[" Ques."38(SMCQ)],[" The equation of curve through point "(1,0)" which satisfies the differential equation "(1+y^(2))dx-xydy=]

The equation of curve through point (1,0) which satisfies the differential equation (1+y^(2))dx- xy dy = 0 , is

The equation of the curve through the point (1,0) which satisfies the differential equatoin (1+y^(2))dx-xydy=0 , is

The equation of the curve through the point (1,0) which satisfies the differential equatoin (1+y^(2))dx-xydy=0 , is

Differential equation (dy)/(dx)=f(x)g(x) can be solved by separating variable (dy)/g(y)=f(x)dx. The equation of the curve to the point (1,0) which satsifies the differential equation (1+y^(2))dx-xydy=0 is

Differential equation (dy)/(dx)=f(x)g(y) can be solved by separating variable (dy)/g(y)=f(x)dx. The equation of the curve to the point (1,0) which satsifies the differential equation (1+y^(2))dx=xydy=0 is

Differential equation (dy)/(dx)=f(x)g(y) can be solved by separating variable (dy)/g(y)=f(x)dx. The equation of the curve to the point (1,0) which satsifies the differential equation (1+y^(2))dx=xydy=0 is

Differential equation (dy)/(dx)=f(x)g(x) can be solved by separating variable (dy)/g(y)=f(x)dx. The equation of the curve to the point (1,0) which satsifies the differential equation (1+y^(2))dx=xydy=0 is

A curve passes through (1,0) and satisfies the differential equation (2x cos y+3x^(2)y)dx+(x^(3)-x^(2)sin y-y)dy=0

Show that the equation of the curve passing through the point (1,0) and satisfying the differential equation (1+y^2)dx-xydy=0 is x^2-y^2=1