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1.01 Add and subtract integers on a number line

Introduction

We've previously learned about  integers  . Integers are made up of positive and negative whole numbers, as well as the number 0. We also know that integers can be represented visually using a number line.

If we know how to locate integers on a number line, we can then think about how to use the number line to add and subtract with integers.

Let's use the expression 5 - 3 = 2 to represent taking 3 apples from a pile of 5 apples. That expression makes sense.

What if we needed to take away 5 more apples? Does this 3-5 make sense?

It turns out that apple arithmetic is fine for whole numbers, but it isn't good enough for all integers, which include positive and negative numbers. To understand the addition and subtraction of integers we can instead model the arithmetic using arrows on a number line. This will give us a way to move back and forth along the number line, and to make sense of expressions like 3 - 5.

Arrows on the number line - addition

To begin, we can imagine that for every integer on the number line there is an arrow going from 0 to that integer.

For a number line with the positive direction to the right, the positive integers have arrows that point to the right, and the negative integers have arrows that point to the left.

Exploration

Use the applet below to explore how to add integers on the number line:

Loading interactive...
  1. What kind of arrows add together to give 0?

  2. What is the result of adding 0 to any other integer?

The addition of integers can be represented by adding their arrows on the number line. When we combine the lengths and directions of two arrows, we get a third arrow whose length and direction corresponds to an integer.

The image below shows how 6 + 2 = 8 is represented using the addition of arrows on the number line. Can you see how the order of addition does not affect the result?

A number line with a blue arrow from 0 to 6, a green arrow from 6 to 8, and a red arrow from 0 from 8.

What if we want to add a negative integer? We use the same approach, the only difference being that the arrows are pointing in different directions. The image below shows that 4 + \left(-9\right) = -5, which is the same result that we get from \left(-9\right) + 4.

A number line with a blue arrow from 0 to 4, a green arrow from 4 to negative 5, and a red arrow from 0 to negative 5.

The examples above show how we can combine positive and negative integers using addition to produce any other integer we like.

Examples

Example 1

Find the value of -7 + 13.

Worked Solution
Create a strategy

Draw a model with arrows using a number line.

Apply the idea

We start by drawing an arrow for -7 in the number line.

Adding a positive integer means we move to the right. So, to draw the arrow that represents adding 13, we need to count 13 units to the right starting at -7.

Finally, we draw a third arrow which starts at 0 and ends at the tip of the second arrow. This third arrow represents the sum of -7 and 13 which is 6.

\displaystyle -7 + 13 \displaystyle =\displaystyle 6Evaluate
Reflect and check

What if we start by drawing first the arrow that represents 13 then the arrow that represents adding -7?

Notice that when we draw the third arrow that represents the sum, we get the same answer.

This shows that -7 + 13 is the same as 13 + \left( -7 \right). The order of drawing the arrows does not affect the sum.

Idea summary

Integer addition can be represented by adding an arrow to the number line. Combining the length and direction of the two arrows yields a third arrow whose length and direction are integers.

Arrows on the number line - subtraction

Let's go back to our example of 3 - 5, this is actually the same as 3 + (-5) = -2, as shown below. In other words, subtracting 5 is the same as adding the opposite of 5.

A number line with green arrows from 0 to 5,  0 to negative 5, 3 to -2, a blue arrow from 0 to 3 and a red arrow from 0 to -2

Finally, we can use the idea that subtracting a number is the same as adding its opposite to make sense of the expression 7 - (-2). Taking away -2 is the same as adding the opposite of -2, which we can write as 7 + (-(-2)). Now, this number (-(-2) is “the opposite of the opposite of 2”, which we know is just 2. So we have 7 - (-2) = 7 + 2, which gives 9 from our now familiar addition of arrows.

A number line with green, blue and red arrows. Ask your teacher for more information.

Examples

Example 2

Find the value of 3 - (-9).

Worked Solution
Create a strategy

Subtracting a negative integer is the same as adding its opposite.

Apply the idea

We are starting at 3 and we want to subtract -9 from this.

\displaystyle 3 - (-9)\displaystyle =\displaystyle 3 + 9Add its opposite

We start by drawing an arrow to represent 3 and another arrow to representing adding 9 in the number line. Then, we draw a third arrow that represents the sum which is 12.

\displaystyle 3 - (-9)\displaystyle =\displaystyle 12Evaluate
Idea summary

Subtracting a negative integer means moving it to the right, and is the same as adding its opposite integer.

Outcomes

7.NS.A.1

Apply and extend previous understandings of addition and subtraction to add and subtract rational numbers; represent addition and subtraction on a horizontal or vertical number line diagram.

7.NS.A.1.A

Describe situations in which opposite quantities combine to make 0.

7.NS.A.1.B

Understand p+q as the number located a distance |q| from p, in the positive or negative direction depending on whether q is positive or negative. Show that a number and its opposite have a sum of 0 (are additive inverses). Interpret sums of rational numbers by describing real-world contexts.

7.NS.A.1.C

Understand subtraction of rational numbers as adding the additive inverse, p-q=p+(-q). Show that the distance between two rational numbers on the number line is the absolute value of their difference, and apply this principle in real-world contexts.

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