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Company A Hours of Work Pay ($) 5.5 140.25 22.0 561.00 35.0 892.50 40.0 1,020.00 Company B Hours of Work Pay ($) 4.0 114.00 10....Question
Company A
Hours of Work Pay ($)
5.5 140.25
22.0 561.00
35.0 892.50
40.0 1,020.00
Company B
Hours of Work Pay ($)
4.0 114.00
10.6 302.10
20.5 584.25
35.0 997.50
Based on the tables showing what two leading gas brands pay employees, compare which company pays the higher rate. Which answer provides the correct company and hourly rate?
(1 point)
Responses
Company A has the best hourly rate of $25.50/hour.
Company A has the best hourly rate of $25.50/hour.
Company B has the best hourly rate of $28.50/hour.
Company B has the best hourly rate of $28.50/hour.
Company A has the best hourly rate of $1,020/40 hours.
Company A has the best hourly rate of $1,020/40 hours.
Company B has the best hourly rate of $997.50/40 hours.
Hours of Work Pay ($)
5.5 140.25
22.0 561.00
35.0 892.50
40.0 1,020.00
Company B
Hours of Work Pay ($)
4.0 114.00
10.6 302.10
20.5 584.25
35.0 997.50
Based on the tables showing what two leading gas brands pay employees, compare which company pays the higher rate. Which answer provides the correct company and hourly rate?
(1 point)
Responses
Company A has the best hourly rate of $25.50/hour.
Company A has the best hourly rate of $25.50/hour.
Company B has the best hourly rate of $28.50/hour.
Company B has the best hourly rate of $28.50/hour.
Company A has the best hourly rate of $1,020/40 hours.
Company A has the best hourly rate of $1,020/40 hours.
Company B has the best hourly rate of $997.50/40 hours.
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To find out which company pays the higher hourly rate, we can calculate the hourly rate for each entry in both tables.
**Company A:**
1. For 5.5 hours:
\( \text{Hourly Rate} = \frac{140.25}{5.5} \approx 25.50 \)
2. For 22.0 hours:
\( \text{Hourly Rate} = \frac{561.00}{22.0} \approx 25.50 \)
3. For 35.0 hours:
\( \text{Hourly Rate} = \frac{892.50}{35.0} \approx 25.50 \)
4. For 40.0 hours:
\( \text{Hourly Rate} = \frac{1,020.00}{40.0} = 25.50 \)
**Company B:**
1. For 4.0 hours:
\( \text{Hourly Rate} = \frac{114.00}{4.0} = 28.50 \)
2. For 10.6 hours:
\( \text{Hourly Rate} = \frac{302.10}{10.6} \approx 28.50 \)
3. For 20.5 hours:
\( \text{Hourly Rate} = \frac{584.25}{20.5} \approx 28.50 \)
4. 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.**
**Company A:**
1. For 5.5 hours:
\( \text{Hourly Rate} = \frac{140.25}{5.5} \approx 25.50 \)
2. For 22.0 hours:
\( \text{Hourly Rate} = \frac{561.00}{22.0} \approx 25.50 \)
3. For 35.0 hours:
\( \text{Hourly Rate} = \frac{892.50}{35.0} \approx 25.50 \)
4. For 40.0 hours:
\( \text{Hourly Rate} = \frac{1,020.00}{40.0} = 25.50 \)
**Company B:**
1. For 4.0 hours:
\( \text{Hourly Rate} = \frac{114.00}{4.0} = 28.50 \)
2. For 10.6 hours:
\( \text{Hourly Rate} = \frac{302.10}{10.6} \approx 28.50 \)
3. For 20.5 hours:
\( \text{Hourly Rate} = \frac{584.25}{20.5} \approx 28.50 \)
4. 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.**
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