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X and Y are center of circles which intersect at A and C. XA and XC are produced to meet at B and D. Prove AB = CD.

X and Y are center of circles which intersect at A and C. XA and XC are produced to-example-1
User Sebastialonso
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1 Answer

19 votes
19 votes

Answer:

On the diagram, construct lines BY, XY and DY.

Now, consider triangles ΔXBY and ΔXDY. We can say that these triangles are congruent by the SAS postulate (they share side XY, XY bisects ∠BYD so ∠BYX=∠DYX, and BY=DY=radius). If they're congruent, their sides are the same so BX=DX.

BX=DX

AB+radius = CD +radius

AB=CD

User Mike Mooney
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