How to solve absolute value equations - Algebra 1

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Question

Solve the absolute value equation:

$\left | \frac{x-4}{3} \right| = \left | x +2 \right|$

Answer

An equation that equates two absolute value functions allows us to choose one of the absolute value functions and treat it as the constant. We then separate the equation into the "positive" version, $\tiny \small \frac{x-4}{3}=x+2$ , and the "negative" version, $\tiny \small \frac{x-4}{3} = -(x+2)$ . Solving each equation, we obtain the solutions, and $\tiny \tiny -\frac{1}{2}$ , respectively.

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Question

Solve for x.

Answer

First, split into two possible scenarios according to the absolute value.

Looking at , we can solve for x by subtracting 3 from both sides, so that we get x = 1.

Looking at , we can solve for x by subtracting 3 from both sides, so that we get x = –7.

So therefore, the solution is x = –7, 1.

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Question

Find the solution to x for |x – 3| = 2.

Answer

|x – 3| = 2 means that it can be separated into x – 3 = 2 and x – 3 = –2.

So both x = 5 and x = 1 work.

x – 3 = 2 Add 3 to both sides to get x = 5

x – 3 = –2 Add 3 to both sides to get x = 1

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Question

Solve for x:

$\small \left | x+2 \right |=12$

Answer

Because of the absolute value signs,

$\small x+2=12$ or $\small x+2=-12$

Subtract 2 from both sides of both equations:

$\small x+2-2=12-2$ or $\small x+2-2=-12-2$

$\small x=10$ or $\small x=-14$

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Question

Solve for :

$|x-4|=\frac{5}{8}$

Answer

$|x-4|=\frac{5}{8}$

There are two answers to this problem:

$x-4=\frac{5}{8}$

$x=\frac{5}{8}+4=4\frac{5}{8}$

and

$-(x-4)=\frac{5}{8}$

$4-x=\frac{5}{8}$

$-x=\frac{5}{8}-4=-3\frac{3}{8}$

$x=-3\frac{3}{8}$

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Question

If , evaluate $\left | -4x + 3\right | \left | 3x-14\right |$ .

Answer

An absolute value expression differs from a normal expression only in its sign. Instead of being a positive or negative quantity, an absolute value represents a scalar distance from zero, so it does not have a sign. For example, $\left | -2\right |$ is the same as $\left | 2\right |$ because both represent a value 2 units away from zero. In this problem, $\left | -4x + 3\right |$ equals $\left | -5 \right |$ , or 5. $\left | 3x - 14\right |$ equals 8. The final answer is or 40.

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Question

$Find ; all ;solutions; for;x ; in ;\left | 5x+3\right |-3=0$

Answer

$\left | 5x+3\right |-3=0$

$\left | 5x+3\right |=3$

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Question

$\textup{If }\left | 2a-4\right |=8,\textup{, what are all possible values of }a\textup{?}$

Answer

$\textup{Set up two equations for absolute value equations:}$

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Question

What is the solution set of this equation?

$\left | 3x-7\right |+7 = -6$

Answer

$\left | 3x-7\right |+7 = -6$

To find a solution, subtract first to isolate the absolute value expression.

$\left | 3x-7\right | = -13$

There is no value of that makes this true, as no number has a negative absolute value. The equation has no solution.

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Question

Solve the following for :

Answer

When we take the absolute value of anything, we will always end with a positive number. So, to clear the absolute value bars, we can split this into two seperate equations. Rather than

$\left | x+2 \right |=5$

we can set two equations of

or

Our first equation, is fairly straightforward so in this equation .

Our second equation is simple to understand once we factor the minus sign. So

becomes

So add 2 to both sides. We get

Multiply both sides by , and we see that

So, since the absolute value sign means both our equations are true, $x=3\ or\ -7$

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Question

Solve for:

$\left | 3x+9\right |=12$

Answer

Absolute value tells you how far away a number is from 0 on the number line, so you will have to find both negative and positive values to solve this absolute value equation. To do so, you must set up two different equations.

The first one will be the positive absolute value:

.

The second one will be the "negative" absolute value. You simply add a negative sign to the left side of the equation:

Then, you solve each equation separately, leaving you with two possible answers for the value of .

or

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Question

Solve for :

$\left | 4x+19 \right | = 31$

Answer

$\left | 4x+19 \right | = 31$ can be rewritten as the compound statement:

or

Solve each separately to obtain the solution set:

$4x \div 4= -50 \div 4$

$4x \div 4= 12 \div 4$

So either or

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Question

Solve for :

$\left | 4x-19 \right | = 31$

Answer

$\left | 4x-19 \right | = 31$ can be rewritten as the compound statement:

or

Solve each separately to get the solution set:

$4x \div 4= -12 \div 4$

$4x \div 4= 50 \div 4$

So either or

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Question

Solve for :

$\left | 2x-7 \right | -15 = -6$

Answer

First, isolate the absolute value expression on one side.

$\left | 2x-7 \right | -15 = -6$

$\left | 2x-7 \right | -15 + 15= -6 + 15$

$\left | 2x-7 \right | =9$

Rewrite this as the compound statement:

or

Solve each equation separately:

$2x\div 2 = -2 \div 2$

$2x\div 2 = 16 \div 2$

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Question

Solve for :

Answer

Rewrite as a compound statement:

or

Solve each separately:

$-3x \div (-3) = -57 \div (-3)$

$-3x \div (-3) = 27 \div (-3)$

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Question

Solve for :

Answer

The absolute value of a number can never be a negative number. Therefore, no value of can make a true statement.

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Question

Solve for :

Answer

Rewrite as a compound statement:

or

Solve each separately:

$5x \div 5 = -50 \div 5$

$5x \div 5 = 80 \div 5$

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Question

Solve for .

Answer

The equation involves an absolute value. First, we need to rewrite the equation with no absolute value.

$x+3=\pm 1$

We can split this equation into two possible equations.

Equation 1:

Equation 2:

With two equations, there are two values for . Let's start with Equation 1.

Subtract from both sides.

That's the first value for . To get the second value for , we need to repeat the steps, but with Equation 2.

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Question

Solve for :

Answer

The absolute value of a number can never be a negative number. Therefore, no value of can make a true statement.

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Question

Solve for :

$\left | 2x +1 \right |=7$

Answer

Absolute value is a function that turns whatever is inside of it positive. This means that what's inside the function, , might be 7, or it could have also been -7. We have to solve for both situations.

a. subtract 1 from both sides

divide both sides by 2

b. subtract 1 from both sides

divide both sides by 2

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