Monday, August 5, 2019

Experiment to Prove Hookes Law

Experiment to Prove Hookes Law Hooke’s Law Aim: -To prove Hooke’s law i.e. the extension of the force is directly proportional to the force applied. To find the spring constant of the spring. Apparatus: Clamp Stand Helical Spring Mass Hanger Pointer Meter Ruler Measuring Balance Method: -Hang a helical spring from a clamp stand. -Attach a mass directly to the bottom of the helical spring and record the position of the bottom of the mass hanger relative to a meter ruler. -Add masses to the spring and record the position of the bottom of the mass hanger. Safety Precautions: Wear safety goggles to prevent any accidents that could occur due to the weights bouncing off the spring. Keep a distance from the apparatus. Be sure that the spring is tightly attached to the clamp. Do not play around with the masses or springs. Data Collection and Processing Uncertainty in a measuring balance =  ±0.1g To covert to kg = 0.1à ·1000 =  ±0.0001kg Uncertainty in a meter ruler =  ±0.05cm To convert to meters = 0.05 à · 100 =  ±0.0005m †¢Formulas Absolute Uncertainty= Limit of readingà ·2 Relative Uncertainty= Absolute Uncertainty à · Measured Value % Uncertainty = Absolute Uncertainty à · Measured Value Ãâ€" 100 Force (Newton’s) = Mass (Kg) Ãâ€" Acceleration (ms- ²) Average Extension (cm) = Extension while loading (m) + Extension while unloading (m) à · 2 Spring Constant, k (Nm- ¹) = Force (Newton’s) à · Extension (m) Elastic Potential Energy (Joules) = 0.5 Ãâ€" Spring Constant Ãâ€" Extension ² Range Of Extension = Extension while loading – Extension while unloading Random Error = Range of extension à · 2 Table 1 Raw Data Table: Trial No. Mass (grams)  ±0.1 Mass (kilograms)  ±0.0001 Force Applied (Newton’s) F=MÃâ€"g  ±0.0001 Extension While Loading(meters)  ±0.0005 Extension While Unloading(meters)  ±0.0005 Average Extension =E1+E2à ·2 (meters)  ±0.001 1 10.2 ±0.1 0.0102 ±0.0001 0.100062 ±0.0001 0.036 ±0.0005 0.037 ±0.0005 0.0365 ±0.001 2 20.4 ±0.1 0.0204 ±0.0001 0.200124 ±0.0001 0.040 ±0.0005 0.039 ±0.0005 0.0395 ±0.001 3 30.6 ±0.1 0.0306 ±0.0001 0.300186 ±0.0001 0.043 ±0.0005 0.042 ±0.0005 0.0425 ±0.001 4 40.8 ±0.1 0.0408 ±0.0001 0.400248 ±0.0001 0.048 ±0.0005 0.046 ±0.0005 0.0470 ±0.001 5 51.0 ±0.1 0.0510 ±0.0001 0.500310 ±0.0001 0.051 ±0.0005 0.050 ±0.0005 0.0505 ±0.001 6 61.2 ±0.1 0.0612 ±0.0001 0.600372 ±0.0001 0.056 ±0.0005 0.057 ±0.0005 0.0565 ±0.001 7 71.4 ±0.1 0.0714 ±0.0001 0.700434 ±0.0001 0.061 ±0.0005 0.060 ±0.0005 0.0605 ±0.001 8 81.6 ±0.1 0.0816 ±0.0001 0.800496 ±0.0001 0.067 ±0.0005 0.067 ±0.0005 0.0670 ±0.001 †¢ Calculations for trial 1 Force (Newton’s) = Mass (kg) Ãâ€" Acceleration (ms- ²) = 10.2 ±0.1 (g) Ãâ€" 9.81 (ms- ²) = 100.062 ±0.1 (g) Covert the g to kg: 100.062 à · 1000 = 0.100062 ±0.0001 (kg) Average Extension = Extension while loading (cm) + Extension while unloading (cm) à · 2 = 3.6 ±0.05 (cm) + 3.7 ±0.05 (cm) = 3.65 ±0.1cm In meters = 3.65 ±0.1cm à · 100 = 0.0365 ±0.001m Table 2 The range of extension and the random error of the experiment: Trial No. Extension While Loading(meters)  ±0.0005 Extension While Unloading(meters)  ±0.0005 Average Extension =E1+E2à ·2 (meters)  ±0.001 Force Applied (Newton’s) F=MÃâ€"g  ±0.0001 Range of Extension (meters)  ±0.0005 Random Error (meters)  ±0.0005 1 0.036 ±0.0005 0.037 ±0.0005 0.0365 ±0.001 0.100062 ±0.0001 0.001 ±0.0005 0.0005 ±0.0005 2 0.040 ±0.0005 0.039 ±0.0005 0.0395 ±0.001 0.200124 ±0.0001 0.001 ±0.0005 0.0005 ±0.0005 3 0.043 ±0.0005 0.042 ±0.0005 0.0425 ±0.001 0.300186 ±0.0001 0.001 ±0.0005 0.0005 ±0.0005 4 0.048 ±0.0005 0.046 ±0.0005 0.0470 ±0.001 0.400248 ±0.0001 0.002 ±0.0005 0.001 ±0.0005 5 0.051 ±0.0005 0.050 ±0.0005 0.0505 ±0.001 0.500310 ±0.0001 0.001 ±0.0005 0.0005 ±0.0005 6 0.056 ±0.0005 0.057 ±0.0005 0.0565 ±0.001 0.600372 ±0.0001 0.001 ±0.0005 0.0005 ±0.0005 7 0.061 ±0.0005 0.060 ±0.0005 0.0605 ±0.001 0.700434 ±0.0001 0.001 ±0.0005 0.0005 ±0.0005 8 0.067 ±0.0005 0.067 ±0.0005 0.0670 ±0.001 0.800496 ±0.0001 0.000 ±0.0005 0.0000 ±0.0005 †¢Calculations for trial 1 Force (Newton’s) = Mass (kg) Ãâ€" Acceleration (ms- ²) = 10.2 ±0.1 (g) Ãâ€" 9.81 (ms- ²) = 100.062 ±0.1 (g) Covert the g to kg: 100.062 à · 1000 = 0.100062 ±0.0001 (kg) Average Extension = Extension while loading (cm) + Extension while unloading (cm) à · 2 = 3.6 ±0.05 (cm) + 3.7 ±0.05 (cm) = 3.65 ±0.1cm In meters = 3.65 ±0.1cm à · 100 = 0.0365 ±0.001m Range Of Extension = Maximum Value – Minimum Value = 0.037 ±0.0005 – 0.036 ±0.0005 = 0.001 ±0.005 (m) Random Error = Range of extension à · 2 = 0.001 ±0.005 à · 2 = 0.0005 ±0.0005 (m) Table 3 Processed Data Table: Trial No. Force Applied (Newton’s) F=MÃâ€"g  ±0.0001 Average Extension =E1+E2à ·2 (meters)  ±0.001 Spring Constant, k (Nm) % Uncertainty Elastic Potential Energy (Joules) % Uncertainty 1 0.100062 ±0.0001 0.0365 ±0.001 2.74 ±2.8% 0.0018251825 ±8.3% 2 0.200124 ±0.0001 0.0395 ±0.001 5.01 ±2.6% 0.0039084263 ±7.7% 3 0.300186 ±0.0001 0.0425 ±0.001 7.06 ±2.4% 0.0063760625 ±7.1% 4 0.400248 ±0.0001 0.0470 ±0.001 8.52 ±2.1% 0.0094103410 ±6.4% 5 0.500310 ±0.0001 0.0505 ±0.001 9.91 ±2.0% 0.0126364880 ±6.0% 6 0.600372 ±0.0001 0.0565 ±0.001 10.6 ±1.8% 0.01721974 ±5.3% 7 0.700434 ±0.0001 0.0605 ±0.001 11.6 ±1.7% 0.02122945 ±5.0% 8 0.800496 ±0.0001 0.0670 ±0.001 11.9 ±1.5% 0.02670955 ±4.5% †¢Calculations for trial 1 Force (Newton’s) = Mass (kg) Ãâ€" Acceleration (ms- ²) = 10.2 ±0.1 (g) Ãâ€" 9.81 (ms- ²) = 100.062 ±0.1 (g) Covert the g to kg: 100.062 à · 1000 = 0.100062 ±0.0001 (kg) Average Extension = Extension while loading (cm) + Extension while unloading (cm) à · 2 = 3.6 ±0.05 (cm) + 3.7 ±0.05 (cm) = 3.65 ±0.1cm In meters = 3.65 ±0.1cm à · 100 = 0.0365 ±0.001m Spring Constant = Force (Newton’s) à · Extension (m) = 0.100062 ±0.0001 (N) à · 0.0365 ±0.001 (m) % Uncertainty for Force = Absolute Uncertainty à · Measured Value Ãâ€" 100 = 0.0001 à · 0.100062 Ãâ€" 100 = 0.1% % Uncertainty for Extension = Absolute Uncertainty à · Measured Value Ãâ€" 100 = 0.001 à · 0.0365 Ãâ€" 100 = 2.7% Spring Constant = 0.100062 ±0.1% (N) à · 0.0365 ±2.7% (m) = 2.74 ±2.8% Nm- ¹ Elastic Potential Energy = 0.5 Ãâ€" Spring Constant Ãâ€" Extension ² = 0.5 Ãâ€" 2.74 ±2.8% Ãâ€" (0.0365 ±0.001)  ² = 0.5 Ãâ€" 2.74 ±2.8% Ãâ€" (0.001332255 ±5.5%) = 0.00183 ±8.3% Conclusion Evaluation Conclusion: In this experiment, I have been quite successful by proving the aim of the experiment which is Hooke’s Law. The results obtained are slightly incorrect due to any errors as part of the experiment. My calculations were all shown for trial one which whereas follows. In relation to the graph, the line does not pass through the origin as there were uncertainties. The line therefore starts a few cm from the origin on the y axis. The slope in the graph indicates the spring constant. It can be seen that the spring constant value in the graph does not match my result for trial no.1 as I have taken the spring constant value in N/cm. If I take the values in N/m and average all the values of the spring constant from my calculations I will end with a result equal to the gradient or slope of the graph that is 0.227. The units taken for every other value is standard and therefore is correct. My results are reliable as they do result in the Force being proportional to the Extension. I feel t hat my data is reliable and the graph does show that the extension of the spring directly proportional to the force that is applied to it. We also found that the spring constant and the elastic potential energy increases due to the extension of the spring being proportional to the force. Evaluation: I have found that the experiment did have many errors which could have been improved. There were both systematic and random errors involved in the experiment. The meter ruler (uncertainty of  ±0.05cm) and the digital balance (uncertainty of  ±0.1g) had uncertainty’s which could have altered the accuracy of the results. The experiment also had a parallax error due to the carelessness of me not observing the pointer and the length in the straight path. My equipment was not very accurate as I was given a meter ruler and not an attached ruler. This could have made it very inaccurate as the ruler was leaning over a wall. I could only take one reading per mass, as time management was an issue, which is not reliable as taking more than two readings and averaging the answer will give a more accurate result. The next time I perform this experiment, I will need to make sure that I have at least three readings per mass and should take the average of the three readings to minimize the errors. I should also make sure that the meter ruler is not leaning on a wall and that it is held on by a clamp or that I have the ruler stuck behind the clamp stand. While repeating the experiment one should also put a pointer on the hook to avoid parallax error and get the measurements even more accurate. Wasif Haque

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