5 CONSERVATION OF ENERGY 5.7 Motion in a general 1 - dimensional potential
k
0The total energy of the mass shown in Fig. 42 is the sum of its kinetic andpotential energies:
E = K + U = K +1
k x^2. (5.45)
2Of course, E remains constant during the mass’s motion. Hence, the above ex-
pression can be rearranged to give
K = E −1
k x^2. (5.46)
2Since it is impossible for a kinetic energy to be negative, the above expression
suggests that |x| can never exceed the value
x =‚
., 2 E. (5.47)
Here, x 0 is termed the amplitude of the mass’s motion. Note that when x attains its
maximum value x 0 , or its minimum value −x 0 , the kinetic energy is momentarily
zero (i.e., K = 0 ).
5.7 Motion in a general 1 - dimensional potential
Suppose that the curve U(x) in Fig. 43 represents the potential energy of some
mass m moving in a 1-dimensional conservative force-field. For instance, U(x)
might represent the gravitational potential energy of a cyclist freewheeling in a
hilly region. Note that we have set the potential energy at infinity to zero. This is
a useful, and quite common, convention (recall that potential energy is undefined
to within an arbitrary additive constant). What can we deduce about the motion
of the mass in this potential?
Well, we know that the total energy, E—which is the sum of the kinetic energy,
K, and the potential energy, U—is a constant of the motion. Hence, we can writeK(x) = E − U(x). (5.48)Now, we also know that a kinetic energy can never be negative, so the above
expression tells us that the motion of the mass is restricted to the region (or