What Does the Solution Set for |x² - 4| < 1 Look Like?

Since |x^2- 4| is a continuous function, there are no other places where it changes from "less than 1" to "greater than 1". So the solution is -sqrt(5)< x< -sqrt(3) or sqrt(3)< x< sqrt(5).
  • #1
fishingspree2
139
0
Hello,

abs(x^2 - 4) < 1

implies that:
x^2 - 4 < 1
and
4 - x^2 < 1

solving first equation for x gives:
-sqrt(5) < x < sqrt(5)

solving second equation for x gives:
-sqrt(3) < x < sqrt(3)

Now, my question is, what does that mean??
How do I give the solution set, without a graphing utility and, if possible, without trial and error?

Thank you
 
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  • #2
Draw the inequalities on two separate number lines. Then just find the intersection of the two(the region which is common to both).
 
  • #3
fishingspree2 said:
Hello,

abs(x^2 - 4) < 1

implies that:
x^2 - 4 < 1
and
4 - x^2 < 1

solving first equation for x gives:
-sqrt(5) < x < sqrt(5)

solving second equation for x gives:
-sqrt(3) < x < sqrt(3)
NO! if 4- x^2< 1, then 3< x^2 so either x> sqrt{3} or x< -sqrt{3}.

Now, my question is, what does that mean??
How do I give the solution set, without a graphing utility and, if possible, without trial and error?

Thank you
In order that |x^2- 4|< 1, you must have both x< -sqrt(3) or x> sqrt(3) and -sqrt(5)< x< sqrt(5). As rockfreak667 said, that is the intersection of the two sets:
-sqrt(5)< x< -sqrt(3) or sqrt(3)< x< sqrt(5).

I would prefer to do this problem in quite a different way: look at the corresponding equation |x^2- 4|= 1. Then either x^2- 4= 1 which leads to x^2= 5 and so x= +/- sqrt(5) or x^2- 4= -1 which leads to x^2= 3 and so x= +/- sqrt(3). But since the function is continuous, the only places it can change from "less than 1" to "greater than 1" is at one of those 4 points where it is "equal to 1".

Those four points divide the line into 5 parts. Check one value of x< -sqrt(5), say 3: If x= 3, |3^2-4|= 5> 1. Check one value of x between -sqrt(5) and -sqrt(3): x= 2. If x= 2 |4- 4|= 0< 1. Check one point between -sqrt(3) and sqrt(3): x= 0. If x= 0 |0- 4|= 4> 1. Check one point between sqrt(3) and sqrt(5): 2. if x= 2, |4- 4|= 0< 1. Finally, check one point larger than sqrt(5): 3. If x= 3, |9- 4|= 5> 1. |x^2- 4|< 1 is satisfied for -sqrt(5)< x< -sqrt(3) and for sqr(3)< x< sqrt(5).
 

Related to What Does the Solution Set for |x² - 4| < 1 Look Like?

What is the definition of absolute value inequality?

Absolute value inequality is an inequality that involves the absolute value of a variable or expression. It is a mathematical statement that compares two quantities and indicates whether one is less than, greater than, or equal to the other.

How do you solve absolute value inequalities?

To solve an absolute value inequality, you must isolate the absolute value expression on one side of the inequality symbol. Then, you must set up two separate equations, one with the positive value of the absolute value expression and one with the negative value. Finally, solve for the variable in both equations and graph the solutions on a number line to find the solution set.

What is the difference between absolute value equations and absolute value inequalities?

The main difference between absolute value equations and absolute value inequalities is that equations have an equal sign, while inequalities have an inequality symbol. This means that equations have only one solution, while inequalities have multiple solutions that must be represented on a number line.

How do you represent the solutions to an absolute value inequality on a number line?

To represent the solutions to an absolute value inequality on a number line, you must first solve for the variable and find the solution set. Then, you plot each solution on the number line, with an open circle for inequalities that use < or > symbols and a closed circle for inequalities that use ≤ or ≥ symbols. Finally, you shade the region between the two solutions to show all possible solutions.

Why are absolute value inequalities important in real-world applications?

Absolute value inequalities are important in real-world applications because they allow us to represent and solve problems that involve quantities that can be either positive or negative. This is useful in many fields, such as physics, economics, and engineering, where variables can have both positive and negative values. Absolute value inequalities also help us understand and analyze relationships between different quantities in a more precise way.

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