topic badge

1.04 Multiply and divide integers

Introduction

We have looked at how to multiply whole numbers when they are positive. Now let's look at what happens when negative integers are included in questions. Remember that the product is the answer when two numbers are multiplied together.

Multiplication of integers

Exploration

The applet below allows us to select two integers to multiply by using the sliders to change the value and the check boxes to change the sign.

  • Blue tiles represent positive integers.

  • Orange tiles represent negative integers.

  • The product is shown as an array.

Loading interactive...
  1. What is the sign of the product of two positive integers?
  2. If you are looking at the product 3 \times \left(-4\right), how many tiles are in 3 groups of -4 tiles?
  3. What is the sign of the product of one positive and one negative integer?
  4. Is the product of 3 \times \left(-4\right) the same as -4 \times 3? Check this for other products.
  5. What is the sign of the product of two negative integers?

The product of two positive integers will result in a positive number, which is the same as that of two negative integers. In comparison, the product of one positive and one negative integer will result in a negative number.

Unlike adding and subtracting integers, where we can use the number line or counters, multiplication comes down to looking at the sign of factors.

A positive times a positive equals a positive.

We have seen that the product of two positive integers is a positive number.

A positive times a negative equals a negative. A negative times a positive equals a negative.

The product of a positive integer and a negative integer is a negative number.

A negative times a negative equals a positive.

The product of two negative integers is a positive number.

If we are working with integers, we just need to determine what the sign will be, and then we can multiply the absolute values of the integers as we already know how to do.

Examples

Example 1

Find the value of: -4 \times 5

Worked Solution
Create a strategy

Determine the sign of the product, then multiply the absolute value of -4 and 5.

Apply the idea

The sign of the product is negative because we are multiplying a negative and a positive integer.

\displaystyle |-4| \times |5|\displaystyle =\displaystyle 4 \times 5Evaluate the absolute value
\displaystyle =\displaystyle 20Evaluate

We determined that the sign of the product should be negative, so the answer is -20.

Example 2

Find the value of: -7 \times (-5)

Worked Solution
Create a strategy

We have the product of two negative integers, so the product will be positive.

Apply the idea
\displaystyle -7 \times (-5)\displaystyle =\displaystyle 35Evaluate
Idea summary
A positive times a positive equals a positive.

We have seen that the product of two positive integers is a positive number.

A positive times a negative equals a negative. A negative times a positive equals a negative.

The product of a positive integer and a negative integer is a negative number.

A negative times a negative equals a positive.

The product of two negative integers is a positive number.

If we are working with integers, we just need to determine what the sign will be, and then we can multiply the absolute values of the integers as we already know how to do.

Division of integers

The same principles that help us to multiply integers also apply to divide.

Exploration

Check that the rules for multiplication also work for division using the applet below.

The applet allows you to select two integers. The horizontal slider selects the divisor, the vertical slider selects the quotient, and the checkboxes change the sign of the integers.

  • Blue tiles represent positive integers.
  • Orange tiles represent negative integers.
  • The dividend is shown as an array.
Loading interactive...
  1. What is the sign of the quotient of two positive integers?
  2. What is the sign of the quotient of two negative integers?

Same with multiplication, the quotient of two positive integers will result in a positive number, and it is also the same as the quotient of two negative integers. In comparison, the quotient of one positive and one negative integer will result in a negative number. The only difference between multiplication and division is that the division of two integers does not always results in another integer.

A positive divided by a positive equals a positive.

We have seen that the quotient of two positive integers is a positive number.

A positive divided by a negative equals a negative. A negative divided by a positive equals a negative.

The quotient of a positive integer and a negative integer is a negative number.

A negative divided by a negative equals a positive.

The quotient of two negative integers is a positive number.

Examples

Example 3

Find the value of: 48 \div (-6)

Worked Solution
Create a strategy

We have the quotient of one positive and one negative number, so the quotient will be negative.

Apply the idea
\displaystyle 48 \div (-6)\displaystyle =\displaystyle -8Evaluate
Reflect and check

We can check if we have determined the correct sign, by using multiplication. Would -8 times -6 equal 48?

Example 4

Evaluate: \dfrac{-60}{-10}

Worked Solution
Create a strategy

We have the quotient of two negative integers, so the quotient will be positive.

Apply the idea
\displaystyle \dfrac{-60}{-10}\displaystyle =\displaystyle 6Evaluate
Reflect and check

We can check if we have determined the correct sign, by using multiplication. Would 6 times -10 equal -60?

Idea summary
A positive divided by a positive equals a positive.

We have seen that the quotient of two positive integers is a positive number.

A positive divided by a negative equals a negative. A negative divided by a positive equals a negative.

The quotient of a positive integer and a negative integer is a negative number.

A negative divided by a negative equals a positive.

The quotient of two negative integers is a positive number.

Outcomes

7.NS.A.2

Apply and extend previous understandings of multiplication and division and of fractions to multiply and divide rational numbers.

7.NS.A.2.A

Understand that multiplication is extended from fractions to rational numbers by requiring that operations continue to satisfy the properties of operations, particularly the distributive property, leading to products such as (-1)(-1) = 1 and the rules for multiplying signed numbers. Interpret products of rational numbers by describing real-world contexts

7.NS.A.2.B

Understand that integers can be divided, provided that the divisor is not zero, and every quotient of integers (with non-zero divisor) is a rational number. If p and q are integers, then -(p/q)=(-p)/q=p/(-q). Interpret quotients of rational numbers by describing real-world contexts.

What is Mathspace

About Mathspace