题目内容
利用换元法解下列方程:
(1)(x+2)2+6(x+2)-91=O;
(2)x2-(1+2
)x-3+
=0.
(1)(x+2)2+6(x+2)-91=O;
(2)x2-(1+2
| 3 |
| 3 |
(1)(x+2)2+6(x+2)-91=O;
设x+2=y,则原方程可变形为:
y2+6y-91=0,
解得:y1=7,y2=-13,
当y1=7时,x+2=7,
x1=5,
当y2=-13时,x+2=-13,
x2=-15;
(2)x2-(1+2
)x-3+
=0,
[x-(3+
)][x+(2-
)]=0,
x-(3+
)=0,x+(2-
)=0,
x1=3+
,x2=-2+
.
设x+2=y,则原方程可变形为:
y2+6y-91=0,
解得:y1=7,y2=-13,
当y1=7时,x+2=7,
x1=5,
当y2=-13时,x+2=-13,
x2=-15;
(2)x2-(1+2
| 3 |
| 3 |
[x-(3+
| 3 |
| 3 |
x-(3+
| 3 |
| 3 |
x1=3+
| 3 |
| 3 |
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)x-3+
。
。
,x2=
,x3=
,x4=
。
,我们可以将x2-1视为一个整体,设x2-1=y
