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This site solves cubic equations, and has the equations it uses

I wrote this function to get the same results but it's not working

void cubicFormula(float a, float b, float c, float d, float *results)
{
    float a2 = a*a;
    float b2 = b*b;
    float b3 = b2*b;

    float q = (3*c- b2)/9;
    float q2 = q*q;
    float q3 = q2*q;
    float r = -27*d + b*(9*c-2*b2);
    float r2 = r*r;

    float discriminant = q3 + r2;

    float s = r + sqrtf(discriminant);
    float t = r - sqrtf(discriminant);

    float term1 = powf((-t + s)/2, 1/3.);

    float r13= 2 * sqrtf(q);

    results[0] = (- term1 + r13 * cosf(q3/3));
    results[1] = (- term1 + r13 * cosf(q3 + (2*M_PI)/3));
    results[2] = (- term1 + r13 * cosf(q3 + (4*M_PI)/3));
}

What could be the problem, is there something I am missing?

Update:

For instance, using these values

a = -1.000000;
b = 36.719475;
c = -334.239960;
d = 629.877808;

The discriminant is less then zero, so r13 is nan

But the site mentioned above and a couple of online solvers I've tested find the three roots

23.775687816485593
2.548516232734247
10.395270950780164

All of them real numbers

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closed as not a real question by Mitch Wheat, Michael Petrotta, Mr. Alien, alk, lserni Nov 11 '12 at 10:47

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center. If this question can be reworded to fit the rules in the help center, please edit the question.

2  
What a, b, c and d are you using? Not all cubic equations have 3 real roots. –  Tim Nov 11 '12 at 4:53
1  
"but it's not working" - in the absence of psychic abilities, please describe how it is not working. –  Mitch Wheat Nov 11 '12 at 4:53
    
Square root may be imaginary number, you need to take that into account before calling sqrt function. Read up on complex numbers. –  hyde Nov 11 '12 at 6:31
    
yes, those cases are covered for the answer below –  rraallvv Nov 12 '12 at 13:22

1 Answer 1

up vote 2 down vote accepted

The site you link to provide a Cubic Equation Calculator. You could start by looking for differences between your code and theirs:

function cubicsolve(dataForm)
{
    var a = parseFloat(dataForm.aIn.value);
    var b = parseFloat(dataForm.bIn.value);
    var c = parseFloat(dataForm.cIn.value);
    var d = parseFloat(dataForm.dIn.value);
    if (a == 0)
    {
        alert("The coefficient of the cube of x is 0. Please use the utility for a SECOND degree quadratic. No further action taken.");
        return;
    } //End if a == 0

    if (d == 0)
    {
        alert("One root is 0. Now divide through by x and use the utility for a SECOND degree quadratic to solve the resulting equation for the other two roots. No further action taken.");
        return;
    } //End if d == 0
    b /= a;
    c /= a;
    d /= a;
    var disc, q, r, dum1, s, t, term1, r13;
    q = (3.0*c - (b*b))/9.0;
    r = -(27.0*d) + b*(9.0*c - 2.0*(b*b));
    r /= 54.0;
    disc = q*q*q + r*r;
    dataForm.x1Im.value = 0; //The first root is always real.
    term1 = (b/3.0);
    if (disc > 0) { // one root real, two are complex
        s = r + Math.sqrt(disc);
        s = ((s < 0) ? -Math.pow(-s, (1.0/3.0)) : Math.pow(s, (1.0/3.0)));
        t = r - Math.sqrt(disc);
        t = ((t < 0) ? -Math.pow(-t, (1.0/3.0)) : Math.pow(t, (1.0/3.0)));
        dataForm.x1Re.value = -term1 + s + t;
        term1 += (s + t)/2.0;
        dataForm.x3Re.value = dataForm.x2Re.value = -term1;
        term1 = Math.sqrt(3.0)*(-t + s)/2;
        dataForm.x2Im.value = term1;
        dataForm.x3Im.value = -term1;
        return;
    } 
    // End if (disc > 0)
    // The remaining options are all real
    dataForm.x3Im.value = dataForm.x2Im.value = 0;
    if (disc == 0){ // All roots real, at least two are equal.
        r13 = ((r < 0) ? -Math.pow(-r,(1.0/3.0)) : Math.pow(r,(1.0/3.0)));
        dataForm.x1Re.value = -term1 + 2.0*r13;
        dataForm.x3Re.value = dataForm.x2Re.value = -(r13 + term1);
        return;
    } // End if (disc == 0)
    // Only option left is that all roots are real and unequal (to get here, q < 0)
    q = -q;
    dum1 = q*q*q;
    dum1 = Math.acos(r/Math.sqrt(dum1));
    r13 = 2.0*Math.sqrt(q);
    dataForm.x1Re.value = -term1 + r13*Math.cos(dum1/3.0);
    dataForm.x2Re.value = -term1 + r13*Math.cos((dum1 + 2.0*Math.PI)/3.0);
    dataForm.x3Re.value = -term1 + r13*Math.cos((dum1 + 4.0*Math.PI)/3.0);
    return;
}  //End of cubicSolve
share|improve this answer
    
hmm, there is a lot of stuff there, I'll take a closer look, thanks –  rraallvv Nov 11 '12 at 5:18

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