2sqrt(28)+3sqrt(63)-sqrt(49)

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Evaluate the following

2√28+3√63-√49

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

Simplify 2√28.

Checking square roots, we see that

5² = 25 and 6² = 36

Our answer in decimal format is between 5 and 6

Our answer is not an integer

Simplify it into the product of an integer and a radical.

We do this by listing each product combo of 28

Check for integer square root values below:

√28 = √1√28

√28 = √2√14

√28 = √4√7

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

Therefore, we use the product combo √28 = √4√7

Evaluating square roots, we see that √4 = 2

Simplifying our product of radicals, we get our answer:

Multiply by our constant of 2

2√28 = (2 x 2)√7

Term 2 has a square root, so we evaluate and simplify:

Simplify 3√63.

Checking square roots, we see that

7² = 49 and 8² = 64

Our answer in decimal format is between 7 and 8

Our answer is not an integer

Simplify it into the product of an integer and a radical.

We do this by listing each product combo of 63

Check for integer square root values below:

√63 = √1√63

√63 = √3√21

√63 = √7√9

From that list, the highest factor with an integer square root is 9

Therefore, we use the product combo √63 = √9√7

Evaluating square roots, we see that √9 = 3

Simplifying our product of radicals, we get our answer:

Multiply by our constant of 3

3√63 = (3 x 3)√7

Term 3 has a square root, so we evaluate and simplify:

Simplify -1√49.

Group constants

-7 = -7

Group square root terms for 13

(4 + 9)√7

13√7

Final Answer: