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Suggested: if u=log(x^2+y^2/x+y) - f(z)=1/2 log(x^2+y^2)+tan^-1(px/y) - u=log(x^2+y^2) - u=log(x^2+y^2)+tan^-1(y/x) - show that y=log(1+x)-2 x/2+x - (1+x)^2d^2y/dx^2+(1+x)dy/dx+y=4 cos log(1+x) - y=log(x+√x^2+a^2) - (1+x)^2d^2y/dx^2+(1+x)dy/dx+y=2 sin log(1+x) - if y= log(x+√x^2+1) ^2 find yn(0) - (d^2-2d+1)y=e^x log x - u= log root x^2+y^2+z^2 prove that (x^2+y^2+z^2)(d^2u/dx^+d^2u/dy^2+d^2u/dx^2 - y= log(x+√1+x^2) ^2 - y=sin log(x^2+2x+1) - x^3d^3y/dx^3+3x^2 d^2y/dx^2+xdy/dx+y=x+log x - log(x^2+y^2)               

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