1.7. TORSION PENDULUM
m m m md 1d 1d 2
d 2(i) (ii) (iii)Axis of cylindricalmassFigure 1.22: Determination of Rigidity Modulus - dynamic torsion methodand using the relation(5.297) we obtain,
T 02
T 22 ≠T 12=
I
I 2 ≠I 1
=
I
2 m(d^22 ≠d^21 )Hence,
I=2 m(d^22 ≠d^21 )T 02
T 22 ≠T 12(1.23)
Substituting from equation (5.298) into the expression (5.293) for Rigidity Modulus, we
arrive at,
n=8 fiIl
T 02 r^4=
8 fil
T 02 r^4A
2 m(d^22 ≠d^21 )T 02
T 22 ≠T 12BHence, the Rigidity Modulus is also given by:
n=16 fiml(d^22 ≠d^21 )
r^4 (T 22 ≠T 12 )(1.24)
Therefore, from the experimental data obtained by measuring the massmof one of the
bodies placed on the disc, the distancesd 1 andd 2 at which they are placed from the disc
centre, the periodsT 1 andT 2 of oscillation and the radiusrof the suspension wire, the
Rigidity Modulus of the wire can be calculated.
Self Learning Activity : Torsion Pendulum
Using the torsion pendulum simulator, study the behaviour of
di�erent torsion pendula and determine moments of inertia of
the given discs and rigidity moduli of the available materials.
Also
http://vlab.amrita.edu/?sub=1&brch=280