How do you simplify sqrt(257)?

1 Answer
George C.
Jul 29, 2015

257 is prime, so sqrt(257) cannot be simplified.

Explanation:

If the radicand has a square factor, then you can move the square root of that factor outside of the square root.

For example, sqrt(12) = sqrt(2^2*3) = sqrt(2^2)sqrt(3) = 2sqrt(3)

If n has no square factor (e.g. n is prime), then sqrt(n) cannot be simplified in this way.

In your case you can note that 257 is 256+1 and sqrt(256) = 16. So 16 makes a very good first approximation to the square root for use with a method like Newton Raphson.

So you can put a_0 = 16 and iterate using:

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

or suchlike to quickly find a very good approximation.

In our case a_1 = 16+1/32 = 16.03125 while sqrt(257) ~= 16.03122

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