y=ln(1十x十y)求dx分之dy

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y=ln(1十x十y)求dx分之dyy=ln(1十x十y)求dx分之dyy=ln(1十x十y)求dx分之dyy=ln(1+x+y)dy/dx=1/(1+x+y)*(0+1+dy/dx)=1/(1+x+

y=ln(1十x十y)求dx分之dy
y=ln(1十x十y)求dx分之dy

y=ln(1十x十y)求dx分之dy
y=ln(1+x+y)
dy/dx=1/(1+x+y)*(0+1+dy/dx)
=1/(1+x+y) +1/(1+x+y)*dy/dx
dy/dx - 1/(1+x+y)*dy/dx =1/(1+x+y)
(1+x+y-1)/(1+x+y)dy/dx=1/(1+x+y)
dy/dx=1/(x+y)