711. x = −1 or x = −7
The absolute value equation 3|x + 4| − 2 = 7 needs to be rewritten before applying the equivalency involving linear equations.
First add 2 to each side to isolate the absolute value expression on the left; you get 3|x + 4| = 9. Next divide each side of the equation by 3 to get |x + 4| = 3.
The absolute value equation is equivalent to the two linear equations x + 4 = 3 and x + 4 = −3.
Adding −4 to each side of the two equations, you get x = −1 and x = −7, respectively.
712. 
The absolute value equation is equivalent to the two linear equations −3x = 4 and −3x = −4. Dividing each side of the two equations by −3, you get x = 
or x = 
, respectively.
713. x = −9 or x = 6
The absolute value equation is equivalent to the two linear equations −2x − 3 = 15 and −2x − 3 = −15.
Solving the first equation, you add 3 to each side of the equation to get −2x = 18. Dividing each side of the equation by −2, you have x = −9.
Solving the second equation, you add 3 to each side of the equation to get −2x = −12. Dividing each side by −2, you have x = 6.
714. No solution
The absolute value equation |3x − 2| + 4 = 1 needs ...
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