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Addition and Subtraction
How to Add and Subtract Square Roots Download Article Co-authored by David Jia
Last Updated: January 13, 2026 Fact Checked
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This article was co-authored by David Jia. 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. There are 7 references cited in this article, which can be found at the bottom of the page. This article has been fact-checked, ensuring the accuracy of any cited facts and confirming the authority of its sources. This article has been viewed 786,199 times.
To add and subtract square roots, you need to combine square roots with the same radical term. This means that you add or subtract 2√3 and 4√3, but not 2√3 and 2√5. There are many cases where you can actually simplify the number inside the radical to be able to combine like terms and to freely add and subtract square roots.
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1 Simplify any terms inside the radicals when possible. To simplify the terms inside of the radicals, try to factor them to find at least one term that is a perfect square, such as 25 (5 x 5) or 9 (3 x 3).[1]X Expert Source David JiaAcademic TutorExpert Interview [2]XResearch source Once you do that, then you can take the square root of the perfect square and write it outside the radical, leaving the remaining factor inside the radical. For this example, we are working with the problem 6√50 - 2√8 + 5√12. The numbers outside the radical sign are the coefficients and the numbers inside it are the radicands. Here's how you simplify each of the terms:[3]XResearch source
6√50 = 6√(25 x 2) = (6 x 5)√2 = 30√2. Here, you've factored "50" into "25 x 2" and then have pulled out the "5" from the perfect square, "25", and placed it outside of the radical, with the "2" remaining on the inside. Then, you multiplied "5" by "6", the number already outside the radical, to get 30 as the new coefficient.
2√8 = 2√(4 x 2) = (2 x 2)√2 = 4√2. Here, you've factored "8" into "4 x 2" and then have pulled out the "2" from the perfect square "4" and placed it outside the radical, leaving the "2" on the inside. Then, you multiplied "2" by "2", the number already outside the radical, to get 4 as the new coefficient.
5√12 = 5√(4 x 3) = (5 x 2)√3 = 10√3. Here, you've factored "12" into "4 x 3" and have pulled out the "2" from the perfect square "4" and placed it outside the radical, leaving the factor "3" on the inside. Then, you multiplied "2" by "5", the number already outside the radical, to get 10 as the new coefficient.
2 Circle any terms with matching radicands. Once you simplified the radicands of the terms you were given, you were left with the following equation: 30√2 - 4√2 + 10√3. Since you can only add or subtract like terms, you should circle the terms that have the same radical, which in this example are 30√2 and 4√2. You can think of this as being similar to adding or subtracting fractions, where you can only add or subtract the terms if the denominators are the same.[4]XResearch source Advertisement
3 If you're working with a longer equation and there are multiple pairs with matching radicands, then you can circle the first pair, underline the second, put an asterisk by the third, and so on. Lining the terms up in order will make it easier for you to visualize the solution, too.
4 Add or subtract the coefficients of the terms with matching radicands. Now, all you have to do is to add or subtract the coefficients of the terms with the matching radicands and leave any additional terms as part of the equation. Do not combine the radicands. The idea is that you are saying how many of that type of radicand there are, total. The non-matching terms can stay as they are.[5]XResearch source Here's what you do:[6]XResearch source
30√2 - 4√2 + 10√3 =
(30 - 4)√2 + 10√3 =
26√2 + 10√3
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1 Do Example 1. In this example, you are adding the following square roots: √(45) + 4√5. Here is what you have to do:
Simplify √(45). First, you can factor it out to get √(9 x 5).
Then, you can pull out a "3" from the perfect square, "9," and make it the coefficient of the radical. So, √(45) = 3√5.[7]XResearch source
Now, just add up the coefficients of the two terms with matching radicands to get your answer. 3√5 + 4√5 = 7√5
2 Do Example 2. This example is the following problem: 6√(40) - 3√(10) + √5. Here is what you have to do to solve it:
Simplify 6√(40). First you can factor out "40" to get "4 x 10", which makes 6√(40) = 6√(4 x 10).
Then, you can pull out a "2" from the perfect square, "4," and then multiply it by the current coefficient. Now you've got 6√(4 x 10) = (6 x 2)√10.
Multiply the two coefficients to get 12√10.
Now, your problem reads 12√10 - 3√(10) + √5. Since the first two terms have the same radicand, you can subtract the second term from the first and leave the third as it is.
You're left with (12-3)√10 + √5, which can be simplified to 9√10 + √5.
3 Do Example 3. This example is the following: 9√5 -2√3 - 4√5. Here, none of the radicals have factors that are perfect squares, so no simplifying is possible.[8]X Expert Source David JiaAcademic TutorExpert Interview The first and third terms are like radicals, so their coefficients can already be combined (9 - 4). The radicand is unaffected. The remaining terms are not alike, so the problem can be simplified as 5√5 - 2√3.
4 Do Example 4. Let's say you're working with the following problem: √9 + √4 - 3√2. Here is what you do:
Since √9 is equal to √(3 x 3), you can simplify √9 to 3.
Since √4 is equal to √(2 x 2), you can simplify √4 to 2.
Now, you can simply add 3 + 2 to get 5.
Since 5 and 3√2 are not like terms, there's nothing more you can do. Your final answer is 5 - 3√2.
5 Do Example 5. Let's try adding and subtracting square roots that are part of a fraction. Now, as with a regular fraction, you can only add or subtract fractions that have the same numerator or denominator. Let's say you're working with this problem: (√2)/4 + (√2)/2. Here's what you do:
Make it so these terms have the same denominator. The lowest common denominator, or the denominator that would be evenly divisible by both the denominators "4" and "2," is "4."[9]XResearch source
So, to make the second term, (√2)/2, have the denominator of 4, you need to multiply both its numerator and denominator by 2/2. (√2)/2 x 2/2 = (2√2)/4.
Add up the numerators of the fractions while leaving the denominator the same. Do just what you would do if you were adding fractions. (√2)/4 + (2√2)/4 = (3√2)/4.
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Question What is root 6 - root 2 multiplied by root 6 + root 2? Donagan Top Answerer Because (x - y)(x + y) = x² - y², the example you show is equal to 6 - 2, or 4. Thanks! We're glad this was helpful.Thank you for your feedback. If wikiHow has helped you, please consider a small contribution to support us in helping more readers like you. We’re committed to providing the world with free how-to resources, and even $1 helps us in our mission. Support wikiHow Yes No Not Helpful 38 Helpful 53
Question How do I solve √2 + √2? Donagan Top Answerer √2 + √2 = 2√2 = √(2² x 2) = √8. Thanks! We're glad this was helpful.Thank you for your feedback. If wikiHow has helped you, please consider a small contribution to support us in helping more readers like you. We’re committed to providing the world with free how-to resources, and even $1 helps us in our mission. Support wikiHow Yes No Not Helpful 135 Helpful 74
Question What answer should I get when adding root 2 and root 2? Donagan Top Answerer √2 + √2 = 2√2. Thanks! We're glad this was helpful.Thank you for your feedback. If wikiHow has helped you, please consider a small contribution to support us in helping more readers like you. We’re committed to providing the world with free how-to resources, and even $1 helps us in our mission. Support wikiHow Yes No Not Helpful 63 Helpful 96
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Always simplify any radicands that have perfect square factors before you begin identifying and combining like radicands.[10]X Expert Source David JiaAcademic TutorExpert InterviewThanks Helpful 0 Not Helpful 0
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Warnings
Never combine non-like radicals. Thanks Helpful 11 Not Helpful 12
Never combine an integer and a radical so that means that: 3 + (2x)1/2 can not be simplified.
Note: saying the "half power of (2x)" = (2x)1/2 is just another way to say "square root of (2x)".
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Thanks for reading our article! If you’d like to learn more about math, check out our in-depth interview with David Jia.
Co-authored by: David Jia Math Tutor This article was co-authored by David Jia. 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. This article has been viewed 786,199 times. 27 votes - 78% Co-authors: 49Updated: January 13, 2026 Views: 786,199 Categories: Featured Articles | Addition and SubtractionArticle SummaryX
To add and subtract square roots, first simplify terms inside the radicals where you can by factoring them into at least 1 term that’s a perfect square. When you do this, take the square root of the perfect square, write it outside of the radical, and leave the other factor inside. Then circle any terms with the same radicands so they’re easier to see. To finish, just add or subtract the coefficients of the terms with matching radicands. Leave any other terms as they are, since you can only add and subtract terms that are the same. For some examples of how to add and subtract square roots, read on!Did this summary help you?YesNo
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Co-authored by: David Jia Math Tutor This article was co-authored by David Jia. 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. This article has been viewed 786,199 times. 27 votes - 78% Co-authors: 49 Updated: January 13, 2026 Views: 786,199 Categories: Featured Articles | Addition and Subtraction Article SummaryX
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1 Simplify any terms inside the radicals when possible. To simplify the terms inside of the radicals, try to factor them to find at least one term that is a perfect square, such as 25 (5 x 5) or 9 (3 x 3).[1] [2] Once you do that, then you can take the square root of the perfect square and write it outside the radical, leaving the remaining factor inside the radical. For this example, we are working with the problem 6√50 - 2√8 + 5√12. The numbers outside the radical sign are the coefficients and the numbers inside it are the radicands. Here's how you simplify each of the terms:[3] 
2 Circle any terms with matching radicands. Once you simplified the radicands of the terms you were given, you were left with the following equation: 30√2 - 4√2 + 10√3. Since you can only add or subtract like terms, you should circle the terms that have the same radical, which in this example are 30√2 and 4√2. You can think of this as being similar to adding or subtracting fractions, where you can only add or subtract the terms if the denominators are the same.[4] Advertisement 
3 If you're working with a longer equation and there are multiple pairs with matching radicands, then you can circle the first pair, underline the second, put an asterisk by the third, and so on. Lining the terms up in order will make it easier for you to visualize the solution, too. 
4 Add or subtract the coefficients of the terms with matching radicands. Now, all you have to do is to add or subtract the coefficients of the terms with the matching radicands and leave any additional terms as part of the equation. Do not combine the radicands. The idea is that you are saying how many of that type of radicand there are, total. The non-matching terms can stay as they are.[5] Here's what you do:[6] 
1 Do Example 1. In this example, you are adding the following square roots: √(45) + 4√5. Here is what you have to do: 
2 Do Example 2. This example is the following problem: 6√(40) - 3√(10) + √5. Here is what you have to do to solve it: 
3 Do Example 3. This example is the following: 9√5 -2√3 - 4√5. Here, none of the radicals have factors that are perfect squares, so no simplifying is possible.[8] The first and third terms are like radicals, so their coefficients can already be combined (9 - 4). The radicand is unaffected. The remaining terms are not alike, so the problem can be simplified as 5√5 - 2√3. 
4 Do Example 4. Let's say you're working with the following problem: √9 + √4 - 3√2. Here is what you do: 
5 Do Example 5. Let's try adding and subtracting square roots that are part of a fraction. Now, as with a regular fraction, you can only add or subtract fractions that have the same numerator or denominator. Let's say you're working with this problem: (√2)/4 + (√2)/2. Here's what you do: 
Donagan Top Answerer Because (x - y)(x + y) = x² - y², the example you show is equal to 6 - 2, or 4. Thanks! We're glad this was helpful. Thank you for your feedback. If wikiHow has helped you, please consider a small contribution to support us in helping more readers like you. We’re committed to providing the world with free how-to resources, and even $1 helps us in our mission. Support wikiHow Yes No Not Helpful 38 Helpful 53