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ZAM.exe is an executable exe file which belongs to the Advanced Malware Protection process which comes along with the Zemana AntiMalware Software developed by Copyright software developer.

If the ZAM.exe process running in the Windows Operating system is important, then you should be careful while deleting it. Sometimes ZAM.exe process might be using CPU or GPU too much. If it is malware or a virus, it might be running in the background.

The .exe extension of the ZAM.exe file specifies that it is an executable file for Windows Operating Systems like Windows XP, Windows 7, Windows 8, and Windows 10.

Malware and viruses are also transmitted through exe files. So we must be sure before running any unknown executable file on our computers or laptops.

Now we will check if the ZAM.exe file is a virus or malware. Whether it should be deleted to keep your computer safe? Read more below.

Let’s check the location of this exe file to determine whether this is legit software or a virus. The location of this file and dangerous rating is.

File Location / Rating: C:Program Files (x86)Zemana AntiMalware

To check whether the exe file is legit you can start the Task Manager. Then click on the columns field and add Verified Signer as one of the columns.

Now, look at the Verified Signer value for ZAM.exe process if it says “Unable to verify” then the file may be a virus.

If the developer of the software is legitimate, then it is not a virus or malware. If the developer is not listed or seems suspicious, you can remove it using the uninstall program.

Based on our analysis of whether this ZAM file is a virus or malware we have displayed our result below.

We also recommend using the Security task manager application to find which processes are unwanted in your Windows computer and can be a security issues. Here is how you can find whether ZAM.exe is a security threat using the Security task manager application.

To remove ZAM.exe from your computer do the following steps one by one. This will uninstall ZAM.exe if it was part of the software installed on your computer.

In order to stop the zam.exe process from running you either have to uninstall the program associated with the file or if it’s a virus or malware, remove it using a Malware and Virus removal tool.

As per the information we have the ZAM.exe is not a Virus or Malware. But a good file might be infected with malware or a virus to disguise itself.

You can find this by opening the Task Manager application (Right-click on Windows Taskbar and choose Task Manager) and clicking on the Disk option at the top to sort and find out the disk usage of ZAM.exe.

You can find this by opening the Task Manager application and finding the ZAM process and checking the CPU usage percentage.

To check ZAM.exe GPU usage. Open the Task Manager window and look for the ZAM.exe process in the name column and check the GPU usage column.

I hope you were able to learn more about the ZAM.exe file and how to remove it. Also, share this article on social media if you found it helpful.

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Quadratics can be defined as a polynomial equation of a second degree, which implies that it comprises a minimum of one term that is squared. It is also called quadratic equations. The general form of the quadratic equation is:

ax² + bx + c = 0

where x is an unknown variable and a, b, c are numerical coefficients. For example, x2 + 2x +1 is a quadratic or quadratic equation. Here, a ≠ 0 because if it equals zero then the equation will not remain quadratic anymore and it will become a linear equation, such as:

bx+c=0

Thus, this equation cannot be called a quadratic equation.

The terms a, b and c are also called quadratic coefficients.

The solutions to the quadratic equation are the values of the unknown variable x, which satisfy the equation. These solutions are called roots or zeros of quadratic equations. The roots of any polynomial are the solutions for the given equation.

The polynomial equation whose highest degree is two is called a quadratic equation or sometimes just quadratics. It is expressed in the form of:

ax² + bx + c = 0

where x is the unknown variable and a, b and c are the constant terms.

Since the quadratic includes only one unknown term or variable, thus it is called univariate. The power of variable x is always non-negative integers. Hence the equation is a polynomial equation with the highest power as 2.

The solution for this equation is the values of x, which are also called zeros. Zeros of the polynomial are the solution for which the equation is satisfied. In the case of quadratics, there are two roots or zeros of the equation. And if we put the values of roots or x on the left-hand side of the equation, it will equal to zero. Therefore, they are called zeros.

The formula for a quadratic equation is used to find the roots of the equation. Since quadratics have a degree equal to two, therefore there will be two solutions for the equation. Suppose ax² + bx + c = 0 is the quadratic equation, then the formula to find the roots of this equation will be:

x = [-b±√(b2-4ac)]/2a

The sign of plus/minus indicates there will be two solutions for x. Learn in detail the quadratic formula here.

Beneath are the illustrations of quadratic equations of the form (ax² + bx + c = 0)

Examples of a quadratic equation with the absence of a ‘ C ‘- a constant term.

Following are the examples of a quadratic equation in factored form

Below are the examples of a quadratic equation with an absence of linear co – efficient ‘ bx’

There are basically four methods of solving quadratic equations. They are:

Suppose if the main coefficient is not equal to one then deliberately, you have to follow a methodology in the arrangement of the factors.

Example:

2x²-x-6=0

(2x+3)(x-2)=0

2x+3=0

x=-3/2

x=2

Learn more about the factorization of quadratic equations here.

Let us learn this method with example.

Example: Solve 2x2 – x – 1 = 0.

First, move the constant term to the other side of the equation.

2x2 – x = 1

Dividing both sides by 2.

x2 – x/2 = ½

Add the square of half of the coefficient of x, (b/2a)2, on both the sides, i.e., 1/16

x2 – x/2 + 1/16 = ½ + 1/16

Now we can factor the right side,

(x-¼)2 = 9/16 = (¾)2

Taking root on both sides;

X – ¼ = ±3/4

Add ¼ on both sides

X = ¼ ± ¾

Therefore,

X = ¼ + ¾ = 4/4 = 1

X = ¼ – ¾ = -2/4 = -½

To learn more about completing the square method, click here.

For the given Quadratic equation of the form, ax² + bx + c = 0

Therefore the roots of the given equation can be found by:

\(\begin{array}{l}x = \frac{-b \pm \sqrt{b^{2}-4ac}}{2a}\end{array} \)

where ± (one plus and one minus) represent two distinct roots of the given equation.

We can use this method for the equations such as:

x2 + a2 = 0

Example: Solve x2 – 50 = 0.

x2 – 50 = 0

x2 = 50

Taking the roots both sides

√x2 = ±√50

x = ±√(2 x 5 x 5)

x = ±5√2

Thus, we got the required solution.