已知z=(xy,.2y),其中f有二阶连续偏导,求z x,z y
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实数x,y,z,满足那么x+y=6,z^2=xy-9,∴xy=z^+9,(x-y)^=(x+y)^-4xy=-4z^>=0,∴z=0,(x+y)^z=6^0=1.
x²-6xy+10y²+4y+|z²-3z+2|+4=0(x²-6xy+9y²)+(y²+4y+4)+|z²-3z+2|=0(x-
x+y=5x=5-yz^2=xy+y-9z^2=(5-y)y+y-9z^2=-y^2+6y-9z^2=-(y-3)^2z^2+(y-3)^2=0所以,z=0,y-3=0z=0,y=3x=5-y=5-3
答:x+y+z=3y=2zy≠0,则z≠0所以:y=2z/3x+2z/3+z=2zx=z/3令z=3k,y=2k,x=k(xy+yz+zx)/(x²+y²+z²)=(2k
把x=6-y带入z^2-4z+4=xy-9中,得(y-3)^2+(z-2)^2=0,故y-3=0,z-2=0,所以y=3,z=2,x=3.
x-y=5x=5+yz^2=-xy-y-9=-(5+y)y-y-9=-y^2-6y-9=-(y+3)^2所以,z=0,y+3=0z=0,y=-3x=5+y=5-3=2x-2y+3z=2-2*(-3)+
z²-4z+4=xy-9又x=6-y,代入得z²-4z+4=(6-y)y-9(z-2)²=-(y-3)²(z-2)²+(y-3)²=0所以(
两边同+1x+y+z+xy+xz+yz+xyz=182x(1+y)+y+1+z(1+x)+yz(1+x)=183一四项,三五项,六七项(y+1)(x+1)+z(1+x)+yz(1+x)=183(x+1
x-y=5,z-y=10相减z-x=5x²+y²+z²-xy-yz-xz=(2x²+2y²+2z²-2xy-2yz-2xz)/2=[(x&s
∵x+y=5,z2=xy+y-9,∴x=5-y,代入z2=xy+y-9得:z2=(5-y)y+y-9,z2+(y-3)2=0,z=0,y-3=0,∴y=3,x=5-3=2,x+2y+3z=2+2×3+
y=-12;一共是三个方程,因为xy/(x+y)=3推出(x+y)/(xy)=1/3-------方程1;同理:(y+z)/(yz)=1/2-------方程2;(x+z)/(xz)=1-------
x=5-yz2=(5-y)y+y-9=6y-y2-9=-(9-6y+y2)=-(y-3)2由题意,只有当该项为0时等式成立得y=3那么z=0x=2即原式=2+6+0=8
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∵x-y=4,y-z=2,∴x-z=6∴x^2y+y^2z+z^2x-(xy^2+yz^2+zx^2)=(x^2y-xy^2)+(y^2z-yz^2)+(z^2x-zx^2)=xy(x-y)+yz(y
解题思路:本题的关键是将三个方程两边取倒数,化简后分别将方程等号左边和右边相加,得到1/x+1/y+1/z的值,最后将要求的分式化简,把1/x+1/y+1/z的值带入即可。解题过程:
3x-y=-2zx+2y=-3z那么:x=-z,y=-z(3x^-xy+2y^)/(2x^+4xy+y^)=(3z^2-z^2+2z^2)/(2z^2+4z^2+z^2)=4z^2/7z^2=4/7
2x+z=6,z-2y=8相减2x+z-z+2y=6-82x+2y=-2x+y=-1x^2+y^2+2xy=(x+y)^2=(-1)^2=1
2x+z=6,z-2y=8相减2x+z-z+2y=6-82x+2y=-2x+y=-1x^2+y^2+2xy=(x+y)^2=(-1)^2=1
∵x-y=4,y-z=2,∴x-z=6∴x^2y+y^2z+z^2x-(xy^2+yz^2+zx^2)=(x^2y-xy^2)+(y^2z-yz^2)+(z^2x-zx^2)=xy(x-y)+yz(y