# php statistics z-score normal distributions

how do I compute the z-score of a array of numbers using PHP? I need to compute the z-score and then find the percentile (CDF)! what PHP functions can I use? thanks!

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The following code will give a good approximation of the CDF (Abramowitz & Stegun (1964))

``````function normal_pdf(\$x) {
return exp(-\$x * \$x / 4) / sqrt(2 * M_PI);
}

function normal_cdf(\$x) {
\$b = array(0.2316419, 0.319381530, -0.356563782, 1.781477937, -1.821255978, 1.330274429);
\$t = 1 / (1 + \$b[0] * \$x);
\$result = 0;
for (\$i = 1; \$i < 6; \$i++) {
\$result += \$b[\$i] * pow(\$t, \$i);
}
return 1 - normal_pdf(\$x) * \$result;
}
``````

This assumes a standard normal distribution. Recall that to standardize, use `z = (x - mean) / (standard deviantion)`

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The normal_cdf function is not correct. It gives negative values for some values of x. –  eckesicle Jun 14 '12 at 15:56
``````/* Mean */
function mean(\$input_array)
{
\$total = 0;
foreach (\$input_array as \$value)
{
\$total += \$value;
}
return (\$total / count(\$input_array));
}

/* Standard Deviation */
function std(\$arr)
{
if (!count(\$arr))
return 0;
\$mean = mean(\$arr);
\$sos = 0; // Sum of squares
for (\$i = 0; \$i < count(\$arr); \$i++)
{
\$sos += (\$arr[\$i] - \$mean) * (\$arr[\$i] - \$mean);
}
return sqrt(\$sos / (count(\$arr) - 1));
}

/* Z Scores */
function z(\$var, \$arr)
{
return (\$var -mean(\$arr)) / std(\$arr);
}
``````
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There are a few functions in the PHP statistics extension that could help you — You probably want `stats_standard_deviation` for a start.

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I need stats_cdf_binomial it seems but that function is not well documented.. I don't even know what the arguments for that function is.. –  Brown Limie Aug 28 '11 at 22:47
``````\$control=array(15,7);
\$treatment=array(46,8);
\$confidence=number_format(cumnormdist(zscore(\$control, \$treatment))*100,0);

function cr(\$t)
{
return \$t[1]/\$t[0];
}

function zscore(\$c, \$t)
{
\$z = cr(\$t)-cr(\$c);
\$s = (cr(\$t)*(1-cr(\$t)))/\$t[0] + (cr(\$c)*(1-cr(\$c)))/\$c[0];
return \$z/sqrt(\$s);
}

function cumnormdist(\$x)
{
\$b1 =  0.319381530;
\$b2 = -0.356563782;
\$b3 =  1.781477937;
\$b4 = -1.821255978;
\$b5 =  1.330274429;
\$p  =  0.2316419;
\$c  =  0.39894228;

if(\$x >= 0.0) {
\$t = 1.0 / ( 1.0 + \$p * \$x );
return (1.0 - \$c * exp( -\$x * \$x / 2.0 ) * \$t *
( \$t *( \$t * ( \$t * ( \$t * \$b5 + \$b4 ) + \$b3 ) + \$b2 ) + \$b1 ));
}
else {
\$t = 1.0 / ( 1.0 - \$p * \$x );
return ( \$c * exp( -\$x * \$x / 2.0 ) * \$t *
( \$t *( \$t * ( \$t * ( \$t * \$b5 + \$b4 ) + \$b3 ) + \$b2 ) + \$b1 ));
}
}
``````
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