Hellen Buys Two Oranges She Pays With £1 Coin And Gets 52p Change How Much Is It For 1 Oranges ?

Solving the Mystery of the Oranges: A Mathematical Enigma

In this article, we will delve into a seemingly simple yet intriguing mathematical problem. A woman, Hellen, buys two oranges and pays with a £1 coin, receiving 52p as change. The question that arises is: how much does one orange cost? To solve this enigma, we will employ basic arithmetic operations and logical reasoning.

Hellen buys two oranges and pays with a £1 coin. She receives 52p as change. We need to find the cost of one orange.

Step 1: Understanding the Transaction

Let's break down the transaction:

• Hellen pays with a £1 coin.
• She receives 52p as change.
• The total cost of the two oranges is £1 - 52p.

Step 2: Converting the Change to Pounds

To make the calculation easier, let's convert the change from pence to pounds:

52p = 0.52 £

Step 3: Calculating the Total Cost of the Oranges

Now, let's calculate the total cost of the two oranges:

Total cost = £1 - 0.52 £ Total cost = 0.48 £

Step 4: Finding the Cost of One Orange

To find the cost of one orange, we need to divide the total cost by 2:

Cost of one orange = Total cost / 2 Cost of one orange = 0.48 £ / 2 Cost of one orange = 0.24 £

Therefore, the cost of one orange is 24p. This solution is based on the assumption that Hellen pays with a £1 coin and receives 52p as change. The calculation is straightforward, and the result is a clear indication of the cost of one orange.

This problem can be solved using various mathematical techniques, including algebraic manipulation and logical reasoning. The key to solving this problem lies in understanding the transaction and converting the change to pounds.

This problem may seem trivial, but it has real-world applications in various fields, such as:

• Accounting: Understanding the cost of items and calculating change is essential in accounting.
• Business: Calculating the cost of goods and services is crucial in business operations.
• Mathematics: This problem demonstrates the importance of basic arithmetic operations and logical reasoning in mathematics.

In conclusion, the cost of one orange is 24p. This problem may seem simple, but it requires a clear understanding of the transaction and basic arithmetic operations. The solution to this problem can be applied to various real-world scenarios, making it an essential mathematical concept to grasp.

• Q: What is the cost of one orange? A: The cost of one orange is 24p.
• Q: How did you calculate the cost of one orange? A: We calculated the total cost of the two oranges and then divided it by 2 to find the cost of one orange.
• Q: What is the significance of this problem? A: This problem demonstrates the importance of basic arithmetic operations and logical reasoning in mathematics and has real-world applications in accounting, business, and mathematics.
  Frequently Asked Questions: Unraveling the Mystery of the Oranges

In our previous article, we solved the enigma of Hellen buying two oranges and paying with a £1 coin, receiving 52p as change. We found that the cost of one orange is 24p. In this article, we will address some of the frequently asked questions related to this problem.

Q: What is the cost of one orange?

A: The cost of one orange is 24p.

Q: How did you calculate the cost of one orange?

A: We calculated the total cost of the two oranges by subtracting the change from the £1 coin. Then, we divided the total cost by 2 to find the cost of one orange.

Q: What is the significance of this problem?

A: This problem demonstrates the importance of basic arithmetic operations and logical reasoning in mathematics and has real-world applications in accounting, business, and mathematics.

Q: Can I use this method to calculate the cost of any item?

A: Yes, you can use this method to calculate the cost of any item. However, you need to ensure that you have the correct information, such as the total cost and the change.

Q: What if I don't have a £1 coin, can I still use this method?

A: Yes, you can still use this method. You can use any denomination of currency, and the calculation will remain the same.

Q: Can I apply this method to other mathematical problems?

A: Yes, you can apply this method to other mathematical problems that involve basic arithmetic operations and logical reasoning.

Q: What if I make a mistake in my calculation?

A: If you make a mistake in your calculation, you can recheck your work and recalculate the cost of the item.

Q: Can I use a calculator to solve this problem?

A: Yes, you can use a calculator to solve this problem. However, it's essential to understand the calculation process to ensure accuracy.

Q: Is this problem suitable for beginners?

A: Yes, this problem is suitable for beginners. It's a simple and straightforward calculation that can help you develop your basic arithmetic skills.

Q: Can I use this method to calculate the cost of a group of items?

A: Yes, you can use this method to calculate the cost of a group of items. However, you need to ensure that you have the correct information, such as the total cost and the change.

In conclusion, the cost of one orange is 24p. This problem may seem simple, but it requires a clear understanding of the transaction and basic arithmetic operations. The solution to this problem can be applied to various real-world scenarios, making it an essential mathematical concept to grasp.

• Mathematics tutorials: For a more in-depth understanding of basic arithmetic operations and logical reasoning.
• Accounting and business resources: For a better understanding of how this problem applies to real-world scenarios.
• Mathematics worksheets: For practice and to develop your basic arithmetic skills.

In conclusion, the cost of one orange is 24p. This problem may seem simple, but it requires a clear understanding of the transaction and basic arithmetic operations. The solution to this problem can be applied to various real-world scenarios, making it an essential mathematical concept to grasp.