题目内容
已知:x+y=1,求(x2-y2)2-2(x2+y2)的值.
分析:先用x表示出y,再把原式进行化简,把y的值代入求解即可.
解答:解:解法一:原式=(x+y)2(x-y)2-2(x2+y2),
∵x+y=1,
∴原式=(x-y)2-2(x2+y2)
=x2-2xy+y2-2x2-y2
=-x2-2xy-y2
=-(x+y)2
=-1;
解法二:∵x+y=1,
∴y=1-x,
∴原式=[x2-(1-x2)]2-2[x2+(1-x)2]
=(2x-1)2-2(2x2-2x+1)
=4x2-4x+1-4x2+4x-2
=-1.
∵x+y=1,
∴原式=(x-y)2-2(x2+y2)
=x2-2xy+y2-2x2-y2
=-x2-2xy-y2
=-(x+y)2
=-1;
解法二:∵x+y=1,
∴y=1-x,
∴原式=[x2-(1-x2)]2-2[x2+(1-x)2]
=(2x-1)2-2(2x2-2x+1)
=4x2-4x+1-4x2+4x-2
=-1.
点评:本题考查的是整式的混合运算-化简求值,熟知整式混合运算的法则是解答此题的关键.
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