Error in Measurement

Error in Measurement Error in Measurement Precision Accuracy Error Types Significant Digits Error Propagation

"Accuracy" means truth."Precision" means detail.

Accuracy • Accurate: measured value very close to actual value. • What affects accuracy? • How can you improve accuracy? • Systematic (correctable) errors • Calibration of instrument, e.g. zero and gain

Precision Precise: Multiple measurements close together -What affects precision? - How can you improve precision? • Random errors (not correctable, need trials) • Instrument capabilities

Significant Digits in Measurement • Conveys precision • Rule of thumb: estimate 1 digit • Digital: half of the last digit

Sig Fig Rules • Examples • 7000.00 kg has six: there is a decimal point, so all the digits are significant. • 0.00040 kg has two: there is a decimal point, so the 4 and last 0 count. The other zeros are all "leading". • 208,000 g has three: the 2, the leftmost 0, and the 8. The trailing zeros do not count, since there is no decimal point. • 4440700 km has five: the 4s, the sandwiched 0, and the 7. The trailing zeros do not count, since there is no decimal point. • In scientific notation, significant digits count in the first part of the number.Examples • 5.8 x 10^3 has two significant digits. • 2.00 x 10^-8 has three significant figures.

Sig Fig in calculations 1. If I ran 10.0 m in 2.0 s, how should my speed be rounded off? 2. What if I ran it in 2.01 s? What about 5 sec? 3. What value of force causes a 25.0 kg ball to have an acceleration of 4 m/s^2? 4. If I raise my 36 m flagpole by 20.0 cm, how tall is it? 5.0, 4.98, 2 100, 36

Pendulum Lab Measurements

Reporting error Reporting error • Error: disagreement between measurement and true/accepted value. We don’t always know this. • Uncertainty: refers to measured value, it is the interval within which repeated measurements are expected to lie. • Examples: 5.0 +/- 0.2 cm (absolute) Mean +/- 1 stddev (68%, or about 2/3) 9.8 +/- 2% (relative)

Histograms

Practice

Answers • Answers: • 1) Unknown. Accuracy can only be decided when the true or accepted value is known. Every value above is as likely as any other value. • 2) Group C: The measurements of this group are very close to each other (repeatable). Individual measurements in Group B have greater precision but they do not agree with each other as closely as Group C. • 3) Unknown. Error can only be decided when the true/accepted value is know. We may suspect error for measurements such as 8.01 cm or 12.18 cm but unless we observe a clear mistake in measurement method we must accept all values here on the same basis. • 4) Group D: The average variation in measurements from this group is nearly 1 cm, almost 3 times more than any other group. (read about average deviation) • ============== • 5) Group C: While they are the most consistent set presented, they are consistently far away from the accepted value. • 6) Group D: Precision refers to the data set itself, not to the comparison between the data and the accepted value. The values for Group D do not agree with each other very well. • 7) Group A: This data shows a pretty wide scatter of values but the average is closer to the accepted value than for any other group. • 8) Group C: Uncertainty is not changed by knowledge of the accepted value. This group has the least variation so the least uncertainty. Here you see a clear difference between uncertainty and error.

Practice

Error Propagation Spirit Travel Example: Length = 4825 +/- 5 m Stop at 3260 +/- 10 m How far to go? 1565 m, +/- ?? Can calculate extremes: 1580 and 1550 m Or add uncertainty Either way, get 1565 +/- 15 m General rules For sum and diff: add absolute errors For Product/Quotient: add relative errors For Powers: relativeerror of the original quantity times the power.

Practice You measure the following quantities: A = 1.0 m ± 0.2 m, B = 2.0 m ± 0.2 m, C = 2.5 m/s ± 0.5 m/s, D = 0.10 s ± 0.01 s. Choose the correct answers for the following expressions: A + B = 3.0 m ± 0.0 m 3.0 m ± 0.2 m 3.0 m ± 0.4 m B − A = 1.0 m ± 0.0 m 1.0 m ± 0.2 m 1.0 m ± 0.4 m C × D = 0.25 m ± 0.05 m 0.25 m ± 0.08 m 0.25 m ± 0.51 m B / D = 20. m/s ± 4 m/s 20. m/s ± 10 m/s 20. m/s ± 20 m/s 3 × A = 3.0 m ± 0.2 m 3.0 m ± 0.3 m 3.0 m ± 0.6 m The square root of (A × B) = 1.4 m ± 0.1 m 1.4 m ± 0.2 m 1.4 m ± 0.4 m Answers: ________________________________________ A + B = 3.0 m ± 0.4 m B − A = 1.0 m ± 0.4 m C × D =0.25 m ± 0.08 m B / D = 20. m/s ± 4 m/s 3 × A = 3.0 m ± 0.6 m The square root of (A × B) = 1.4 m ± 0.2 m

Error in Measurement