The relationship between the length and the period of motion of a pendu

Introduction I chose to investigate this topic out of minute curiosity to see how the length of a pendulum affects its period of motion. A pendulum is a suspended point of fortune, hung from a resolute point on an inextensible cord. When it is pulled and released from virtuoso side of its equilibrium, at x, the pendulum swings back and forth on a vertical plane under the influence of gravity (La N Powers, 2006). The motion is semestral and oscillatory I am determining the oscillation or otherwise known as the period of motion (Resnick & Malliday, 1977, pp. 310-311). The period of motion is the amount of clip taken to swing back and forth once, measured in seconds and symbolised by T (Kurtus, 2010). Galileo discovered pendulums and he found that the period of motion is proportional to the squarely root of the length - Tl (Morgan, 1995). Due to the research carried out, I have discovered that the correct method of measuring the independent variable (length of the string) is from the fixed point it is hung from (fulcrum) to the center of the mass (Cory, 2004)(Encyclopedia Britannica, 2011). The formula F=-mg sin shows that when a pendulum is displaced from its equilibrium, it is brought back to the center by restoring force (Pendulum, 2008). Newtons second law, F=Ma=(d2 (L))/(dt2 ) , shows that the arc which the pendulum swings through is actually a segment of a circle with the radius being the length of the pendulum. The combination of these formulae demonstrates that the mass of a pendulum is independent to its period of motion (Encyclopedia Britannica, 2011). I concluded from this that a specific weight for my pendulum is not necessary, although it must remain constant. As seen in the supra equation, this restoring force is... ...of motion (T), measured in seconds and milliseconds. Time is recorded for five periods and averaged (T=t/5). Repeated five times for each length and averaged. Constant variables the environmental conditions (enclosed indoor ar ea), the weight of the pendulum, repeated the same amount of times for each length, released from 10, and the pendulum is released with the same tension in the string each time Equipment 160cm of 8 strand braided nylon bricklayers line17.07grams worth of 5/16 zinc plated mudguard washersScientific scales reading from 100-0.01gramsA stopwatch measuring to the milliseconds bounds clamp with a hole in the handleBlu-Tack180 protractor A capable assistant Stool (if needed)Procedure Clamp the spring clamp to an quarry over 160cm high without obstructions underneath and with the hole facing downwards.