Section – B
A simple pendulum with length and bob of mass is executing S.H.M. of amplitude . The maximum tension in the string is found to be . The value of is
Section – B
A simple pendulum with length and bob of mass is executing S.H.M. of amplitude . The maximum tension in the string is found to be . The value of is
Correct answer:99
Standard Method
Given: , , ,
Find: The value of if the maximum tension is .
For pendulum,
For SHM,
Using
we get
Substitute this into the tension formula:
Substituting the given values:
Therefore, .
Using energy at mean position
Given: The pendulum performs small oscillations with amplitude .
Find: Maximum tension in the string and then compare with .
At the mean position, speed is maximum. For SHM,
with
So,
Now maximum tension occurs at the lowest point:
Substitute :
Using , , , ,
Hence, the required value is .
Using without dividing by is incorrect because centripetal force term is . Always use the radius of circular motion, which here is the pendulum length.
Taking amplitude as angular amplitude instead of linear amplitude is wrong here. The given amplitude is , so convert it to before substituting into SHM relations.
Writing is an algebra mistake. After substituting for in , the correct expression is .
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