Question

如圖,平面上兩條直線AB與AP互相垂直,AB=1,AP=3,D在直線AB上,AD=4,平面上動點M在直線AB上的射影為點N,滿足DM=2BN.

(1)求動點M的軌跡C的方程;

(2)若直線y=kx+M(k≠0,M≠0)與點M的軌跡C交于不同的兩點E、F,且E、F都在以P為圓心的圓上,求實數(shù)M的取值范圍.

Answer 1

解：(1)以A為原點，AB所在直線為x軸建立平面直角坐標(biāo)系，則B(1，0)，D(4，0)，P(0，3)，?

設(shè)M(x,y),則N(x,0),                                                                                                 ?

由|DM|=2|BN|，得=2|x-1|,?

整理得點M的軌跡方程為=1.                                                                    ?

(2)設(shè)E(x₁,y₁),F(x₂,y₂),?

由消去y整理得(3-k²)x²-2kMx-(M²+12)=0.?

依題意得(*)                                                    ?

設(shè)EF的中點為G(x₀,y₀),則x₀==.?

∵點G在直線y=kx+M上,∴y₀=kx₀+M=.?

∴G(,).                                                                                             ?

∵E、F兩點都在以P(0,3)為圓心的同一圓上，?

∴GP⊥EF，即k_GP·k=-1.?

∴·k=-1,整理得k²=.                                                            ?

代入(*)式得?

解得M＞0或M＜-.                                                                                                  ?

又k²=＞0，∴M＜.?

故所求M的取值范圍是(-∞,-)∪(0,).