Jannie Receives R150 Pocket Money Per Month.In The New Year His Mother Decided To Increase His Pocket Money In Ratio 6:5 Calculate Jannie Adjusted Monthly Pocket Money

by ADMIN 168 views

Jannie's Pocket Money Adjustment: A Math Problem

Jannie, a young boy, receives R150 as pocket money every month. His mother, wanting to increase his allowance, decides to do so in a specific ratio. In this article, we will explore how Jannie's pocket money is adjusted using the ratio 6:5.

Before we dive into the calculation, let's understand the ratio 6:5. This ratio means that for every 6 units of the original amount, Jannie's mother will increase it by 5 units. In other words, the new amount will be 6 units (original) + 5 units (increase) = 11 units.

To calculate the increase in Jannie's pocket money, we need to find the amount of the increase. Since the ratio is 6:5, we can set up a proportion to find the increase.

Let x be the amount of the increase. We can set up the proportion as follows:

6/5 = 150/x

To solve for x, we can cross-multiply:

6x = 5(150)

6x = 750

Now, we can divide both sides by 6:

x = 750/6

x = 125

So, the amount of the increase is R125.

Now that we know the amount of the increase, we can calculate Jannie's new pocket money. We can add the increase to the original amount:

New pocket money = Original pocket money + Increase = R150 + R125 = R275

In conclusion, Jannie's pocket money is adjusted to R275 per month using the ratio 6:5. This means that his mother increases his allowance by R125, making his new pocket money R275.

  • The ratio 6:5 means that for every 6 units of the original amount, Jannie's mother will increase it by 5 units.
  • The amount of the increase is R125.
  • Jannie's new pocket money is R275 per month.
  • Ratio: 6:5
  • Increase: R125
  • New pocket money: R275

This problem can be applied to real-life situations where an allowance or salary needs to be increased. For example, a company may increase an employee's salary by a certain ratio, or a parent may increase their child's allowance based on their performance.

  • When working with ratios, make sure to understand the meaning of the ratio and how it applies to the problem.
  • Use proportions to solve for unknown values.
  • Check your work by plugging in the values to ensure that the solution is correct.
  • Q: What is the ratio 6:5? A: The ratio 6:5 means that for every 6 units of the original amount, Jannie's mother will increase it by 5 units.
  • Q: How much is Jannie's new pocket money? A: Jannie's new pocket money is R275 per month.
  • Q: What is the amount of the increase? A: The amount of the increase is R125.
    Jannie's Pocket Money Adjustment: A Math Problem - Q&A

In our previous article, we explored how Jannie's pocket money was adjusted using the ratio 6:5. In this article, we will answer some frequently asked questions related to the problem.

Q: What is the ratio 6:5?

A: The ratio 6:5 means that for every 6 units of the original amount, Jannie's mother will increase it by 5 units. This means that the new amount will be 6 units (original) + 5 units (increase) = 11 units.

Q: How do I calculate the increase in Jannie's pocket money?

A: To calculate the increase, you can set up a proportion using the ratio 6:5. Let x be the amount of the increase. You can set up the proportion as follows:

6/5 = 150/x

To solve for x, you can cross-multiply:

6x = 5(150)

6x = 750

Now, you can divide both sides by 6:

x = 750/6

x = 125

So, the amount of the increase is R125.

Q: How do I calculate Jannie's new pocket money?

A: To calculate Jannie's new pocket money, you can add the increase to the original amount:

New pocket money = Original pocket money + Increase = R150 + R125 = R275

Q: What is the difference between the original and new pocket money?

A: The difference between the original and new pocket money is R125. This is the amount of the increase.

Q: Can I use this method to calculate the increase in any allowance or salary?

A: Yes, you can use this method to calculate the increase in any allowance or salary. The ratio 6:5 is just an example, and you can use any ratio to calculate the increase.

Q: How do I apply this method in real-life situations?

A: This method can be applied in real-life situations where an allowance or salary needs to be increased. For example, a company may increase an employee's salary by a certain ratio, or a parent may increase their child's allowance based on their performance.

Q: What are some tips and tricks for working with ratios?

A: Here are some tips and tricks for working with ratios:

  • Make sure to understand the meaning of the ratio and how it applies to the problem.
  • Use proportions to solve for unknown values.
  • Check your work by plugging in the values to ensure that the solution is correct.

Q: What are some common mistakes to avoid when working with ratios?

A: Here are some common mistakes to avoid when working with ratios:

  • Not understanding the meaning of the ratio and how it applies to the problem.
  • Not using proportions to solve for unknown values.
  • Not checking your work by plugging in the values to ensure that the solution is correct.

In conclusion, Jannie's pocket money was adjusted using the ratio 6:5. We answered some frequently asked questions related to the problem, including how to calculate the increase and how to apply this method in real-life situations. We also provided some tips and tricks for working with ratios and common mistakes to avoid.

  • The ratio 6:5 means that for every 6 units of the original amount, Jannie's mother will increase it by 5 units.
  • The amount of the increase is R125.
  • Jannie's new pocket money is R275 per month.
  • This method can be applied in real-life situations where an allowance or salary needs to be increased.
  • Make sure to understand the meaning of the ratio and how it applies to the problem.
  • Use proportions to solve for unknown values.
  • Check your work by plugging in the values to ensure that the solution is correct.
  • Ratio: 6:5
  • Increase: R125
  • New pocket money: R275

This problem can be applied to real-life situations where an allowance or salary needs to be increased. For example, a company may increase an employee's salary by a certain ratio, or a parent may increase their child's allowance based on their performance.

  • When working with ratios, make sure to understand the meaning of the ratio and how it applies to the problem.
  • Use proportions to solve for unknown values.
  • Check your work by plugging in the values to ensure that the solution is correct.
  • Q: What is the ratio 6:5? A: The ratio 6:5 means that for every 6 units of the original amount, Jannie's mother will increase it by 5 units.
  • Q: How do I calculate the increase in Jannie's pocket money? A: To calculate the increase, you can set up a proportion using the ratio 6:5.
  • Q: How do I calculate Jannie's new pocket money? A: To calculate Jannie's new pocket money, you can add the increase to the original amount.
  • Q: What is the difference between the original and new pocket money? A: The difference between the original and new pocket money is R125.
  • Q: Can I use this method to calculate the increase in any allowance or salary? A: Yes, you can use this method to calculate the increase in any allowance or salary.