Geometry Problem
Level: Mathematics Education, High School, Honors Geometry, College.
Click the figure below to see the complete problem 824.
Tuesday, November 27, 2012
Problem 824: Desargues' Theorem, Triangles in Perspective, Concurrent Lines, Collinear Points, Center, Axis, Perspector, Perspectrix
Labels:
axis,
center,
collinear,
concurrent,
Desargues' theorem,
perspective,
perspector,
perspectrix,
triangle
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Apply Menelaus’s theorem to triangle OAB and transversal DB’A’ we have
ReplyDelete(DA/DB).(B’B/B’O).(A’O/A’A)=-1
Apply Menelaus’s theorem to triangle OBC and transversal FC’B’ we have
(FB/FC).(C’C/C’O).(B’O/B’B)=-1
Apply Menelaus’s theorem to triangle OAC and transversal EC’A’ we have
(EC/EA).(A’A/A’O).(C’O/C’C)=-1
Multiplying the three equalities we obtain after simplification.
(DA/DB).(FB/FC).(EC/EA)=-1
So D,E,F are collinear per converse of Menelaus’s theorem
Using homogeneous coordinates in projective geometry.
ReplyDeleteWLOG, we may let A=[1,0,0], B=[0,1,0], C=[0,0,1] and O=[1,1,1].
Then we have
line OA: y=z
line OB: x=z
line OC: x=y
Thus we may let A'=[a,1,1], B'=[1,b,1], C'=[1,1,c].
Now we have
line AB: z=0
line A'B': (1−b)x−(a-1)y+(ab−1)z=0
∴ D = AB∩A'B' = [a−1,1−b,0]
line AC: y=0
line A'C': (c−1)x−(ac-1)y+(a−1)z=0
∴ E = AC∩A'C' = [a−1,0,1−c]
line BC: x=0
line B'C': (bc−1)x−(c-1)y+(1−b)z=0
∴ F = BC∩B'C' = [0,b−1,1−c]
Now consider the determinant
|a−1 1−b 0 |
|a−1 0 1−c| = −(a−1)(b−1)(1−c)−(a−1)(1−b)(1−c) = 0
| 0 b−1 1−c|
Hence, D,E,F are collinear.
Another proof using projective geometry but without coordinates.
ReplyDeleteSince O lies on AA', we can write O=mA+nA'.
Similarly, we have O=pB+qB' and O=rC+sC'.
So we have
mA+nA' = pB+qB' ⇒ mA−pB = −nA'+qB' = D
mA+nA' = rC+sC' ⇒ mA−rC = −nA'+sC' = E
pB+qB' = rC+sC' ⇒ pB−rC = −qB'+sC' = F
D+E+F = (mA−pB)+(mA−rC)+(pB−rC) = 0
So D,E,F are collinear.