Electric Circuits Answers

A stretched string is observed to vibrate with frequency 30 Hz in its fundamental mode
when the supports are 60 cm apart. The amplitude at the antinode is 3 cm. The string has
a mass of 30g. Calculate the speed of propagation of the wave and the tension in the
string. (

The oscillations of two points x1 and x2 at x = 0 and x = 1 m respectively are modelled as
follows:
y1 = 0.2 sin 3pt
and y2 = 0.2 sin (3pt +
8
p
)
Calculate the wavelength and speed of the associated wave.

The equation of transverse wave on a rope is
y (x, t) = 5 sin (4.0t −0.02x)
where y and x are measured in cm and t is expressed in second. Calculate the maximum
speed of a particle on the rope.

A spring is stretched 5 × 10−2 m by a force of 5 × 10−4 N. A mass of 0.01 kg is placed on the
lower end of the spring. After equilibrium has been reached, the upper end of the spring is
moved up and down so that the external force acting on the mass is given by F(t) = 20 cos wt.
Calculate (i) the position of the mass at any time, measured form the equilibrium position and
(ii) the angular frequency for which resonance occurs.

For a damped harmonic oscillation, the equation of motion is
0, 2
2
+ g + kx =
dt
dx
dt
d x
m
with m = 0.25 kg, g = 0.07 kgs−1 and k = 85 Nm−1. Calculate (i) the period of motion,
(ii) number of oscillations in which its amplitude will become half of its initial value,
(iii) the number of oscillations in which its mechanical energy will drop to half of its initial
value, (iv) its relaxation time, and (v) quality factor. (4×5 = 20

Two collinear harmonic oscillations x1 = 8 sin (100 pt) and x2 = 12 sin (96 pt) are
superposed. Calculate the (i) maximum and minimum amplitudes, and (ii) the frequency of
amplitude modulation. (5+5)

The displacement of a simple harmonic oscillator is given by




 p
+
p
=
2 4
( ) 2sin
t
x t
where x is measured in cm and t in second. Calculate the (i) period of oscillation (ii)
maximum velocity, and (iii) maximum acceleration