(1)椭圆C:x^2/a^2+y^2/b^=1(a>b>o)经过点P(1,√2/2),
∴1/a^2+1/(2b^2)=1.(1)
两焦点与短轴的一个端点构成等腰直角三角形,
∴b=c,a=b√2.(2)
代入(1),b^2=1,
代入(2),a^2=2.
∴椭圆方程为x^2/2+y^2=1.(3)
(2)把x=(-n/m)(y+1/3)=k(y+1/3)(其中k=-n/m)代入(3)*2,
(k^2+2)y^2+(2/3)k^2y+k^2/9-2=0,
△=(4/9)k^4-4(k^2+2)(k^2/9-2)
=(64/9)k^2+16,
设A(x1,y1),B(x2,y2),则
y1+y2=-2k^2/[3(k^2+2)],y1y2=(k^2-18)/[9(k^2+2)],
AB的中点为(2k/[3(k^2+2)],-k^2/[3(k^2+2)],
|AB|=(√△)/(k^2+2)*√(1+k^2),
∴以AB为直径的圆的方程是
{x-2k/[3(k^2+2)]}^2+{y+k^2/[3(k^2+2)]}^2=(16k^2+36)(k^2+1)/[3(k^2+2)]^2,
化简得x^2+y^2-4kx/[3(k^2+2)]+2k^2y/[3(k^2+2)]=(5k^2+6)/[3(k^2+2)],
这个圆过定点T(0,1),满足TA*TB=0.
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