Yes. Given a constant for gravity, the period of the pendulum is a function of it's length to the center of mass.
In a higher gravity, the period would be shorter for the same length of pendulum.
Technically and mathematically, the length is the onlything that affects its period.
no. it affects the period of the cycles.
Height does not affect the period of a pendulum.
Approximately 2*pi*sqrt(l/g) where l is the length of the pendulum (in metres) and g = 9.8 ms-2, the acceleration due to gravity.
A longer pendulum has a longer period.
Its length.
The period increases as the square root of the length.
Technically and mathematically, the length is the onlything that affects its period.
A pendulum with a period of five seconds has a length of 6.21 meters.
no. it affects the period of the cycles.
Height does not affect the period of a pendulum.
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.
It doesn't. Only the length of the pendulum and the strength of the gravitational field alter the period/frequency.
Approximately 2*pi*sqrt(l/g) where l is the length of the pendulum (in metres) and g = 9.8 ms-2, the acceleration due to gravity.
A shorter pendulum has a shorter period. A longer pendulum has a longer period.
A longer pendulum has a longer period.
pendulum length (L)=1.8081061073513foot pendulum length (L)=0.55111074152067meter