z=sin(x zy),
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![z=sin(x zy),](/uploads/image/f/921488-32-8.jpg?t=z%3Dsin%28x+zy%29%2C)
z对x的偏导=cosx+cos(x+y)=0时,cosx=-cos(x+y)=cos(pi-x-y),所以x=pi-x-y.同理z对y的偏导=0时,有y=pi-x-y.所以x=y=pi/3.此时z=3
原题的意思是:z为何值时,函数y=√3cos(3x-z)-sin(3x-z)是奇函数?y=2[(√3/2)cos(3x-z)-(1/2)six(3x-z)]=2[cosπ/6cos(3x-z)-sin
sin^2(x-y)+sin^2(y-z)+sin^2(z-x)=[1-cos2(x-y)+1-cos2(y-z)+1-cos2(z-x)]/2=3/2-[(cos2xcos2y+sin2xsin2y
=2x*sin(xy)+x^2*y*cosx题中的偏导数就是把y变成常数.详细步骤真没有.再问:是对的吧--我真是一点都不懂--毕业考试不过拿不到毕业证,求负责你说对我就这么背了再答:别背。真的要理解
∂z/∂x只对x求导数,而把y看作一个常数,∂z/∂x=(x+y)'sin(x-y)+(x+y)sin(x-y)'=sin(x-y)+(x+y)cos(
一阶dz/dx=ycosxydz/dy=xcosxy二阶d^2z/dx^2=y^2cosxyd^2z/dy^2=x^2cosxy还有混合导数相等就写一个了=cosxy-xcosy
∂Z/∂x=y*cos(xy)-2cos(xy)*sin(xy)*y=y*cos(xy)-y*sin(2xy)∂Z/∂y=x*cos(xy)-2cos(
∂z/∂x=cos(x-y)∂z/∂y=-cos(x-y)dz=∂z/∂x*dx+∂z/∂y*dy=co
先对x求偏导数得z'(x)cosz=yz+z'(x)y所以z'(x)=yz/(cosz-y)同理对y求偏导数得z'(y)=xz/(cosz-x)所以dz=yz/(cosz-y)dx+xz/(cosz-
sinz=[e^(iz)-e^(-iz)]/(2i)=2e^(iz)-e^(-iz)=4i令z=x+iy,代入:e^x(cosy+isiny)-e^(-x)(cosy-isiny)=4i对比实部及虚部
sinx+siny+sinz-sin(x+y+z)=4sin[(x+y)/2]sin[(x+z)/2]sin[(y+z)/2]sinx+siny+sinz-sin(x+y+z)=2sin[(x+y)/
所以Z=[Ln(2±√3)i]/i=π/2+iln(2±√3)正弦函数的值应该exp(iz)=cos(z)+isin(z)sin(z)=(exp(iz)-exp(-iz))/2i=2
先告诉你个公式:sin(a+bi)=[e^b+e^(-b)]/2*sina+i*[e^b-e^(-b)]/2*cosa设z=a+bi,则z+i=a+(b+1)isin(z+i)=1sin[a+(b+1
z=cosθ+isinθ,所以z^n=cosnθ+isinnθ,1/z^n=z^(-n)=cos(-nθ)+isin(-nθ),=cosnθ-isinnθ所以z^n+1/(z^n)=cosnθ+isi
az/ax=(cosxsin(x+y)-sinxcos(x+y))/sin^2(x+y)=sin(x+y-x)/sin^2(x+y)=siny/sin^2(x+y)az/ay=sinx*(-1/sin
用2isinZ=e^(iZ)-e^(-iZ)得e^(iZ)-e^(-iZ)=4i设e^(iZ)=x,则x²-4ix-1=0用求根公式得x=(2±√3)i即e^(iZ)=(2±√3)i两边取对
(x-4)2次方+1/4|x+y-z|=0x=4,x+y-z=0z-y=45x+3y-3z=20-3(z-y)=20-3*4=8(5x+3y-3z)2008次方=8^2008=4096^502末位是6