在三棱柱ABC-A1B1C1中,D,D1分别是BC,B1C1的中点。求证:平面A1BD1//平面AC1D
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已知斜
三棱柱
ABC-A1B1C1中,A1C1=B1C1=2,D、D1分别是AB、A1B1的中点,平面A1ABB1⊥平面A1B1C1,
异面直线
AB1和C1B互相垂直.
(1)求证:AB1⊥C1D1;
(2)求证:AB1⊥面A1CD
最佳答案
证明:(1)Because(B):A1C1=B1C1=2
and
D1是A1B1的中点
So(s):
C1D1⊥A1B1
又B:A1ABB1⊥平面A1B1C1
S:C1D1⊥A1ABB1
又B:AB1包含于A1ABB1
S:AB1⊥C1D1
(2)连接BD1
B:C1D1⊥A1ABB1故C1D1⊥BD1.........\1\
且C1D1⊥AB1.....................\2\
且C1D1//CD
S:CD⊥A1ABB1
S:CD⊥AB1..........................\3\
又B:异面直线AB1和C1B互相垂直(即AB1⊥C1B)....\4\
由\2\和\4\知AB1⊥平面BC1D1
S:AB1⊥BD1
又因为A1D//BD1
S:AB1⊥A1D..................................\5\
由\3\和\5\即得AB1⊥面A1CD
三棱柱
ABC-A1B1C1中,A1C1=B1C1=2,D、D1分别是AB、A1B1的中点,平面A1ABB1⊥平面A1B1C1,
异面直线
AB1和C1B互相垂直.
(1)求证:AB1⊥C1D1;
(2)求证:AB1⊥面A1CD
最佳答案
证明:(1)Because(B):A1C1=B1C1=2
and
D1是A1B1的中点
So(s):
C1D1⊥A1B1
又B:A1ABB1⊥平面A1B1C1
S:C1D1⊥A1ABB1
又B:AB1包含于A1ABB1
S:AB1⊥C1D1
(2)连接BD1
B:C1D1⊥A1ABB1故C1D1⊥BD1.........\1\
且C1D1⊥AB1.....................\2\
且C1D1//CD
S:CD⊥A1ABB1
S:CD⊥AB1..........................\3\
又B:异面直线AB1和C1B互相垂直(即AB1⊥C1B)....\4\
由\2\和\4\知AB1⊥平面BC1D1
S:AB1⊥BD1
又因为A1D//BD1
S:AB1⊥A1D..................................\5\
由\3\和\5\即得AB1⊥面A1CD
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