_y}
12. Colinear(x;a;b) ∧ Colinear(y;a;b) ∧ Colinear(c;d;v) ∧ x_v_y
13. d ≠ v

⊢ ∃c1,d1:Point. (Colinear(c;d;c1) ∧ Colinear(c;d;d1) ∧ c1-v-d1 ∧ x leftof c1d1 ∧ y leftof d1c1)

BY
{ SwapVars `c' `d' }

1
1. e : EuclideanPlane
2. a : Point
3. b : Point
4. d : Point
5. c : Point
6. a ≠ b
7. x : {z:Point| Colinear(z;a;b)}
8. y : {z:Point| Colinear(z;a;b)}
9. x leftof dc
10. y leftof cd
11. v : {x1:Point| Colinear(d;c;x1) ∧ x_x1_y}
12. Colinear(x;a;b) ∧ Colinear(y;a;b) ∧ Colinear(d;c;v) ∧ x_v_y
13. c ≠ v

⊢ ∃c1,d1:Point. (Colinear(d;c;c1) ∧ Colinear(d;c;d1) ∧ c1-v-d1 ∧ x leftof c1d1 ∧ y leftof d1c1)

Latex:

Latex:
1. e : EuclideanPlane 2. a : Point 3. b : Point 4. c : Point 5. d : Point 6. a \mneq{} b 7. x : \{z:Point| Colinear(z;a;b)\} 8. y : \{z:Point| Colinear(z;a;b)\} 9. x leftof cd 10. y leftof dc 11. v : \{x1:Point| Colinear(c;d;x1) \mwedge{} x\_x1\_y\} 12. Colinear(x;a;b) \mwedge{} Colinear(y;a;b) \mwedge{} Colinear(c;d;v) \mwedge{} x\_v\_y 13. d \mneq{} v \mvdash{} \mexists{}c1,d1:Point. (Colinear(c;d;c1) \mwedge{} Colinear(c;d;d1) \mwedge{} c1-v-d1 \mwedge{} x leftof c1d1 \mwedge{} y leftof d1c1) By Latex: SwapVars `c' `d' Home Index