How do you factor the trinomial 6x^2 +8x+ 26x2+8x+2?

1 Answer
KillerBunny
Jun 19, 2016

You can factor 6x^2+8x+26x2+8x+2 as 6(x+1)(3x+1)6(x+1)(3x+1)

Explanation:

To factor a trinomial, you simply have to look for its roots. There are three possible cases:

  1. The trinomial has no solutions. Then, it is not possible to factor it.
  2. The trinomial has only one solution x_0x0. Then, it is a square of a binomial, more precisely, it is a(x-x_0)^2a(xx0)2.
  3. The trinomial has two different solutions x_1x1 and x_2x2. Then, you can factor is as the product of two binomials, i.e. a(x-x_1)(x-x_2)a(xx1)(xx2).

The quantity that tells us how many solutions a trinomial has is its discriminant: if the trinomial is ax^2+bx+cax2+bx+c, its discriminant is

Delta=b^2-4ac

If Delta<0 then we are in case one, if it equals zero we are in case two, if Delta>0 we are in case three.

In your case,

Delta=b^2-4ac=8^2-4*6*2=64-48=16>0

Your trinomial has two solutions, which are given by the formula

x_{1,2}=\frac{-b\pm\sqrt{\Delta}}{2a}=(-8\pm\sqrt(16))/12=(-8\pm4)/12

The two possible choices given by the \pm sign give us x_1=(-8-4)/12=-12/12=-1 and x_2=(-8+4)/12=-4/12=-1/3

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