They also mention their attempts to derive the equation for the period of a pendulum and ask for guidance. Another person provides a clear explanation and derivation of the formula using torque and acceleration, and suggests comparing the results with the known formula for further validation. The ...
The period of a physical pendulum is calculated using the equation T = 2π√(I/mgd), where T is the period, I is the moment of inertia of the pendulum, m is the mass of the pendulum, g is the acceleration due to gravity, and d is the distance from the pivot point to the cent...
In the pendulum swing experiment given here, we discuss the factors affecting the period of the pendulum by changing the period of the pendulum. Visit us to know more about the experiment.
A simple Pendulum consists of a point mass attached to a light inextensible string and suspended from a fixed support. Know the time period and energy of a simple pendulum with derivation.
In a period motion, the motion repeats after a regular interval of time and the number of periodic motions completed per unit time is called frequency. The time taken to complete one periodic motion is called time period. The examples of periodic motions are simple pendulum, vibration of partic...
Why am I getting this derivation of time period of pendulum in an accelerated frame wrong? [closed] Ask Question Asked 2 months ago Modified 2 months ago Viewed 44 times This question shows research effort; it is useful and clear 0 Save this question. Sh...
hello, i have some diffuculties with this problem, there's the point where the spring is attached to the rod and according to the equation of time period of physical pendulum , h represent the distance from the COM and the pivot point. here the pivot point is at the COM. ...
I will be using the length-period equation of a simple pendulum: T = 2pi sqrt(l/g). The Attempt at a Solution My idea is to measure the period of the motion more accurately using digital means, rather than the traditional stopwatch. To my understanding this should provide me with a ...
since is a constant I'll derive the rest because a limit is just a special type of derivation (I think?) derived is: and from that I can see that the smaller the a the smaller the period of the oscillation so we would get the shortest period if the pendulum was hung from i...