题目内容
计算或解方程或化简求值:
(1)(x-8y)(x-y)
(2)(25x2+15x3y-20x4)÷(-5x2)
(3)|-
|+
+
(4)(2x+3y)2-(2x+y)(2x-y)
(5)解方程:8x-(x+5)(x-5)=-2-(x+1)(x+3)
(6)先化简,再求值:[(x2+y2)-(x-y)2+2y(x-y)]÷4y,其中x=3,y=-4.
(1)(x-8y)(x-y)
(2)(25x2+15x3y-20x4)÷(-5x2)
(3)|-
| 1 |
| 2 |
(-
|
| 3 | -8 |
(4)(2x+3y)2-(2x+y)(2x-y)
(5)解方程:8x-(x+5)(x-5)=-2-(x+1)(x+3)
(6)先化简,再求值:[(x2+y2)-(x-y)2+2y(x-y)]÷4y,其中x=3,y=-4.
分析:(1)根据多项式乘多项式法则展开得出x2-xy-8xy+8y2,再合并同类项即可;
(2)根据多项式除以单项式法则先展开得出25x2÷(-5x2)+15x3y÷(-5x2)-20x4÷(-5x2),再根据单项式除以单项式法则进行计算即可;
(3)求出每一部分的值,再代入求出即可;
(4)根据平方差公式和完全平方公式先展开得出4x2+12xy+9y2-4x2+y2,再合并同类项即可;
(5)去括号得出8x-x2+25=-2-x2-x-3x-3,移项、合并同类项得出12x=-30,系数化成1即可;
(6)先算小括号里面的,在去小括号后合并同类项得出[-2y2+4xy]÷4y,推出-
y+x,代入求出即可.
(2)根据多项式除以单项式法则先展开得出25x2÷(-5x2)+15x3y÷(-5x2)-20x4÷(-5x2),再根据单项式除以单项式法则进行计算即可;
(3)求出每一部分的值,再代入求出即可;
(4)根据平方差公式和完全平方公式先展开得出4x2+12xy+9y2-4x2+y2,再合并同类项即可;
(5)去括号得出8x-x2+25=-2-x2-x-3x-3,移项、合并同类项得出12x=-30,系数化成1即可;
(6)先算小括号里面的,在去小括号后合并同类项得出[-2y2+4xy]÷4y,推出-
| 1 |
| 2 |
解答:解:(1)原式=x2-xy-8xy+8y2,
=x2-9xy+8y2;
(2)解:原式=25x2÷(-5x2)+15x3y÷(-5x2)-20x4÷(-5x2),
=-5-3xy+4x2;
(3)解:原式=
+
-2,
=-1;
(4)解:原式=4x2+12xy+9y2-4x2+y2,
=12xy+10y2;
(5)解:去括号得:8x-x2+25=-2-x2-x-3x-3,
移项得:8x-x2+x2+x+3x=-2-3-25,
合并同类项得:12x=-30,
系数化成1得:x=-
;
(6)解:当x=3,y=-4时,
[(x2+y2)-(x-y)2+2y(x-y)]÷4y,
=[x2+y2-(x2-2xy+y2)+2xy-2y2]÷4y,
=[x2+y2-x2+2xy-y2+2xy-2y2]÷4y,
=[-2y2+4xy]÷4y,
=-
y+x,
=-
×(-4)+3,
=5.
=x2-9xy+8y2;
(2)解:原式=25x2÷(-5x2)+15x3y÷(-5x2)-20x4÷(-5x2),
=-5-3xy+4x2;
(3)解:原式=
| 1 |
| 2 |
| 1 |
| 2 |
=-1;
(4)解:原式=4x2+12xy+9y2-4x2+y2,
=12xy+10y2;
(5)解:去括号得:8x-x2+25=-2-x2-x-3x-3,
移项得:8x-x2+x2+x+3x=-2-3-25,
合并同类项得:12x=-30,
系数化成1得:x=-
| 5 |
| 2 |
(6)解:当x=3,y=-4时,
[(x2+y2)-(x-y)2+2y(x-y)]÷4y,
=[x2+y2-(x2-2xy+y2)+2xy-2y2]÷4y,
=[x2+y2-x2+2xy-y2+2xy-2y2]÷4y,
=[-2y2+4xy]÷4y,
=-
| 1 |
| 2 |
=-
| 1 |
| 2 |
=5.
点评:本题主要考查了整式的运算,平方差公式和完全平方公式,解一元一次方程等知识点的应用,考查了学生综合运用性质进行计算的能力,题目都比较典型,但是一些比较容易出错的题目.
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