题目内容
12.在直角坐标系xOy中,直线l的参数方程是$\left\{\begin{array}{l}x=2+\frac{{\sqrt{2}}}{2}t\\ y=\frac{{\sqrt{2}}}{2}t\end{array}\right.$(t为参数),以原点O为极点,以x轴正半轴为极轴,圆C的极坐标方程为$ρ=4\sqrt{2}cos(θ+\frac{π}{4})$(Ⅰ)将圆C的极坐标方程化为直角坐标方程;
(Ⅱ)若直线l与圆C交于A,B两点,点P的坐标为(2,0),试求$\frac{1}{{|{PA}|}}+\frac{1}{{|{PB}|}}$的值.
分析 (I)由$ρ=4\sqrt{2}cos(θ+\frac{π}{4})$,展开化为ρ2=$4\sqrt{2}×\frac{\sqrt{2}}{2}$(ρcosθ-ρsinθ),把$\left\{\begin{array}{l}{x=ρcosθ}\\{y=ρsinθ}\end{array}\right.$代入即可得出.
(II)把直线l的参数方程是$\left\{\begin{array}{l}x=2+\frac{{\sqrt{2}}}{2}t\\ y=\frac{{\sqrt{2}}}{2}t\end{array}\right.$(t为参数)代入圆的方程可得:${t}^{2}+2\sqrt{2}t-4=0$,利用根与系数的关系可得|t1-t2|=$\sqrt{({t}_{1}+{t}_{2})^{2}-4{t}_{1}{t}_{2}}$.利用$\frac{1}{{|{PA}|}}+\frac{1}{{|{PB}|}}$=$\frac{1}{|{t}_{1}|}+\frac{1}{|{t}_{2}|}$=$\frac{|{t}_{1}-{t}_{2}|}{|{t}_{1}{t}_{2}|}$即可得出.
解答 解:(I)由$ρ=4\sqrt{2}cos(θ+\frac{π}{4})$,展开化为ρ2=$4\sqrt{2}×\frac{\sqrt{2}}{2}$(ρcosθ-ρsinθ),
化为x2+y2=4x-4y,即(x-2)2+(y+2)2=8.
(II)把直线l的参数方程是$\left\{\begin{array}{l}x=2+\frac{{\sqrt{2}}}{2}t\\ y=\frac{{\sqrt{2}}}{2}t\end{array}\right.$(t为参数)代入圆的方程可得:${t}^{2}+2\sqrt{2}t-4=0$,
∴t1+t2=-2$\sqrt{2}$,t1t2=-4<0.
|t1-t2|=$\sqrt{({t}_{1}+{t}_{2})^{2}-4{t}_{1}{t}_{2}}$=$\sqrt{(-2\sqrt{2})^{2}-4×(-4)}$=2$\sqrt{6}$.
∴$\frac{1}{{|{PA}|}}+\frac{1}{{|{PB}|}}$=$\frac{1}{|{t}_{1}|}+\frac{1}{|{t}_{2}|}$=$\frac{|{t}_{1}-{t}_{2}|}{|{t}_{1}{t}_{2}|}$=$\frac{2\sqrt{6}}{4}$=$\frac{\sqrt{6}}{2}$.
点评 本题考查了把极坐标方程化为直角方程、直线参数方程的应用、一元二次方程的根与系数的关系,考查了推理能力与计算能力,属于中档题.
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