题干
如图,四棱锥P﹣ABCD中,PA⊥底面ABCD,AB⊥AD,AC⊥CD,∠ABC=60°,PA=AB=BC,
E是PC的中点.求证:
(Ⅰ)CD⊥AE;
(Ⅱ)PD⊥平面ABE.
答案(点此获取答案解析)
证明:(Ⅰ)∵PA⊥底面ABCD,∴PA⊥CD,又AC⊥CD,PA∩AC=A,
故CD⊥平面PAC.
又AE⊂平面PAC,∴CD⊥AE.
(Ⅱ)由题意:AB⊥AD,
∴AB⊥平面PAD,从而AB⊥PD.
又AB=BC,且∠ABC=60°,
∴AC=AB,从而AC=PA.
又E为PC之中点,∴AE⊥PC.
由(Ⅰ)知:AE⊥CD,∴AE⊥平面PCD,从而AE⊥PD.
又AB∩AE=A,
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