The differential equation for the family of curves y = c sin x can be given by

The differential equation for the family of curves y = c\ sinx can be given by

The differential equation of the family of curves, y^2 = 4a ( x + b) , a b in R , has order and degree respectively equal to :

Form the differential equation representing the family of curves y = a sin x + b cos x , where a, b are the arbitrary constants.

The differential equation representing the family of curve y=mx is

The differential equation of the family of curves y=e^(2x)(a cos x+b sin x) where, a and b are arbitrary constants, is given by

Form the differential equation of the family of curves y=asin(b x+c),\ a\ a n d\ c being parameters.

From the differential equation of the family of curves y=asin(x+b) , where a and b are arbitrary constants.

The differential eqaution of the family of curve y^(2)=4a(x+a) , is

Let y = (a sin x+ (b +c) cos x ) e ^(x+d), where a,b,c and d are parameters represent a family of curves, then differential equation for the given family of curves is given by y'' -alpha y'+betay=0, then alpha+ beta =

The differential equation of the family of curves y=e^x(Acosx+Bsinx), where A and B are arbitrary constants is