Algebra II: Linear Equations

Linear Equations

Linear sentences may be equations or inequalities. What they have in common is that the variable has an exponent of 1, which is understood and so never written. They also can be represented on a graph in the form of a straight line.

An equation is a statement that says two mathematical expressions are equal. A linear equation in one variable is an equation with the exponent 1 on the variable. These are also know as first degree equations, because the highest exponent on the variable is 1. All linear equations can eventually be written in the form ax + b = c, where a, b, and c are real numbers and a ≠ 0. It is assumed here that you are familiar with the addition and multiplication properties of equations.

Addition property of equations: If a, b, and c are real numbers and a = b, then a + c = b + c.
Multiplication property of equations: If a, b, and c are real numbers and a = b, then ac = bc.

The goal in solving linear equations is to get the variable isolated on either side of the equation by using the addition property of equations and then to get the coefficient of the variable to become 1 by using the multiplication property of equations.

Example 1: Solve for x: 6(2 x − 5) = 4(8 x + 7)

To isolate the x's on either side of the equation, you can either add –12 x to both sides or add –32 x to both sides.

Multiply each side by

The solution is . This is indicated by putting the solution inside braces to form a set . This set is called the solution set of the equation. You can check this solution by replacing x with in the original equation. The solution set is

Example 2: Solve for

This equation will be made simpler to solve by first clearing fraction values. To do this, find the least common denominator (LCD) for all the denominators in the equation and multiply both sides of the equation by this value, using the distributive property.