10.2 Solving quadratic equations by factoring

Elementary algebra Page 1 / 1

This module is from Elementary Algebra</link>by Denny Burzynski and Wade Ellis, Jr. Methods of solving quadratic equations as well as the logic underlying each method are discussed. Factoring, extraction of roots, completing the square, and the quadratic formula are carefully developed. The zero-factor property of real numbers is reintroduced. The chapter also includes graphs of quadratic equations based on the standard parabola, y = x^2, and applied problems from the areas of manufacturing, population, physics, geometry, mathematics (numbers and volumes), and astronomy, which are solved using the five-step method.Objectives of this module: be able to solve quadratic equations by factoring.

Overview

Factoring Method
Solving Mentally After Factoring

Factoring method

To solve quadratic equations by factoring, we must make use of the zero-factor property.

Set the equation equal to zero, that is, get all the nonzero terms on one side of the equal sign and 0 on the other.

$a x^{2} + b x + c = 0$
Factor the quadratic expression.

$() () = 0$
By the zero-factor property, at least one of the factors must be zero, so, set each of the factors equal to 0 and solve for the variable.

Sample set a

Solve the following quadratic equations. (We will show the check for problem 1.)

$\begin{array}{l} x^{2} - 7 x + 12 & = & 0. & \begin{array}{l} The equation is already \\ set equal to 0 . Factor . \end{array} \\ (x - 3) (x - 4) & = & 0 & Set each factor equal to 0 . \\ x - 3 & = & 0 & or & x - 4 & = & 0 \\ x & = & 3 & or & x & = & 4 \end{array}$
$\begin{array}{l} C h e c k : If x = 3, x^{2} - 7 x & + & 12 & = & 0 \\ 3^{2} - 7 \cdot 3 & + & 12 & = & 0 & Is this correct? \\ 9 - 21 & + & 12 & = & 0 & Is this correct? \\ 0 & = & 0 & Yes, this is correct . \end{array}$

$\begin{array}{l} C h e c k : If x = 4, x^{2} - 7 x & + & 12 & = & 0 \\ 4^{2} - 7 \cdot 4 & + & 12 & = & 0 & Is this correct? \\ 16 - 28 & + & 12 & = & 0 & Is this correct? \\ 0 & = & 0 & Yes, this is correct . \end{array}$
Thus, the solutions to this equation are $x = 3, 4.$

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10.2 Solving quadratic equations by factoring

Overview

Factoring method

Sample set a

Practice set a

Solving mentally after factoring

Sample set b

Practice set b

Exercises

Exercises for review

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