In today’s post we are going to work with the Rule of Three, direct or inverse, by looking at some sample problems. If you want, before we begin, you can review how to use the Rule of 3.

First of all, we are going to see what is the difference between the Direct Rule of Three and the Inverse Rule of Three (“Inverse Proportion”):

##### Direct Rule of Three:

- When one of the quantities increases, the other quantities increase in the same proportion.

##### Inverse Rule of Three= Inverse Proportion:

- When increasing one quantity, the other decreases in the same proportion.

Now that we’ve cleared up what the Rule of Three for Direct and Inverse Proportion are, let’s take a look at some problems to understand it better.

##### Direct Rule of Three Problems:

*Today we are going to go on a school excursion and we need to make sandwiches for the whole class. If we need 2 loaves of bread to make sandwiches for my 4 siblings, how many loaves of bread will we need in order to make sandwiches for all 24 students in the class?*

The first step is to determine if we need to use the Direct Rule of Three or Inverse Proportion:

- If we make more sandwiches, will we need more loaves of bread?
- Any time that we make more sandwiches, we will need more bread.

So that means that as one quantity increases, the other increases in the same proportion: this problem requires the __Direct Rule of Three__.

Once we know what kind of problem we are dealing with, we can go ahead and solve it:

*Answer: We will need 12 loaves of bread to make sandwiches for 24 students. *

##### Inverse Proportion Problems:

*Last month, it took 3 gardeners 12 hours to fix up the gardens in the city’s main square. This month, the city has a bigger budget and can hire 6 gardeners. Knowing that it took 12 hours to finish the job for 3 gardeners, how much time will it take for 6 gardeners to fix up the gardens?*

The first step is to determine whether the problem requires the Direct Rule of Three or Inverse Proportion:

- If the city hired more gardeners, will it take more or less time to finish the job?
- Having more gardeners will reduce the total time of work.

So, as one quantity increases, the other decreases in the same proportion: we are solving an __Inverse Proportion problem.__

Once we know what kind of problem we are dealing with, we can go ahead and solve it:

*Answer: With 6 gardeners, the gardens will be fixed up in take 6 hours.*

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### Learn More:

- Rule of 3: Direct and Inverse
- Singapore Bar Models for Multiplication and Division
- How to solve addition problems
- Adding With an Unknown Quantity
- Division Problems: Different Models and Examples

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