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.
of course ... the length of the pendulum ... :) base on our experiment >>>
The period increases - by a factor of sqrt(2).
Technically and mathematically, the length is the onlything that affects its period.
no. it affects the period of the cycles.
The period of a pendulum (for short swings) is about 2 PI (L/g)1/2. The gravity on the moon is less than that on Earth by a factor of six, so the period of the pendulum on the moon would be greater, i.e. slower, by about a factor of 2.5.
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.
of course ... the length of the pendulum ... :) base on our experiment >>>
The period increases - by a factor of sqrt(2).
Technically and mathematically, the length is the onlything that affects its period.
no. it affects the period of the cycles.
Assuming the pendulum referred to s asimple pendulum of an arm and a weight the major factors on the period are the local attraction of gravity and the length of the arm.
The period of a pendulum (for short swings) is about 2 PI (L/g)1/2. The gravity on the moon is less than that on Earth by a factor of six, so the period of the pendulum on the moon would be greater, i.e. slower, by about a factor of 2.5.
A shorter pendulum has a shorter period. A longer pendulum has a longer period.
The period of a pendulum is totally un-affected by the mass of the bob.The time period of pendulum is given by the eqn.T=2*PIE*(l/g)1/2 ;l is the length of pendulum;g is the acceleration due to gravity.'l' is the length from the centre of suspension to the centre of gravity the bob.ie.the length of the pendulum depends on the centre of gravity of the bob,and hence the distribution of mass of the bob.
A longer pendulum has a longer period. A more massive pendulum has a longer 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, therefore length affects period. and in return for this answer..will u date me?
A longer pendulum has a longer period.