Time for $20$ oscillations of a pendulum is measured as $t_1 = 39.6\, s$,$t_2 = 39.9\, s$,and $t_3 = 39.5\, s$. What is the precision in the measurements? What is the accuracy of the measurement?
(N/A) Given,$t_1 = 39.6\, s$,$t_2 = 39.9\, s$,and $t_3 = 39.5\, s$.
The least count of the measuring instrument is $0.1\, s$ (as measurements have only one significant figure after the decimal point).
Precision in the measurement $=$ Least count of the instrument $= 0.1\, s$.
The average time for $20$ oscillations is given by:
$t_{avg} = \frac{t_1 + t_2 + t_3}{3} = \frac{39.6 + 39.9 + 39.5}{3} = \frac{119.0}{3} = 39.666... \approx 39.7\, s$.
Absolute errors in the measurements are:
$\Delta t_1 = |t_{avg} - t_1| = |39.7 - 39.6| = 0.1\, s$
$\Delta t_2 = |t_{avg} - t_2| = |39.7 - 39.9| = 0.2\, s$
$\Delta t_3 = |t_{avg} - t_3| = |39.7 - 39.5| = 0.2\, s$
Average absolute error (Accuracy) $= \frac{\Delta t_1 + \Delta t_2 + \Delta t_3}{3} = \frac{0.1 + 0.2 + 0.2}{3} = \frac{0.5}{3} \approx 0.17\, s$.
Rounding off to one decimal place,the accuracy of the measurement is $\pm 0.2\, s$.
The least count of the measuring instrument is $0.1\, s$ (as measurements have only one significant figure after the decimal point).
Precision in the measurement $=$ Least count of the instrument $= 0.1\, s$.
The average time for $20$ oscillations is given by:
$t_{avg} = \frac{t_1 + t_2 + t_3}{3} = \frac{39.6 + 39.9 + 39.5}{3} = \frac{119.0}{3} = 39.666... \approx 39.7\, s$.
Absolute errors in the measurements are:
$\Delta t_1 = |t_{avg} - t_1| = |39.7 - 39.6| = 0.1\, s$
$\Delta t_2 = |t_{avg} - t_2| = |39.7 - 39.9| = 0.2\, s$
$\Delta t_3 = |t_{avg} - t_3| = |39.7 - 39.5| = 0.2\, s$
Average absolute error (Accuracy) $= \frac{\Delta t_1 + \Delta t_2 + \Delta t_3}{3} = \frac{0.1 + 0.2 + 0.2}{3} = \frac{0.5}{3} \approx 0.17\, s$.
Rounding off to one decimal place,the accuracy of the measurement is $\pm 0.2\, s$.
Explore More
Similar Questions
The resistance $R = V / I$ where $V = (100 \pm 5) \; V$ and $I = (10 \pm 0.2) \; A$. Find the percentage error in $R$. (in $\%$)
Easy
View Solution$A$ physical quantity $P$ is given by $P = \frac{A^3 B^{1/2}}{C^{-4} D^{3/2}}$. The quantity which brings in the maximum percentage error in $P$ is
Easy
View SolutionIf $a, b, c$ are the percentage errors in the measurement of $A, B$ and $C$,then the percentage error in $ABC$ would be approximately
Easy
View SolutionThe time period of a simple harmonic oscillator is $T = 2 \pi \sqrt{\frac{m}{k}}$. The measured value of mass $(m)$ of the object is $10 \ g$ with an accuracy of $10 \ mg$,and the time for $50$ oscillations of the spring is found to be $60 \ s$ using a watch of $2 \ s$ resolution. The percentage error in the determination of the spring constant $(k)$ is . . . . . . %.
An experiment measures quantities $a, b$ and $c$,and quantity $X$ is calculated from $X = ab^2 / c^3$. If the percentage errors in $a, b$ and $c$ are $\pm 1\%, \pm 3\%$ and $\pm 2\%$,respectively,then the percentage error in $X$ will be
Easy
View SolutionVedclass Products
For Students
Vedclass Test Series
Mock tests in real JEE/NEET style with performance analysis. 5-day free trial.
Start Free TrialFor Teachers
Exam Paper Generator
Generate Set A/B/C/D exam papers from 7.5L+ questions in 2 minutes. 3 chapters free.
Try FreeFor Institutes
Online Exam Module
Live online exams with unlimited students, 360° analytics & white-label branding.
See Demo