# How do I calculate the new standard deviation if the original population is unknown?

Coming from this question on Math SE I have the following scenario.

There is a set (`\$array`) with arbitrary values, the amount of values in the set (`\$n`), it's mean (`\$mean`) and standard deviation (`\$s`).

``````\$array = array(1, 5, 16, 3, ...);
\$n = count(\$array);
\$mean = array_sum(\$array) / count(\$array);
\$s = sd(\$array);
``````

Where the `sd()` function has it's origin on the PHP comments for the `stats_standard_deviation()` function:

``````// Function to calculate square of value - mean
function sd_square(\$x, \$mean) { return pow(\$x - \$mean,2); }

// Function to calculate standard deviation (uses sd_square)
function sd(\$array) {
// square root of sum of squares devided by N-1
return sqrt(array_sum(array_map("sd_square", \$array, array_fill(0,count(\$array), (array_sum(\$array) / count(\$array)) ) ) ) / (count(\$array)-1) );
}
``````

Now the `\$array` is dropped and the values aren't available anymore (let's say for reasons of anonymity) but another `\$x` value is coming in which shall be calculated within the `\$mean` and `\$s` (standard deviation).

I try to calculate the new standard deviation by this formular (according to this answer on Math SE):

``````function m_reverse(\$n, \$mean, \$x) {
return ( \$n * \$mean + \$x ) / ( \$n + 1 );
}

function sd_reverse(\$s, \$n, \$x, \$mean) {
return sqrt( 1 / \$n * ( ( \$n - 1 ) * pow( \$s, 2 ) + ( \$x - \$mean ) ) );
}
``````

The `m_reverse()` functions returns the correct new mean. But the `sd_reverse()` function won't. Can anyone figure out, what I've done wrong? Maybe inappropriate usage of paranthesis?

You can find a code example of my implementation here: http://3v4l.org/5mPDp

Any help appreciated!

-
How are you calling `sd_reverse` maybe one of the inputs if off-by-one? –  Halcyon Apr 30 at 11:48
I believe that last `\$x-\$mean` should be squared. –  Teepeemm Apr 30 at 11:56
@Halcyon you can view the whole code here: 3v4l.org/5mPDp –  Gottlieb Notschnabel Apr 30 at 12:26
@Teepeemm what makes you believe that? –  Gottlieb Notschnabel Apr 30 at 12:27
The answer you were given on math.se is wrong... –  Joni Apr 30 at 13:07

``````function sd_reverse(\$s, \$n, \$x, \$mean, \$old_mean) {