In the adjacent figure, ∆PQR is isosceles such that PQ = PR. If S and T be the mid-point of PR and PQ respectively, then prove that QS = RT.
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Step-by-step explanation:
take traingles TQR and SQR
PQ = PR (given isosceles ∆s)
and T , S are mid pts on PQ and PR
> TQ = SR
both the ∆s have base common i.e. QR.
since two sides are proved to be equal , third side of the triangles are automatically proven to be equal
i.e. QS = RT
Hence Proved...
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