z=e的x 2y,x=cost,y=t2,求dz dt
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x2y+xy2-x-y=xy(x+y)-(x+y)=(x+y)(xy-1)∵x+y=-5,xy=7,∴原式=-5×(7-1)=-30.
(x+y)(xy)=x^2y+xy^2=-8原式=-7
x²+y²=25sin²tz²=25cos²t所以x²+y²+z²=25
(太麻烦拉,给点分啊!)设v=x*x-y*y,u=exp{xy}那么dv/dx=2x(这里应该用偏导符号,代替一下),dv/dy=2y,du/dx=y*exp{xy},du/dy=x*exp{xy}那
e^(-xy)-2z+e^z=0-ye^(-xy)-2z'(x)+e^zz'(x)=0z'(x)=ye^(-xy)/(e^z-2)-xe^(-xy)-2z'(y)+e^zz'(y)=0z'(y)=xe
原式=2x2y+2xy-3x2y-3xy-4x2y=-5x2y-xy当x=-2,y=12时,原式=-9.
∵x+y=6,xy=4,∴x2y+xy2=xy(x+y)=4×6=24.故答案为:24.
x3+y3-x2y-xy2=(x+y)(x2-xy+y2)-xy(x+y)=(x+y)(x2-2xy+y2)=(x+y)(x2+2xy+y2-4xy)=(x+y)[(x+y)2-4xy]=10×(10
解-x²y-xy²=-xy(x+y)=-2×5=-10
|x-2|+(y+3)²=0都是非负式所以分别都=0所以x-2=0y+3=0所以x=2y=-3又因为z是最大的负整数所以z=-1原式=2(x²y+xyz)-3(x²y-x
(x2+z2)(x2+y2)(y2+z2)=(x+y)2-2xy×(x+z)2-2xz×(y+z)2-2yz--之后不清楚了
由已知得dy/dx=(e^y+z)/(e^x+z),dz/dx=(z^2-e^(x+y))/(e^x+z),dz/dy=(z^2-e^(x+y))/(e^y+z),所以可以得到三式,e^ydx+zdx
原式=5xy2-2x2y+3xy2-2x2y=8xy2-4x2y,∵(x-2)2+|y+1|=0,∴x-2=0,y+1=0,即x=2,y=-1,则原式=16+16=32.
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
代入x=-1,y=1,2x^y-(5xy^-3x^y)-x^=2*(-1)^*1-{5*(-1)*1^-3*(-1)^*1}-(-1)^=2-(-5-3)-1=9备注:2^表示2的平方
x+2y+z=e^(x-y-z)两边对x求偏导注意到z=z(x,y)1+z'=e^(x-y-z)*(1-z')...(1)再对x求偏导z"=e^(x-y-z)(1-z')^2-z"e^(x-y-z).
t=0:0.01:27;x=sin(t);y=cos(t);z=t;plot3(x,y,z)见图
楼上兄的回答思路是正确的,只不过修正一下小错误symsxyf=sin(x^2*y)*exp(-x-y);ddf=diff(diff(f,x),y);simple(ddf)
1、z=e^2cost+3t^2z的导数=-2sinte^2cost+6t2、z=tan(3t+2/t^2+t^(3/2))z的导数=1/[1+(3t+2/t^2+t^(3/2))^2]乘以(3t+2
由柯西-黎曼条件v'(x)=-u'(y),v'(y)=u'(x)得u'(y)=-6xy,u'(x)=3y²-3x²因而选择B