(1)見(jiàn)解析(2)θ=
【解析】(1)法一:∵A1O⊥平面ABCD�����,∴A1O⊥BD.
又底面ABCD是正方形���,∴BD⊥AC����,又A1O∩AC=O����,∴BD⊥平面A1OC,又A1C?平面A1OC�����,∴BD⊥A1C.
又OA1是AC的中垂線����,∴A1A=A1C=
�,且AC=2�����,
∴AC2=AA+A1C2����,
∴△AA1C是直角三角形����,∴AA1⊥A1C.
又BB1∥AA1����,∴A1C⊥BB1��,又BB1∩BD=B�����,∴A1C⊥平面BB1D1D.
法二:由題設(shè)易知OA�,OB����,OA1兩兩垂直�����,以O為原點(diǎn)建立直角坐標(biāo)系���,如圖.
∵AB=AA1=
,
∴OA=OB=OA1=1����,
∴A(1,0,0),B(0,1,0),C(-1,0,0),D(0���,-1,0),
A1(0,0,1).由
=
�,易得B1(-1,1,1).
∵
=(-1,0�,-1)�����,
=(0�����,-2,0)���,
=(-1,0,1).
∴
·
=0����,
·
=0,
∴A1C⊥BD����,A1C⊥BB1��,
又BD∩BB1=B���,
∴A1C⊥平面BB1D1D.
(2)設(shè)平面OCB1的法向量n=(x,y�,z).
∵
=(-1,0,0)�����,
=(-1,1,1)�����,
∴
∴
取n=(0,1�����,-1)��,
由(1)知,
=(-1,0�,-1)是平面BB1D1D的法向量��,
∴cos θ=|cos〈n,
〉|=
=
.
又∵0≤θ≤
�,∴θ=.
