问题标题:
(2014•唐山三模)在斜三棱柱ABC-A1B1C1中,平面A1ACC1⊥平面ABC,AC⊥BC,A1B⊥C1C,AC=BC.(1)求证A1A⊥A1C;(2)若A1A=A1C,求二面角B-A1C-B1的余弦值.
问题描述:
(2014•唐山三模)在斜三棱柱ABC-A1B1C1中,平面A1ACC1⊥平面ABC,AC⊥BC,A1B⊥C1C,AC=BC.
(1)求证A1A⊥A1C;
(2)若A1A=A1C,求二面角B-A1C-B1的余弦值.
崔汉国回答:
(1)∵平面A1ACC1⊥平面ABC,AC⊥BC,
∴BC⊥平面A1ACC1,
∴A1A⊥BC,
∵A1B⊥C1C,A1A∥CC1
∴A1A⊥A1B,
∴A1A⊥平面A1BC,
∴A1A⊥A1C;
(Ⅱ)建立如图所示的坐标系C-xyz.
设AC=BC=2,
∵A1A=A1C,
则A(2,0,0),B(0,2,0),A1(1,0,1),C(0,0,0).
CB
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