Pre-Calculus - Solve Absolute Value Inequalities

Solve for

$3 \left | x-6\right |<21$

Explanation

In order to solve this equation, we must first isolate the absolute value. In this case, we do it by dividing both sides by which leaves us with:

$\left | x-6\right |<7$ $\left | x-6 \right|< 7$

When we work with absolute value equations, we're actually solving two equations. So, our next step is to set up these two equations:

and

In both cases we solve for by adding to both sides, leaving us with

and

This can be rewritten as

Solve for

$\left | 4x-2\right |<10$

Explanation

When we work with absolute value equations, we're actually solving two equations:

and

Adding to both sides leaves us with:

and

Dividing by in order to solve for allows us to reach our solution:

and

Which can be rewritten as:

Solve the following inequality:

$2+3\left | x+4\right |<17$

$x>9 \ or \ x<-1$

$x< 9 \ or \ x<-1$

Explanation

$2+3\left | x+4\right |<17$

First we need to get the expression with the absolute value sign by itself on one side of the inequality. We can do this by subtracting two from both sides then dividing everything by three.

$3\left | x+4\right |<15$

$\left | x+4\right |<5$

Since absolute value signs make both negative and positive values positive we need to set up a double inequality.

Now to solve for subtract four from each side.

$4\left | \frac{x-1}{2} \right |\geq 16$

$-7\geq x\geq 9$

$7\geq x\geq -9$

$-7\geq x\geq 11$

$0\geq x\geq 9$

$-7\geq x\geq 18$

Explanation

To solve absolute value inequalities, you have to write it two different ways. But first, divide out the 4 on both sides so that there is just the absolute value on the left side. Then, write it normally, as you see it: $\frac{x-1}{2}\geq 4$ and then flip the side and make the right side negative: $\frac{x-1}{2}\leq -4$ . Then, solve each one. Your answers are $x\geq 9$ and $x\leq -7$ .

Solve for .

$5\left | \frac{x}{2} +4\right |<10$

Explanation

Our first step in solving this equation is to isolate the absolute value. We do this by dividing both sides by

$|\frac{x}{2}+4|<2$ .

We then set up our two equations:

$\frac{x}{2}+4<2$ $\frac{x}{2}+4<2$ and $\frac{x}{2}+4>-2$ $\frac{x}{2}+4>-2$ .

Subtracting 4 from both sides leaves us with

$\frac{x}/{2} <-2$ $\frac{x}{2}<-2$ and $\frac{x}{2}>-6$ $\frac{x}{2} >-6$ .

Lastly, we multiply both sides by 2, leaving us with :

and .

Which can be rewritten as:

Solve the following absolute value inequality:

$3\left | \frac{2x}{5} +7\right |>18$

$-32.5>x \ or -2.5< x$

$-32.5>x \ or -2.5> x$

$-32.5< x \ or -2.5< x$

$32.5>x \ or -2.5< x$

Explanation

$3\left | \frac{2x}{5} +7\right |>18$

First we need to get the expression with the absolute value sign by itself on one side of the inequality. We can do this by dividing both sides by three.

$\left | \frac{2x}{5} +7\right |>6$

We now have two equations:

$\frac{2x}{5} +7>6$ and $-6> \frac{2x}{5} +7$

$\frac{2x}{5} >-1$ $-13> \frac{2x}{5}$

$x>-\frac{5}{2}$ $-\frac{65}{2}> x$

So, our solution is $-32.5>x \ or -2.5< x$

Solve for

$2\left | 3x-5\right |>46$

$x> \frac{28}{3} \text{ or } x<-6$

$x< \frac{28}{3} \text{ or } x>-6$

Explanation

In order to solve for we must first isolate the absolute value. In this case, we do it by dividing both sides by 2:

$\left | 3x-5\right |>23$

As with every absolute value problem, we set up our two equations:

and

We isolate by adding to both sides:

and

Finally, we divide by :

$x>\frac{28}{3}$ and

Solve for

$4\left | 5x+8\right |-2<22$

$-\frac{14}{5}<x<-\frac{2}{5}$

$-\frac{3}{5}<x<-\frac{2}{5}$

$-\frac{14}{5}<x<-\frac{3}{5}$

Explanation

We first need to isolate the absolute value, which we can do in two steps:

1. Add 2 to both sides:

$4\left | 5x+8\right |<24$

2. Divide both sides by 4:

$\left | 5x+8\right |<6$

Our next step is to set up our two equations:

and

We can now solve the equations for by subtracting both sides by 8:

and

and then dividing them by 5:

$x<-\frac{2}{5}$ and $x>-\frac{14}{5}$

Which can be rewritten as:

$-\frac{14}{5}<x<-\frac{2}{5}$

Solve the absolute value inequality.

$-3\left | 2x-1\right |+6<15$

Explanation

First, simplify so that the absolute value function is by itself on one side of the inequality.

Note that the symbol flipps when you divide both sides by .

Next, the two inequalities that result after removing the absolute value symbols are

and .

When you simplify the two inequalities, you get

and .

Thus, the solution is

Solve the following absolute value inequality:

$7+\left | 4x+13\right |<36$

Explanation

$7+\left | 4x+13\right |<36$

First we need to get the expression with the absolute value sign by itself on one side of the inequality. We can do this by subtracting seven from both sides.

$\left | 4x+13\right |<29$

Next we need to set up two inequalities since the absolute value sign will make both a negative value and a positive value positive.

From here, subtract thirteen from both sides and then divide everything by four.

Solve Absolute Value Inequalities

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