【答案】(1)∠APC=120°����;(2)∠APC=360°﹣2∠AMC.
【解析】
(1)延長(zhǎng)AP交CD于點(diǎn)Q, 連接MP并延長(zhǎng)到點(diǎn)R,根據(jù)角度關(guān)系推算即可.
(2) 過P作PQ∥AB于Q,MN∥AB于N,根據(jù)角度關(guān)系推算即可.
解:(1)如圖1,延長(zhǎng)AP交CD于點(diǎn)Q,則可得到∠BAP=∠AQC,
則∠APC=∠BAP+∠DCP=2(∠MAP+∠MCP),
連接MP并延長(zhǎng)到點(diǎn)R,則可得∠APR=∠MAP+∠AMP,∠CPR=∠MCP+∠CMP,
所以∠APC=∠AMC+∠MAP+∠MCP,
所以∠APC=∠AMC+
∠APC,
所以∠APC=2∠AMC=120°.
(2)如圖2,過P作PQ∥AB于Q,MN∥AB于N,
則AB∥PQ∥MN∥CD,
∴∠APQ=180°﹣∠BAP,∠CPQ=180°﹣∠DCP,∠AMN=∠BAM,∠CMN=∠DCM,
∵AM平分∠BAP,CM平分∠PCD,
∴∠BAP=2∠BAM,∠DCP=2∠DCM,
∴∠APC=∠APQ+∠CPQ=180°﹣∠BAP+180°﹣∠DCP=360°﹣2(∠BAM+∠DCM)=360°﹣2(∠BAM+∠DCM)=360°﹣2∠AMC,即∠APC=360°﹣2∠AMC.
