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There are a number of ways to solve for x, whether you're working with exponents and radicals or if you just have to do some division or multiplication. No matter what process you use, you always have to find a way to isolate x on one side of the equation so you can find its value. Here's how to do it:

How do you solve for X in equations?

  • For basic linear equations: Follow the order of operations (using PEMDAS) to resolve the equation.
  • For exponents: Separate the exponent variable from the rest of the equation and find the square root of each side.
  • For fractions: Cross-multiply to create a fraction-less equation, combine any like terms, and divide both sides by the x-value's coefficient.
Method 1
Method 1 of 5:

Using a Basic Linear Equation

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  1. Here it is:
    • 2 2 (x+3) + 9 - 5 = 32
  2. Remember the order of operations: PEMDAS, which stands for Parentheses, Exponents, Multiplication/Division, and Addition/Subtraction. [1] You can't resolve the parentheses first because x is in the parentheses, so you should start with the exponent , 2 2 . 2 2 = 4
    • 4(x+3) + 9 - 5 = 32
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  3. Do the multiplication . [2] Just distribute the 4 into (x +3). Here's how:
    • 4x + 12 + 9 - 5 = 32
  4. Do the addition and subtraction . Just add or subtract the remaining numbers. Here's how:
    • 4x+21-5 = 32
    • 4x+16 = 32
    • 4x + 16 - 16 = 32 - 16
    • 4x = 16
  5. [3] To do this, just divide both sides of the equation by 4 to find x. 4x/4 = x and 16/4 = 4, so x = 4.
    • 4x/4 = 16/4
    • x = 4
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    Joseph Meyer

    Math Teacher
    Joseph Meyer is a High School Math Teacher based in Pittsburgh, Pennsylvania. He is an educator at City Charter High School, where he has been teaching for over 7 years. Joseph is also the founder of Sandbox Math, an online learning community dedicated to helping students succeed in Algebra. His site is set apart by its focus on fostering genuine comprehension through step-by-step understanding (instead of just getting the correct final answer), enabling learners to identify and overcome misunderstandings and confidently take on any test they face. He received his MA in Physics from Case Western Reserve University and his BA in Physics from Baldwin Wallace University.
    Joseph Meyer
    Math Teacher

    To solve an equation for a variable like "x," you need to manipulate the equation to isolate x. Use techniques like the distributive property, combining like terms, factoring, adding or subtracting the same number, and multiplying or dividing by the same non-zero number to isolate "x" and find the answer.

  6. [4] Just plug x = 4 back into the original equation to make sure that it checks out. Here's how:
    • 2 2 (x+3)+ 9 - 5 = 32
    • 2 2 (4+3)+ 9 - 5 = 32
    • 2 2 (7) + 9 - 5 = 32
    • 4(7) + 9 - 5 = 32
    • 28 + 9 - 5 = 32
    • 37 - 5 = 32
    • 32 = 32
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Method 2
Method 2 of 5:

With Exponents

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  1. Let's say you're working with this problem where the x term includes an exponent:
    • 2x 2 + 12 = 44
  2. [5] The first thing you should do is combine like terms so that all of the constant terms are on the right side of the equation while the term with the exponent is on the left side. Just subtract 12 from both sides. Here's how:
    • 2x 2 +12-12 = 44-12
    • 2x 2 = 32
  3. In this case, 2 is the x coefficient, so divide both sides of the equation by 2 to get rid of it. Here's how:
    • (2x 2 )/2 = 32/2
    • x 2 = 16
  4. 4
    Take the square root of each side of the equation. [6] Taking the square root of x 2 will cancel it out. So, take the square root of both sides. You'll get x left over on one side and plus or minus the square root of 16, 4, on the other side. Therefore, x = ±4.
  5. 5
    Check your work. Just plug x = 4 and x = -4 back in to the original equation to make sure it checks out. For instance, when you're checking x=4:
    • 2x 2 + 12 = 44
    • 2(4) 2 + 12 = 44
    • 2(16) + 12 = 44
    • 32 + 12 = 44
    • 44 = 44
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Method 3
Method 3 of 5:

Using Fractions

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  1. Let's say you're working with the following problem: [7]
    • (x + 3)/6 = 2/3
  2. Cross multiply . To cross multiply, simply multiply the denominator of each fraction by the numerator of the other fraction. [8] You'll be essentially multiplying in two diagonal lines. So, multiply the first denominator, 6, by the second numerator, 2, to get 12 on the right side of the equation. Multiply the second denominator, 3, by the first numerator, x + 3, to get 3 x + 9 on the left side of the equation. Here's how it will look:
    • (x + 3)/6 = 2/3
    • 6 x 2 = 12
    • (x + 3) x 3 = 3x + 9
    • 3x + 9 = 12
  3. Combine the constant terms in the equation to subtract 9 from both sides of the equation. [9] Here's what you do:
    • 3x + 9 - 9 = 12 - 9
    • 3x = 3
  4. Just divide 3x and 9 by 3, the x term coefficient, to solve for x. 3x/3 = x and 3/3 = 1, so you're left with x = 1. [10]
  5. To check your work, just plug x back in to the original equation to make sure that it works. [11] Here's what you do:
    • (x + 3)/6 = 2/3
    • (1 + 3)/6 = 2/3
    • 4/6 = 2/3
    • 2/3 = 2/3
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Method 4
Method 4 of 5:

Using Radical Signs

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  1. Let's say you're solving for x in the following problem: [12]
    • √(2x+9) - 5 = 0
  2. You have to move the part of the equation with the square root sign to one side of the equation before you can proceed. So, you'll have to add 5 to both sides of the equation. Here's how:
    • √(2x+9) - 5 + 5 = 0 + 5
    • √(2x+9) = 5
  3. Square both sides. Just as you would divide both sides of an equation by a coefficient that is being multiplied by x, you would square both sides of an equation if x appears under the square root, or the radical sign. This will remove the radical sign from the equation. Here's how you do it:
    • (√(2x+9)) 2 = 5 2
    • 2x + 9 = 25
  4. Combine like terms by subtracting both sides by 9 so that all of the constant terms are on the right side of the equation while x remains on the left side. Here's what you do:
    • 2x + 9 - 9 = 25 - 9
    • 2x = 16
  5. The last thing you have to do to solve for x is to isolate the variable by dividing both sides of the equation by 2, the coefficient of the x term. 2x/2 = x and 16/2 = 8, so you're left with x = 8.
  6. Plug 8 back in to the equation for x to see if you get the right answer:
    • √(2x+9) - 5 = 0
    • √(2(8)+9) - 5 = 0
    • √(16+9) - 5 = 0
    • √(25) - 5 = 0
    • 5 - 5 = 0
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Method 5
Method 5 of 5:

Using Absolute Value

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  1. Let's say you're trying to solve for x in the following problem:
    • |4x +2| - 6 = 8
  2. Isolate the absolute value . The first thing you have to do is to combine like terms and get the terms inside the absolute value sign on one side. In this case, you would do it by adding 6 to both sides of the equation. Here's how:
    • |4x +2| - 6 = 8
    • |4x +2| - 6 + 6 = 8 + 6
    • |4x +2| = 14
  3. This is the first and easiest step. You'll have to solve for x twice whenever you work with absolute value. Here's how you do it the first time:
    • 4x + 2 = 14
    • 4x + 2 - 2 = 14 -2
    • 4x = 12
    • x = 3
  4. Now, do it again, except set the first part of the equation equal to -14 instead of 14. Here's how:
    • 4x + 2 = -14
    • 4x + 2 - 2 = -14 - 2
    • 4x = -16
    • 4x/4 = -16/4
    • x = -4
  5. Now that you know that x = (3, -4), just plug both numbers back in to the equation to see that it works. Here's how:
    • (For x = 3):
      • |4x +2| - 6 = 8
      • |4(3) +2| - 6 = 8
      • |12 +2| - 6 = 8
      • |14| - 6 = 8
      • 14 - 6 = 8
      • 8 = 8
    • (For x = -4):
      • |4x +2| - 6 = 8
      • |4(-4) +2| - 6 = 8
      • |-16 +2| - 6 = 8
      • |-14| - 6 = 8
      • 14 - 6 = 8
      • 8 = 8
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Practice Problems and Answers

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  • Question
    What is the first step in solving for X?
    David Jia
    Math Tutor
    David Jia is an Academic Tutor and the Founder of LA Math Tutoring, a private tutoring company based in Los Angeles, California. With over 10 years of teaching experience, David works with students of all ages and grades in various subjects, as well as college admissions counseling and test preparation for the SAT, ACT, ISEE, and more. After attaining a perfect 800 math score and a 690 English score on the SAT, David was awarded the Dickinson Scholarship from the University of Miami, where he graduated with a Bachelor’s degree in Business Administration. Additionally, David has worked as an instructor for online videos for textbook companies such as Larson Texts, Big Ideas Learning, and Big Ideas Math.
    Math Tutor
    Expert Answer
    Start on the side of the equation with X and do the inverse operations to isolate X. For example, if the equation was X + 5 = 10, you would subtract 5 from each side.
  • Question
    How I solve this problem: 15 : 1000 : x : 100?
    Donagan
    Top Answerer
    If the problem is 15:1,000 = x:100, re-write it as one fraction equal to another: 15 / 1,000 = x / 100. Solve for x either by inspection or by cross-multiplication.
  • Question
    Solve for x; Peter is twice as old as his son. Twelve years ago he was four times older than him. How old are they now?
    Donagan
    Top Answerer
    Let x be the son's current age. Then 2x is Peter's current age. Twelve years ago the son's age was (x-12), and Peter's age was (2x-12). Set up an equation stating that Peter's age 12 years ago was four times the son's age then. Solve for x and 2x.
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      Article Summary X

      To solve for x in a basic linear equation, start by resolving the exponent using the order of operations. Then, isolate the variable to get your answer. To solve for x when the equation includes an exponent, start by isolating the term with the exponent. Then, isolate the variable with the exponent by dividing both sides by the coefficient of the x term to get your answer. If the equation has fractions, start by cross-multiplying the fractions. Then, combine like terms and isolate x by dividing each term by the x coefficient. If you want to learn how to solve for x if the equation has radicals or absolute values, keep reading the article!

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