I found that the square root of any prime number S can be approximated, at the n-th order, as a rational number represented by the polynomials shown below. $x_0$ is an initial seed, which is a rational number chosen “close” to $\sqrt S$. I used the iterative method, not the continued fractions

[![enter image description here][1]][1]

My question: Is someone aware of this result? Is it already known and has been published elsewhere? If affirmative, please post the reference!

  [1]: https://i.sstatic.net/6TWtG.png