topic badge
CanadaON
Grade 8

4.01 Linear rules

Lesson

Identifying linear relationships

A relationship between two variables is linear if both of the following conditions are met:

  • a linear equation can be used to relate the two variables
  • the dependent variable changes by a constant amount as the independent variable changes

If we are given the graph of a relationship, it is very easy to see if it forms a straight line or not, but for now we will look at how to identify a linear relationship from either its table of values, or just from its equation.

From a table of values

When determining a relationship between two variables, a table of values can be used to display several values for a given independent variable ($x$x) with corresponding values of the dependent variable ($y$y).

A table of values makes it easy to identify if a relationship is linear or not. If there is a common difference between $y$y values as $x$x changes by a constant amount, then there is a linear relationship.

 

Worked Example

Does the following table of values represent a linear relationship?

$x$x $1$1 $2$2 $3$3 $4$4 $5$5
$y$y $8$8 $16$16 $24$24 $32$32 $40$40

Think: In a linear relationship, the $y$y-value must change by equal amounts as the $x$x-value increases by $1$1. We can see that the $x$x-values in this table of values are increasing by $1$1 each step, so we want to find out if the $y$y-values are changing by equal amounts each step.

DoWe can add an extra row to the bottom of our table of values to show the change in $y$y-value at each step. We can see straight away that the $y$y-value is increasing for each step, but by how much?

$x$x $1$1 $2$2 $3$3 $4$4 $5$5
$y$y $8$8 $16$16 $24$24 $32$32 $40$40


We can see that the $y$y-value always increases by $8$8 as the $x$x-value increases by $1$1. This means the table of values does represent a linear relationship.

Reflect: By comparing the increases in the $y$y-value as the $x$x-value increases by $1$1, we can determine if an equation is linear. 

 

Careful!

The $x$x-values in a table of values might not necessarily increase by $1$1 each step. However, we can still use this method by dividing the increase or decrease in the $y$y-value by the increase in the $x$x-value to find the unit change.

Practice question

Question 1

Consider the relationship between $x$x and $y$y in the table below.

$x$x $1$1 $2$2 $3$3 $4$4 $5$5
$y$y $5$5 $1$1 $-3$3 $-7$7 $-11$11
  1. Is the relationship linear?

    Yes, the relationship is linear.

    A

    No, the relationship is not linear.

    B

Writing rules for relationships

We have looked at writing rules for relationships. When constructing a linear equation from a worded sentence, look for terms such as sum, minus, times, and equals. We can convert the description into a linear equation by using mathematical symbols in the place of words.

 

Linear equations 

All linear relationships can be expressed in the form: $y=mx+c$y=mx+c.

  • $m$m is equal to the change in the $y$y-values for every increase in the $x$x-value by $1$1.
  • $c$c is the value of $y$y when $x=0$x=0.

 

Practice question

Question 2

Consider the relationship between $x$x and $y$y in the table below.

$x$x $1$1 $2$2 $3$3 $4$4 $5$5
$y$y $6$6 $12$12 $18$18 $24$24 $30$30
  1. Which of the following options describes the relationship between $x$x and $y$y?

    The $y$y-value is equal to the $x$x-value plus five.

     

    A

    The $y$y-value is equal to five times the $x$x-value.

    B

    The $y$y-value is equal to six times the $x$x-value.

    C

    The $y$y-value is equal to the $x$x-value.

    D
  2. Write the linear equation that describes this relationship between $x$x and $y$y.

Question 3

The variables $x$x and $y$y are related, and a table of values is given below:

$x$x $1$1 $2$2 $3$3 $4$4 $5$5
$y$y $-2$2 $-4$4 $-6$6 $-8$8 $-10$10
  1. What is the value of $y$y when $x=0$x=0?

  2. Write the linear equation expressing the relationship between $x$x and $y$y.

  3. What is the value of $y$y when $x=-16$x=16?

Question 4

The variables $x$x and $y$y are related, and a table of values is given below:

$x$x $0$0 $1$1 $2$2 $3$3 $4$4 $5$5
$y$y $8$8 $13$13 $18$18 $23$23 $28$28 $33$33
  1. Linear relations can be written in the form $y=mx+c$y=mx+c.

    For this relationship, state the values of $m$m and $c$c:

    $m=\editable{}$m=

    $c=\editable{}$c=

  2. Write the linear equation expressing the relationship between $x$x and $y$y.

  3. What is the value of $y$y when $x=29$x=29?

Outcomes

8.B2.8

Compare proportional situations and determine unknown values in proportional situations, and apply proportional reasoning to solve problems in various contexts.

8.C1.1

Identify and compare a variety of repeating, growing, and shrinking patterns, including patterns found in real-life contexts, and compare linear growing and shrinking patterns on the basis of their constant rates and initial values.

8.C1.2

Create and translate repeating, growing, and shrinking patterns involving rational numbers using various representations, including algebraic expressions and equations for linear growing and shrinking patterns.

8.C4

Apply the process of mathematical modelling to represent, analyse, make predictions, and provide insight into real-life situations.

What is Mathspace

About Mathspace