Advertisements
Advertisements
प्रश्न
A seconds pendulum is taken to a place where acceleration due to the gravity falls to one-fourth. How is the time period of the pendulum affected, if at all? Give reasons. What will be its new time period?
Advertisements
उत्तर
As we know,
`T = 2pisqrt(l/g)`
We observe that time period is inversely related to the square root of gravity's acceleration.
As a result, as 'g' decreases by one-fourth, the time period increases.
When the acceleration due to gravity is reduced by one-fourth, we see that
`T = 2pisqrt((l/g)/4)`
`T = 2pisqrt((4l)/g)`
`T = 2 xx 2pisqrt(l/g)`
As a result, we can conclude that when gravity's acceleration is lowered to one-fourth, the time period of a basic pendulum doubles.
As, the given pendulum is a seconds' pendulum so T = 2s
∴ New T = 2 x 2 = 4s
APPEARS IN
संबंधित प्रश्न
Name the instrument which has the least count
1 mm
A microscope has its main scale with 20 divisions in 1 cm and vernier scale with 25 divisions, the length of which is equal to the length of 24 divisions of main scale. The least count of microscope is
Define the terms : oscillation
Name two factors on which the time period of a simple pendulum depends. Write the relation for the time period in terms of the above named factors.
Two simple pendulums A and B have equal lengths, but their bobs weigh 50 gf and 100 gf, respectively. What would be the ratio of their time periods? Give reasons for your answer.
Name the convenient unit you will use to measure:
distance between the two cities.
Name the most convenient unit of mass you will use to measure:
The bag of sugar
Name the most convenient unit of mass you will use to measure:
Mass of a cricket ball.
