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In algebra, you might find some equations that have more than one letter. The equations may work out to where the answer for x may actually contain another letter itself. An example of this would be \(5x + 3 = 10y + 18\) You want to solve for x , just like before, so get x by itself on one side of the equation. Subtract 3 from both sides:

Generally, think of what is being done to x and then "undo" it by doing the opposite, and do that on both sides of the equal sign. Take care of all adding and subtracting first, and then do the multiplication and division. Follow the example below. The example shows the steps to get x by itself. The answer to the example problem is x=16.

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To effectively get X by itself in a fraction, it is crucial to understand the components of a fraction. A fraction consists of two parts: the numerator and the denominator. The numerator represents the number of parts we have or the quantity we are considering. It is the top number in a fraction. For example, in the fraction 3/5, the numerator ...

This algebra video teaches how to get the x or whatever variable (letter) all by itself on the side you want it to be on. The key is that you can add, subtr...

Solve for x: Divide or multiply both sides by the coefficient of ‘x’ to get ‘x’ by itself. Example: Solve for x in the equation: 5x – 3 = 2x + 9. Move x terms to one side: Subtract 2x from both sides: 3x – 3 = 9; Move constant terms to the other side: Add 3 to both sides: 3x = 12; Solve for x: Divide both sides by 3: x = 4

to get 3 = 3x – 2. Now, the coefficient of x is 1, and we can see that x = 1/3. By shifting the emphasis from “getting x by itself” to having the coefficient of x equal to 1 on one side of the equation, students will be able to better understand the problem-solving process and the steps needed to solve for x.

This is a simple equation with one variable. The purpose of isolating x in this equation is to find the exact value of x. Let’s start by figuring out how to get x by itself on the left side of the equation. There are two things we need to do before we can accomplish this: Get rid of the 2 that is added to the x. Get rid of the 4 that is ...

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20. The first step to solving a multi-step equation is to_ isolate the variable term using addition or subtraction on the constant term. simplify the expression using the distributive property gather like terms Isolate the variable by multiplying or dividing by the coefficient

In order to get the x by itself, the first thing that you need to tackle is getting rid of that c and moving it to the other side. So since it is dividing the left side, you will need to multiply by c on both sides. This will give you: Once you have moved c, the next step to get X by itself is to remove the b from the left side.

To solve the equation 10 = x − 3 and isolate x, follow these steps: Understand the Equation: The equation tells us that 10 equals x minus 3. Our goal is to find the value of x by itself. Identify the Operation: In the equation, x is being reduced by 3 (i.e., we have subtraction). To isolate x, we need to undo this subtraction. Add to Both Sides:

To solve the equation 10 = x − 3 and get x by itself, you need to isolate x on one side of the equation. Here's how you can do it step-by-step: Start with the original equation: 10 = x − 3. Identify the operation needed to isolate x: To isolate x, notice that it's currently being subtracted by 3.

To solve the equation x = 3 and get x by itself, follow these steps: 1. Understand the Equation: The equation involves a square root, x , and we need to "undo" this square root to solve for x. 2. Square Both Sides: To eliminate the square root, square both sides of the equation.This means you will raise both sides of the equation to the power of 2. Here's how it looks:

This video demonstrates how to solve for X in algebra. The equation taken for this is 2X+4=10.The first thing you have to do to solve this equation is to get X by itself on one side of the equation. In order to do that you take the number that does not have X with it and do the opposite operation that has been done. So in the equation here we have plus four so we subtract four from both sides ...

Isolating x is a fundamental concept in algebra that involves manipulating an equation to get the variable x by itself on one side of the equation. This process makes it easier to solve for x and understand its value. Why Isolating x is Important.

To get x by itself in the equation 10 = x − 3, we need to isolate x on one side of the equation. Here's how you can do it step-by-step: Identify what is being done to x: In the equation x − 3, the number 3 is being subtracted from x.

How can I get this equation to have x all by itself IE (x=....) algebra-precalculus; Share. Cite. Follow asked Nov 28, 2013 at 0:14. Chris Muench Chris Muench. 151 1 1 bronze badge $\endgroup$ 1 $\begingroup$ Hint: Simplify the RHS, inverting both sides and then multiplying by 12. $\endgroup$

In our example, we can subtract 5 from both sides to get 3x = 6. Next, we need to get x by itself. Since 3 is being multiplied by x, we can divide both sides by 3 to get x = 2. So, the mystery number 'x' in this equation is 2. By solving for x, we're unlocking the answer to the equation and discovering the value of the unknown variable.