已知圆C:x^2+y^2-2x+4y+4=0,是否存在斜率1的直线l,使以l被圆C所截得的弦AB为直径的圆经过原点?若存在,写出直线的方程;若不存在,请说明理由.
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![已知圆C:x^2+y^2-2x+4y+4=0,是否存在斜率1的直线l,使以l被圆C所截得的弦AB为直径的圆经过原点?若存在,写出直线的方程;若不存在,请说明理由.](/uploads/image/z/3703459-67-9.jpg?t=%E5%B7%B2%E7%9F%A5%E5%9C%86C%EF%BC%9Ax%5E2%2By%5E2-2x%2B4y%2B4%3D0%2C%E6%98%AF%E5%90%A6%E5%AD%98%E5%9C%A8%E6%96%9C%E7%8E%871%E7%9A%84%E7%9B%B4%E7%BA%BFl%2C%E4%BD%BF%E4%BB%A5l%E8%A2%AB%E5%9C%86C%E6%89%80%E6%88%AA%E5%BE%97%E7%9A%84%E5%BC%A6AB%E4%B8%BA%E7%9B%B4%E5%BE%84%E7%9A%84%E5%9C%86%E7%BB%8F%E8%BF%87%E5%8E%9F%E7%82%B9%3F%E8%8B%A5%E5%AD%98%E5%9C%A8%2C%E5%86%99%E5%87%BA%E7%9B%B4%E7%BA%BF%E7%9A%84%E6%96%B9%E7%A8%8B%3B%E8%8B%A5%E4%B8%8D%E5%AD%98%E5%9C%A8%2C%E8%AF%B7%E8%AF%B4%E6%98%8E%E7%90%86%E7%94%B1.)
已知圆C:x^2+y^2-2x+4y+4=0,是否存在斜率1的直线l,使以l被圆C所截得的弦AB为直径的圆经过原点?若存在,写出直线的方程;若不存在,请说明理由.
已知圆C:x^2+y^2-2x+4y+4=0,是否存在斜率1的直线l,使以l被圆C所截得的弦AB为直径的圆经过原点?
若存在,写出直线的方程;若不存在,请说明理由.
已知圆C:x^2+y^2-2x+4y+4=0,是否存在斜率1的直线l,使以l被圆C所截得的弦AB为直径的圆经过原点?若存在,写出直线的方程;若不存在,请说明理由.
let line l be:
y = x + c (1)
C:x^2+ y^2-2x +4y + 4 =0 (2)
let l cut C at A(x1,y1),B(x2,y2)
|AB|^2 = (x1-x2)^2 + (y1-y2)^2 (3)
Sub (1) into (2)
x^2 + (x+c)^2 - 2x+ 4(x+c) + 4 =0
2x^2 + 2(c+1)x + c^2+4c+4 =0
x1+x2 = -(c+1)
x1x2 = (c^2+4c+4)/2
(x1-x2)^2 = (x1+x2)^2 - 2x1x2
= (c+1)^2 - (c^2+4c+4)
= -2c-3 (4)
Similarly,we have
x^2+ y^2-2x +4y + 4 =0
(y-c)^2 +y^2 -2(y-c) + 4y +4 =0
2y^2 -2(c-1)y+c^2+2c+4=0
y1+y2 = c-1
y1y2= (c^2+2c+4)/2
(y1-y2)^2 = (y1+y2)^2 - 2y1y2
= (c-1)^2 - (c^2+2c+4)
= -4c-3 (5)
centre of the circle C'
= mid point of AB
= ((x1+x2)/2 ,(y1+y2)/2)
=( -(c+1)/2,(c-1)/2 )
if the cicle pass through O(0,0),then
|C'O| = √ {(c^2+1)/2}
Sub (4),(5) into (3)
|AB|^2 = -2c-3 +(-4c-3)
= -6c -6
= -6(c+1)
|C'O| = (1/2) |AB|
2(c^2+1) = -6(c+1)
2c^2+6c+8 =0
c^2+3c+4 =0
△= 9 - 16 < 0
no such c exists
不存在斜率1的直线l,使以l被圆C所截得的弦AB为直径的圆经过原点
设直线的方程为:y=x+b,且圆的方程经整理得:(x-1)^2+(y+2)^2=1,两式联立得:2x^2+4x+2b+8=0,所以:x1+x2=-2,y1+y2=2b-2,所以另一圆的圆心为(-1,b-1),所以两圆心的斜率是: