题目内容

(1)设x<y<0,试比较(x2+y2)(x-y)与(x2-y2)(x+y)的大小;
(2)已知a,b,c∈{正实数},且a2+b2=c2,当n∈N,n>2时比较cn与an+bn的大小.
(1)(x2+y2)(x-y)>(x2-y2)(x+y)(2)an+bn<cn
(1)方法一 (x2+y2)(x-y)-(x2-y2)(x+y)
=(x-y)[x2+y2-(x+y)2]=-2xy(x-y),
∵x<y<0,∴xy>0,x-y<0,
∴-2xy(x-y)>0,
∴(x2+y2)(x-y)>(x2-y2)(x+y).
方法二 ∵x<y<0,∴x-y<0,x2>y2,x+y<0.
∴(x2+y2)(x-y)<0,(x2-y2)(x+y)<0,
∴0<=<1,
∴(x2+y2)(x-y)>(x2-y2)(x+y).
(2)∵a,b,c∈{正实数},∴an,bn,cn>0,
=+.
∵a2+b2=c2,则+=1,
∴0<<1,0<<1.
∵n∈N,n>2,
,,
=+=1,
∴an+bn<cn.
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