simplify.
1) $\sqrt{200}$
2) $\sqrt{80}$
3) $\sqrt{162}$
4) $\sqrt{75}$
5) $\sqrt{180}$
6) $\sqrt{490}$
7) $\sqrt{192}$
8) $\sqrt{225}$
9) $\sqrt{63}$
10) $\sqrt{72}$
11) $\sqrt{245}$
12) $\sqrt{125}$
13) $\sqrt{112}$
14) $\sqrt{243}$
15) $\sqrt{810}$
16) $\sqrt{98}$
17) $\sqrt{384}$
18) $\sqrt{28}$
19) $\sqrt{20}$
20) $\sqrt{48}$

Question

Accepted Answer

# Explanation:
## Step1: Factor out perfect square
For each square root, rewrite the radicand as a product of the largest perfect square factor and a remaining factor, then use the property $\sqrt{ab}=\sqrt{a}\sqrt{b}$ where $a$ is a perfect square.
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## 2) $\sqrt{80}$
### Step1: Factor into perfect square
$\sqrt{16 	imes 5}$
### Step2: Split and simplify
$\sqrt{16}\sqrt{5} = 4\sqrt{5}$

## 4) $\sqrt{75}$
### Step1: Factor into perfect square
$\sqrt{25 	imes 3}$
### Step2: Split and simplify
$\sqrt{25}\sqrt{3} = 5\sqrt{3}$

## 6) $\sqrt{490}$
### Step1: Factor into perfect square
$\sqrt{49 	imes 10}$
### Step2: Split and simplify
$\sqrt{49}\sqrt{10} = 7\sqrt{10}$

## 8) $\sqrt{225}$
### Step1: Identify perfect square
$\sqrt{15^2}$
### Step2: Simplify square root
$15$

## 10) $\sqrt{72}$
### Step1: Factor into perfect square
$\sqrt{36 	imes 2}$
### Step2: Split and simplify
$\sqrt{36}\sqrt{2} = 6\sqrt{2}$

## 12) $\sqrt{125}$
### Step1: Factor into perfect square
$\sqrt{25 	imes 5}$
### Step2: Split and simplify
$\sqrt{25}\sqrt{5} = 5\sqrt{5}$

## 14) $\sqrt{243}$
### Step1: Factor into perfect square
$\sqrt{81 	imes 3}$
### Step2: Split and simplify
$\sqrt{81}\sqrt{3} = 9\sqrt{3}$

## 16) $\sqrt{98}$
### Step1: Factor into perfect square
$\sqrt{49 	imes 2}$
### Step2: Split and simplify
$\sqrt{49}\sqrt{2} = 7\sqrt{2}$

## 18) $\sqrt{28}$
### Step1: Factor into perfect square
$\sqrt{4 	imes 7}$
### Step2: Split and simplify
$\sqrt{4}\sqrt{7} = 2\sqrt{7}$

## 20) $\sqrt{48}$
### Step1: Factor into perfect square
$\sqrt{16 	imes 3}$
### Step2: Split and simplify
$\sqrt{16}\sqrt{3} = 4\sqrt{3}$
---
# Answer:
1) $10\sqrt{2}$
2) $4\sqrt{5}$
3) $9\sqrt{2}$
4) $5\sqrt{3}$
5) $6\sqrt{5}$
6) $7\sqrt{10}$
7) $8\sqrt{3}$
8) $15$
9) $3\sqrt{7}$
10) $6\sqrt{2}$
11) $7\sqrt{5}$
12) $5\sqrt{5}$
13) $4\sqrt{7}$
14) $9\sqrt{3}$
15) $9\sqrt{10}$
16) $7\sqrt{2}$
17) $8\sqrt{6}$
18) $2\sqrt{7}$
19) $2\sqrt{5}$
20) $4\sqrt{3}$

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QUESTION IMAGE

Question

Explanation:

Step1: Factor out perfect square

2) $\sqrt{80}$

Step1: Factor into perfect square

Step2: Split and simplify

4) $\sqrt{75}$

Step1: Factor into perfect square

Step2: Split and simplify

6) $\sqrt{490}$

Step1: Factor into perfect square

Step2: Split and simplify

8) $\sqrt{225}$

Step1: Identify perfect square

Step2: Simplify square root

10) $\sqrt{72}$

Step1: Factor into perfect square

Step2: Split and simplify

12) $\sqrt{125}$

Step1: Factor into perfect square

Step2: Split and simplify

14) $\sqrt{243}$

Step1: Factor into perfect square

Step2: Split and simplify

16) $\sqrt{98}$

Step1: Factor into perfect square

Step2: Split and simplify

18) $\sqrt{28}$

Step1: Factor into perfect square

Step2: Split and simplify

20) $\sqrt{48}$

Step1: Factor into perfect square

Step2: Split and simplify

Answer: