题目内容
椭圆4x2+9y2=144内有一点P(3,2)过点P的弦恰好以P为中点,那么这弦所在直线的方程为( )
| A.3x+2y-12=0 | B.2x+3y-12=0 |
| C.4x+9y-144=0 | D.9x+4y-144=0 |
设弦的端点为A(x1,y1),B(x2,y2),
则x1+x2=6,y1+y2=4,
把A、B坐标代入椭圆方程得,4x12+9y12=144,4x22+9y22=144,
两式相减得,4(x12-x22)+9(y12-y22)=0,即4(x1+x2)(x1-x2)+9(y1+y2)(y1-y2)=0,
所以
=-
=-
=-
,即kAB=-
,
所以这弦所在直线方程为:y-2=-
(x-3),即2x+3y-12=0.
故选B.
则x1+x2=6,y1+y2=4,
把A、B坐标代入椭圆方程得,4x12+9y12=144,4x22+9y22=144,
两式相减得,4(x12-x22)+9(y12-y22)=0,即4(x1+x2)(x1-x2)+9(y1+y2)(y1-y2)=0,
所以
| y1-y2 |
| x1-x2 |
| 4(x1+x2) |
| 9(y1+y2) |
| 4×6 |
| 9×4 |
| 2 |
| 3 |
| 2 |
| 3 |
所以这弦所在直线方程为:y-2=-
| 2 |
| 3 |
故选B.
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