题目内容
当k=______时,关于x的一元二次方程kx2-2(k+1)x+k-1=0的两个不相等的实数根x1,x2满足
+
=3.
| 1 |
| x1 |
| 1 |
| x2 |
根据题意得
x1+x2=-
=-
=
,
x1x2=
=
,
又∵
+
=3,
∴
+
=
=
×
=
=3,
即2(k+1)=3(k-1),
解得k=5.
x1+x2=-
| b |
| a |
| -2(k+1) |
| k |
| 2(k+1) |
| k |
x1x2=
| c |
| a |
| k-1 |
| k |
又∵
| 1 |
| x1 |
| 1 |
| x2 |
∴
| 1 |
| x1 |
| 1 |
| x2 |
| x1+x2 |
| x1x2 |
| 2(k+1) |
| k |
| k |
| k-1 |
| 2(k+1) |
| k-1 |
即2(k+1)=3(k-1),
解得k=5.
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