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Straight line graphs - OCRStraight line graphs

Graphs show the relationship between two variables and are often seen in newspapers and the media. People who work in professions involving maths and science commonly use graphs.

Part of MathsAlgebra

Straight line graphs

The graph of each of these equations is a straight line:

  • \(x = 3\)
  • \(y = 2\)
  • \(y = x\)
  • \(y = -2x\)
  • \(y = 3x - 1\)
  • \(x + y = 3\)
  • \(3x 鈥 4y = 12\)
  • \(y 鈥 2 = 3(x + 4) \)

If an equation can be rearranged into the form \(y = mx + c\), then its graph will be a straight line.

In the above:

\(x + y = 3\) can be rearranged as \(y = 3 鈥 x\) (which can be re-written as \(y = 鈭抶 + 3\));

\(3x 鈥 4y = 12 \) can be rearranged as \(y = \frac{3}{4}x - 3\);

\(y 鈥 2 = 3(x + 4)\) can be rearranged as \(y = 3(x + 4) + 2 \) or \(y = 3x + 14\).

Vertical and horizontal lines

Vertical lines have equations of the form \(x = k\).

Horizontal lines have equations of the form \(y = c\).

Example

Draw the graph of \(x = 3\)

Mark some points on a grid which have an x-coordinate of 3, such as (3, 0), (3, 1), (3, -2).

The points lie on the vertical line \(x = 3\)

Graph showing plot of x=3

Plotting straight line graphs

A table of values can be used to plot straight line graphs.

Example

Draw the graph of \(y = 3x - 1\)

Create a table of values:

x-10123
y\(\begin{array}{l} y = 3x - 1 \\ y = 3 \times -1 - 1 \\ y = -3 - 1 \\ y = -4 \end{array}\)\(\begin{array}{l} 3 \times 0 - 1 \\ = -1 \end{array}\)258
x
-1
0
1
2
3
y
\(\begin{array}{l} y = 3x - 1 \\ y = 3 \times -1 - 1 \\ y = -3 - 1 \\ y = -4 \end{array}\)
\(\begin{array}{l} 3 \times 0 - 1 \\ = -1 \end{array}\)
2
5
8

Plotting the coordinates and drawing a line through them gives:

Graph showing plot of y=3x-1

This is the graph of \(y = 3x - 1\).

Sketching straight line graphs

If you recognise that the equation is that of a straight line graph, then it is not actually necessary to create a table of values.

Just two points are needed to draw a straight line graph, although it is a good idea to do a check with another point once you have drawn the graph.

Example

Draw the graph of \(y = 3x - 1\)

If you recognise this as a straight line then just choose two 鈥榚asy鈥 values of \(x\), work out the corresponding values of \(y\) and plot those points.

When \(x = 0\), \(y = 3 \times 0 - 1 = 鈭1\). Plot (0, 鈭1).

When \(x = 2\), \(y = 3 \times 2 - 1 = 5\). Plot (2, 5).

Drawing the line through (0, -1) and (2, 5) gives the line above.

Example

Draw the graph of \(2x + 3y = 12\).

If you recognise this as a straight line then:

When \(x = 0\), then \(2 \times 0 + 3y = 12\) means \(3y = 12\), so \(y = 4\). Plot (0, 4).

When \(y = 0\), then \(2x + 3 \times 0 = 12\) means \(2x = 12\), so \(x = 6\). Plot (6, 0).

Draw the line through (0, 4) and (6, 0).

A straight line graph that plots the equation 2x + 3y = 12. The line is shown crossing number four on the Y axis and number six on the X axis.

Now check:

The drawn graph passes through (3, 2).

Does (3, 2) satisfy \(2x + 3y = 12?\)

\(2 \times 3 + 3 \times 2 \) does equal 12, so we can be confident that our line is correct.