【答案】(1)證明見解析(2)
【解析】分析:(1)①利用矩形的性質(zhì)��,結(jié)合已知條件可證△PMN≌△PDF��,則可證得結(jié)論��;②由勾股定理可求得DM=
DP,利用①可求得MN=DF��,則可證得結(jié)論��;
(2)過點(diǎn)P作PM1⊥PD,PM1交AD邊于點(diǎn)M1��,則可證得△PM1N≌△PDF,則可證得M1N=DF��,同(1)②的方法可證得結(jié)論.
詳解:(1)①∵四邊形ABCD是矩形,∴∠ADC=90°.
又∵DE平分∠ADC��,∴∠ADE=∠EDC=45°;
∵PM⊥PD��,∠DMP=45°,∴DP=MP.
∵PM⊥PD��,PF⊥PN,∴∠MPN+∠NPD=∠NPD+∠DPF=90°��,∴∠MPN=∠DPF.
在△PMN和△PDF中��,∵ 
,
∴△PMN≌△PDF(ASA)��,∴PN=PF,MN=DF��;
②∵PM⊥PD��,DP=MP,∴DM2=DP2+MP2=2DP2��,∴DM=DP.
∵又∵DM=DN+MN��,且由①可得MN=DF,∴DM=DN+DF��,∴DF+DN=DP;
(2)
.理由如下:
過點(diǎn)P作PM1⊥PD,PM1交AD邊于點(diǎn)M1��,如圖,
∵四邊形ABCD是矩形��,∴∠ADC=90°.
又∵DE平分∠ADC��,∴∠ADE=∠EDC=45°;
∵PM1⊥PD��,∠DM1P=45°��,∴DP=M1P,∴∠PDF=∠PM1N=135°��,同(1)可知∠M1PN=∠DPF.在△PM1N和△PDF中��,
��,
∴△PM1N≌△PDF(ASA)��,∴M1N=DF��,由勾股定理可得:
=DP2+M1P2=2DP2��,∴DM1DP.
∵DM1=DN﹣M1N��,M1N=DF��,∴DM1=DN﹣DF,∴DN﹣DF=DP.
