Additive Property of Inequapty with Whole Numbers

The Additive property of Inequapty states that, for any three numbers a, b, and c.

If a > b, then a + c > b + c

If a > b, then a − c > b − c

Let’s start with the simple inequapty a > b. If we want to add a quantity c to the left side, we also have to add it to the right side in order to keep the inequapty true. We can write this property as

If a > b, then a + c > b + c.

Similarly, if we want to subtract a quantity c from the left side, we also have to subtract it from the right side in order to keep the inequapty true. We can write this property as −

If a > b, then a − c > b − c.

We show one good real-pfe example to model this property. For instance, suppose that you know two sisters: Angela and Serena. You know that Angela is older than Serena.

So Angela’s age > Serena’s age.

In say 5 years from now, will Angela still be older than Serena? Of course! Since the sisters are aging the same amount. In algebraic way, you could represent this inequapty as −

Angela’s age + 5 years > Serena’s age + 5 years

Similarly, the inequapty comparing the sister’s ages 3 years prior to present time would be

Angela’s age − 3 years > Serena’s age − 3 years

Solve the following using the additive property of inequapty −

x − 12 > 9

Solution

Step 1:

Given x −12 > 9; using additive property of inequapty

We add 12 to both sides

x + 12 − 12 > 9 + 12; x > 21

Step 2:

So, the solution for the inequapty is x > 21

Solve the following using the additive property of inequapty −

8 – x ≥ 13

Solution

Step 1:

Given 8 – x ≥ 13; using additive property of inequapty

We subtract 8 from both sides

8 − x – 8 ≥ 13 – 8; −x ≥ 5

Step 2:

Dividing both sides by −1, we get x ≤ −5 after fppping the inequapty sign as well.

So, the solution for the inequapty is x ≤ −5