To calculate Carter's relative error, we can use the formula for relative error, which is given by:
\[ \text{Relative Error} = \frac{|\text{Measured Value} - \text{Actual Value}|}{|\text{Actual Value}|} \]
In this case, the measured value is 10.39 cm and the actual value is 10 cm.
- Calculate the absolute error:
\[ |\text{Measured Value} - \text{Actual Value}| = |10.39 - 10| = |0.39| = 0.39 \text{ cm} \]
- Calculate the relative error:
\[ \text{Relative Error} = \frac{0.39}{10} = 0.039 \]
- Convert to percentage:
To express the relative error as a percentage, multiply by 100:
\[ \text{Relative Error as a Percentage} = 0.039 \times 100 = 3.9% \]
- Rounding to the nearest hundredth:
Since the relative error expressed as a percentage is \(3.90%\), when rounded to the nearest hundredth, it is:
\[ \text{Relative Error} \approx 3.90% \]
Thus, Carter's relative error to the nearest hundredth is 3.90%.
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