Use the graph to choose inside or outside the roots
What you will learn
Know the rule, then use it
These are the short notes. Read each one, then check you can use it in the worked example below.
Method
Sketch the parabola: find the roots, then decide which region satisfies the inequality
Factorise the quadratic to find the roots
x² + x − 6 = (x + 3)(x − 2) = 0, so roots are x = −3 and x = 2
Sketch the parabola
Since the coefficient of x² is positive (+1), the parabola is U-shaped (opens upward)
Identify the region where the graph is ABOVE the x-axis (y > 0)
The U-shape is above the x-axis to the LEFT of −3 and to the RIGHT of 2
Watch out
Students write −3 < x < 2 (the region BETWEEN the roots) when the inequality is > 0 and the parabola opens upward
Find the roots, sketch the parabola, then choose the required region.
Solve x² + x − 6 > 0
Factorise the quadratic to find the roots: x² + x − 6 = (x + 3)(x − 2) = 0, so roots are x = −3 and x = 2.
Sketch the parabola: Since the coefficient of x² is positive (+1), the parabola is U-shaped (opens upward).It crosses the x-axis at −3 and 2.
Identify the region where the graph is ABOVE the x-axis (y > 0): The U-shape is above the x-axis to the LEFT of −3 and to the RIGHT of 2.
Write the solution: x < −3 or x > 2. Note: two separate regions, connected by 'or'.
x < −3 or x > 2
Build up to the hardest questions
Do them in order. If you miss a step, read the solution, then redo the question without looking.
WorkedreasoningSolve x² + x − 6 > 0
4 marks4 minsquadratic-inequalities-workedShow solution
Solve x² + x − 6 > 0
- 1.Factorise the quadratic to find the roots: x² + x − 6 = (x + 3)(x − 2) = 0, so roots are x = −3 and x = 2.
- 2.Sketch the parabola: Since the coefficient of x² is positive (+1), the parabola is U-shaped (opens upward).It crosses the x-axis at −3 and 2.
- 3.Identify the region where the graph is ABOVE the x-axis (y > 0): The U-shape is above the x-axis to the LEFT of −3 and to the RIGHT of 2.
- 4.Write the solution: x < −3 or x > 2. Note: two separate regions, connected by 'or'.
x < −3 or x > 2
- M1: factorise the quadratic to find the roots
- M1: sketch the parabola
- M1: identify the region where the graph is above the x-axis (y > 0)
- M1: write the solution
- A1: x < −3 or x > 2
Students write −3 < x < 2 (the region BETWEEN the roots) when the inequality is > 0 and the parabola opens upward.That region is actually below the x-axis (y < 0).Always sketch the parabola — even a rough U-shape takes 5 seconds and prevents this error completely.The sketch tells you whether you want inside the roots or outside the roots.
DiagnosticrecallSolve x² − 16 < 0
1 mark2 minsquadratic-inequalities-q1Show solution
Solve x² − 16 < 0
- 1.Spot the skill: Sketch the parabola: find the roots, then decide which region satisfies the inequality.
- 2.Use the factorise the quadratic to find the roots stage first, then sketch the parabola.
- 3.Keep the final answer visible: −4 < x < 4.
−4 < x < 4
- M1: use the correct sketch the parabola: find the roots, then decide which region satisfies the inequality.for ax² > 0 (positive leading coefficient), the parabola opens upward — it is above the x-axis outside the roots.for ax² < 0, it is below the x-axis between the roots.
- A1: −4 < x < 4
Students write −3 < x < 2 (the region BETWEEN the roots) when the inequality is > 0 and the parabola opens upward.That region is actually below the x-axis (y < 0).Always sketch the parabola — even a rough U-shape takes 5 seconds and prevents this error completely.The sketch tells you whether you want inside the roots or outside the roots.
EasyprocedureSolve x² − 5x + 4 > 0
2 marks3 minsquadratic-inequalities-q2Show solution
Solve x² − 5x + 4 > 0
- 1.Spot the skill: Sketch the parabola: find the roots, then decide which region satisfies the inequality.
- 2.Use the sketch the parabola stage first, then identify the region where the graph is above the x-axis (y > 0).
- 3.Keep the final answer visible: x < 1 or x > 4.
x < 1 or x > 4
- M1: use the correct sketch the parabola: find the roots, then decide which region satisfies the inequality.for ax² > 0 (positive leading coefficient), the parabola opens upward — it is above the x-axis outside the roots.for ax² < 0, it is below the x-axis between the roots.
- A1: x < 1 or x > 4
Students write −3 < x < 2 (the region BETWEEN the roots) when the inequality is > 0 and the parabola opens upward.That region is actually below the x-axis (y < 0).Always sketch the parabola — even a rough U-shape takes 5 seconds and prevents this error completely.The sketch tells you whether you want inside the roots or outside the roots.
MediumreasoningSolve x² − 3x − 10 ≤ 0
3 marks4 minsquadratic-inequalities-q3Show solution
Solve x² − 3x − 10 ≤ 0
- 1.Spot the skill: Sketch the parabola: find the roots, then decide which region satisfies the inequality.
- 2.Use the identify the region where the graph is above the x-axis (y > 0) stage first, then write the solution.
- 3.Keep the final answer visible: −2 ≤ x ≤ 5.
−2 ≤ x ≤ 5
- M1: use the correct sketch the parabola: find the roots, then decide which region satisfies the inequality.for ax² > 0 (positive leading coefficient), the parabola opens upward — it is above the x-axis outside the roots.for ax² < 0, it is below the x-axis between the roots.
- A1: −2 ≤ x ≤ 5
Students write −3 < x < 2 (the region BETWEEN the roots) when the inequality is > 0 and the parabola opens upward.That region is actually below the x-axis (y < 0).Always sketch the parabola — even a rough U-shape takes 5 seconds and prevents this error completely.The sketch tells you whether you want inside the roots or outside the roots.
Hardproblem solvingSolve 2x² − 5x − 3 > 0
3 marks5 minsquadratic-inequalities-q4Show solution
Solve 2x² − 5x − 3 > 0
- 1.Spot the skill: Sketch the parabola: find the roots, then decide which region satisfies the inequality.
- 2.Use the write the solution stage first, then factorise the quadratic to find the roots.
- 3.Keep the final answer visible: x < − or x > 3.
x < − or x > 3
- M1: use the correct sketch the parabola: find the roots, then decide which region satisfies the inequality.for ax² > 0 (positive leading coefficient), the parabola opens upward — it is above the x-axis outside the roots.for ax² < 0, it is below the x-axis between the roots.
- A1: x < − or x > 3
Students write −3 < x < 2 (the region BETWEEN the roots) when the inequality is > 0 and the parabola opens upward.That region is actually below the x-axis (y < 0).Always sketch the parabola — even a rough U-shape takes 5 seconds and prevents this error completely.The sketch tells you whether you want inside the roots or outside the roots.
Exam-stylemulti-stepFind the set of integer values satisfying x² − 6x + 5 < 0
4 marks6 minsquadratic-inequalities-q5Show solution
Find the set of integer values satisfying x² − 6x + 5 < 0
- 1.Spot the skill: Sketch the parabola: find the roots, then decide which region satisfies the inequality.
- 2.Use the factorise the quadratic to find the roots stage first, then sketch the parabola.
- 3.Keep the final answer visible: {2, 3, 4}.
{2, 3, 4}
- M1: use the correct sketch the parabola: find the roots, then decide which region satisfies the inequality.for ax² > 0 (positive leading coefficient), the parabola opens upward — it is above the x-axis outside the roots.for ax² < 0, it is below the x-axis between the roots.
- A1: {2, 3, 4}
Students write −3 < x < 2 (the region BETWEEN the roots) when the inequality is > 0 and the parabola opens upward.That region is actually below the x-axis (y < 0).Always sketch the parabola — even a rough U-shape takes 5 seconds and prevents this error completely.The sketch tells you whether you want inside the roots or outside the roots.
Grade 9 stretchproblem solvingSolve x2 - 2x - 15 ≥ 0.
4 marks7 minsquad-ineq-g9Show solution
Solve x2 - 2x - 15 ≥ 0.
- 1.Factorise the quadratic.
- 2.Find its roots.
- 3.Use the regions outside the roots because the parabola opens upwards.
x ≤ -3 or x ≥ 5
- M1: (x - 5)(x + 3)
- M1: roots -3 and 5
- A1: correct regions
Do not rush straight into arithmetic. Select the relevant method and show a complete chain of working.
Switch between skills
Set a timer and attempt all four questions before opening any answers. This is closer to the way skills appear in a real paper.
1Quadratic inequalities - 2 marksSolve x² − 16 < 0Mark answer
−4 < x < 4
2Algebraic notation and substitution - 2 marksFind t² + 4t when t = −2Mark answer
−4
3Simplifying expressions - 2 marksSimplify 2xy + 3x²y − xy + x²yMark answer
3x²y + xy
4Expanding and factorising - 3 marksFactorise fully 6x² + 9xMark answer
3x(2x + 3)
- I can explain the method for quadratic inequalities.
- I can show clear working without skipping key steps.
- I can avoid this mistake: Students write −3 < x < 2 (the region BETWEEN the roots) when the inequality is > 0 and the parabola opens upward.That region is actually below the x-axis (y < 0).Always sketch the parabola — even a rough U-shape takes 5 seconds and prevents this error completely.The sketch tells you whether you want inside the roots or outside the roots.
This guide follows the Pearson Edexcel GCSE Mathematics 1MA1 specification. Practice questions are original Learnova questions shaped around official content and exam skills.