Let O be the intersection of KL and BC. Then it is sufficient to prove that OS.OT=BO.OC(power of point). BO/OT=KO/OL=OS/OC. QED.

Since $KS \parallel LC$ and $KB \parallel LT$, we deduce that $\triangle KSB$ and $\triangle LCT$ are homothetic with center $O \equiv KL \cap BC.$ Then by Power of a Point, \[ \frac{OS}{OC} = \frac{OB}{OT} \implies OS \cdot OT = OB \cdot OC = OP \cdot OQ. \]Hence, $P, Q, S, T$ are concyclic, as desired.

The case when $KL \parallel BC$ is obvious by symmetry. Otherwise, define $R=\overline{KL} \cap \overline{BC}$. Since $$KS \parallel LC \Longrightarrow \frac{RS}{RC}=\frac{KS}{LC}=\frac{KB}{LC}$$and similarly, $$\frac{RB}{RT}=\frac{KB}{LC} \Longrightarrow RP\cdot RQ=RB\cdot RC=RS\cdot RT$$from where it is obvious that $P,Q,S,T$ are concyclic.

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