9. Solving Absolute Value Equations
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Chapter 1
9.
Solving Absolute Value Equations
Absolute value equations are mathematical expressions that involve the absolute value of a variable. This lesson explores the methods for solving such equations, including algebraic and graphical approaches. It also delves into the properties of equality that are essential for isolating the absolute value expression. Real-world applications are highlighted, such as predicting distances and modeling battery performance. For example, the distance a train is from a village can be modeled using absolute value equations to determine when a smartphone will regain signal. The lesson provides a comprehensive guide for understanding and applying these equations in various scenarios.
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Lesson Settings & Tools
| | 10 Theory slides |
| | 10 Exercises - Grade E - A |
| | Each lesson is meant to take 1-2 classroom sessions |
Solving Absolute Value Equations
Slide of 10
Mathematical models, at times, can predict irrelevant values when describing real-world scenarios. For example, the calculation of a length only makes sense to obtain a non-negative result. Thankfully, this lesson will show how situations that require a positive result can be modeled using the absolute value. Additionally, equations that involve absolute value expressions will be explored.
Catch-Up and Review
Here are a few recommended readings before getting started with this lesson.
- Variable
- Expression
- Number Line
- Solution of an Equation
- Opposite of a Number
- Properties of Equality
- Inverse Operations
- Solving Multi-Step Equations
Here are a few practice exercises before getting started with this lesson.
a Which of the following expressions represents the solution to the equation 3x-4=14?
{"type":"choice","form":{"alts":["x=4","x=5","x=3","x=6"],"noSort":false},"formTextBefore":"","formTextAfter":"","answer":3}
b How many units away is -5 from 0 on the number line?
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c Which two values are at the same distance from 2 on the number line?
{"type":"choice","form":{"alts":["5 and 6","5 and 4","- 1 and 5","- 2 and 4"],"noSort":false},"formTextBefore":"","formTextAfter":"","answer":2}
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Modeling the Performance of a Battery
A university is developing an eco-friendly battery for tablets called Flora, which uses no harmful chemicals for the environment. After running some tests, the following number line describes the results. Fully charged, the point at 10 indicates the average amount of hours a Flora battery lasts. The points at 8 and 12 indicate the minimum and maximum performance times, respectively.
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Why and How to Define an Always Positive Quantity
Think of a mathematical model that needs to predict a strictly positive quantity. Ever wonder exactly how many days until the end of school, but are only given the calendar date? Well, consider a formula that counts the number of days. A date is entered into the formula and the prediction of 20 days away from today is made.
Then, another date is entered, but this time the formula says that it is - 30 days away!
Considering the given information about the formula, try to answer the following questions.
- Since days cannot be negative, what can the minus sign mean here?
- How many days away is this date from today?
- If the formula predicted a value of - x for a specific date, how many days away would it be from today?
- Is there a reasonable way to assign a positive value to every real number in general?
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Absolute Value
The absolute value of a number a is the distance between a and 0 on the number line. It is denoted as |a| and it is always a non-negative value.
The absolute value is defined for any real number. The absolute value of a negative number is its opposite value, while the absolute value of a positive number is equal to itself.
|a| = a &if a≥ 0 - a &if a < 0
Absolute Value Properties
There are several properties and identities that are useful when simplifying expressions or solving equations dealing with absolute values. For any two real numbers a and b, the following relationships and identities hold true.
| Property | Algebraic Representation |
|---|---|
| Non-negativity | |a| ≥ 0 |
| Symmetry | | - a| = |a| |
| Idempotence | ||a|| = |a| |
| Positive-definiteness | |a| = 0 ⇔ a = 0 |
| Identity of Indiscernibles | |a − b| = 0 ⇔ a = b |
| Multiplicativity | |ab| = |a| * |b| |
| Preservation of Division | |a/b|=|a|/|b| if b ≠ 0 |
| Subadditivity | |a + b| ≤ |a| + |b| |
| Triangle Inequality | |a − b| ≤ |a − c| + |c − b| |
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Simplifying Absolute Value Expressions
Practice simplifying absolute value expressions by using the following applet.
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Absolute Value Equations
An absolute value equation is an equation that involves the absolute value of a variable expression. | 2x-8 |=5 Equations of the form |x|=a, where a is a real number greater than zero, can be solved by looking for the numbers x whose distance from 0 in the number line equals a. For example, the solutions of |x|=4 are all values of x that are 4 units away from 0.
Since there are two points on the number line that fulfill this requirement, there are two solutions to the equation |x|=4, namely x=4 and x=- 4. However, solving an absolute value equation, in general, might require a more elaborate and structured approach.
Number of Solutions
Simple absolute value equations of the form |x|=a, can have no, one, or two solutions, depending on the value of a. However, more complex absolute value equations may have more than two solutions.
| Equation | Number of Solutions | Solution(s) |
|---|---|---|
| |x|=- 4 | Zero | No solution |
| |x|=0 | One | 0 |
| |x|=4 | Two | - 4, 4 |
| |x^2-4 |=2 | Four | - sqrt(2), sqrt(2), - sqrt(6), sqrt(6) |
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Solving Absolute Value Equations Algebraically
An absolute value equation can be solved algebraically by first isolating the absolute value expression. Then, consider the two possible cases for the argument inside the absolute value: one where it is positive and one where it is negative. These lead to two separate linear equations, which can be solved independently. The following example will illustrate this process.
|2x+4|-16=0
To solve an absolute value equation, there are four steps to follow.
Absolute value equations can also be solved graphically.
1
Isolate the Absolute Value Expression
expand_more Use the Properties of Equality and inverse operations to isolate the absolute value expression on one side of the equation.
2
Rewrite the Absolute Value Equation as Two Linear Equations
expand_more The absolute value function |x| gives the distance from zero to x, making it positive or zero. For an equation |ax+b|=k, where k≥0, this implies two possible cases. ax+b=k or ax+b=- k Applying this to the absolute value equation rewritten in Step 1 creates two linear equations. 2x+4=16 or 2x+4=-16
3
Solve Each Linear Equation Separately
expand_more Solve each linear equation found in Step 2 separately.
| 2x+4=16 | 2x+4=-16 |
|---|---|
| 2x=12 | 2x=-20 |
| x=12/2 | x=-20/2 |
| x=6 | x=-10 |
4
Combine the Solutions
expand_more The solutions derived from the linear equations satisfy the original absolute value equation, making them solutions to the absolute value equation. Since x=6 and x=-10 are solutions for each linear equation respectively, these are also solutions to the equation |2x+4|-16=0 Equation: &|2x+4|-16=0 Solutions:& x=6 or x=-10
Extra
Negative or Zero Constant TermsAfter writing the absolute value equation in the form |ax+b|=k, where a, b, and k are constants, check the value of k.
- If k<0, there is no solution. The absolute value function always returns a non-negative number, making it impossible for |ax+b| to be negative.
- If k=0, the equation simplifies to |ax+b|=0, which has a single solution given by the linear equation ax+b=0.
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Practice Solving Absolute Value Equations
Practice solving absolute value equations by using the following applet. Indicate which number line represents the solution set of the given equation.
Example
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Using Absolute Value Equations to Model Real Life Situations
Davontay is on a train trip to a school of magic. His smartphone is powered by an eco-friendly battery, but still a young product, it easily loses reception. A vendor notices and gives him hope. She exclaims, "Don't worry, lad. When the train is 60 kilometers near the next wizard village, the phone will get signal. It will last until the train is 60 kilometers past that village."
Davontay looks up to check the train information monitor. He sees that the train is 150 kilometers away from the nearest city and is moving at the speed of 3 kilometers per minute. After how many minutes will his smartphone recover its signal? Assuming that the train does not stop in the next wizard village, for how many minutes will his smartphone stay connected? 
From the diagram, it can be seen that the train needs to cover a distance of 150-60=90 kilometers for the smartphone to recover its signal. By using the speed formula, the time of travel for that distance can be calculated.
Therefore, the phone will recover its signal after 30 minutes. Now, to determine how long it will keep connected, the time the train will take to leave the 60 kilometers proximity from the wizard village should be found. 
As can be seen, the train needs to cover a distance of 150+60=210 kilometers for the smartphone to lose connection again. Now the formula for speed will be used once more. Recall that t was already isolated in the previous calculations. This result will be reused.
Hence, the smartphone will lose connection, once again, after 70 minutes of traveling. Taking into account that it will recover connection after the first 30 minutes, it can be concluded that it will remain connected for 70-30=40 minutes in total. 
Now, the first equation will be solved.
Therefore, one of the solutions to the original absolute value equation is t=70. Now, the remaining equation will be solved.
Consequently, the train will be 60 kilometers away from the city on two occasions. Once, after traveling for 30 minutes while approaching the village. Secondly, after traveling 70 minutes having already passed, and moving away from the village. Therefore, the phone will stay connected for a total of 70-30=40 minutes.
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Hint
The current distance from the train to the village is 150 kilometers, and for each passing minute its distance to the next village is reduced by 3 kilometers. When will the trains distance be equal to 60 kilometers?
Solution
This scenario will be solved using two methods. First, by using a number line, and then, it will be solved through setting up and solving an absolute value equation.
Solving the Example by Using a Number Line
It is helpful to summarize the important information in a diagram. Recall that the train is originally 150 kilometers away from the next wizard village, and the smartphone will only get a signal when the distance of the train from the village is equal to 60 kilometers.
t = d/s
▼
Substitute values and evaluate
t= 70
Solving the Example by Using an Absolute Value Equation
It is known that Davontay's distance from the next village is 150 kilometers. Since the train is moving, his distance is decreasing each minute by 3 kilometers. Using this information, Davontay's distance from the city can be written in terms of the time variable t. distance = 150-3t However, since the distance from the village is a length, it must be a non-negative quantity. This can be be assured by taking the absolute value of the expression. distance = |150-3t| Next, the times when this distance between the train and the city is exactly 60 kilometers should be calculated. This can be done by setting up the following equation. |150-3t| = 60 Since the constant at the right-hand side of the equation is positive, solving the equation is equivalent to solving two individual equations.
150-3t=- 60
t= 70
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Using Absolute Value Equations to Define a Range of Prices
Davontay is stoked to buy this video game console that is energized by an eco-friendly battery — everyone wants one. Davontay has $280 saved for this console, but its average selling price is $350. Shopping online, he uses a search program designed to find discounts. He finds that the differences in prices can be modeled with an absolute value equation.
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Hint
The value on the right-hand side of the equation is positive. Therefore, solving the absolute value equation is equivalent to solving two individual equations.
Solution
First, the absolute value equation will be solved to find the minimum selling price. Note that the absolute value expression is already isolated on the left-hand side of the equation, and the quantity on the right-hand side is positive. Therefore, solving this absolute value equation is equivalent to solving two individual one-step equations.
As has been determined, according to the model, the minimum price at which the console can be purchased online is $305. The difference between the minimum price and what Dylan has saved $285 is $25. Therefore, Davontay needs to save $25 more to be able to buy the game console he has long awaited.
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Using an Absolute Value Equation to Model Battery Performance
A university is developing an eco-friendly battery for tablets called Flora
that uses no harmful chemicals for the environment. After running some tests, the following number line describes the results. Fully charged, the point at 10 indicates the average amount of hours a Flora battery lasts. The points at 8 and 12 indicate the minimum and maximum performance times, respectively.
{"type":"choice","form":{"alts":["|x-10| =2","|x-10| = 8","|x+10| = 2","|x+10| = 12"],"noSort":false},"formTextBefore":"","formTextAfter":"","answer":0}
Hint
What is the distance from the average performance value to the minimum and maximum values? Use this distance to form an absolute value equation.
Solution
To set up an absolute value equation having the required maximum and minimum values as the solutions, it is useful to identify what is the distance from them to the average value on the number line.
As it can be seen from the diagram above, the average value of 10 is two units away from both the minimum and the maximum performance values. Note that the distance of an unknown value x from 10 in a number line can be calculated as a difference of those values. cc if x ≥ 10 & Distance: &x-10 & Example& x = 12 & Distance: &12-10 = 2 if x <10 & Distance: &10-x & Example& x = 8 & Distance: &10-8 = 2 Next, to write the distance in the form of an absolute value expression, the inequalities will be rewritten to have zeros on the right-hand sides resemble the definition for the absolute value of a quantity. x≥ 10 &⇔ x-10≥ 0 [1em] x < 10 &⇔ x-10 < 0 Also, note that 10-x is equivalent to - (x-10). All of these observations can be summarized in the following manner. Distance= x-10 & if x - 10 ≥ 0 - (x-10) & if x - 10 < 0 Notice that this formula for the distance is now very similar to the definition of the absolute value of a number. Therefore, all the previous information imply that the distance for a value x from 10 is |x-10|. Distance=|x -10| Finally, since it is known that the distance to the desired values is 2, the required equation can be set up. 2=|x-10| ⇕ |x-10|=2 Now that the Flora battery has been tested and the performance results can be reported using a formal mathematical expression, the university can let everyone know about Flora to power devices in a cleaner way!
Solving Absolute Value Equations
Exercise 3.1
How many solutions does the equation a|x+b|+c=d have, given the following conditions?
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{"type":"choice","form":{"alts":["Zero solutions","One solution","Two solutions"],"noSort":true},"formTextBefore":"","formTextAfter":"","answer":2}
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Let us start by isolating the absolute value expression. Then we can begin analyzing the number of solutions under the given conditions.
Notice that the variables a, d, and c now appear only on the right-hand side of the equation. |x+b|=d-c/a Now let's review our conditions again. a>0, c=d The first condition we were given tells us that a is a positive number, and the second condition states that c and d have the same value. Recall that the difference of two equal numbers is 0. c = d ⇒ d-c= 0 Now we can substitute 0 for d-c in the fraction on the right-hand side and simplify.
The absolute value of an expression equals 0 only if the expression inside equals 0. Therefore, there is one solution to the equation.
Let's begin with our simplified expression. |x+b|=d-c/a Again, we only need to consider the right-hand side of the equation, as this is where we find a, c, and d. Let's review our conditions. a<0, c>d To analyze the numerator and denominator, we must consider their signs. From the exercise, we know that a<0. Let's rewrite the second condition c>d so that it matches the numerator.
The difference d-c is less than 0, so we know that the numerator is negative. Dividing two negative numbers always gives a positive result. d-c <0 and a<0 ⇒ d-c/a >0 Since the right-hand side is positive, we know that the absolute value expression will have two solutions.
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Solving Absolute Value Equations
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