Answer:
The percentage uncertainty in the average speed is 0.10% (2 sig. fig.)
Explanation:
Consider the formula for average speed [tex]\bar{v}[/tex].
[tex]\displaystyle \bar{v} = \frac{s}{t}[/tex],
where
The percentage uncertainty of a fraction is the sum of percentage uncertainties in
What are the percentage uncertainties in [tex]s[/tex] and [tex]t[/tex] in this question?
The unit of the absolute uncertainty in [tex]s[/tex] is meters. Thus, convert the unit of [tex]s[/tex] to meters:
[tex]s = \rm 42.238\;km = 42.238\times 10^{3}\;m[/tex].
[tex]\begin{aligned}\displaystyle \text{Percentage Uncertainty in }s &= \frac{\text{Absolute Uncertainty in } s}{\text{Measured Value of }s}\times 100\% \\ &=\rm\frac{29\; m}{42.238\times 10^{3}\;m}\times 100\%\\ &= 0.0687\%\end{aligned}[/tex].
The unit of the absolute uncertainty in [tex]t[/tex] is seconds. Convert the unit of [tex]t[/tex] to seconds:
[tex]t = \rm 2\times 3600 + 31\times 60 + 46 = 9106\;s[/tex]
Similarly,
[tex]\begin{aligned}\displaystyle \rm \text{Percentage Uncertainty in }t &= \frac{\text{Absolute Uncertainty in }t}{\text{Measured Value of }t}\times 100\% \\ &=\rm\frac{46\; s}{9106\;s}\times 100\%\\ &= 0.0329\%\end{aligned}[/tex].
The average speed [tex]\bar{v}[/tex] here is a fraction of [tex]s[/tex] and [tex]t[/tex]. Both [tex]s[/tex] and [tex]t[/tex] come with uncertainty. The percentage uncertainty in [tex]\bar{v}[/tex] will be the sum of percentage uncertainties in [tex]s[/tex] and [tex]t[/tex]. That is:
[tex]\text{Percentage Uncertainty in }\bar{v}\\=(\text{Percentage Uncertainty in } s) + (\text{Percentage Uncertainty in } t)\\ = 0.0687\% + 0.0329\%\\ = 0.010\%[/tex].
Generally, keep
The percentage uncertainty in [tex]\bar{v}[/tex] here is less than 2%. Thus, keep two significant figures. However, keep more significant figures than that in calculations to make sure that the final result is accurate.
