如图,四边形ABCD中,AB=AC=AD,AC平分∠BAD,点P是AC延长线上一点,且PD⊥AD.
(1)证明:∠BDC=∠PDC;
(2)若AC与BD相交于点E,AB=1,CE∶CP=2∶3,求AE的长.

如图,四边形ABCD中,AB=AC=AD,AC平分∠BAD,点P是AC延长线上一点,且PD⊥AD.
(1)证明:∠BDC=∠PDC;
(2)若AC与BD相交于点E,AB=1,CE∶CP=2∶3,求AE的长.

(1)证明:∵AB=AD,AC平分∠BAD,
∴AC⊥BD,∴∠ACD+∠BDC=90°.
∵AC=AD,∴∠ACD=∠ADC,
∴∠ADC+∠BDC=90°.
∵PD⊥AD,∴∠PDC+∠ADC=90°,
∴∠BDC=∠PDC.
(2)解:如图,过点C作CM⊥PD于点M.

∵∠BDC=∠PDC,∴CE=CM.
∵∠CMP=∠ADP=90°,∠P=∠P,
∴△CPM∽△APD,∴
=
.
设CM=CE=x,
∵CE∶CP=2∶3,
∴PC=
x.
∵AB=AD=AC=1,
∴
=
,
解得x=
,
∴AE=1-
=
.