证明：连接AD∵D是BC的中点,△ABC是等腰直角三角形∴AD=BD=DC∠BAD=∠C=45°∵AB=AC,BP=AQ∴AP=CQ∵在△APD和△CQD中AP=CQ∠BAD=∠C=45°AD=DC∴△APD≌△CQD∴DP=DQ∠APD=∠CQD∵∠CQD+∠AQD=180°∴在四边形APDQ中...