且AF2,AB,BF2成等差数列。(1)求三角形ABF2的周长(2)求AB的长(3)若直线L的斜率为1,求b的值
(1)△ABF2的周长=AB+(AF2+BF2)=(AF1+BF1)+(AF2+BF2)=(AF1+AF2)+(BF1+BF2)=2a+2a=4a=4;
(2)AB=AF1+BF1=(AF2+BF2)/2=[(2a-AF1)+(2a-BF1)]/2=2a-(AF1+BF1)/2;
AB=AF2+BF1=2a/(1+1/2)=4a/3=4/3;
(3)直线斜率为1,通过左焦点(-c,0),方程为:y=x+c,代入椭圆方程:x^2+(x+c)^2/b^2=1;
整理:(1+b^2)*x^2+2c*x+(c^2-b^2)=0,将b^2=a^2-c^2=1-c^2代入得:(2-c^2)*x^2+2c*x+(2c^2-1)=0;
设上列方程两根分别为x1、x2,有:x1+x2=-2c/(2-c^2),x1*x2=(2c^2-1)/(2-c^2);
AB^2/2=(x1-x2)^2=(x1+x2)^2-4x1*x2=[-2c/(2-c^2)]^2-4(2c^2-1)/(2-c^2)=(4/3)^2/2;
上列c^2的一元二次方程整理为:28c^4-53c^2+17=0,解得(c<a=1):c^2=19/28;
所以 b=√(a^2-c^2)=√(1-19/28)=3/(2√7)=3√7/14;
(2)AB=AF1+BF1=(AF2+BF2)/2=[(2a-AF1)+(2a-BF1)]/2=2a-(AF1+BF1)/2;
AB=AF2+BF1=2a/(1+1/2)=4a/3=4/3;
(3)直线斜率为1,通过左焦点(-c,0),方程为:y=x+c,代入椭圆方程:x^2+(x+c)^2/b^2=1;
整理:(1+b^2)*x^2+2c*x+(c^2-b^2)=0,将b^2=a^2-c^2=1-c^2代入得:(2-c^2)*x^2+2c*x+(2c^2-1)=0;
设上列方程两根分别为x1、x2,有:x1+x2=-2c/(2-c^2),x1*x2=(2c^2-1)/(2-c^2);
AB^2/2=(x1-x2)^2=(x1+x2)^2-4x1*x2=[-2c/(2-c^2)]^2-4(2c^2-1)/(2-c^2)=(4/3)^2/2;
上列c^2的一元二次方程整理为:28c^4-53c^2+17=0,解得(c<a=1):c^2=19/28;
所以 b=√(a^2-c^2)=√(1-19/28)=3/(2√7)=3√7/14;
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