题目内容
11.已知向量${\overrightarrow m_1}$=(0,x),${\overrightarrow n_1}$=(1,1),${\overrightarrow m_2}$=(x,0),${\overrightarrow n_2}$=(y2,1)(其中x,y是实数),又设向量$\overrightarrow m$=${\overrightarrow m_1}$+$\sqrt{2}$${\overrightarrow n_2}$,$\overrightarrow n$=${\overrightarrow m_2}$-$\sqrt{2}$${\overrightarrow n_1}$,且$\overrightarrow m$∥$\overrightarrow n$,点P(x,y)的轨迹为曲线C.(Ⅰ)求曲线C的方程;
(Ⅱ)设直线l:y=kx+1与曲线C交于M、N两点,当|MN|=$\frac{{4\sqrt{2}}}{3}$时,求直线l的方程.
分析 (1)由已知求得$\overrightarrow{m}、\overrightarrow{n}$的坐标,结合$\overrightarrow m$∥$\overrightarrow n$列式化简求得曲线C的方程;
(2)联立直线方程与椭圆方程,化为(1+2k2)x2+4kx=0,再由弦长公式求得k,则直线方程可求.
解答 解:(Ⅰ)由已知$\overrightarrow m$=${\overrightarrow m_1}$+$\sqrt{2}$${\overrightarrow n_2}$=(0,x)+($\sqrt{2}{y}^{2}$,$\sqrt{2}$)=($\sqrt{2}{y}^{2}$,x+$\sqrt{2}$),
$\overrightarrow n$=${\overrightarrow m_2}$-$\sqrt{2}$${\overrightarrow n_1}$=(x,0)-($\sqrt{2}$,$\sqrt{2}$)=(x-$\sqrt{2}$,-$\sqrt{2}$),
∵$\overrightarrow m$∥$\overrightarrow n$,∴-2y2-(x+$\sqrt{2}$)(x-$\sqrt{2}$)=0.
即-2y2-x2+2=0.
∴所求曲线C的方程是:$\frac{{x}^{2}}{2}+{y}^{2}=1$;
(Ⅱ)联立$\left\{\begin{array}{l}{y=kx+1}\\{\frac{{x}^{2}}{2}+{y}^{2}=1}\end{array}\right.$,消去y得:(1+2k2)x2+4kx=0,
设M(x1,y1),N(x2,y2),则△=16k2≥0.
${x}_{1}+{x}_{2}=\frac{-4k}{1+2{k}^{2}}$.x1x2=0.
∴|MN|=$\sqrt{1+{k}^{2}}|{x}_{1}-{x}_{2}|=\sqrt{1+{k}^{2}}•\sqrt{({x}_{1}+{x}_{2})^{2}-4{x}_{1}{x}_{2}}$=$\sqrt{1+{k}^{2}}•\sqrt{(\frac{-4k}{1+2{k}^{2}})^{2}}=\frac{4}{3}\sqrt{2}$,
解得:k=±1.
∴所求直线的方程为x-y+1=0或x+y-1=0.
点评 本题考查直线方程和曲线方程的求法,考查椭圆性质的应用,体现了“设而不求”的解题思想方法,是中档题.
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