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sqrt(124)

sqrt(-58)

Square root of 136

square root 247

sqrt300

8^3

2 to the 4 power

25root767

sqrt(5)sqrt(7)

sqrt3sqrt12sqrt40sqrt48

7x7x7x7x7

(3^4)^2

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Evaluate √136

__Term 1 has a square root, so we evaluate and simplify:__

Simplify √136.

Checking square roots, we see that 11^{2} = 121 and 12^{2} = 144.

Our answer in decimal format is between 11 and 12

Our answer is not an integer, so we try simplify it into the product of an integer and a radical.

__We do this by listing each product combo of 136 checking for integer square root values below:__

√136 = √1√136

√136 = √2√68

√136 = √4√34

√136 = √8√17

From that list, the highest factor that has an integer square root is 4.

Therefore, we use the product combo √136 = √4√34

Evaluating square roots, we see that √4 = 2

__Simplifying our product of radicals, we get our answer:__

√136 =**2√34**

__Group square root terms for 2__

2√34

__Build final answer:__

**2√34**

sqrt(124)

sqrt(-58)

Square root of 136

square root 247

sqrt300

8^3

2 to the 4 power

25root767

sqrt(5)sqrt(7)

sqrt3sqrt12sqrt40sqrt48

7x7x7x7x7

(3^4)^2

2^4*2^7 Excel Download for Premium Users Only Quizzes Available for Premium Users Only Unlimited Practice Problem Generator for Premium Users Only Flashcards for Premium Users Only

Evaluate √136

Simplify √136.

Checking square roots, we see that 11

Our answer in decimal format is between 11 and 12

Our answer is not an integer, so we try simplify it into the product of an integer and a radical.

√136 = √1√136

√136 = √2√68

√136 = √4√34

√136 = √8√17

From that list, the highest factor that has an integer square root is 4.

Therefore, we use the product combo √136 = √4√34

Evaluating square roots, we see that √4 = 2

√136 =

2√34

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