13.已知在直角坐標(biāo)系xOy中����,圓錐曲線C的參數(shù)方程為$\left\{\begin{array}{l}{x=2cosθ}\\{y=sinθ}\end{array}\right.$(θ為參數(shù))���,定點(diǎn)A(0�,-$\sqrt{3}$)����,F(xiàn)1��,F(xiàn)2是圓錐曲線C的左��、右焦點(diǎn)��,直線l過(guò)點(diǎn)A����,F(xiàn)1.
(1)求圓錐曲線C及直線l的普通方程�����;
(2)設(shè)直線l與圓錐曲線C交于E���,F(xiàn)兩點(diǎn)����,求弦EF的長(zhǎng).
分析 (1)圓錐曲線C的參數(shù)方程為$\left\{\begin{array}{l}{x=2cosθ}\\{y=sinθ}\end{array}\right.$(θ為參數(shù))�����,利用cos2θ+sin2θ=1,可得普通方程.可得橢圓的左焦點(diǎn)F1(-$\sqrt{3}$����,0),又直線l還經(jīng)過(guò)點(diǎn)$(0���,-\sqrt{3})$��,可得直線l的截距式方程.
(2)直線l的方程與橢圓方程聯(lián)立化為$5{x}^{2}+8\sqrt{3}x$+8=0�����,利用|EF|=$\sqrt{(1+1)[({x}_{1}+{x}_{2})^{2}-4{x}_{1}{x}_{2}]}$即可得出.
解答 解:(1)圓錐曲線C的參數(shù)方程為$\left\{\begin{array}{l}{x=2cosθ}\\{y=sinθ}\end{array}\right.$(θ為參數(shù))�����,
利用cos2θ+sin2θ=1����,可得普通方程:$\frac{{x}^{2}}{4}+{y}^{2}$=1.
可得橢圓的左焦點(diǎn)F1(-$\sqrt{3}$�����,0),
又直線l還經(jīng)過(guò)點(diǎn)$(0����,-\sqrt{3})$,
可得直線ld的方程為:$\frac{x}{-\sqrt{3}}$+$\frac{y}{-\sqrt{3}}$=1�����,即x+y+$\sqrt{3}$=0.
(2)聯(lián)立$\left\{\begin{array}{l}{x+y+\sqrt{3}=0}\\{{x}^{2}+4{y}^{2}=4}\end{array}\right.$����,化為$5{x}^{2}+8\sqrt{3}x$+8=0����,
∴x1+x2=-$\frac{8\sqrt{3}}{5}$,x1x2=$\frac{8}{5}$.
∴|EF|=$\sqrt{(1+1)[({x}_{1}+{x}_{2})^{2}-4{x}_{1}{x}_{2}]}$=$\sqrt{2×(\frac{64×3}{25}-4×\frac{8}{5})}$=$\frac{8}{5}$.
點(diǎn)評(píng) 本題考查了參數(shù)方程化為普通方程�����、直線截距式�、直線與橢圓相交弦長(zhǎng)問(wèn)題、一元二次方程的根與系數(shù)的關(guān)系����,考查了推理能力與計(jì)算能力�����,屬于中檔題.
