Factoring by Substitution

Factoring by substitution is a technique used to factorize a given quadratic expression by making a substitution that simplifies the expression into a form that can be easily factored. This method is particularly useful when the quadratic expression is not easily factorable using traditional methods such as factoring by grouping or trial and error.

Step-by-Step Guide for Factoring by Substitution

Identify the Quadratic Expression: Start by identifying the given quadratic expression that you want to factorize.
Make a Substitution: Let a new variable equal to a portion of the original expression. For example, if the expression is in the form \(ax^2 + bx + c\), let \(u = x^2\) to simplify the expression.
Factor the Substituted Expression: Factor the substituted expression using any suitable factoring method such as difference of squares, perfect square trinomial, or grouping.
Replace the Substituted Variable: Replace the substituted variable with the original variable to obtain the factored form of the original quadratic expression.

Example:

Factor the quadratic expression \(4x^2 + 12x + 9\) using substitution.

Solution:

Identify the Quadratic Expression: The given quadratic expression is \(4x^2 + 12x + 9\).
Make a Substitution: Let \(u = 4x^2\) to simplify the expression.
Factor the Substituted Expression: The substituted expression \(u + 12x + 9\) can be factored as \((u + 9)(u + 1)\).
Replace the Substituted Variable: Replace \(u\) with \(4x^2\) to obtain the factored form: \((4x^2 + 9)(4x^2 + 1)\).

By following the steps above, the quadratic expression \(4x^2 + 12x + 9\) has been factored using substitution.