求由方程x^ 2 2xy y^ 2=3x所确定的隐函数y=y(x)的导数
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原式=[x-y(x-y)2-y(x+y)(x+y)(x-y)]•xyy-1=(1x-y-yx-y)•xyy-1=1-yx-y•xyy-1=-xyx-y.故答案是:-xyx-y.
两边对【x】求导,注意,y是x的函数,利用复合函数求导1/[1+(y/x)^2]×(y/x)'=1/2×1/(x^2+y^2)×(x^2+y^2)',也就是:x^2/(x^2+y^2)×(xy'-y)
将xy提取公因式变成:xy(x+y)=-3*6=-18
x=0时代入方程,得:0-1+3y=0,故y(0)=1/3方程两边对x求导:1/√(1-x^2)*lny+arcsinx*y'/y-2e^2x+3y'=0得:y'=[2e^2x-lny/√(1-x^2
两边对x求导,(y+xy')e^xy=2+3y'代入(0,1)1=2+3y',y'=-1/3(y-1)=-x/3整理,得x+3y-3=0
2xdx+ydx+xdy+2ydy=0(x+2y)dy=-(2x+y)dxdy=-(2x+y)/(x+2y)×dx
x²+y³-xyz=0,z=(x²+y³)/(xy)=x/y+y²/x;故z/x=1/y+y²/x²z/y=x/y²+y
x=0则lny=0y=1两边对x求导[1/(x²+y)]*(x²+y)'=3x²+cosx(2x+y')/(x²+y)=3x²+cosxy'=(x&s
两边都对x求导有(2x+dy/dx)/(xˆ2+y)=3xˆ2y+xˆ3dy/dx+cosx得dy/dx=(3xˆ4y+3xˆ2yˆ2+x&
直接求导,用xy表示导数【欢迎追问,
选D把-x移项就可以的得到D.
原式=[(x+y)2(x-y)(x+y)+-4xy(x-y)(x+y)]×(x+3y)(x-3y)(x+3y)(x-y)=x-3yx+y,由已知得(3x-2y)(x+y)=0,因为x+y≠0,所以3x
分别对y求导,求左边为1+【e^(x+y)×(dx/dy+1)】右边为2×dx/dy推的dx/dy:自己算下,没得草稿纸.
y^3z^2-x^2+xyz-5=0等式两边同时对x求导:∂z/∂x=(2x-yz)/(2zy^3+xy)等式两边同时对y求导:∂z/∂y=-(3y
2y*y'*sinx+y^2*cosx+e^y*y'+2=0dy/dx=y'=-(2+y^2*cosx)/(2y*sinx+e^y)
x+2=0x=-22.10x+3=5x-710x-5x=-7-35x=-10x=-2同乘以44x=-8可以
x=1,y=0,z=9首先x、y、z都是个位数xyy可以写成100x+10y+y同理,zz可以写成10z+zyx写成10y+x等式重新代入以上化解后的式子,就是:100x+11y-11z=10y+x合
两边对x求导xy^2+sinx=e^yy^2+2xyy'+cosx=e^y*y'y'(e^y-2xy)=y^2+cosxy'=(y^2+cosx)/(e^y-2xy)
两边对x求导:3x^2-3y^2-6xyy'+6y^2y'=0得y'=(y^2-x^2)/[2(y^2-xy)]=(y+x)/(2y)令y'=0,得y+x=0,将y=-x代入原方程:x^3-3x^3-