Multiplying integers
We know how to multiply and divide whole numbers when they are all positive. Now let's look at what happens when negative integers are included in questions. The product is the answer when two numbers are multiplied together.
Your knowledge of times tables will really help you through this chapter, we just need to know what to do when one or more of the numbers we are multiplying or dividing are negative.
Worked example 1
- $4\times5=20$4×5=20
- $16\times10=160$16×10=160
We just need to learn a couple of extra rules to our existing knowledge, to account for negatives.
Worked example 2
- $\left(-4\right)\times5=-20$(−4)×5=−20
- $16\times\left(-10\right)=-160$16×(−10)=−160
In both of the above cases, we can take out a factor of $-1$−1, giving us $-1\times\left(4\times5\right)=-20$−1×(4×5)=−20, and $-1\times\left(16\times10\right)=-160$−1×(16×10)=−160 respectively.
We can see that is does not matter which term is negative when we are finding the product; the product of a negative number and a positive number will always be negative. But what if both numbers are negative?
Worked example 3
- $\left(-4\right)\times\left(-5\right)=20$(−4)×(−5)=20
- $\left(-16\right)\times\left(-10\right)=160$(−16)×(−10)=160
In these cases, we can think of it as taking out two factors of $-1$−1.
So $\left(-4\right)\times\left(-5\right)=\left(-1\times-1\right)\times\left(4\times5\right)=1\times20=20$(−4)×(−5)=(−1×−1)×(4×5)=1×20=20
Worked example 4
Find $\sqrt{25}$√25.
We know that $5^2=25$52=25, so it makes sense that $\sqrt{25}=5$√25=5. However using the above rule, we now know that: $-5\times-5=(-5)^2=25$−5×−5=(−5)2=25. So this means that $\sqrt{25}=-5$√25=−5 as well. So:
| $\sqrt{25}$√25 | $=$= | $5$5 and $-5$−5 | |
| $=$= | $\pm5$±5 |
$\pm5$±5 reads as "plus minus five", so we are including both the positive and negative fives in the answer. |
Dividing integers
As division is just the opposite of multiplication, the rules for dividing by integers are the same as the rules for multiplying integers.
Worked example 5
- $20\div5=4$20÷5=4
- $160\div10=16$160÷10=16
To account for negatives, we can follow the same rules as we did when multiplying with integers.
Worked example 6
- $20\div\left(-5\right)=-4$20÷(−5)=−4
- $\left(-160\right)\div10=-16$(−160)÷10=−16
Again, in both cases, we can take out a negative factor of $-1$−1, giving us $\frac{1}{-1}\times\frac{20}{5}=-4$1−1×205=−4, and $\frac{-1}{1}\times\frac{160}{10}=-16$−11×16010=−16 respectively.
As before, we can see that is does not matter which term is negative when we are finding the quotient; the quotient of two numbers, when one is negative, will always be negative. But what if both numbers are negative?
Worked example 7
- $\left(-20\right)\div\left(-5\right)=4$(−20)÷(−5)=4
- $\left(-160\right)\div\left(-10\right)=16$(−160)÷(−10)=16
Like with multiplying two negatives, we can think of it as taking out two factors of $-1$−1.
So $\left(-20\right)\div\left(-5\right)=\frac{-1}{-1}\times\frac{20}{5}=1\times4=4$(−20)÷(−5)=−1−1×205=1×4=4.
Practice questions
Question 1
Evaluate $5\times\left(-9\right)$5×(−9)
Question 2
Evaluate $\left(-20\right)\div4$(−20)÷4
Question 3
Evaluate $\left(-6\right)^3$(−6)3