在极坐标系中，圆C1的方程为ρ=42cos(θ-π4)，以极点为坐标原点_爱下问搜题

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问题解答题

在极坐标系中，圆C₁的方程为ρ=4

2

cos(θ-

π

4

)，以极点为坐标原点，极轴为x轴的正半轴建立平面直角坐标系，圆C₂的参数方程

x=-1-acosθ

y=-1+asinθ

（θ是参数），若圆C₁与圆C₂相切，求实数a的值．

答案

圆C₁的方程为ρ=4

2

cos(θ-

π

4

)，的直角坐标方程为：（x-2）²+（y-2）²=8，

圆心C₁（2，2），半径r₁=2

2

，

圆C₂的参数方程

x=-1-acosθ

y=-1+asinθ

（θ是参数）的直角坐标方程为：（x+1）²+（y+1）²=a²．

圆心距C₁C₂=3

2

，

两圆外切时，C₁C₂=r₁+r₂=2

2

+|a|=3

2

，a=±

2

；

两圆内切时，C₁C₂=|r₁-r₂|=|2

2

-|a||=3

2

，a=±5

2

．

综上，a=±

2

或a=±5

2

．

问答题

远期合同法

单项选择题

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