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Question

If non-parallel sides of a trapezium are equal, prove that it is cyclic.


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Solution

Step 1:- Given

  1. According to the given details ABCD is a trapezium in which AD||BC
  2. Non-parallel sides ABandDC of the trapezium ABCD are equal i.e., AB=DC.

Step 2:- Construction and congruent triangle:

If the sum of a pair of opposite angles of a quadrilateral is 180°, the quadrilateral is cyclic.

Draw a trapezium ABCD with AD||BC

ADandBC are the non-parallel sides that are equal. AB=DC.

Draw AMandDN such that they are perpendicular to BC.

From, the right triangles AMBandDNC,

AMB=DNC=90°AB=DC(Given)

Since the perpendicular distance between two parallel lines are the same,

AM=DNAMBDNC(ByRHScongruencerule)B=C(CPCT)and,1=2BAD=1+90°=2+90°=CDA

From quadrilateral ABCD

B+C+CDA+BAD=360°B+B+CDA+CDA=360°[B=C,BAD=CDA]2(B+CDA)=360°B+CDA=180°

We know that, if any pair of opposite angles of a quadrilateral is 180°, then the quadrilateral is cyclic.

Hence, the trapezium ABCD is cyclic.


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