Name DateWORKSHEET 3.9: SOLVING ABSOLUTE VALUE EQUATIONS
THAT HAVE TWO SOLUTIONS, ONE SOLUTION, OR NO SOLUTION
-------------------------------------------------------------------------------------Follow the guidelines below to solve absolute value equations:- Isolate the absolute value expression.
- If the absolute value equation equals
- A positive number, there are two solutions
- A negative number, the equation has no solution
- Zero, there is one solution
EXAMPLES
Positive number Negative number Zero
|x+ 1 |= 10 | 2 x|=− 2 |x− 3 |= 0
Write two equations. No solution. Write one equation.
x+ 1 = 10 x+ 1 =− 10 x− 3 = 0
x=9andx=− 11 x= 3DIRECTIONS: Solve each equation, if possible, or state if the equation has no solution.
- |x− 3 |= 15 2. |x+ 5 |= 0 3. |y− 2 |=− 3
- |y|− 3 =− 3 5. − 2 |x+ 1 |=− 10 6. | 2 y+ 3 |= 7
- − 3 +|x− 5 |=− 1 8. 2 |x+ 7 |=− 1 9. 2 |x− 1 |= 4
- |x− 5 |+ 12 = 10 11. − 3 |x+ 7 |= 30 12. − 4 |x+ 8 |+ 13 =− 11
CHALLENGE:Write an absolute value equation that has one solution,x=2.105Copyright
©
2011 by Judith A. Muschla, Gary Robert Muschla, and Erin Muschla. All rights reserved.