An object moving along the x-axis is said to exhibit simple harmonic motion if its position as a function of time varies as

x(t) = x₀ + Acos(wt+f).

The object oscillates about the equilibrium position x₀.  If we choose the origin of our coordinate system such that x₀ = 0, then the displacement x from the equilibrium position as a function of time is given by

x(t) = Acos(wt+f).

A is the amplitude of the oscillation, i.e. the maximum displacement of the object from equilibrium, either in the positive or negative x-direction.  Simple harmonic motion is repetitive.  The period T is the time it takes the object to complete one oscillation and return to the starting position.  The angular frequency w is given by w = 2p/T.  The angular frequency is measured in radians per second.  The inverse of the period is the frequency f = 1/T.  The frequency f = 1/T = w/2p of the motion gives the number of complete oscillations per unit time.  It is measured in units of Hertz, (1Hz = 1/s).

The velocity of the object as a function of time is given by

v(t) = dx(t)/dt = -wAsin(wt+f),

and the acceleration is given by

a(t) = dv(t)/dt = -w²Acos(wt+f) = -w²x.

The quantity f is called the phase constant.  It is determined by the initial conditions of the motion.  If at t = 0 the object has its maximum displacement in the positive x-direction, then f = 0, if it has its maximum displacement in the negative x-direction, then f = p.  If at t = 0 the particle is moving through its equilibrium position with maximum velocity in the negative x-direction then f = p/2.  The quantity wt + f is called the phase.

In the figure below position and velocity are plotted as a function of time for oscillatory motion with a period of 5s.  The amplitude and the maximum velocity have arbitrary units.  Position and velocity are out of phase.  The velocity is zero at maximum displacement, and the displacement is zero at maximum speed.

For simple harmonic motion, the acceleration a = -w²x is proportional to the displacement, but in the opposite direction.  Simple harmonic motion is accelerated motion.  If an object exhibits simple harmonic motion, a force must be acting on the object.  The force is

F = ma = -mw²x .

It obeys Hooke's law, F = -kx, with k = mw².

F = ma = md²x/dt² with F = -kx, leads to the second-order differential equation

d²x/dt² = -(k/m)x.

We now know how to solve this equation.  The solution is

x(t) = Acos(wt+f),   with w² = k/m.

The solution to a second-order differential equation includes two constants of integration.  Here these constants are A and f.  They are determined by the initial conditions of the problem.

The same equations have the same solutions.  Whenever you encounter a differential equation of the form d²x/dt² = -b²x, you know that the solution is x(t) = Acos(wt+f), with w = b.

The force exerted by a spring obeys Hooke's law.  Assume that an object is attached to a spring, which is stretched or compressed.  Then the spring exerts a force on the object.  This force is proportional to the displacement of the spring from its equilibrium position and is in a direction opposite to the displacement.

F = -kx

Assume the spring is stretched a distance A and then released.  The object attached to the spring accelerates.

a = -(k/m)x

It gains speed as it moves towards the equilibrium position because its acceleration is in the direction of its velocity.  When it is at the equilibrium position, the acceleration is zero, but the object has kinetic energy.  It overshoots the equilibrium position and starts slowing down, because the acceleration is now in a direction opposite to the direction of its velocity.  Neglecting friction, it comes to a stop when the spring is compressed by a distance A and then accelerates back towards the equilibrium position.  It again overshoots and comes to a stop at the initial position when the spring is stretched a distance A.  The motion repeats.  The object oscillates back and forth.  It executes simple harmonic motion.  The angular frequency of the motion is

,

the period is

,

and the frequency is

.

Problems:

Assume a mass suspended from a vertical spring of spring constant k.  In equilibrium the spring is stretched a distance x₀ = mg/k.  If the mass is displaced from equilibrium position downward and the spring is stretched an additional distance x, then the total force on the mass is mg-k(x₀+x) = -kx directed towards the equilibrium position.  If the mass is displaced upward by a distance x, then the total force on the mass is mg-k(x₀-x) = kx, directed towards the equilibrium position.  The mass will execute simple harmonic motion.  The angular frequency w = SQRT(k/m) is the same for the mass oscillating on the spring in a vertical or horizontal position.  The equilibrium length of the spring about which it oscillates is different for the vertical position and the horizontal position.

Assume an object attached to a spring exhibits simple harmonic motion.  Let one end of the spring be attached to a wall and let the object move horizontally on a frictionless table.

What is the total energy of the object?

The object's kinetic energy is

K = (1/2)mv² = (1/2)mw²A²sin²(wt+f),

Its potential energy is elastic potential energy.  The elastic potential energy stored in a spring displaced a distance x from its equilibrium position is U=(1/2)kx².  The object's potential energy therefore is

U = (1/2)kx² = (1/2)mw²x² = (1/2)mw²A²cos²(wt+f).

The total mechanical energy of the object is

E = K+U = (1/2)mw²A²(sin²(wt+f)+cos²(wt+f)) = (1/2)mw²A².

The energy E in the system is proportional to the square of the amplitude.

E = (1/2)kA².

It is a continuously changing mixture of kinetic energy and potential energy.

For any object executing simple harmonic motion with angular frequency w, the restoring force F = -mw²x obeys Hooke's law, and therefore is a conservative force.  We can define a potential energy U = (1/2) mw²x ², and the total energy of the object is given by E = (1/2)mw²A².

Problems: