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Question

If the perpendicular bisector of a chord AB of a circle PXAQBY intersects the circle at P and Q, prove that arcPXAarcPYB.


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Solution

Prove the given condition :

Given,

  1. PXAQBY is the circle.
  2. Perpendicular bisector of chord AB intersects the circle at P and Q.

PQ is the perpendicular bisector of AB,

AM=BM

In APM and BPM,

  1. AM=BM [PM bisects AB at M]
  2. AMP=BMP=90° PQAB
  3. PM is the common side

By SAS congruence rule, if any two sides and anangle included between the sides of one triangle are equivalent to the corresponding two sides and the included angle between the sides of the second triangle, then the two triangles are said to be congruent.

APMBPM

Since, corresponding parts of congruent triangles are congruent, we can say that AP=BP

If two chords of a circle are equal, then their corresponding arcs are congruent i.e.arcPXAarcPYB

Hence proved that arcPXAarcPYB.


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