题目内容
15.已知曲线C1的参数方程为$\left\{\begin{array}{l}{x=4t}\\{y=3t-1}\end{array}\right.$(t为参数),当t=0时,曲线C1上对应的点为P,以原点O为极点,以x轴的正半轴建立极坐标系,曲线C2的极坐标方程为$ρ=\frac{2\sqrt{3}}{\sqrt{3+si{n}^{2}θ}}$(Ⅰ)求证:曲线C1的极坐标方程为3ρcosθ-4ρsinθ-4=0;
(Ⅱ)设曲线C1与曲线C2的公共点为A,B,求|PA|•|PB|的值.
分析 (Ⅰ)由曲线C1的参数方程为$\left\{\begin{array}{l}{x=4t}\\{y=3t-1}\end{array}\right.$(t为参数),得直角坐标方程,从而可得极坐标方程;
(Ⅱ)当t=0时,得P(0,-1),由(Ⅰ)知曲线C1是经过P的直线,可曲线C1的参数方程,由$ρ=\frac{2\sqrt{3}}{\sqrt{3+si{n}^{2}θ}}$,可得曲线C2的直角坐标方程,再代入x、y得21T2-30T-50=0,由韦达定理可得答案.
解答 (Ⅰ)证明:∵曲线C1的参数方程为$\left\{\begin{array}{l}{x=4t}\\{y=3t-1}\end{array}\right.$(t为参数),
∴曲线C1的直角坐标方程为3x-4y-4=0,
所以曲线C1的极坐标方程为3ρcosθ-4ρsinθ-4=0;
(Ⅱ)解:当t=0时,x=0,y=-1,所以P(0,-1),
由(Ⅰ)知:曲线C1是经过P的直线,
设它的倾斜角为α,则tanα=$\frac{3}{4}$,从而$sinα=\frac{3}{5}$,cos$α=\frac{4}{5}$,
所以曲线C1的参数方程为$\left\{\begin{array}{l}{x=\frac{4}{5}T}\\{y=-1+\frac{3}{5}T}\end{array}\right.$,T为参数,
∵$ρ=\frac{2\sqrt{3}}{\sqrt{3+si{n}^{2}θ}}$,∴ρ2(3+sin2θ)=12,
所以曲线C2的直角坐标方程为3x2+4y2=12,
将$x=\frac{4}{5}T$,$y=-1+\frac{3}{5}T$代入3x2+4y2=12,
得21T2-30T-50=0,
所以|PA|•|PB|=|T1T2|=$\frac{50}{21}$.
点评 本题考查极坐标方程、参数方程以及直角坐标方程之间的相互转化,利用韦达定理是解题的关键,属于中档题.
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