题目内容
计算:
(1)
+
(2)
-
-
(3)1+
÷(
-
)
(4)(x4-y4)÷
•
.
(1)
| x2 |
| x-y |
| y2 |
| y-x |
(2)
| x |
| x+1 |
| 1 |
| x-1 |
| 2 |
| 1-x2 |
(3)1+
| 1-a |
| a |
| a |
| a+2 |
| 1 |
| a2+2a |
(4)(x4-y4)÷
| x2+y2 |
| x+y |
| 1 |
| x2+2xy+y2 |
考点:分式的混合运算
专题:
分析:(1)先变形,再根据同分母的分式相减的法则进行计算即可;
(2)先通分,再计算即可;
(3)根据运算顺序,先算乘除,后算加减,有括号的先算括号里面的;
(4)先对多项式进行因式分解,再约分即可.
(2)先通分,再计算即可;
(3)根据运算顺序,先算乘除,后算加减,有括号的先算括号里面的;
(4)先对多项式进行因式分解,再约分即可.
解答:
解:(1)原式=
-
=
=x+y;
(2)原式=
-
+
=
=
=
;
(3)原式=1+
÷(
-
)
=1+
÷
=1-
•
=1-
=
=-
;
(4)原式=(x2+y2)(x+y)(x-y)•
•
=x-y.
| x2 |
| x-y |
| y2 |
| x-y |
=
| (x+y)(x-y) |
| x-y |
=x+y;
(2)原式=
| x(x-1) |
| (x+1)(x-1) |
| x+1 |
| (x+1)(x-1) |
| 2 |
| (x+1)(x-1) |
=
| x2-x-x-1+2 |
| (x+1)(x-1) |
=
| (x-1)2 |
| (x+1)(x-1) |
=
| x-1 |
| x+1 |
(3)原式=1+
| 1-a |
| a |
| a2 |
| a(a+2) |
| 1 |
| a(a+2) |
=1+
| 1-a |
| a |
| (a+1)(a-1) |
| a(a+2) |
=1-
| a-1 |
| a |
| a(a+2) |
| (a+1)(a-1) |
=1-
| a+2 |
| a+1 |
=
| a+1-a-2 |
| a+1 |
=-
| 1 |
| a+1 |
(4)原式=(x2+y2)(x+y)(x-y)•
| x+y |
| x2+y2 |
| 1 |
| (x+y)2 |
=x-y.
点评:本题考查了分式的混合运算,通分、因式分解和约分是解答的关键.
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