11.已知集合A={(x�����,y)|x2-y2-y=4},B={(x��,y)|x2-xy-2y2=0}���,C={(x���,y)|x-2y=0},D={(x��,y)|x+y=0}
(1)判斷集合B、C����、D之間的關(guān)系;
(2)求A∩B.
分析 (1)根據(jù)關(guān)于B�����、C����、D的表達式,從而求出B��、C�、D的關(guān)系;(2)由題意得到方程組解出即可.
解答 解:(1)∵B={(x�,y)|x2-xy-2y2=0}={(x,y)|(x-2y)(x+y)=0}��,
而C={(x����,y)|x-2y=0},D={(x���,y)|x+y=0}�,
∴集合C和集合D是集合B的子集;
(2)∵B={(x�����,y)|x2-xy-2y2=0}={(x���,y)|(x-2y)(x+y)=0},
∴B={(x�,y)|x=2y或x=-y},
當x=2y時���,得$\left\{\begin{array}{l}{x=2y}\\{{x}^{2}{-y}^{2}-y=4}\end{array}\right.$���,解得:$\left\{\begin{array}{l}{x=\frac{8}{3}}\\{y=\frac{4}{3}}\end{array}\right.$或$\left\{\begin{array}{l}{x=-2}\\{y=-1}\end{array}\right.$,
當x=-y時�����,得$\left\{\begin{array}{l}{x=-y}\\{{x}^{2}{-y}^{2}-y=4}\end{array}\right.$��,解得:$\left\{\begin{array}{l}{x=4}\\{y=-4}\end{array}\right.$����,
∴A∩B={($\frac{8}{3}$���,$\frac{4}{3}$),(-2����,-1),(4����,-4)}.
點評 本題考查了集合之間的關(guān)系,考查集合的運算����,是一道基礎(chǔ)題.
