To find out which company pays the higher hourly rate, we can calculate the hourly rate for each entry in both tables.
Company A:
-
For 5.5 hours:
\( \text{Hourly Rate} = \frac{140.25}{5.5} \approx 25.50 \) -
For 22.0 hours:
\( \text{Hourly Rate} = \frac{561.00}{22.0} \approx 25.50 \) -
For 35.0 hours:
\( \text{Hourly Rate} = \frac{892.50}{35.0} \approx 25.50 \) -
For 40.0 hours:
\( \text{Hourly Rate} = \frac{1,020.00}{40.0} = 25.50 \)
Company B:
-
For 4.0 hours:
\( \text{Hourly Rate} = \frac{114.00}{4.0} = 28.50 \) -
For 10.6 hours:
\( \text{Hourly Rate} = \frac{302.10}{10.6} \approx 28.50 \) -
For 20.5 hours:
\( \text{Hourly Rate} = \frac{584.25}{20.5} \approx 28.50 \) -
For 35.0 hours:
\( \text{Hourly Rate} = \frac{997.50}{35.0} = 28.50 \)
Summary of Results:
- Company A pays approximately $25.50/hour.
- Company B pays approximately $28.50/hour.
Conclusion:
Company B has the best hourly rate of $28.50/hour.
Therefore, the correct response is:
Company B has the best hourly rate of $28.50/hour.
6 answers