Investigating the Oscillations of a Mass on a Spring

In this physics course to examine the quality of vibration of the spring, I am here to investigate the vibration of the spring. In this investigation, vibration means that the waves move in a regular pattern. In this survey, I can use any mass and many springs so that I can examine the vibration. Variable: I think there are many factors and variables that affect the time of vibration once. - Weight quality - I think there is a big influence on the vibration time.

Factors influencing the complete vibration time of the pendulum Factors influencing the complete vibration period of the pendulum In my research, my purpose was to discover and study the factors that affected the complete vibration time. It is important to understand what a single pendulum pendulum is. A simple pendulum is a weight or mass that allows it to be suspended freely from a fixed point. Vibration is a cycle of pendulum motion, such as from position a to b, and back to a. The oscillation period is the time required for the pendulum to complete one of its operating cycles. This is determined by measuring the time it takes for the pendulum to occupy a particular position.

The spring constant of steel spring constant was determined statically by measuring the elongation at load and it was found that it is determined dynamically by measuring the period of mass from one suspension to the vertical vibration It was. The results were 2.94 ± 0.01 N / m and 2.98, respectively. Our spring actions follow Hooke's law within both experiments. The purpose of this experiment was to measure and compare spring constants using two different programs. First, when examining the force applied to the spring, the spring of various mass hung from the spring due to the displacement of the spring from the other part of the spring, and the vertical displacement spring constant was measured as 2.94 ± 0.01 N / m. Our results confirm Hooke's law, F is the second step, we set the spring to have suspicious vertical vibration and measure the oscillation period. Using this method, we found a spring of 2.98 ± 0.02 N / m