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Question: A student uses a simple pendulum of exactly 1 m length to determine \(g\), the acceleration due to g...

A student uses a simple pendulum of exactly 1 m length to determine gg, the acceleration due to gravity. He uses a stopwatch with the least count of 1 sec for this and records 40 seconds for 20 oscillations. For this observation, which of the following statements is true?
A. Error ΔT\Delta T in measuring TT, the time period, is 0.05 seconds
B. Error ΔT\Delta T in measuring TT, the time period, is 1 second
C. Percentage error in the determination of gg is 5%
D. Both A and C

Explanation

Solution

Find the time period and use it to determine the error in it. Find the percentage error in gg using the formula for the time period of a simple pendulum.
Formula used: T=2πlgT=2\pi \sqrt{\dfrac{l}{g}}
TT is the time period of the pendulum
ll is the length of the pendulum
gg is the acceleration due to gravity.
Complete step by step answer:
20 oscillations take 40 seconds
1 oscillation takes 2 seconds
Therefore, the time period
T=2T=2 seconds
Now,
ΔTT=Δtt=140\dfrac{\Delta T}{T}=\dfrac{\Delta t}{t}=\dfrac{1}{40}
ΔT=0.05\Delta T=0.05seconds
Squaring and rearranging the formula for time period,
g=4π2lT2g=\dfrac{4{{\pi }^{2}}l}{{{T}^{2}}}
Taking log on both sides,
logg=log4π2l2logT\log g=\log 4{{\pi }^{2}}l-2\log T
Differentiating both sides (4π2l4{{\pi }^{2}}l is constant and error is additive),
Δgg=2ΔTT Δgg=2×0.052=0.05  \dfrac{\Delta g}{g}=\dfrac{2\Delta T}{T} \\\ \dfrac{\Delta g}{g}=\dfrac{2\times 0.05}{2}=0.05 \\\
The percentage error in gg is 5%
Hence, both options A and C are correct

So, the correct answer is “Option D”.

Additional Information:
If two simple pendulums are connected by a spring, then this coupled pendula will have two fundamental frequencies corresponding to compression and elongation of the spring.
A spherical pendulum moves in 3 dimensions on the surface of a hypothetical sphere centred about the pivot point.

Note:
The simple pendulum executes simple harmonic motion due to restoring gravitational force which tends to accelerate it towards its equilibrium position. The simple pendulum is a simplified model of a real physical pendulum by making certain assumptions. The string is massless and inextensible and the bob is a point mass. Motion is restricted in 2 dimensions. Friction and other processes causing energy loss are neglected.