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#1 2014-04-01 01:27:47
- thedarktiger
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- Registered: 2014-01-10
- Posts: 91
Circles intersecting with triangles
Let \overline{PQ} be a diameter of a circle and T be a point on the circle besides P and Q. The tangent to the circle through point Q intersects line PT at R, and the tangent through T intersects \overline{QR} at M. Prove that M is the midpoint of \overline{QR}.
thanks! 
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#2 2014-04-01 04:01:06
- Bob
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- Registered: 2010-06-20
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Re: Circles intersecting with triangles
hi
TQR = TPQ (angle made by tangent with chord = angle subtended by chord)
So you should be able to show that triangles PTQ and QTR are similar.
TM = QM (as tangents from the same point are equal)
So extend the similarity property to include the midpoints of PQ and QR.
Bob
Children are not defined by school ...........The Fonz
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