方程y=xlny确定了函数y=f(x,求)-搜答案-智慧作业帮

最后乘以dy/dx实际上是对Iny中的y求导,因为Iny是复合函数（y是关于x的函数）,所以(Iny）'=1/y*y'=1/y*dy/dx

lny+x/y=0等式两边求导：y'*1/y+1/y+x*y'(-1/y²)=0(1/y-x/y²)y'=-1/y∴y'=(-1/y)/(1/y-x/y²)=-y/(y-

答：y=xlny+x^3对x求导：y'=lny+(x/y)y'+3x^2(1-x/y)y'=lny+3x^2y'=(3x^2+lny)y/(y-x)所以：dy/dx=(3x^2+lny)y/(y-x)

y=sin(x+y),y'=cos(x+y)*(1+y'),y'=cos(x+y)/(1-cos(x+y))=dy/dx

两边求导得：cos(xy)*(y+xy')+1+y'=0y'[xcos(xy)+1]=-ycos(xy)-1所以,y'=-[ycos(xy)+1]/[xcos(xy)+1]

两边同时对X求导y+xy`=e^x+y`y`=(e^x-y)/(x-1)

y=sin(x+y).两边对x求导得：y’=cos(x+y)(1+y')y'=cos(x+y)/(1-cos(x+y))所以：dy=[cos(x+y)/(1-cos(x+y))]dx再问：y'=cos

dy=dsin(x+y)dy=cos(x+y)d(x+y)dy=cos(x+y)(dx+dy)dy=cos(x+y)dx+cos(x+y)dy所以dy/dx=cos(x+y)/[1-cos(x+y)]

看不懂求什么?用一下ln吧,不知道你要干什么,可能有用

x(lny(x))'+lny(x)+y(x)(e^(xy(x)))'+y'(x)e^(xy(x))=0x(1/y(x))y'(x)+lny(x)+y(x)(e^(xy(x)))(xy(x))'+y'(

e^z-xyz=0z＝㏑x+㏑y+㏑z[偏z偏x]＝1/x+（1/z）[偏z偏x]（这里y看成常数）[偏z偏x]＝（1/x）/｛1-（1/z）｝＝z/[x(z-1)]

y'=-2sin2(x+y)-2y'sin2(x+y)(1+2sin2(x+y))y'=-2sin2(x+y)y'=-2sin2(x+y)/(1+2sin2(x+y))

将x=0代入方程得：lny=1,得y=e方程两边对x求导：y+xy'+e^xlny+y'e^x/y=0代入x=0,y=e得：e+lne+y'/e=0,得y'=-e(e+1)即y'(0)=-e(e+1)

两边对x求导：2y'-1=y'cosy得：y'=1/(2-cosy)因此dy=dx/(2-cosy)

方程y=sin(x+y)两边对x求导数有：y'=cos(x+y)(x+y)'=cos(x+y)(1+y')移项整理得：[1-cos(x+y)]y'=cos(x+y)因此：y'=cos(x+y)/[1-

y'=-e^y-xe^y*y'(1+xe^y)y'=-e^yy'=-e^y/(1+xe^y)

dx/dy=(dx/dt)*(dt/dy)dx/dt=2tdt/dy=1所以dx/dy=2tdy/dt=1/2t

等式两边求导y'=e^y*y'y'=1/(e^y-1)(y'=dy/dx)

主要利用复合函数的求导：z=f(y),y=g(x),则z对x求导dz/dx=f'(y)*(dy/dx).等式左边对x求导过程：d(lny)/dx=(1/y)y',等式右边对x求导过程：d(x-y)/d