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[选修4-4:坐标系与参数方程]
22.(10分)在平面直角坐标系$xOy$中,以坐标原点$O$为极点,$x$轴的正半轴为极轴建立极坐标系,曲线$C$的极坐标方程为$\rho =\rho \cos \theta +1$.
(1)写出$C$的直角坐标方程;
(2)直线$l:\left\{\begin{array}{l}{x=t}\\ {y=t+a}\end{array}\right.(t$为参数),若$C$与$l$交于$A$、$B$两点,$\vert AB\vert =2$,求$a$的值.
分析:(1)由已知结合极坐标与直角坐标的互化公式即可求解;
(2)由已知结合参数的几何意义即可求解.
解:(1)因为$\rho =\rho \cos \theta +1$,所以$\rho ^{2}=(\rho \cos \theta +1)^{2}$,
故$C$的直角坐标方程为$x^{2}+y^{2}=(x+1)^{2}$,
即$y^{2}=2x+1$;
(2)将$\left\{\begin{array}{l}{x=t}\\ {y=t+a}\end{array}\right.$ 代入$y^{2}=2x+1$可得$t^{2}+2(a-1)t+a^{2}-1=0$,
设$A$,$B$所对应的参数分别为$t_{1}$,$t_{2}$,
则$t_{1}+t_{2}=-2(a-1)$,$t_{1}t_{2}=a^{2}-1$,
则$\vert AB\vert =\sqrt{2}\vert t_{1}-t_{2}\vert =\sqrt{2}\times \sqrt{({t}_{1}+{t}_{2})^{2}-4{t}_{1}{t}_{2}}$
$=\sqrt{2}\times \sqrt{4(a-1)^{2}-4({a}^{2}-1)}=2\sqrt{2}\times \sqrt{{a}^{2}-2a+1-{a}^{2}+1}$
$=4\times \sqrt{1-a}=2$,
解得:$a=\dfrac{3}{4}$.
点评:本题主要考查了极坐标与直角坐标的互化公式的应用,还考查了参数几何意义的应用,属于中档题.
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