- 已知两点M(
- 已知两点M(-1,0),N(1,0),且动点P使向量MN^2=2向量PM•向量PN,求向量PM与PN的夹角的取值范围
- 设P(x,y),向量PM=(-1-x,-y),向量PN=(1-x,-y),向量MN=(2,0),向量MN²=4,向量PM•向量PN=(-1-x,-y)(1-x,-y)=-1+x²+y²,∴ 4=-1+x²+y²,即x²+y²=5.设P(√5cθ,√5sinθ),|PM|²=(√5cosθ+1)²+(√5sinθ)²=2√5cosθ+6,|PN|²=(√5cosθ-1)²+(√5sinθ)²=-2√5cosθ+6,|PM||PN|=√[(6+2√5cosθ)(6-2√5cosθ)]=2√(9-5cos²θ), cos=4/|PM||PN|=2/√(9-5cos²θ).
∵ 0≤cos²θ≤1, 4≤9-5cos²θ≤9, ∴ 2/3≤cos≤1,
∴ 向量PM与PN的夹角的取值范围是[0,arccos(2/3)].