Math

QuestionSolve 2x48|2x - 4| \leq 8. Choose the correct range for xx from the options given.

Studdy Solution

STEP 1

Assumptions1. The absolute value of a number is its distance from zero on the number line, and is always non-negative. . The inequality x48|x-4| \leq8 can be split into two separate inequalities x48x-4 \leq8 and x48x-4 \geq -8.

STEP 2

Let's solve the first inequality 2x482x-4 \leq8.

STEP 3

To isolate xx, we first add to both sides of the inequality.
2x+8+2x-+ \leq8+

STEP 4

implify the inequality.
2x122x \leq12

STEP 5

Next, we divide both sides of the inequality by2 to solve for xx.
2x2122\frac{2x}{2} \leq \frac{12}{2}

STEP 6

implify the inequality to find the solution.
x6x \leq6

STEP 7

Now, let's solve the second inequality 2x42x-4 \geq -.

STEP 8

To isolate xx, we first add4 to both sides of the inequality.
2x4+48+42x-4+4 \geq -8+4

STEP 9

implify the inequality.
2x42x \geq -4

STEP 10

Next, we divide both sides of the inequality by2 to solve for xx.
2x242\frac{2x}{2} \geq \frac{-4}{2}

STEP 11

implify the inequality to find the solution.
xx \geq -

STEP 12

The solution to the inequality 2x48|2x-4| \leq8 is the intersection of the solutions to the two inequalities 2x482x-4 \leq8 and 2x482x-4 \geq -8. This means that xx must satisfy both inequalities simultaneously.
So, the solution to the inequality is x2x \geq -2 and x6x \leq6.
The correct option is C. x2x \geq -2 and x6x \leq6.

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