The complete method for solving a rational equation is
1. Determine all the values that must be excluded from consideration by finding the values that will produce zero in the denominator (and thus, division by zero). These excluded values are not in the domain of the equation and are called nondomain values.
2. Clear the equation of fractions by multiplying every term by the LCD.
3. Solve this nonfractional equation for the variable. Check to see if any of these potential solutions are excluded values.
4. Check the solution by substitution.
Potential solutions that have been excluded because they make an expression undefined (or produce a false statement for an equation) are called
extraneous solutions. Extraneous solutions are discarded. If there are no other potential solutions, the equation has no solution.
Sample set a
Solve the following rational equations.
Practice set a
Solve the following rational equations.
is extraneous, so no solution.
Sample set b
Solve the following rational equations.
The zero-factor property can be used to solve certain types of rational equations. We studied the zero-factor property in Section 7.1, and you may remember that it states that if
and
are real numbers and that
then either or both
or
The zero-factor property is useful in solving the following rational equation.
Practice set b
Solve the equation
Solve the equation
This equation has no solution.
is extraneous.
Section 7.6 exercises
For the following problems, solve the rational equations.
No solution; 6 is an excluded value.
No solution;
is an excluded value.
For the following problems, solve each literal equation for the designated letter.
Exercises for review
(
[link] ) Write
so that only positive exponents appear.
(
[link] ) Supply the missing word. An slope of a line is a measure of the
of the line.
(
[link] ) Find the product.
(
[link] ) Find the sum.