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# The Definition of an Absolute Value

For students who study mathematics, there are many courseworks that you need to complete to prove your knowledge and get high grades. For example, your professors may ask you to complete different academic assignments about an absolute value. This means that you should know how to find the absolute value of a number with ease because the theory behind it is quite significant when it comes to solving equations. It’s all about measuring how far a given number is from 0, so think about a number line that has zero in its center and ask yourself how far away you’re from this point. Many students don’t like mathematics, and if you’re one of them, take into consideration a number of effective tips and the services, including essay editing, offered by qualified freelancers who are easy to find online because they are quite affordable and of the highest quality.

In mathematics, when it comes to real numbers, it should be their non-negative value regardless of a sign. For instance, the absolute value of both 3 and -3 is 3, and you can consider it as a distance from 0. Don’t forget about existing generalization that may take place in a wide range of mathematical settings. You can define it for complex numbers, ordered rings, quaternions, vector spaces, and fields too, but remember that this term is closely related to norm, magnitude, and distance notions in different physical and mathematical contexts.

What about history? Argand first introduce a module in 1806, which meant the unit of measure for a complex absolute value, and then this term was borrowed into English, and it’s been utilized in this sense for a certain period of time. Its notation was presented by Weierstrass and it had vertical bars in both sides, but there are other names that describe an absolute value, such as a magnitude and a numerical value. Besides, the same notation can be used with sets if you need to denote cardinality, but its meaning always depends on a specific context.

## The Basic Properties of an Absolute Value

For all real numbers, their absolute values must always be either 0 or positive, but never negative. Take into account the point of view of analytic geometry that determines this term as the distance between 2 real numbers, and the notion of this abstract distance function should be viewed as the generalization of the absolute value of a difference of these numbers.

As a student, you also need to learn more about its important properties, including non-negativity, subadditivity, multiplicativeness, and positive-definiteness. However, there are other interesting properties of an absolute value, such as the following:

• Evenness, which means the reflection symmetry of a given graph.
• Idempotence.
• Triangle inequality (which is equivalent to subadditivity).
• Preserving divisions (similar to multiplicativeness).
• Identity of indiscernibles (or positive-definiteness).

If your math assignments are about the absolute value of complex numbers, you should know that the above-mentioned definition can’t be directly generalized for them because they aren’t ordered. The good news is that it’s still possible to generalize the geometric interpretation of their absolute value. You can define it as a distance in a particular complex place from the original while using the so-called Pythagorean Theorem. If you prefer a more general point of view, keep in mind that it’s all about a difference of 2 complex numbers, which is equal to a distance between them.

When it comes to a real absolute value function, it remains continuous everywhere and it’s differentiable everywhere (the only exception is 0). This means that it gradually reduced on an interval and gradually increased on it. As you already know, real numbers and their opposites have the same absolute value so that it’s an even and not invertible function. Another important fact is that both complex and real functions are idempotent, and this term is closely related to a distance concept.

## Tips on How to Simplify Absolute Values

Any absolute value is the expression of the distance of a given number (variables or expressions) from zero, and it’s always denoted by vertical bars on each side, so everything that you see inside them is called an argument, but these bars can’t function just as brackets or parentheses (make sure that you use them properly).

How to simplify if your argument includes any variable? This question is often asked by those students who are not good in mathematics. If you belong to their group, be sure to consider an argument that is a variable because it’s set equal to a given number to make the whole process fast and easy. An absolute value presents a certain distance from zero, so this variable can be either a positive number that must be equal or its negative version, but there is no way to predict it at the very beginning, and that’s why you need to take into account both possibilities when solving this problem.

If you have any inequality in your academic assignment, it’s required to take further steps, including recognizing absolute value inequalities. Be sure to interpret them to get all numbers that can work and graph a number line. This is when you should tag all points that correspond with the numbers given in your math task. If you’re not sure how to complete it, don’t hesitate to get the professional help of freelancers who can do anything, including the best engineering paper.

The next thing that should be done is paying attention to numbers on the left side of this line. You need to consider 2 possible ranges of numbers because you don’t know if a given variable is negative or positive. Start with taking numbers on the left and make a variable negative to convert an absolute value into parentheses to solve this problem. The same step should be taken with numbers on the right to find the existing intersect of 2 intervals, as this is how you will define where possible solutions overlap.

## Guidelines on Finding the Absolute Value of a Number

You should already know that an absolute value is the distance of a given number from 0 along a number line. According to the fact that it’s always positive because you cannot take negative steps, absolute value s must be positive. Make a number in this value sign positive because it makes all numbers positive in its simplest meaning. Keep in mind that this term is quite useful when you need to measure a distance or find specific values in finances where you have to deal with negative numbers, such as loans or debts.

Be sure to use simple and vertical bars to represent an absolute value, and its notation is quite simple. You also need to drop negative signs on numbers inside its marks, and then drop the latter ones because a number that remains is the right answer. It’s necessary to simplify an expression that you see inside an absolute value sign. When dealing with simple expressions, it’s possible to make them whole positive, but remember that some expressions must be simplified before taking their absolute value. The key idea when solving such math problems is to make everything that can be seen inside it positive. Besides, you always need to use the right order of operations before finding the necessary value. When it comes to determining quite long equations, do everything you can before finding their absolute value. Simplifying them before adding, dividing, or subtracting everything else is a poor idea. You should keep working on your practice issues to get them done successfully, and you’ll understand that an absolute value concept is quite simple. However, you may still face certain problems when dealing with this type of mathematics homework.

## How to Solve Non-Real Absolute Value s

To achieve this goal, the first step is noting all complex equations that you have with some imaginary numbers to solve them all separately. It’s impossible to find the absolute value of these numbers so that you need to plug complex equations into a simple distance formula. Be sure to find the coefficients of these equations and remove the signs of this value from them. The main thing that should be done at this point is finding coefficients, and you need to square them and find a distance by using your distance formula (it must be reviews if you feel confused). When completing this process, remember that squaring numbers can make them positive, thus taking an absolute value effectively.

You also need to add these squared numbers under a radical (it’s a sign used to take a square root). Make sure that you take this root to come up with a final answer, and the main step that should be taken is simplifying given equations. It’s all about finding a distance from a particular point on your imaginary graph 0. If you can’t see any squared root, leave an answer under a radical because it’s legitimate, but don’t forget to try several practice problems and learn how to make a great thesis conclusion for any mathematics coursework to achieve your academic success.

## How to Graph an Absolute Value

The main rule is that this kind of graph shouldn’t be similar to symmetrical V due to important properties of this value. For example, they make the left side of this graph be similar to its right side because they both mirror each other. You should understand that an absolute value can change the value of any number to positive, but the process of graphing its function may turn out to be quite tricky due to its similarity to graphing any linear equation. The good news is that there are only a few basic steps involved in it.

Start with making the T-chart of a given function equation and it should consist of 2 columns for x and y values. You need to choose the number of x values from a wide range to prevent your graph from being too similar to linear equations. The next step is defining corresponding y values from the chosen ones, and it’s easy to take while substituting x values and simplifying. The number that you get as a result is the y value for particular x values. Take a look at a given equation and replace any x with the chosen x value before simplifying it to end up with one number (the result you get will be y). Create a Cartesian plane and plot all points of both y-axis and x-axis (they correspond x and y values). Finally, you need to connect them and search for a symmetrical V-shape, and graphing an absolute value will be completed successfully. One of the most common mistakes done by students during this process is getting all points near each other. To prevent that and get better grades, you need to plot more points toward 1 side to graph the other side.

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