题目内容
计算:
(1)
+
-
;
(2)2
+(-1)3-2×
-(
-2)0;
(3)3ab(2a2b-ab2);
(4)(3a-b)(-b+4a);
(5)(-2x+y)2+4y(x-
y);
(6)(-2a+b)(-2a-b)+2a(-3a+
ab).
(1)
| 4 |
| (-4)2 |
| 3 | -27 |
(2)2
| 2 |
| ||
| 2 |
| 3 |
(3)3ab(2a2b-ab2);
(4)(3a-b)(-b+4a);
(5)(-2x+y)2+4y(x-
| 1 |
| 2 |
(6)(-2a+b)(-2a-b)+2a(-3a+
| 1 |
| 2 |
分析:(1)求出每一部分的值,再合并即可.
(2)先算乘方、乘法,再合并即可.
(3)根据多项式乘以单项式法则展开即可.
(4)根据多项式乘以多项式法则展开,再合并即可.
(5)先算乘方,再算乘法,最后合并即可.
(6)先算乘法,再合并即可.
(2)先算乘方、乘法,再合并即可.
(3)根据多项式乘以单项式法则展开即可.
(4)根据多项式乘以多项式法则展开,再合并即可.
(5)先算乘方,再算乘法,最后合并即可.
(6)先算乘法,再合并即可.
解答:解:(1)
+
-
;
=2+4-(-3)
=9;
(2)2
+(-1)3-2×
-(
-2)0
=2
-1-
-1
=
-2;
(3)3ab(2a2b-ab2)
=6a3b2-3a2b3;
(4)(3a-b)(-b+4a)
=-3ab+12a2+b2-4ab
=12a2-7ab+b2;
(5)(-2x+y)2+4y(x-
y)
=4x2-4xy+y2+4xy-2y2
=4x2-y2;
(6)(-2a+b)(-2a-b)+2a(-3a+
ab)
=4a2-b2-6a2+a2b
=-2a2-b2+a2b.
| 4 |
| (-4)2 |
| 3 | -27 |
=2+4-(-3)
=9;
(2)2
| 2 |
| ||
| 2 |
| 3 |
=2
| 2 |
| 2 |
=
| 2 |
(3)3ab(2a2b-ab2)
=6a3b2-3a2b3;
(4)(3a-b)(-b+4a)
=-3ab+12a2+b2-4ab
=12a2-7ab+b2;
(5)(-2x+y)2+4y(x-
| 1 |
| 2 |
=4x2-4xy+y2+4xy-2y2
=4x2-y2;
(6)(-2a+b)(-2a-b)+2a(-3a+
| 1 |
| 2 |
=4a2-b2-6a2+a2b
=-2a2-b2+a2b.
点评:本题考查了合并同类项,零指数幂,平方差公式,完全平方公式,整式的混合运算的应用,主要考查学生的计算能力.
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