(23a) Frames of Reference: The Centrifugal Force

We now come back to motion in a circle.

The Centrifugal force

Motion in a circle is an accelerated motion. Therefore, if we study it in the rotating frame of reference, we can expect inertial forces to appear--like the ones discussed in the preceding section.

  Suppose a person sits on a bus, moving in a straight line with constant speed v. As before, the forces involved are the passenger's weight F₁ and the reaction force of the seat F₂, and in the absence of acceleration, the two cancel:

F₁+ F₂ = 0

    Suddenly the bus makes a sharp turn, following part of a circle of radius r. If the passenger's body is to stay in the seat as before, an extra force must be added, to keep it from continuing in a straight line (its natural tendency). If r_u is a unit vector (unit vectors are defined in the preceding section) directed outwards from the center of rotation, along the radius r, the force F₂ exerted by the seat must increase to provide the centripetal force -(mv²/r)r_u that makes the passenger follow the motion of the bus:

How does this same event look in the frame of the bus? Adding (mv²/r)r_u to both sides of the equation gives, in a similar way to what was done before

Equilibrium is attained and the passenger stays in place, if the equation above is satisfied. This can be viewed as the equilibrium between 3 forces-- F₁, F₂ and the centrifugal force (mv²/r)r_u directed along r_u, radially outwards.

This can easily be generalized to any frame of reference moving around a circle:

Equilibrium exists in the rotating frame if all forces balance, including an inertial "centrifugal" force (mv²/r)r_u.

Examples

(You may also note that the direction of the centrifugal force is away from the axis of rotation, and therefore it points away from the Earth´s center only at the equator. One therefore expects at all other points (except for the poles) a very slight difference between the vertical as defined by a plumb line and the direction to the center of the Earth.)

Another example is the "loop the loop" feature found on some roller coasters in amusement parks. There the track descends on a long slope and then, at the bottom, turns in a complete circle (drawing) before leveling out again. At the point marked "A" the riders are briefly turned upside down, but no one ever falls out. How come? And (in the absence of friction), what is the minimum height h of the starting point S above A needed to ensure that the car passes safely through A?

• The weight -mg r_u (downwards, along -r_u at this point.)
• The centrifugal force (mv²/r) r_u, and
• The force F₂ exerted by the rails.

The two vectors are both along r_u (with signs giving the direction), so everyhing reduces to an equation between ordinary numbers:

Suppose now the car has come down from a height h above the highest point in the loop. It has

• lost potential energy mgh, and
• gained kinetic energy mv²/2

The car must have started at least half a loop radius above A.
Click here for an optional section handling the same problem by using the centripetal force.

Exploring Further:

About a classroom demonstration of "loop the loop" with a "hot wheels" toy car--click here.

Site about roller coasters--the biggest, highest, the one with the most loops (8) and the one with the biggest loop ("Moonsault Scramble" in Japan, pictured at the beginning of this page)--click here.