(1)作B′E⊥CD于E.∵平面B′CD⊥平面ACD,
∴B′E⊥平面ACD.
∴B′E的长为点B′到平面ACD的距离.
B′E=B′C•sinα=sinα.
(2)∵B′E⊥平面ACD,
∴CE为B′C在平面ACD内的射影.
又AD⊥B′C,∴AD⊥CD(CE).
∵AC=BC=1,∠ACB=90°,
∴D为AB中点,且α=
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∴S△ACD=
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∴VB′-ACD=
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(1)作B′E⊥CD于E.| π |
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