7 sqrt 80 %252B 9 sqrt 45

Simplify 745. Checking square roots, we see that 62 = 36 and 72 = 49.Our answer is not an integer.Simplify it into the product of an integer and a radical. List each product combo of 45checking for integer square root values below:45 = 14545 = 31545 = 59

80%252b9√45

Simplify 7√45.

Checking square roots, we see that 62 = 36 and 72 = 49.
Our answer is not an integer.
Simplify it into the product of an integer and a radical.

List each product combo of 45
checking for integer square root values below:

45 = √145
45 = √315
45 = √59

From that list, the highest factor that has an integer square root is 9.
Therefore, we use the product combo √45 = √95
Evaluating square roots, we see that √9 = 3

Simplify our product
Multiply by our constant of 7
7√45 = (7 x 3)√5
7√45 = 21√5
Simplifying the original expression, we get:
Group √5 terms → 21√5 = 21√5
Build our final simplified answer:
21√5
Evaluate the product of the 1 square root terms:
7√80%252b9√45
Multiply the product of the outside constants:
7 = 7
The square root of products is equal to the product of square roots:
Product of the inner constants under the radical sign = 80 = 80
List out the product of all variables and exponents:
b9451 = b9451
Our final product term is 7√80b945, simplify it

Simplify √80.

Checking square roots, we see that 82 = 64 and 92 = 81.
Our answer is not an integer.
Simplify it into the product of an integer and a radical.

List each product combo of 80
checking for integer square root values below:

80 = √180
80 = √240
80 = √420
80 = √516
80 = √810

From that list, the highest factor that has an integer square root is 16.
Therefore, we use the product combo √80 = √165
Evaluating square roots, we see that √16 = 4

Simplify our product
80 = 4√5

Therefore, we can factor out 4 from the radical, and leave 5 under the radical

We can factor out the following portion using the highest even powers of variables:
= =
Our leftover piece under the radical becomes 4√5b945
Our final answer is the factored out piece and the expression under the radical
4√5b945
Multiply by outside constant of 7 to get our final answer:
7 x 4√5b945 = 28√5b945

What is the Answer?

How does the Radical Expressions Calculator work?

Free Radical Expressions Calculator - Evaluates and simplifies radical expressions. Simplifying radical expressions.
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What 4 formulas are used for the Radical Expressions Calculator?

List out all factor products for S
Find the highest factor with an integer square root and multiply the square root by the other square root of the factor

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What 3 concepts are covered in the Radical Expressions Calculator?

radicalThe √ symbol that is used to denote square root or nth roots
√radical expressionsan nth root of a number x is a number r which, when raised to the power n, yields x
n√xsquare roota factor of a number that, when multiplied by itself, gives the original number
√x

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