Math

QuestionA scientist measures 90.7 kg90.7 \mathrm{~kg}, while the true value is 60.0 kg60.0 \mathrm{~kg}. Find the absolute and relative error.

Studdy Solution

STEP 1

Assumptions1. The measured value is 90.7 kg90.7 \mathrm{~kg} . The true value is 60.0 kg60.0 \mathrm{~kg}
3. Absolute error is calculated as the absolute difference between the true value and the measured value4. Relative error is calculated as the absolute error divided by the true value

STEP 2

First, we need to calculate the absolute error. The absolute error is the absolute difference between the true value and the measured value.
Absoluteerror=MeasuredvalueTruevalueAbsolute\, error = |Measured\, value - True\, value|

STEP 3

Now, plug in the given values for the measured value and the true value to calculate the absolute error.
Absoluteerror=90.7 kg60.0 kgAbsolute\, error = |90.7 \mathrm{~kg} -60.0 \mathrm{~kg}|

STEP 4

Calculate the absolute error.
Absoluteerror=90.7 kg60.0 kg=30.7 kgAbsolute\, error = |90.7 \mathrm{~kg} -60.0 \mathrm{~kg}| =30.7 \mathrm{~kg}

STEP 5

Next, we need to calculate the relative error. The relative error is the absolute error divided by the true value.
Relativeerror=AbsoluteerrorTruevalueRelative\, error = \frac{Absolute\, error}{True\, value}

STEP 6

Now, plug in the values for the absolute error and the true value to calculate the relative error.
Relativeerror=30. kg60.0 kgRelative\, error = \frac{30. \mathrm{~kg}}{60.0 \mathrm{~kg}}

STEP 7

Calculate the relative error.
Relativeerror=30.7 kg60.0 kg=0.511666...Relative\, error = \frac{30.7 \mathrm{~kg}}{60.0 \mathrm{~kg}} =0.511666...

STEP 8

The relative error is a ratio and does not have units. Also, it is often expressed as a percentage. So, we multiply the decimal by100 to get a percentage.
Relativeerror=0.511666...×100%Relative\, error =0.511666... \times100\%

STEP 9

Calculate the relative error as a percentage.
Relativeerror=.511666...×100%=51.17%Relative\, error =.511666... \times100\% =51.17\%The absolute error of the scientist's measurement is 30.7 kg30.7 \mathrm{~kg} and the relative error is 51.17%51.17\%.

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