How do you find the square root of 320?

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How do you find the square root of 320?

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Answer 1 · 2015-09-20T23:36:11

$8*sqrt5$

Explanation:

I don't know either,
so let's break it down into pieces, shall we?

We have:
$sqrt320$
The only thing that involves 32 in my mind is $4*8$ or $2*16$ , and so we notice that $320=2*160$ or $4*80$ or $16*20$ or $8*40$ , etc...

Let's try with $4*80$ :

$sqrt320=sqrt(4*80)$
At this point, it is good to remember the rule:
$sqrt(a*b)=sqrt(a)*sqrt(b)$
so that
$sqrt320=sqrt(4*80)$
$=sqrt(4)*sqrt80$
$=2*sqrt80$

Then you see that $80=4*20$ , so:

$sqrt320=2*sqrt80$
$=2*sqrt(4*20)$
$=2*sqrt(4)*sqrt(20)$
$=2*2*sqrt(20)=4*sqrt20$

Again you see that $20=4*5$ , so:
$sqrt320=4*sqrt20$
$=4*sqrt(4*5)$
$=4*sqrt4*sqrt5$
$=4*2*sqrt5$
$=8*sqrt5$

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How do you find the square root of 320?

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