Respuesta :
Option A is the correct answer.
Explanation:
When an elevator moves upward with consonant acceleration a, the overall acceleration on the body is given by
a' = a + g
So acceleration of pendulum is a + g.
We have equation for period of simple pendulum
[tex]T=2\pi \sqrt{\frac{l}{a'}}[/tex]
In normal case a' = g here a' is more.
From the equation we can see that period of simple pendulum is inversely proportional to square root of acceleration.
Since acceleration increases period decreases.
Option A is the correct answer.
Answer:
A)The period decreases.
Explanation:
Given that
Length of the pendulum = L
Time period = T ( at rest condition)
[tex]T=2\pi \sqrt{\dfrac{L}{g_{eff}}}[/tex]
At rest condition only gravitational acceleration g act downward.
At rest [tex]g_{eff}=g[/tex]
[tex]T_{at\ rest}=2\pi \sqrt{\dfrac{L}{g}}[/tex]
When acceleration will move upward with acceleration a ,then
[tex]g_{eff}=g+a[/tex]
[tex]T_{at\ motion}=2\pi \sqrt{\dfrac{L}{g+a}}[/tex]
Therefore we can say that time period of the pendulum will decrease ,because g+a is more than g.
