【答案】(1)證明見解析�����;(2)證明見解析
【解析】
(1)取AC中點(diǎn)P���,連結(jié)NP�,BP����,推導(dǎo)出四邊形PNMB是平行四邊形,從而MN∥BP�,由此能證明MN∥平面ABC;
(2)推導(dǎo)出MN⊥A1C����,MN⊥AA1��,從而MN⊥平面A1ACC1���,由此能證明平面A1MC⊥平面A1ACC1.
(1)取AC中點(diǎn)P���,連結(jié)NP���,BP,∵N是A1C中點(diǎn)�����,P為AC中點(diǎn)���,
∴PN∥AA1��,且BB1=AA1���,又M為BB1中點(diǎn),∴BM∥AA1�����,且BM=
AA1�����,
∴PN∥BM�,且PN=BM���,∴四邊形PNMB是平行四邊形,∴MN∥BP���,
∵MN平面ABC����,BP平面ABC���,∴MN∥平面ABC.
(2)∵MA1=MC����,且N是A1C的中點(diǎn)����,∴MN⊥A1C,
又MN⊥AA1�����,AA1∩A1C=A1�����,
A1C���,AA1平面A1ACC1����,∴MN⊥平面A1ACC1�����,
∵MN平面A1MC���,∴平面A1MC⊥平面A1ACC1.
