答:
椭圆(y^2)/4+(x^2)/2=1长轴在y轴上,短轴在x轴上
所以:焦点在y轴上
点A(1,√2)经验证在椭圆上
直线L斜率k=√2,y=√2x+b,√2x-y+b=0
点A(1,√2)到直线的距离d=|√2-√2+b|/√(1+2)=|b|/√3
直线与椭圆联立得:
(√2x+b)^2+2x^2=4
4x^2+2√2bx+b^2-4=0
根据韦达定理:
x1+x2=-√2b/2
x1*x2=(b^2-4)/4
因为:y1-y2=√2(x1-x2)
所以:
BC^2=(x1-x2)^2+(y1-y2)^2
=3(x1-x2)^2
=3*[(x1+x2)^2-4x1x2]
=3*(-√2b/2)^2-3*(b^2-4)
=3(b^2)/2-3b^2+12
=-3(b^2)/2+12
所以:BC=√[12-3(b^2)/2]
所以三角形ABC面积:
S=BC*d/2
=[ |b| / (2√3) ]*√[12-3(b^2)/2]
=2*√[ 3(b^2)/2) ]*√[12-3(b^2)/2 ] *(√2/12)