how many largest perfect squares are under each radical?
radical | largest perfect squares
$sqrt{8}$ |
$sqrt{18}$ |
$sqrt{32x^6}$ |
$sqrt{50x}$ |
$sqrt{72}$ |

Question

Accepted Answer

# Explanation:
## Step1: Factor √8, find largest square
$8 = 4 	imes 2$, where $4=2^2$
## Step2: Factor √18, find largest square
$18 = 9 	imes 2$, where $9=3^2$
## Step3: Factor √32x⁶, find largest square
$32x^6 = 16x^6 	imes 2$, where $16x^6=(4x^3)^2$
## Step4: Factor √50x, find largest square
$50x = 25 	imes 2x$, where $25=5^2$
## Step5: Factor √72, find largest square
$72 = 36 	imes 2$, where $36=6^2$

# Answer:
| Radical | Largest perfect squares |
|---------|--------------------------|
| $\sqrt{8}$ | $4$ |
| $\sqrt{18}$ | $9$ |
| $\sqrt{32x^6}$ | $16x^6$ |
| $\sqrt{50x}$ | $25$ |
| $\sqrt{72}$ | $36$ |

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QUESTION IMAGE

Question

Explanation:

Step1: Factor √8, find largest square

Step2: Factor √18, find largest square

Step3: Factor √32x⁶, find largest square

Step4: Factor √50x, find largest square

Step5: Factor √72, find largest square

Answer:

Radical	Largest perfect squares
$\sqrt{18}$	$9$
$\sqrt{32x^6}$	$16x^6$
$\sqrt{50x}$	$25$
$\sqrt{72}$	$36$