The differential equation satisfied by` y = A sin (omegat + omega_0) + B cos(omegat+omega_0)` (`omega,omega_0` are known constant) is

The differential equation satisfied by y=A sin(omega t+omega_(0))+B cos(omega t+omega_(0))(omega,omega_(0) are known constant) is

The differential equation obtained by eliminating A and B from y = A cos omega t + B sin omegat is

The differential equation, obtained on eliminating A and B from the equations y= A cos omega wt+ B sin omega t is

The differential equation, obtained on eliminating A and B from the equations y= A cos omega wt+ B sin omega t is

The dimension of omega in the expression y= Asin (omegat-kx) is

The displacement of an oscillator is given by x=a sin omega t+b cos omega t where a, b and omega , are constant. Then -

Evaluate int^t _0 A sin omega dt where A and omega are constants.

The differential equation obtained by eliminating A and B from y = A cos omega t + B sin omega t is (i)y''+y'=0 (ii) y''+w^2y=0 (iii) y''-w^2y=0 (iv) y''+y=0

Obtain the equation omega = omega_0 + alphat .

The differential equation obtained on eliminating A and B from y=A cos\ omegat+bsinomegat , is (a) y^(primeprime)+ y^(prime)=0 (b.) y^(primeprime)+omega^2y=0 (c.) y^(primeprime)=omega^2y (d.) y^(primeprime)+y=0