The degree of the differential equation satisfying by the curves `sqrt(1+x)-asqrt(1+y)=1,` is ……..

Degree of differential equation y^n+tan y' = y is 1

Differential equation representing the curve : y=cos x is :

Differential equation representing the curve : y=sin x is :

Differential equation representing the curve : y=-sin x is :

Degree of the differential equation log (dy/dx)^1/2 = 3x + 4y is :

Degree of the differential equation log (dy/dx)^1/2 = 5x + 4y is :

Form the differential equation satisfied by sqrt(1-x^2)+sqrt(1-y^2)=a(x-y) , a is an arbitrary constant.

Solve the differential equation : y sqrt(1-x^2)dy - sqrt(1+y^2)dx = 0

Solve the differential equation : y sqrt(1-x^2)dy-sqrt(1+y^2)dx =0