1?22?x2?y?3?x?y?1?[2(1?x)?2(1?x)] 即?2?x?0??2(1?x)?2(1?x)?0?所以,点P的轨迹是以原点为圆心,3为半径的右半圆. (2)点P的坐标为(x0,y0)
PM?PN?x0?y0?1?2,|PM|?|PN|??(4?2x0)(4?2x0)?24?x0PM?PN|PM|?PN?0?x0?3,?12222(1?x)?y0?22(1?x0)?y0222?cos???14?x02
?3?cos??1,0???,?sin??1?cos??1?14?x02,?tan??sin?cos??3?x02?|y0|
8.证明:(1)连结BG,则EG?EB?BG?EB?12(BC?BD)?EB?BF?EH?EF?EH
12BD=EH)
由共面向量定理的推论知:E、F、G、H四点共面,(其中(2)因为EH?AH?AE?12AD?12AB?12(AD?AB)?12BD.
所以EH∥BD,又EH?面EFGH,BD?面EFGH 所以BD∥平面EFGH.
(3)连OM,OA,OB,OC,OD,OE,OG 由(2)知EH?平分,所以
OM??1412(OE?OG)?12OE?12OG?1111[(OA?OB)]?[(OC?OD)]222212BD,同理FG?12BD,所以EH?FG,EHFG,所以EG、FH交于一点M且被M
.
(OA?OB?OC?OD).
VI