D.E. `yy_(1)+x=a`, where a is a constant, represents a family of

Differential equation yy_(1)+x=A , where A is an arbitrary constant, represents a family of

The differential equation y"" (dy)/(dx) + x = a where a is a constant represents

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 family of curves y = e^(a sinx) where a is an arbitrary constant , is represented by the differential equation

Show that the differential equation that represents the family of all parabolas having their axis of symmetry coincident with the axis of x is yy_(2)+y_(1)^(2)=0

Which one of the following is the differential equation that represents the family of curves y=(1)/(2x^(2)-c) where c is an arbitrary constant ?

what is the general solution of (1+e^(x)) y dy = e^(x) dx ? where 'c' is a constant of integration

Write the differential equation obtained by eliminating the arbitrary constant C in the equation representing the family of curves xy=C cos x

The differential equation of the curve y=e^(x) (a cos x + b sin x) representing the given family of curves where a and b are costants , is

Statement 1: Order of a differential equation represents the number of arbitrary constants in the general solution.Statement 2: Degree of a differential equation represents the number of family of curves.