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Inequalities - EduqasGraphs of inequalities - Higher

Inequalities show the relationship between two expressions that are not equal to one another. Inequalities are useful when projecting profits and breakeven figures.

Part of MathsAlgebra

Graphs of inequalities - Higher

An inequality can be represented graphically as a region on one side of a line.

For example, this graph shows the inequality \(x \textless -1\). This can be seen as there is a dashed line at \(x = \textless -1\), and the region where the \(x\) coordinates are less than 鈭1 is shaded out.

Graph showing the inequality x < -1 and the region where the x coordinates are less than -1 is shaded

Example

Show the region satisfied by the inequality \(-2 \textless x \leq 3\).

Identify the two regions shown by the inequalities. These are \(2 \textless x\) (or \(x \textgreater -2\)) and \(x \leq 3\).

\(x \textgreater -2\): draw a dotted line at \(x = -2\). \(x = -2\) is the graph made by coordinates points where \(x\) is equal to -2, for example (-2, 5), (-2, 4), (-2, 3), (-2, 2) and so on.

\(x \leq 3\): draw a solid line at \(x = 3\). \(x = 3\) is the graph made by coordinate points where \(x\) is equal to 3, for example (3, -4), (3, -3), (3,-2), (3, -1) and so on.

\(x\) is the values in between these two inequalities, so shade this region.

Graph showing the inequalities of x = -2 and x = 3

Question

Show the region satisfied by the inequalities \(-4 \leq y \textless 0\) and \(y \geq x\).