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

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

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

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

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

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

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

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 \(x = 3\)

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

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

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

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

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

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

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

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).

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.