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i dont really know--inertia is the thing that jerks you forward if the bus you are riding in suddenly stops and the period of a pendulum is how long it takes the pendulum to complete a full swing
A shorter pendulum has a shorter period. A longer pendulum has a longer period.
A longer pendulum has a longer period. A more massive pendulum has a longer period.
They determine the length of time of the pendulum's swing ... its 'period'.
Yes, the length of pendulum affects the period. For small swings, the period is approximately 2 pi square-root (L/g), so the period is proportional to the square root of the length. For larger swings, the period increases exponentially as a factor of the swing, but the basic term is the same so, yes, length affects period.
T=1/2l
There's no relationship between the length of the pendulum and the number of swings.However, a shorter pendulum has a shorter period, i.e. the swings come more often.So a short pendulum has more swings than a long pendulum has in the same amountof time.
For small angles, the formula for a pendulum's period (T) can be approximated by the formula:T = 2 * pi * sqrt(L/g), where L is the length of the pendulum length, and g is acceleration due to gravity. See related link for Simple Pendulum.
The relationship between log(period) and log(length) is linear, with slope 0.5 and intercept log(2*pi/sqrt(g))
You measure the period of the pendulum for different lengths. Plot the results on a scatter plot and see if you can work out the nature of the relationship between the two variables.
t = 2*pi*sqrt(l/g) Where t is the period, l is the length and g is the accelaration due to gravity.
i dont really know--inertia is the thing that jerks you forward if the bus you are riding in suddenly stops and the period of a pendulum is how long it takes the pendulum to complete a full swing
A shorter pendulum has a shorter period. A longer pendulum has a longer period.
Our Physics class calculated that the height of the dome inside the cathedral is approximately 16m. We used the relationship between the period of a pendulum (incense thurible) and the length of the pendulum.
A longer pendulum has a longer period.
pendulum length (L)=1.8081061073513foot pendulum length (L)=0.55111074152067meter
multiply the length of the pendulum by 4, the period doubles. the period is proportional to the square of the pendulum length.