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Introduction

In this article, we will delve into a mathematical problem that requires selecting the correct answer from each drop-down menu. The problem involves a parking lot that charges by the quarter hour, and the table shows the parking fee in dollars with respect to the time in hours. We will analyze the given information, identify the key concepts, and provide step-by-step solutions to arrive at the correct answers.

Understanding the Problem

Alayna parks her car in a lot that charges by the quarter hour. The table shows the parking fee in dollars with respect to the time in hours. The table is as follows:

Time (hours) Parking Fee (dollars)
0 0
0.25 2
0.5 4
0.75 6
1 8
1.25 10
1.5 12
1.75 14
2 16

Key Concepts

To solve this problem, we need to understand the following key concepts:

  • Parking Fee: The amount charged by the parking lot for each quarter hour.
  • Time: The duration for which the car is parked in the lot.
  • Quarter Hour: A unit of time equal to 15 minutes.

Step 1: Analyzing the Table

The table shows the parking fee in dollars with respect to the time in hours. We can see that the parking fee increases by $2 for every quarter hour. For example, if Alayna parks her car for 0.25 hours, the parking fee is $2. If she parks her car for 0.5 hours, the parking fee is $4, which is $2 more than the previous quarter hour.

Step 2: Identifying the Correct Answer

To select the correct answer from each drop-down menu, we need to analyze the table and identify the parking fee for each time period. We can see that the parking fee increases by $2 for every quarter hour. Therefore, we can calculate the parking fee for each time period as follows:

  • 0-0.25 hours: The parking fee is $2.
  • 0.25-0.5 hours: The parking fee is $4.
  • 0.5-0.75 hours: The parking fee is $6.
  • 0.75-1 hour: The parking fee is $8.
  • 1-1.25 hours: The parking fee is $10.
  • 1.25-1.5 hours: The parking fee is $12.
  • 1.5-1.75 hours: The parking fee is $14.
  • 1.75-2 hours: The parking fee is $16.

Conclusion

In conclusion, we have analyzed the given table and identified the key concepts involved in the problem. We have also provided step-by-step solutions to arrive at the correct answers. By understanding the parking fee and time concepts, we can select the correct answer from each drop-down menu.

Final Answer

The final answer is as follows:

Time (hours) Parking Fee (dollars)
0 0
0.25 2
0.5 4
0.75 6
1 8
1.25 10
1.5 12
1.75 14
2 16

Discussion Category: Mathematics

This problem involves mathematical concepts such as time, quarter hour, and parking fee. The problem requires the application of mathematical reasoning and problem-solving skills to arrive at the correct answers. The discussion category for this problem is mathematics.

Related Topics

The following topics are related to this problem:

  • Time and Duration: Understanding the concept of time and duration is essential to solve this problem.
  • Quarter Hour: The quarter hour is a unit of time equal to 15 minutes, and it is used to calculate the parking fee.
  • Parking Fee: The parking fee is the amount charged by the parking lot for each quarter hour.
  • Mathematical Reasoning: Mathematical reasoning and problem-solving skills are required to arrive at the correct answers.

Conclusion

Introduction

In our previous article, we analyzed a mathematical problem that required selecting the correct answer from each drop-down menu. The problem involved a parking lot that charges by the quarter hour, and the table showed the parking fee in dollars with respect to the time in hours. In this article, we will provide a Q&A section to further clarify any doubts and provide additional information.

Q: What is the parking fee for 0-0.25 hours?

A: The parking fee for 0-0.25 hours is $2.

Q: How does the parking fee increase with time?

A: The parking fee increases by $2 for every quarter hour.

Q: What is the parking fee for 1-1.25 hours?

A: The parking fee for 1-1.25 hours is $10.

Q: How can I calculate the parking fee for a given time period?

A: To calculate the parking fee for a given time period, you can use the following formula:

Parking Fee = (Time in hours) x $2

For example, if the time is 0.5 hours, the parking fee would be:

Parking Fee = 0.5 x $2 = $4

Q: What is the parking fee for 2 hours?

A: The parking fee for 2 hours is $16.

Q: How does the quarter hour relate to the parking fee?

A: The quarter hour is a unit of time equal to 15 minutes, and it is used to calculate the parking fee. For every quarter hour, the parking fee increases by $2.

Q: What is the discussion category for this problem?

A: The discussion category for this problem is mathematics.

Q: What are some related topics to this problem?

A: Some related topics to this problem include:

  • Time and Duration: Understanding the concept of time and duration is essential to solve this problem.
  • Quarter Hour: The quarter hour is a unit of time equal to 15 minutes, and it is used to calculate the parking fee.
  • Parking Fee: The parking fee is the amount charged by the parking lot for each quarter hour.
  • Mathematical Reasoning: Mathematical reasoning and problem-solving skills are required to arrive at the correct answers.

Conclusion

In conclusion, we have provided a Q&A section to further clarify any doubts and provide additional information. We hope that this article has been helpful in understanding the problem and arriving at the correct answers. If you have any further questions, please feel free to ask.

Final Answer

The final answer is as follows:

Time (hours) Parking Fee (dollars)
0 0
0.25 2
0.5 4
0.75 6
1 8
1.25 10
1.5 12
1.75 14
2 16

Discussion Category: Mathematics

This problem involves mathematical concepts such as time, quarter hour, and parking fee. The problem requires the application of mathematical reasoning and problem-solving skills to arrive at the correct answers. The discussion category for this problem is mathematics.

Related Topics

The following topics are related to this problem:

  • Time and Duration: Understanding the concept of time and duration is essential to solve this problem.
  • Quarter Hour: The quarter hour is a unit of time equal to 15 minutes, and it is used to calculate the parking fee.
  • Parking Fee: The parking fee is the amount charged by the parking lot for each quarter hour.
  • Mathematical Reasoning: Mathematical reasoning and problem-solving skills are required to arrive at the correct answers.