What are the solutions to the absolute value equation |3X - 6| = 27?

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Multiple Choice

What are the solutions to the absolute value equation |3X - 6| = 27?

To solve the absolute value equation |3X - 6| = 27, we start by recognizing that an absolute value equation |A| = B can be rewritten as two separate equations:

3X - 6 = 27

3X - 6 = -27

Now, we can solve each equation.

For the first equation (3X - 6 = 27):

Add 6 to both sides:

3X = 27 + 6

3X = 33

Divide both sides by 3:

X = 11

For the second equation (3X - 6 = -27):

Again, add 6 to both sides:

3X = -27 + 6

3X = -21

Divide both sides by 3:

X = -7

Thus, the solutions to the equation |3X - 6| = 27 are X = -7 and X = 11.

The correct choice contains these values, confirming that the solution set includes both X = -7 and X = 11.

What are the solutions to the absolute value equation |3X - 6| = 27?

Prepare for the BMS Mathematics Academic Team Test. Enhance your skills with challenging quizzes, detailed explanations, and performance analysis. Excel on your exam!

What are the solutions to the absolute value equation |3X - 6| = 27?

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