SIMPLE HARMONIC MOTION 195From equation (17.14),frequency,
f=√
g
L
2 π=√
9. 81
2
2 π= 0 .352 HzProblem 3. In order to determine the value
ofgat a certain point on the Earth’s surface,
a simple pendulum is used. If the pendulum
is of length 3 m and its frequency of
oscillation is 0.2875 Hz, determine the value
ofg.From equation (17.14), frequency,
f=√
g
L
2 πi.e. 0. 2875 =
√
g
3
2 πand ( 0. 2875 )^2 ×( 2 π)^2 =
g
33. 263 =g
3from which, acceleration due to gravity,
g= 3 × 3. 263 = 9 .789 m/s17.5 The compound pendulum
Consider the compound pendulum of Figure 17.7,
which oscillates about the pointO. The pointGin
Figure 17.7 is the position of the pendulum’s centre
of gravity.
LetIo=mass moment of inertia aboutO
Now T=Ioα=−restoring couple
=−mghsinθFrom the parallel axis theorem,
IG=Io−mh^2 =mkG^2or Io=mk^2 G+mh^2
whereIG=mass moment of inertia aboutG,
k^2 G=radius of gyration aboutGO
hxyymgh sin qxGqFigure 17.7Hence
(
mk^2 G+mh^2)
α=−mghsinθbut for small displacements,sinθ=θHence, m(
kG^2 +h^2)
α=−mghθi.e.(
k^2 G+h^2)
α+ghθ= 0or α+gh
(k^2 G+h^2 )θ= 0However, α+ω^2 θ= 0Therefore, ω^2 =gh
(kG^2 +h^2 )and ω=√
gh
(kG^2 +h^2 )( 17. 15 )T=2 π
ω= 2 π√
(k^2 G+h^2 )
gh( 17. 16 )and f=1
T=1
2 π√
gh
(k^2 G+h^2 )( 17. 17 )Problem 4. It is required to determine the
mass moment of inertia aboutGof a metal
ring, which has a complex cross-sectional
area. To achieve this, the metal ring is
oscillated about a knife edge, as shown in