The factorisation method is a fundamental technique for solving quadratic equations. It is efficient, straightforward, and widely used in algebra. This method allows us to express a quadratic equation as a product of two linear factors and find the values of the variable by applying the Zero Product Property.
What is a Quadratic Equation Root?
A root of a quadratic equation is a value of that satisfies the equation . In general, for to be a root of :
The roots of the equation are also called the zeroes of the quadratic polynomial .
What is Factorisation?
Factorisation involves rewriting a quadratic equation of the form:
as a product of two linear factors:
Where:
- and are coefficients of ,
- and are constants.
Once the equation is factorised, the Zero Product Property is used:
If , then or .
This property enables us to find the values of that satisfy the equation.
Steps to Solve Quadratic Equations by Factorisation
- Write the Equation in Standard Form
Ensure the quadratic equation is written as , where . - Find the Factors
Identify two numbers that:- Multiply to (the product of the first and last coefficients), and
- Add up to (the middle term coefficient).
- Split the Middle Term
Rewrite the middle term using the two numbers found in Step 2. - Group and Factorise
Group the terms into two pairs and factor out the greatest common factor (GCF) from each pair. - Apply the Zero Product Property
Set each factor equal to zero and solve for .
Detailed Examples
Example 1: Solve
Solution:
- Write in standard form.
The equation is already in standard form: . - Find two numbers that multiply to and add to .
The numbers are and . - Split the middle term.
. - Group and factorise.
Group terms: .
Factorise: . - Factorise completely.
. - Solve.
Set each factor to zero:
,
.
Answer: .
Example 2: Solve
Solution:
- Write in standard form.
The equation is already in standard form: . - Find two numbers that multiply to and add to .
The numbers are and . - Split the middle term.
. - Group and factorise.
Group terms: .
Factorise: . - Factorise completely.
. - Solve.
Set each factor to zero:
,
.
Answer: .
Example 3: Solve
Solution:
- Write in standard form.
The equation is already in standard form: . - Find two numbers that multiply to and add to .
The numbers are and . - Split the middle term.
. - Group and factorise.
Group terms: .
Factorise: . - Factorise completely.
. - Solve.
Set each factor to zero:
,
.
Answer: .
Example 4: Solve
Solution:
- Split the middle term into and .
. - Group the terms:
. - Factorise:
. - Combine terms:
. - Solve each factor:
,
.
Answer: .
Example 5: Solve
Solution:
- Split the middle term into and .
. - Group the terms:
. - Factorise:
. - Combine terms:
. - Solve each factor:
,
.
Answer: .
Example 6: Solve
Solution:
- Rewrite the equation in standard form.
Factorise:
. - The roots of the equation are:
. - This root is repeated because the factor appears twice.
Answer: .
Example 7: Dimensions of a Prayer Hall
Find the dimensions of a hall if the quadratic equation governing its breadth is:
.
Solution:
- Factorise:
. - Solve for :
.
Since the breadth cannot be negative, . The length is :
.
Answer: Breadth = , Length = .
Practice Questions
- Solve .
Answer: . - Solve .
Answer: .
Solve .
Answer: .
FAQs
Use other methods like the quadratic formula or completing the square.
Factorisation works best when the quadratic equation can be split into integer factors easily.
Factorisation rewrites a quadratic equation as a product of two linear factors to find the variable’s value
Related Topics
- Introduction to Triangles
- Introduction to Polynomials
- Sum of First n Terms of an AP
- Algebraic Methods of Solving a Pair of Linear Equations
- Inches to Centimeters(cm) Converter
- Roman Numerals
- Ordinal Numbers
- Geometrical Meaning of the Zeroes of a Polynomial
- Differentiation Formulas
- The Fundamental Theorem of Arithmetic
- Area of Triangle
- Mensuration
- Pair of Linear Equations in Two Variables
- Introduction to Arithmetic Progressions
- nth Term of an AP
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