Class 11 Physics MCQs | 100 Q&A | Units & Measurements
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Class 11 Physics | Units and Measurements MCQs with Answers – Part 3

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211. A length is measured as \(40.0\,\text{cm}\) with an absolute error of \(0.2\,\text{cm}\). The percentage error is
ⓐ. \(5.0\%\)
ⓑ. \(2.0\%\)
ⓒ. \(0.5\%\)
ⓓ. \(0.2\%\)
212. Two mass measurements are reported as \(20.0\pm0.2\,\text{g}\) and \(200.0\pm0.5\,\text{g}\). The better measurement by percentage error is
ⓐ. both are equally good because both use \(\text{g}\)
ⓑ. \(20.0\pm0.2\,\text{g}\)
ⓒ. the one with the larger absolute error
ⓓ. \(200.0\pm0.5\,\text{g}\)
213. Relative error has no unit because it is formed by
ⓐ. dividing quantities with the same unit
ⓑ. changing every unit into \(\text{kg}\)
ⓒ. adding two values with different units
ⓓ. multiplying error by the measured value
214. The expression for percentage error is completed as \(\frac{\Delta a}{a}\times\_\_\_\_\).
ⓐ. \(\Delta a\)
ⓑ. \(100\%\)
ⓒ. \(a^2\)
ⓓ. \(\frac{1}{100}\,\text{cm}\)
215. A table compares measurements of different quantities.
RecordMeasurementPercentage error
P\(10.0\pm0.1\,\text{cm}\)\(1.0\%\)
Q\(50.0\pm0.5\,\text{s}\)\(1.0\%\)
R\(100\pm1\,\text{g}\)\(1.0\%\)
S\(200\pm2\,\text{m}\)\(10\%\)
The record that needs correction is
ⓐ. Q
ⓑ. P
ⓒ. S
ⓓ. R
216. A diameter is measured as \(2.00\,\text{mm}\) with an uncertainty of \(0.01\,\text{mm}\). A length is measured as \(20.0\,\text{cm}\) with an uncertainty of \(0.1\,\text{cm}\). The comparison of percentage errors is
ⓐ. diameter has \(0.5\%\), length has \(5\%\)
ⓑ. both are \(0.5\%\)
ⓒ. diameter has \(5\%\), length has \(0.5\%\)
ⓓ. both are \(5\%\)
217. When two measured quantities are added, the maximum absolute error in the result is found by
ⓐ. adding their absolute errors
ⓑ. multiplying their measured values
ⓒ. dividing the smaller error by the larger error
ⓓ. subtracting their absolute errors
218. Two lengths are measured as \(12.4\pm0.1\,\text{cm}\) and \(8.2\pm0.1\,\text{cm}\). Their sum with maximum absolute error is
ⓐ. \(4.2\pm0.2\,\text{cm}\)
ⓑ. \(20.6\pm0.2\,\text{cm}\)
ⓒ. \(20.6\pm0.1\,\text{cm}\)
ⓓ. \(20.6\pm1.0\,\text{cm}\)
219. For a difference \(x=a-b\), the maximum absolute error is
ⓐ. \(\Delta a+\Delta b\)
ⓑ. \(\Delta a-\Delta b\)
ⓒ. \(\Delta b-\Delta a\)
ⓓ. \(\frac{\Delta a}{\Delta b}\)
220. A rod length is found by subtracting two scale readings: \(x=(18.6\pm0.1\,\text{cm})-(5.2\pm0.1\,\text{cm})\). The result with maximum absolute error is
ⓐ. \(13.4\pm0.2\,\text{cm}\)
ⓑ. \(13.4\pm0.0\,\text{cm}\)
ⓒ. \(23.8\pm0.2\,\text{cm}\)
ⓓ. \(13.4\pm0.1\,\text{cm}\)
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