【答案】(1)見解析(2)見解析
【解析】試題分析:(1)由三角形中位線性質(zhì)及棱柱性質(zhì)得DE∥A1C1�����,再根據(jù)線面平行判定定理得結(jié)論(2)先由直三棱柱性質(zhì)得A1A⊥平面A1B1C1��,即A1A⊥A1C1����,又已知A1C1⊥A1B1,所以由線面垂直判定定理得A1C1⊥平面ABB1A1,即A1C1⊥B1D.再由已知B1D⊥A1F���,結(jié)合線面垂直判定定理得B1D⊥平面A1C1F.最后根據(jù)面面垂直判定定理得平面B1DE⊥平面A1C1F.
試題解析:證明:(1)在直三棱柱ABC A1B1C1中,A1C1∥AC.
在△ABC中���,∵D���,E分別為AB,BC的中點�����,
∴DE∥AC�����,于是DE∥A1C1��,
又∵DE平面A1C1F��,A1C1平面A1C1F����,
∴直線DE∥平面A1C1F.
(2)在直三棱柱ABC A1B1C1中��,A1A⊥平面A1B1C1���,
∵A1C1平面A1B1C1,∴A1A⊥A1C1��,
又∵A1C1⊥A1B1�,AA1平面ABB1A1,A1B1平面ABB1A1����,A1A∩A1B1=A1,
∴A1C1⊥平面ABB1A1.
∵B1D平面ABB1A1��,∴A1C1⊥B1D.
又∵B1D⊥A1F����,A1C1平面A1C1F�����,A1F平面A1C1F���,A1C1∩A1F=A1���,
∴B1D⊥平面A1C1F.
∵B1D平面B1DE�,∴平面B1DE⊥平面A1C1F.
