0

Javascript>

If you are in the data science industry, you would be bothered if you don't have normal distribution table. I came across the article in Stackoverflow that converts z-score to probability in JavaScript. What I really want to know is the reverse calculation of this function.

/**
 * @param {number} z - Number of standard deviations from the mean.
 */
function GetZPercent(z) {
   // If z is greater than 6.5 standard deviations from the mean
   // the number of significant digits will be outside of a reasonable 
   // range.
   if (z < -6.5)
     return 0.0;

   if (z > 6.5)
     return 1.0;

   var factK    = 1;
   var sum      = 0;
   var term     = 1;
   var k        = 0;
   var loopStop = Math.exp(-23);
   
   while (Math.abs(term) > loopStop) {
     term = 0.3989422804 * Math.pow(-1, k) * Math.pow(z, k) / (2 * k + 1) /
            Math.pow(2, k) * Math.pow(z, k + 1) / factK;
     sum += term;
     k++;
     factK *= k;
   }

   sum += 0.5;

   return sum;
 }

I have a sense of how to convert z-score into the probability. But, I have no idea how to calculate the z-score(Standard deviation) from corresponding probability in javascript. For example, If I put in 0.95 (or 95%), I can expect to get 2.25 standard deviation. Above code gives me 95%, if I enter 2.25.

9
  • 4
    So you have the javascript code and ask for ... the javascript code? What is the problem?
    – trincot
    Apr 12 '16 at 14:10
  • Are you asking about how you call this function in a webpage (e.g. how you supply the z score to the function from an input and get the result out and display it?)
    – TheHans255
    Apr 12 '16 at 14:40
  • One of these +1500 similar questions might provide an answer, e.g., like this question with code identical to yours: Seeking a statistical javascript function to return p-value from a z-score
    – Roberto
    Apr 12 '16 at 14:45
  • Sorry for my ambiguity. I am asking about javascript code. Above code converts the z-score to probability. I am asking about vice versa; converting probability to z-score. If I put in 95%, it would spit out 2.25 standard deviation.
    – Gregory
    Apr 12 '16 at 15:07
  • Can you edit your question, because in there you are really asking the opposite, both in the title as in the body of your question.
    – trincot
    Apr 12 '16 at 15:16
3

I found that this code also works. Use critz(p) to convert probability to z-score. For example we can expect 1.65 from critz(0.95) as 95% corresponds to 1.65 standard deviation in z-score.

/*  The following JavaScript functions for calculating normal and
    chi-square probabilities and critical values were adapted by
    John Walker from C implementations
    written by Gary Perlman of Wang Institute, Tyngsboro, MA
    01879.  Both the original C code and this JavaScript edition
    are in the public domain.  */

/*  POZ  --  probability of normal z value

    Adapted from a polynomial approximation in:
            Ibbetson D, Algorithm 209
            Collected Algorithms of the CACM 1963 p. 616
    Note:
            This routine has six digit accuracy, so it is only useful for absolute
            z values <= 6.  For z values > to 6.0, poz() returns 0.0.
*/
    var Z_MAX = 6;
function poz(z) {

    var y, x, w;

    if (z == 0.0) {
        x = 0.0;
    } else {
        y = 0.5 * Math.abs(z);
        if (y > (Z_MAX * 0.5)) {
            x = 1.0;
        } else if (y < 1.0) {
            w = y * y;
            x = ((((((((0.000124818987 * w
                     - 0.001075204047) * w + 0.005198775019) * w
                     - 0.019198292004) * w + 0.059054035642) * w
                     - 0.151968751364) * w + 0.319152932694) * w
                     - 0.531923007300) * w + 0.797884560593) * y * 2.0;
        } else {
            y -= 2.0;
            x = (((((((((((((-0.000045255659 * y
                           + 0.000152529290) * y - 0.000019538132) * y
                           - 0.000676904986) * y + 0.001390604284) * y
                           - 0.000794620820) * y - 0.002034254874) * y
                           + 0.006549791214) * y - 0.010557625006) * y
                           + 0.011630447319) * y - 0.009279453341) * y
                           + 0.005353579108) * y - 0.002141268741) * y
                           + 0.000535310849) * y + 0.999936657524;
        }
    }
    return z > 0.0 ? ((x + 1.0) * 0.5) : ((1.0 - x) * 0.5);
}


/*  CRITZ  --  Compute critical normal z value to
               produce given p.  We just do a bisection
               search for a value within CHI_EPSILON,
               relying on the monotonicity of pochisq().  */

function critz(p) {
    var Z_EPSILON = 0.000001;     /* Accuracy of z approximation */
    var minz = -Z_MAX;
    var maxz = Z_MAX;
    var zval = 0.0;
    var pval;
    if( p < 0.0 ) p = 0.0;
    if( p > 1.0 ) p = 1.0;

    while ((maxz - minz) > Z_EPSILON) {
        pval = poz(zval);
        if (pval > p) {
            maxz = zval;
        } else {
            minz = zval;
        }
        zval = (maxz + minz) * 0.5;
    }
    return(zval);
}
1
0

Here is a function that does an opposite calculation (probability to z-score). This snippet allows you to input the probability and the the corresponding z-score is displayed:

function percentile_z(p) {
    if (p < 0.5) return -percentile_z(1-p);

    if (p > 0.92) {
        if (p == 1) return Infinity;
        let r = Math.sqrt(-Math.log(1-p));
        return (((2.3212128*r+4.8501413)*r-2.2979648)*r-2.7871893)/
               ((1.6370678*r+3.5438892)*r+1);
    }
    p -= 0.5;
    let r = p*p;
    return p*(((-25.4410605*r+41.3911977)*r-18.6150006)*r+2.5066282)/
             ((((3.1308291*r-21.0622410)*r+23.0833674)*r-8.4735109)*r+1);
}

// I/O handling
function calc() {
    var p = +document.getElementById("prob").value;
    var z = percentile_z(p);
    document.getElementById("z").textContent = z.toFixed(4);
}
calc();
input { width: 5em }
Probability (between 0 and 1):
<input type="number" id="prob" step="0.0001" min="0" max="1" value="0.9500" oninput="calc()"><p>

Z Score: <span id="z"></span>

For a probability of 0.95 it returns a z-score of 1.6449. See also this table as reference.


Derived from easycalculation.com

2
  • This doesn't seem to work for p>=0.5, and even if you add in a Math.abs() around 0.5-p, it seems like it gives incorrect answers for, say, 0.6
    – Zeke
    Jan 30 at 23:56
  • Thank you for your comment. Strange this went unnoticed for 4 years. Many thanks for spotting this! Corrected now.
    – trincot
    Jan 31 at 10:31

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.