The family of curves represented by (dy)...

The family of curves represented by `(dy)/(dx)=(x^(2)+x+1)/(y^(2)+y+1)` and the family represented by `(dy)/(dx)+(y^(2)+y+1)/(x^(2)+x+1)=0`

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x(2y-1)dx+(x^(2)+1)dy=0

(dy)/(dx)=(x+y+1)/(2x+2y+3)

(dy)/(dx)=(x+y+1)/(2x+2y+3)

(y-x(dy)/(dx))=3(1-x^(2)(dy)/(dx))

A family of curves has the differential equation xy(dy)/(dx)=2y^(2)-x^(2) . Then, the family of curves is

The differential equation (dy)/(dx) = (x(1+y^(2)))/(y(1+x^(2)) represents a family of

(y^(2))/(x^(2))(dx)/(dy)=(y+1)/(x+1)

y(1+x^(2))dy=x(1+y^(2))dx

y(1-x^(2))dy=x(1+y^(2))dx

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