# Finding the floor of square root without using sqrt function [closed]

Let's say I have an integer `n` and I want to find the largest number `m` for which the square of that number is smaller than `n`.

What would be the optimal solution for this problem?

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Start by doing some research: en.wikipedia.org/wiki/Methods_of_computing_square_roots –  Marc B Mar 7 '13 at 17:58
What have you tried? –  millsj Mar 7 '13 at 17:58
possible duplicate of Fastest way to get the integer part of sqrt(n)? –  NPE Mar 7 '13 at 17:58
is m an integer also? –  David Hope Mar 7 '13 at 17:58
Your title answers the question already. Include the [itex] library and use the sqrt function, then cast that from a double to an int. If you use a float, you may face inaccuracy problems when dealing with larger numbers. –  Mohammad Ali Baydoun Mar 7 '13 at 17:59

## closed as not a real question by Marc B, StoryTeller, NPE, Mat, JeroenMar 7 '13 at 19:15

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"The Optimal Solution" rarely exists, but a reasonably fast algorithm is as follows (anyone knows its name?), it's called the Babylonian Method:

``````int num = 4567;

int r1 = num / 2;
int r2 = 2;

while (std::abs(r2 - r1) > 1) {
r2 = (r1 + r2) / 2;
r1 = num / r2;
}
``````

Here `r1` and `r2` are the lower and higher approximations of the square root. In your case, you'll need the smaller one.

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That's the "Babylonian Method" –  Axel Kemper Mar 7 '13 at 18:06
@AxelKemper Thanks! –  user529758 Mar 7 '13 at 18:06
`int int_abs(int x)` Er ... whats wrong with `std::abs` (always assuming the OP is using a compiler that supports it)? –  dmckee Mar 7 '13 at 18:08
@dmckee I'm going to RTFM, but doesn't that take `float`s? –  user529758 Mar 7 '13 at 18:09
@dmckee I read the FM, and I found out it's overloaded. Sorry. (I wrote this code as C...) –  user529758 Mar 7 '13 at 18:12

Since you're just looking for the integer part, you could do it this way:

1. Start a loop with the lowest possible m, ie m=1 ( unless you're allowing n < 1 )
2. Check if m*m is greater than n
3. If it's not, you need to check the next m, so add 1 to m and go on to the next iteration of the loop
4. If it is bigger, then stop looping and subtract 1 from m, because m-1 was the final value to be smaller than the square root of n.
``````int n = 123; //or whatever you want
int m = 1;
while (m * m <= n) {
m = m + 1;
}
return (m - 1);
``````
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This is sloooooow. –  user529758 Mar 7 '13 at 18:41
Yea... It's at least valid. But I have no problem admitting your solution is better. –  jonhopkins Mar 7 '13 at 18:45
@johnhopkins of course this is fine for small values of `n`. –  user529758 Mar 7 '13 at 19:04
An easy optimisation should be to turn this into a binary-search-like algorithm, but H2CO3's solution is probably still faster. –  Dukeling Mar 7 '13 at 19:42
@Dukeling I really like that idea. Might try it later. –  jonhopkins Mar 7 '13 at 19:43