证明x^2y^2 [x^2y^2 (x-y)^2]在(0,0)极限不存在

1／x＝p1／y＝q1／z＝rpq+qr+pr=1(y+x)/z+(y+z)/x+(z+x)/y≥2(1/x+1/y+1/z)^2为(pq+qr+pr)[r/p+r/q+q/r+q/p+p/r+p/q

y'=1-2x/(1+x²)=(1+x²-2x)/(1+x²)=(x-1)²/(1+x²)显然y'>0所以y单调增加

有这样的公式：a^3+b^3+c^2-3abc=(a+b+c)(a^2+b^2+c^2-ab-bc-ca)左边减右边,证明：（x+y-2z)^3+(y+z-2x)^3+(z+x-2y)^3-3（x+y

以D(X+Y)为例：D(X+Y)=E[(X+Y)-E(X+Y)]^2←方差的定义=E[X-E(X)+Y-E(Y)]^2=E[X-E(X)]^2+E[Y-E(Y)]^2+2E【[X-E(X)][Y-E(

COS（X+Y）COS（X-Y）=(COSX*COSY-SINX*SINY)(COSX*COSY+SINX*SINY)=(COSX*COSY)^2-(SINX*SINY)^2=COS^2X(1-SIN

正整数?取对数即证：2xlnx+2ylny+2zlnz>(y+z)lnx+(x+z)lny+(x+y)lnzx>y>z,lnx>lny>lnz由排序不等式得xlnx+ylny+zlnz>ylnx+zl

1)x(x-y)(x+y)-x(x+y)^2=x((x-y)(x+y)-(x+y)^2)=x(x^2-y^2-x^2-2xy-y^2)=x(-2xy-2y^2)=-2xy(x+y)2)（2a+b)(2

【(x-y)^2+(x+y)(x-y)】除以2x=(x-y)*(x-y+x+y)/2x=(x-y)*2x/2x=x-y

左边=(sinxcosy+cosxsiny)(sinxcosy-cosxsiny)=sin²xcos²y-cos²xsin²y=sin²x(1-sin

(1)令(x,y)沿y=kx趋近于（0,0）,则Lim（(x,y)→(0,0)）x+y/x-y=Lim（(x,y)→(0,0)）x+kx/x-kx=kk取不同值则极限也不同,所以极限不存在.（2）极限

令y=kx代入即可知,极限与k有关,因此极限不存在

[(x+y)(x-y)-(x+y)^2-2y(x-y)-2xy]/xy={(x+y)[(x-y)-(x+y)]-2y(x-y)-2xy}/xy={(x+y)[(x-y-x-y)]-2y(x-y)-2x

将(x+y+z)²展开有(x+y+z)²=x²+y²+z²+2xy+2xz+2yz=x²+y²+z²所以2xy+2xz+

（1)x^2/x)-y-x-y=x-y-x-y=-2y(2)(a/a-b)-(a/a+b)-(2b^2/a^2-b^2)=a(a+b-a+b)/(a^2-b^2)-(2b^2/a^2-b^2)=2b/

1左=[2x-[x]+[y]]+[2y-2[y]]+[x]+[y]=[[x]+[y]+2(x-[x])]+[2(y-[y])]+[x]+[y][x+y]=[x]+[y]+1时,则满足2(x-[x])≥

假设两个都不成立,即1+x/y>2,化简得x+y>2y；1+y/x>2,化简得x+y>2x,两个相加得2(x+y)>2(x+y).矛盾.故1+x/y

（X+Y）^2=X^2+Y^2+2XY=x^2+y^2+2xy*cosΦ>=0所以x^2+y^2>=2xy*cosΦ又因为0

用求导的方式来做.y'=1-(2x)/(1+x^2)=(1+x^2-2x)/(1+x^2)=(x-1)^2/(x^2+1)>=0所以函数为增函数.再问：y'=(x-1)^2/(x^2+1)如果x=1时

1.当n=1时原式=x^2-y^2=(x-y)(x+y)能被x+y整除故命题成立2.假设n=k时命题成立,即x^(2k)-y^(2k)能被x+y整除当n=k+1时x^(2k+2)-y^(2k+2)=x