Factorising Expressions Quizzes
Visual overview of Factorising Expressions.
Introduction
Factorising expressions is like uncovering the hidden structure within algebra. It means rewriting an expression as a product of simpler factors that multiply to give the original form. This reverses the process of expansion and reveals patterns that make equations easier to solve. Mastering factorisation links multiplication and addition, turning complex expressions into manageable parts.
Example: \(6x+9=3(2x+3)\).
Core Concepts
What is Factorising?
Factorising means expressing a sum or difference as a product. It is the opposite of expanding brackets.
- Expanded form → \(6x+9\)
- Factorised form → \(3(2x+3)\)
Common Factors (Single Bracket Factorisation)
Find the greatest common factor (GCF) of all terms and factor it out.
- \(8x+12=4(2x+3)\)
- \(15a+20b=5(3a+4b)\)
- \(9x^2+6x=3x(3x+2)\)
Factorising with Negative Signs
When the first term is negative, it is often easier to take out a negative factor.
- \(-6x-9=-3(2x+3)\)
- \(-10a+20b=-10(a-2b)\)
Difference of Two Squares
Pattern: \(a^2-b^2=(a+b)(a-b)\)
- \(x^2-9=(x+3)(x-3)\)
- \(4x^2-25=(2x+5)(2x-5)\)
- \(9y^2-16=(3y+4)(3y-4)\)
Factorising Quadratic Trinomials
A quadratic expression has the form \(ax^2+bx+c\). We look for two numbers that multiply to \(a\times c\) and add to \(b\).
Example
Simplify \(x^2+7x+12\).
- Find two numbers that multiply to \(12\) and add to \(7\): \(3\) and \(4\).
- Write: \((x+3)(x+4)\).
Quadratics with a Coefficient of x² ≠ 1
For \(ax^2+bx+c\) where \(a>1\), use grouping or trial pairs of factors.
Example
Simplify \(2x^2+5x+2\).
- Product \(a\times c=4\); numbers adding to \(5\): \(4\) and \(1\).
- Rewrite middle term: \(2x^2+4x+x+2\)
- Group: \((2x^2+4x)+(x+2)\)
- Factor each: \(2x(x+2)+1(x+2)\)
- Final: \((2x+1)(x+2)\)
Factorising with Common Brackets (Grouping)
When terms share a common bracket, take that bracket out as a factor.
- \(3x(x+4)+2(x+4)=(3x+2)(x+4)\)
Special Cases and Perfect Squares
When a quadratic is a perfect square trinomial:
- \(x^2+6x+9=(x+3)^2\)
- \(4x^2-12x+9=(2x-3)^2\)
Worked Examples
Example 1 (Foundation): Common Factor
Factorise \(9x+12\).
- GCF \(=3\)
- \(3(3x+4)\)
Example 2 (Foundation): With Negative Sign
Factorise \(-15x-20\).
- GCF \(=-5\)
- \(-5(3x+4)\)
Example 3 (Higher): Difference of Squares
Factorise \(x^2-49\).
- \((x+7)(x-7)\)
Example 4 (Higher): Quadratic with 1x²
Factorise \(x^2+8x+15\).
- Pairs for 15 that sum to 8 → 3 & 5
- \((x+3)(x+5)\)
Example 5 (Higher): Quadratic with 2x²
Factorise \(2x^2+7x+3\).
- Product \(a\times c=6\); pair \(6,1\)
- \(2x^2+6x+x+3=(2x^2+6x)+(x+3)\)
- \(2x(x+3)+1(x+3)=(2x+1)(x+3)\)
Example 6 (Higher): Grouping with Common Bracket
Factorise \(4x(x-2)+5(x-2)\).
- \((x-2)(4x+5)\)
Common Mistakes
- Not taking out the greatest common factor.
- Forgetting to divide every term by the factor.
- Sign errors when the first term is negative.
- Using incorrect pairs of numbers in quadratics.
- Trying to apply the difference-of-squares rule with a “+” sign.
Applications
- Solving equations by setting each bracket equal to zero.
- Rewriting formulas for simplification or cancellation.
- Understanding the structure of quadratic graphs.
- Simplifying fractions with algebraic numerators and denominators.
Strategies & Tips
- Always factor out any common number or variable first.
- Memorise special patterns: \(a^2-b^2\) and perfect squares.
- For quadratics, test factors of \(a\times c\) that sum to \(b\).
- Check your result by expanding it back out.
- Practise both simple and complex cases until pattern spotting feels natural.
Summary / Call-to-Action
Factorising reveals the hidden structure of algebra. By taking out common factors, recognising squares, and decomposing quadratics, you can simplify, solve, and understand expressions at a deeper level. These methods turn complex algebra into step-by-step reasoning.
- Practise each method—common factor, difference of squares, quadratic.
- Expand back after each attempt to verify accuracy.
- Apply factorisation when solving equations or simplifying fractions.
- Challenge yourself with mixed questions across all patterns.