The speed (magnitude of the velocity) of a pendulum is greatest when it is at the lowest part of it's swing, directly underneath the suspension.
The factors that affect the period of a pendulum (the time it takes to swing from one side to the other and back again) are:
# Gravity (the magnitude of the force(s) acting on the pendulum)
# Length of the pendulum # (+ minor contributions from the friction of the suspension and air resistance)
my class did this experiment and got totally opposite info, the pendulum returned to its original side more times when the string was longer
The period of the pendulum increases, i.e. the pendulum swings fewer times in an hour.
The time period of a pendulum is directly proportional to the square root of its length. So, if the length increases, its time period also increase.
ie. It takes longer to complete one oscillation T = 2π√(l/g)
T = Time period
l = length
g = acceleration due to gravity
the longer something is, the more movement the tip has
the longer something is, the less force the tip has.
in other words, the length of the pendulum affects its speed by:
if its longer, it will move more quickly and with less force
vice versa
it will go slower because, it goes in bigger rotations, creating less swings
As the length of a pendulum increases, so does the time taken for one swing (the period of oscillation). A shorter pendulum will make swings more quickly than a longer pendulum.
If the pendulum rod expands, then the length increases, and the period increases. A close approximation for the period is T =~ 2*pi*sqrt(L/g).
Period of pendulum depends only on its length that too directly and acceleration due to gravity at that place, but inversely But it is independent of the mass of the bob So as length increases its period increases.
the period of the pendulum increases with the square root of the length so if the length is four times, the period just doubles.
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.
time period of a pendulum is given by;T=22/7(l/g)^1/2 where l is length of a pendulum i.e; time period is directly proprotional to the square root of length. in summer, length of pendulum increases due to increase in temperature and hence time increases & increases in time means the clock runs faster
The period increases as the square root of the length.
The period increases - by a factor of sqrt(2).
If the pendulum rod expands, then the length increases, and the period increases. A close approximation for the period is T =~ 2*pi*sqrt(L/g).
The period is proportional to the square root of the length so if you quadruple the length, the period will double.
Period of pendulum depends only on its length that too directly and acceleration due to gravity at that place, but inversely But it is independent of the mass of the bob So as length increases its period increases.
Making the length of the pendulum longer. Also, reducing gravitation (that is, using the pendulum on a low-gravity world would also increase the period).
the period of the pendulum increases with the square root of the length so if the length is four times, the period just doubles.
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.
time period of a pendulum is given by;T=22/7(l/g)^1/2 where l is length of a pendulum i.e; time period is directly proprotional to the square root of length. in summer, length of pendulum increases due to increase in temperature and hence time increases & increases in time means the clock runs faster
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