I'm creating a program to factor trinomials but I'm getting a bit confused and mixed up and I can't figure out how to correctly print the output.

example trinomial:

2x**2+6x+4 = (1x+2)(2x+2)

So far my code just factors each part of the equation

def factortri(x, b, c, e):
    for i in range(x): 
        if i > 0: 
            if x%i == 0: 
                if i > x/i: 
                   h = "%s, %s"%(i,x/i)
                   print h
    for i in range(e): 
        if i > 0: 
            if e%i == 0: 
                if i > e/i: 
                    s = (e/i)
                    f = "%s,%s"%(i,s)
                    print f
                    if i*x + s*x == c: 
                        print i
                        print x
                        print s
                        print x
    for l in range(b): 
        if l > 0: 
            if b%l == 0: 
                if l > b/l: 
                    r = (b/l)
                    g = "%s, %s"%(l,r) 
                    if (l+i)*(r+s)== c+e:
                        print "yes"
                    if (r+i)*(l+s)== c+e:
                        print "yes"
                    if (r+s)*(l+i)== c+e:
                        print "yes"
                    if (l+s)*(r+i)== c+e:
                        print "yes"

x = input("First Tri Co-ef: ")
b = input("First Tri Exponent: ")
c = input("Middle Tri Co-ef: ")
e = input("Last Trinomial: ")

factortri(x, b, c, e)

Is there easier way to do this?

  • Can you assume that all the numbers are integers? – pfnuesel Apr 19 '13 at 6:25
  • yes when i input im only using integers – Serial Apr 19 '13 at 6:26
  • Moreover, how do your trinomials look like? Are they all quadratic polynomials? Only one variable? – pfnuesel Apr 19 '13 at 6:26
  • they will always be for example 4x^2+8x+4 they will always have a variable with an exponent a variable then an integer – Serial Apr 19 '13 at 6:27
  • Is the highest exponent always 2? – pfnuesel Apr 19 '13 at 6:35

If I understood you correctly, all your trinomials are quadratic polynomials with only one variable. I would solve this like this:

First bring the quadratic polynomial ax^2 + bx + c to a monic form, x^2 + px + q, by dividing it by a, then set this polynomial equal to 0 and use the formula x_{1,2} = -p/2 +/- sqrt((p/2)^2-q) (more readable version on e.g. Wikipedia (http://en.wikipedia.org/wiki/Quadratic_equation#Quadratic_formula) to get the two solutions.

Now your solution is simply a(x-x1)(x-x2), where x1 and x2 are the solutions from the quadratic equation.

I add an example to make this more clear:

If you have an equation 2x^2 + 6x + 4, you divide this by a=2 and get x^2 + 3x +2, now you use the formula mentioned above and get the solutions x1=-2 and x2=-1. Now you put everything together and get a(x-x1)(x-x2) = 2(x+2)(x+1), which is the same as in your example.

  • so for example 2x^2+6x+4 would be changed to ax^2 + px + q – Serial Apr 19 '13 at 6:38

How about finding factors using the quadratic formula and then substituting the values back in?


NOTE: this method can only be used if the exponents are in an arithmetic progression. I would have asked you this in a comment, but I have too few points to do so.


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