How do you find the square root of 529?

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How do you find the square root of 529?

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Answer 1 · 2015-09-08T23:48:07

Check for divisibility by a perfect square to simplify. You will find that $23^2 = 529$

Explanation:

When we try to simplify a square root, we look for perfect square factors.

Do this by testing perfect squares until you get to a number whose square if greater that $529$ (for example $25^2 = 625$ )

So we test $2^2 = 4$ . Clearly $4$ is not a factor of $529$ (nor is any other even number.

Test $3^2 = 9$ which is not a factor. Skip $4^2$ because it is even.

Obviously $5^2=25$ is not a factor. Skip $6^2$ .
Keep going . . .

$23^2 = 529$ so we're finished.

$sqrt529 = 23$

Answer 2 · 2017-05-17T21:39:17

Use a mixture of methods to find $sqrt(529) = 23$

Explanation:

There are quite a few different ways to find square roots.

Here's a bit of a mish-mash for this particular example...

Given $529$ , first split off pairs of digits starting from the right hand side to get:

$5|29$

Next, note that $5$ lies between two square numbers $2^2 = 4$ and $3^2 = 9$

We can approximate where $sqrt(5)$ lies between $2$ and $3$ by linearly interpolating. What's that? We approximate the part of the graph of $x^2$ between $x=2$ and $x=3$ using a straight line to get our approximation.

Since $5$ is $1/5$ of the way between $2^2=4$ and $3^2=5$ , we can approximate $sqrt(5)$ by $2+1/5 = 2.2$

Hence a good first approximation for $sqrt(500)$ is $22$ .

How about $529$ ?

We can use the Babylonian method to find a better approximation.

Given a positive number $n$ and an approximation $a_i$ to its square root, a better approximation is given by the formula:

$a_(i+1) = (a_i^2+n)/(2a_i)$

So putting $n=529$ and $a_0=22$ , we find:

$a_1 = (a_0^2+n)/(2a_0) = (22^2+529)/(2*22) = (484+529)/44 = 1013/44 = 23.02bar(27)$

That looks suspiciously close to $23$ so try:

$23^2 = 529$

Thus $sqrt(529) = 23$

Answer 3 · 2017-06-30T21:46:50

$sqrt529 =23$

Explanation:

Do a really rough estimate first using squares of multiples of $10$

$20^2 = 400 and 30^2 = 900$

$529$ lies between $400 and 900$

so $sqrt529$ will lie between $20 and 30$

Now look at the last digit ... $9$
There are only two numbers whose squares end with a $9$ ,

$3 and 7 rarr " "3^2 =9 and 7^2 =49$

So the possibilities are $23 and 27$

However, $25^2 = 625 and 529$ is less than $625$

My first guess would therefore be $23$

Multiplying confirms that $23 xx 23 = 529$

Hence $sqrt529 =23$

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How do you find the square root of 529?

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