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

Verify that the function y=c_1 e^(a x) cos b x+c_2 e^(a x) sin b x , where c_1, c_2 are arbitrary constants is a solution of the differential equation. ((d^2 y)/(d x^2))-2 a (dy)/(dx)+(a^2+b^2) y=0

The differential equation of the family of curves y= e^(x) (A cos x + B sin x) , where A and B are arbitrary constants is a) y''-2y'+2y=0 b) y''+2y'-2y=0 c) y''+y^(2)+y=0 d) y''+2y'-y=0

The general solution of a differential equation contains 3 arbitrary constants. Then what is the order of the differential equation?A)2 B)3 C)0 D)1

Find the derivative of sin (x+a) ,where a is a constant.

Elimination of arbitrary constants A and B from y=(A)/(x)+B,xgt0 leads to the differential equation

y=2e^(2x)-e^(-x) is a solution of the differential equation

The differential equation representing the family of curves given by y=ae^(-3x)+b , where a and b are arbitrary constants, is a) (d^(2)y)/(dx^(2))+3(dy)/(dx)-2y=0 b) (d^(2)y)/(dx^(2))-3(dy)/(dx)=0 c) (d^(2)y)/(dx^(2))-3(dy)/(dx)-2y=0 d) (d^(2)y)/(dx^(2))+3(dy)/(dx)=0

Differentiate a^x w.r.t. x , where a is a positive constant.