xdx+ydy+(xdy-ydx)/(x^(2)+y^(2))=0...

xdx+ydy+(xdy-ydx)/(x^(2)+y^(2))=0

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The solution of the differential equation xdx+ydy =(xdy-ydx)/(x^(2)+y^(2)) is tan(f(x, y)-C)=(y)/(x) (where, C is an arbitrary constant). If f(1, 1)=1 , then f(pi, pi) is equal to

The solution of the differential equation xdx+ydy =(xdy-ydx)/(x^(2)+y^(2)) is tan(f(x, y)-C)=(y)/(x) (where, C is an arbitrary constant). If f(1, 1)=1 , then f(pi, pi) is equal to

Solve: xdy+ydx= (xdy-ydx)/(x^(2)+y^(2))

Solve: xdy+ydx= (xdy-ydx)/(x^(2)+y^(2))

Solve: xdy+ydx= (xdy-ydx)/(x^(2)+y^(2))

The solution of (xdx + ydx)/(x^(2) + y^(2)) = 0 is

xdx + is + (xdy-ydx) / (x ^ (2) + y ^ (2)) = 0

Solve xdy + ydx - (a^(2)(xdy-ydx))/(x^(2) + y^(2))

The solution of (xdx+ydy)/(xdy-ydx)=sqrt((a^(2)-x^(2)-y^(2))/(x^2+y^(2))), is given by

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