【答案】(1)見(jiàn)解析��;(2)
【解析】
(1)推導(dǎo)出AA1⊥平面ABCD��,AA1⊥CM��,CM⊥AB��,從而CM⊥平面ABB1A1,進(jìn)而CM⊥B1N,推導(dǎo)出△A1B1N∽△ANM��,從而∠A1B1N=∠ANM,∠A1NB1=∠AMN��,進(jìn)而B1N⊥MN,B1N⊥平面CMN��,由此能證明平面B1NC⊥平面CMN.
(2)求出點(diǎn)B1到平面CMN的距離為h1
��,設(shè)N到平面B1CM的距離為h2��,由
��,能求出點(diǎn)N到平面B1MC的距離.
(1)證明:∵直四棱柱ABCD﹣A1B1C1D1��,∴AA1⊥平面ABCD��,
∵CM平面ABCD��,∴AA1⊥CM��,
∵底面ABCD是菱形,∠ABC=60°��,M是AB的中點(diǎn)��,
∴CM⊥AB��,
∵AA1∩AB=A��,AA1平面ABB1A1��,AB平面ABB1A1,
∴CM⊥平面ABB1A1��,
∵B1N平面ABB1A1��,∴CM⊥B1N��,
∵M是AB中點(diǎn)��,N為AA1中點(diǎn)��,AA1
��,
∴
��,
��,
∵∠B1A1N=∠NAM=90°��,∴△A1B1N∽△ANM��,
∴∠A1B1N=∠ANM��,∠A1NB1=∠AMN��,
∴∠A1NB1+∠ANM=90°��,∴B1N⊥MN��,
∵MN∩CM=M��,∴B1N⊥平面CMN��,
∵B1N平面B1NC��,∴平面B1NC⊥平面CMN.
(2)∵在直四棱柱ABCD﹣A1B1C1D1中��,底面ABCD為菱形��,∠ABC=60°��,
AA1
AB��,AB=2��,M��,N分別為AB��,AA1的中點(diǎn).
∴MN
��,B1M
3��,B1C
,
B1N
��,
∵底面ABCD是菱形��,∠ABC=60°��,
∴CM
��,CN
��,
由(1)知B1N⊥平面CMN��,設(shè)點(diǎn)B1到平面CMN的距離為h1��,h1��,
∵CN2=MN2+CM2��,∴
��,
∴
��,
∵B1M=3��,
��,∴
��,
設(shè)N到平面B1CM的距離為h2��,
∵��,
∴
��,
解得h2.
∴點(diǎn)N到平面B1MC的距離為.
