7 CIRCULAR MOTION 7.7 Motion on curved surfaces
the object will fly off the surface of the hoop, since it is no longer being pressed
into this surface. It should be clear, by now, that the problem we are considering
is exactly analogous to the earlier problem of an object attached to the end of a
piece of string which is executing a vertical circle, with the reaction R of the hoop
playing the role of the tension T in the string.
Let us imagine that the hoop under consideration is a “loop the loop” segment
in a fairground roller-coaster. The object sliding around the inside of the loop
then becomes the roller-coaster train. Suppose that the fairground operator can
vary the velocity v with which the train is sent into the bottom of the loop (i.e.,
the velocity at θ = 0◦). What is the safe range of v? Now, if the train starts at
θ = 0 ◦ with velocity v then there are only three possible outcomes. Firstly, the
train can execute a complete circuit of the loop. Secondly, the train can slide
part way up the loop, come to a halt, reverse direction, and then slide back down
again. Thirdly, the train can slide part way up the loop, but then fall off the loop.
Obviously, it is the third possibility that the fairground operator would wish to
guard against.
Using the analogy between this problem and the problem of a mass on the endof a piece of string executing a vertical circle, the condition for the roller-coaster
train to execute a complete circuit is
v^2 > 5 r g. (7.57)Note, interestingly enough, that this condition is independent of the mass of the
train.
Equation (7.56) yields
vJ^2 =r R
− r g cos θ. (7.58)
m
Now, the condition for the train to reverse direction without falling off the loop
is vJ^2 = 0 with R > 0. Thus, the train reverses direction when
R = m g cos θ. (7.59)Note that this equation can only be satisfied for positive R when cos θ > 0. In
other words, the train can only turn around without falling off the loop if the