What are the integer solutions to the absolute value inequality |X - 2| ≤ 5?

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Multiple Choice

What are the integer solutions to the absolute value inequality |X - 2| ≤ 5?

To solve the absolute value inequality |X - 2| ≤ 5, we begin by interpreting what this inequality means. An absolute value inequality of the form |A| ≤ B indicates that the expression A is bounded between -B and B. In this case, A is X - 2, and B is 5.

The inequality can be rewritten without the absolute value as two simultaneous inequalities:

-5 ≤ X - 2 ≤ 5.

To solve this, we will break it down into two parts.

First, consider the left part of the inequality:

X - 2 ≥ -5.

Adding 2 to both sides gives:

X ≥ -3.

Next, consider the right part of the inequality:

X - 2 ≤ 5.

Adding 2 to both sides gives:

X ≤ 7.

Now we can combine these two results:

-3 ≤ X ≤ 7.

This indicates that X can take on any integer value from -3 to 7, inclusive. The integer solutions within this specified range are -3, -2, -1, 0, 1, 2, 3, 4, 5, 6, and 7.

This set of

What are the integer solutions to the absolute value inequality |X - 2| ≤ 5?

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 integer solutions to the absolute value inequality |X - 2| ≤ 5?

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