Show dimensionally that the relation t =...

Show dimensionally that the relation `t = 2pi((I)/(g))`
is incorrect, where I is length and t is time period of a simple pendulum , g is acc. Due to gravity. Find the correct form of the relation, dimensionally

Similar Questions

Explore conceptually related problems

Check the correctness of the relation T=2pisqrt((l)/(g)) , where T is the time period, l is the length of pendulum and g is acceleration due to gravity.

The time period T of a simple pendulum depends on length L and acceleration due to gravity g Establish a relation using dimensions.

The graph of time period (T) of a simple pendulum versus its length (I) is

Check whether the equation T=2πsqrt ( m/g) is dimensionally correct.Where T is the Time period of a simple pendulum , m is the mass of the bob and g is the acceleration due to gravity

If the time period of a simple pendulum is T = 2pi sqrt(l//g) , then the fractional error in acceleration due to gravity is

Using dimensional analysis check the correctness of the equation T=2pisqrt(l/g) , where T is the period of the simple pendulum of length l and g is the acceleration due to gravity.

Establish the relation T = 2pi sqrt1//g for the time period of a simple pendulum with the help of dimensional analysis.

Find the dimensions of K in the relation T = 2pi sqrt((KI^2g)/(mG)) where T is time period, I is length, m is mass, g is acceleration due to gravity and G is gravitational constant.

Show dimensionally that the relation `t = 2pi((I)/(g))` is incorrect, where I is length and t is time period of a simple pendulum , g is acc. Due to gravity. Find the correct form of the relation, dimensionally

Similar Questions

Recommended Questions

Show dimensionally that the relation `t = 2pi((I)/(g))`
is incorrect, where I is length and t is time period of a simple pendulum , g is acc. Due to gravity. Find the correct form of the relation, dimensionally