The diagonals $PR$ and $QS$ of a cyclic quadrilateral $PQRS$ intersect at $X$. The tangent at $P$ is parallel to $QS$. Prove that $PQ = PS$.
2026-04-10 19:39:11.1775849951
Geometry Proof Using Circle Theorem
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There is no need of point $R$. Since angles in alternate segments at tan are equal $PQ=PS$.