f(X)=xy x^2=y^2,x^2 y^2不可微
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(1)原式=2xy+x(x−y)+y(x+y)x2−y2=(x+y)2(x+y)(x−y)=x+yx−y;(2)原式=2a−(a+2)(a+2)(a−2)a−2(a+2)(a−2)=1a+2;(3)原
∵xyx+y=2∴xy=2(x+y)∴原式=3x−5×2(x+y)+3y−x+3×2(x+y)−y=−7x−7y5x+5y=−75
令x=y=0得2f(0)=2f^2(0),于是f(0)=0.(因为f(0)不为1).再令x=0得f(y)+f(-y)=2f(0)f(y)=0,因此f(-y)=-f(y),f是奇函数.显然有F(-x)=
令y=2,根据f(2)=1/2,2f(x)f(y)=f(x+y)+f(x-y)有f(x)=f(x+2)+f(x-2)x=2010f(2010)=f(2012)+f(2008)x=2008f(2008)
令y=xx+y=2x所以f(2x)=f(x)+f(x)=2f(x)令x=0则f(2*0)=2*f(0)即f(0)=2f(0)f(0)=0令y=-x则f(0)=f(x)+f(-x)所以f(-x)=-f(
f(0)+f(0)=2f(0)f(0)2f(0)=2f(0)^2f(0)=0,f(0)=1f(x)+f(-x)=2f(0)f(x)f(-x)+f(x)=2f(0)f(-x)2f(0)f(x)=2f(0
这道题实际就是要把x^2+y^2变换成只由x+y和y组成的多项式x^2+y^2=x^2-y^2+2y^2=(x+y)(x-y)+2y^2=(x+y)[(x+y)-2y]+2y^2将式中(x+y)替换为
设a=xy,b=x+y.f(xy,x+y)=x^2+y^2+2xy-2xy=(x+y)^2-2xy把a,b带f(a,b)=b^2-2a所以f(x,y)=y^2-2x同理f(x+y,xy)=x^2+y^
figureezmesh('x*y')holdonezmesh('1-x-y')holdoff再问:不是很清楚。这个间距太大了,,可不可以精度大一些。。
∵xyx+y=-2,yzy+z=43,zxz+x=-43,∴1x+1y=-12,1y+1z=34,1z+1x=-34,∴2(1x+1y+1z)=-12,即1x+1y+1z=-14,则xyzxy+yz+
证明函数f(x,y)=(x+y)/(x-y)在点(0,0)处的二重极限不存在.当点(x,y)沿着直线y=kx(k为不等于1的任意实数)趋于(0,0)时,limf(x,y)=lim(x+kx)/(x-k
由(1)、(3)得y=xx−2,z=6xx−3,故x≠0,代入(2)解得x=2710,所以y=277,z=-54.检验知此组解满足原方程组.∴10x+7y+z=0.故选D.
令y=0,则有f(x)+f(x)=2f(x)f(0)令x=0,y=x,则有f(x)+f(-x)=2f(0)f(x)所以f(x)=f(-x),f(x)为偶函数
把分式xyx+y中的x和y都扩大2倍后得:2x•2y2(x+y)=4xy2(x+y)=2•xyx+y,即分式的值扩大2倍.故选:B.
x=±1,y=±3,z=±2xyzz>y则0>x>z>yx=-1,y=-3,z=-2,x2y-[4x2y-(xyz-x2z)-3x2z]-2xyx=x2y-4x2y+xyz-x2z+3x2z-2xyx
依题意有f(0+0)+f(0-0)=2f(0)*f(0)又f(0)不等于0所以f(0)=1当x=0,y取任何实数时f(0+y)+f(0-y)=2f(0)*f(y)=2f(y)所以f(-y)=f(y)所
f(x)=f(x+1)+f(x-1)f(x+1)=f(x)+f(x+2)上面两个式子联立,f(x+2)=-f(x-1)即f(x)=f(x+6)f(2010)=f(0)4f(1)f(0)=f(1-0)+
f(x+y)=[a^(x+y)+a^(-x-y)]f(x-y)=[a^(x-y)+a^(y-x)]所以,f(x+y)+f(x-y)=a^(x+y)+a^(-x-y)+a^(x-y)+a^(y-x)f(
x,y都是未知数,你也可以把他们当做t,r那么就是求f(t,r)首先由题意知2x+y=t,2y+x=r用t,r表示x,y,可得x=1/3(2t-r),y=1/3(2r-t)并将其代入f(2x+y,2y
f(x+y,xy)=x^2+y^2=(x+y)^2-2xyf(x,y)=x^2-2y