Total energy of a particle executing oscillating motionis 3 joule and given by
`E=x^(2)+2x +v^(2)-2v`
Where x is the displacement from origin at x=0 and v is velocity of particle at x. Then choose the correct statements)

The energy of a particle executing simple harmonic motion is given by E=Ax^2+Bv^2 where x is the displacement from mean position x=0 and v is the velocity of the particle at x then choose the correct statement(s)

A particle is executing simple harmonic motion in a conservative force field. The total energy of simple harmonic motion is given by E=ax^(2)+bv^(2) where ‘x’ is the displacement from mean position x = 0 and v is the velocity of the particle at x then choose the INCORRECT statements.{Potential energy at mean position is assumed to be zero}

The total energy of a particle executing simple garmonic motion is (x- displacement)

The total energy of a particle, executing simple harmonic motion is. where x is the displacement from the mean position, hence total energy is independent of x.

The velocity of telegraphic comunication is given by v=x^(2) log (1//x) where x is the displacement for maximum velocity x equals to ?

The speed v of a particle moving along a straight line is given by a+bv^(2)=x^(2) where x is its distance from the origin. The acceleration of the particle is

The speed v of a particle moving along a straight line is given by a+bv^(2)=x^(2) , where x is its distance from the origin. The acceleration of the particle is

The total energy of a particle having a displacement x, executing simple harmonic motion is