椭圆x2/4+y2=1的右焦点为F,A,B,C为该椭圆上的三点,若FA+FB+FC=0(向量),则|FA|+|FB|+|FC|=___
椭圆x2/4+y2=1的右焦点为F,A,B,C为该椭圆上的三点,若FA+FB+FC=0(向量),则|FA|+|FB|+|FC|=___
日期:2022-03-30 03:36:14 人气:1
a=2 & c^2=4-1=3, e=c/a=根号3/2 A(x1,y1),B(,x2,y2),C(x3,y3)
则:向量FA+FB+FC=(x1-c+x2-c+x3-c,y1+y2+y3)=0(向量),
所以 x1-c+x2-c+x3-c=0, x1+x2+x3=3c
|FA|+|FB|+|FC|=a-ex1+a-ex2+a-ex3=3a-e(x1
则:向量FA+FB+FC=(x1-c+x2-c+x3-c,y1+y2+y3)=0(向量),
所以 x1-c+x2-c+x3-c=0, x1+x2+x3=3c
|FA|+|FB|+|FC|=a-ex1+a-ex2+a-ex3=3a-e(x1