Apogee
The acceleration of a pendulum is zero at the lowest point of its swing.
A simple pendulum.
A pendulum.
I think it will as it has mechanical parts to make the pendulum move, not 100% sure.
The period of a pendulum is affected by the angle created by the swing of the pendulum, the length of the attachment to the mass, and the weight of the mass on the end of the pendulum.
The acceleration of a pendulum is zero at the lowest point of its swing.
At the low point of a swinging pendulum, the type of energy being demonstrated is maximum kinetic energy. It has zero potential energy at this point of the swing.
a pendulum
28 kg
A heavier pendulum will swing longer due to its greater inertia.
There two equally slow points- the upper ends of the swing are zero. The pendulum swings as far up as it will go, and as it reverses to swing down again, the speed is (very briefly) zero.
how is pendulum swing related to teaching process?
No, the swing of the pendulum will never carry it back quite as high as it was when it started. The pendulum must work against air resistance, and so a little bit of momentum is lost with every swing. Even if the pendulum operated in a vacuum, there would still be some tiny amount of friction at the point where the pendulum is attached to its frame. The swing of a pendulum is never 100% efficient. So the pendulum will run down.
A simple pendulum.
If the pendulum was pushed with a large force or if it was heavier. It might swing faster.
At this point, at the top of the swing, the pendulum has potential energy. As it drops it loses potential and gains kinetic energy. At the fastest point, as the pendulum reached the bottom of the swing, it has kinetic energy. It then loses kinetic energy and gains potential energy as it swings up to the other side.
By shorten the string of the pendulum