题目内容
因式分解:
(1)x3(a+1)-xy(x-y)(a-b)+y3(b+1)
(2)1-2ax-(c-a2)x2+acx3.
(1)x3(a+1)-xy(x-y)(a-b)+y3(b+1)
(2)1-2ax-(c-a2)x2+acx3.
考点:因式分解-分组分解法
专题:计算题
分析:(1)原式第一项括号中变形后,利用单项式乘多项式法则变形,结合后,提取公因式即可得到结果;
(2)原式第三项变形后,结合并利用完全平方公式分解,提取公因式即可得到结果.
(2)原式第三项变形后,结合并利用完全平方公式分解,提取公因式即可得到结果.
解答:解:(1)原式=x3(a-b+b+1)-xy(x-y)(a-b)+y3(b+1)
=x3(a-b)+x3(b+1)-xy(x-y)(a-b)+y3(b+1)
=(x3+y3)(b+1)+[x3-xy(x-y)](a-b)
=(x+y)(x2-xy+y2)(b+1)+x(x2-xy+y2)(a-b)
=(x2-xy+y2)[(x+y)(b+1)+x(a-b)]
=(x2-xy+y2)(ax+x+by+y);
(2)原式=1-2ax-cx2+a2x2+acx3
=a2x2-2ax+1+acx3-cx2
=(ax-1)2+cx2(ax-1)
=(ax-1)(ax-1+cx2).
=x3(a-b)+x3(b+1)-xy(x-y)(a-b)+y3(b+1)
=(x3+y3)(b+1)+[x3-xy(x-y)](a-b)
=(x+y)(x2-xy+y2)(b+1)+x(x2-xy+y2)(a-b)
=(x2-xy+y2)[(x+y)(b+1)+x(a-b)]
=(x2-xy+y2)(ax+x+by+y);
(2)原式=1-2ax-cx2+a2x2+acx3
=a2x2-2ax+1+acx3-cx2
=(ax-1)2+cx2(ax-1)
=(ax-1)(ax-1+cx2).
点评:此题考查了因式分解-分组分解法,将原式进行适当的变形是解本题的关键.
练习册系列答案
相关题目