How do you factor quadratic x^2-x-56x2x56?

2 Answers
Alan P.
Mar 27, 2015

Solve x^2 - x - 56 = 0x2x56=0
using the formula
x_0 = (-b+-sqrt(b^2 - 4ac))/(2a)x0=b±b24ac2a

to get solutions
x_0=ax0=a and x_0=bx0=b
(in this particular case x_0=8x0=8 and x_0=-7x0=7)

Since the original quadratic is equal to zero when xx is equal to either of the x_0x0 values
(x-a)(xa) and (x-b)(xb) are factors of the original quadratic.

Using a=8a=8 and b=-7b=7
(x-8)(x+7) = x^2-x -56(x8)(x+7)=x2x56
and the factorization is complete.

Jim H
Mar 27, 2015

To factor x^2-x-56x2x56 by trial and error, use the following.

(This takes longer to explain than it does to do.)

We're looking for
(x+b)(x+d)=x^2+(d+b)x+(bd)=x^2-x-56(x+b)(x+d)=x2+(d+b)x+(bd)=x2x56

the products used to get 56 (bdbd) using whole numbers are
1*56156
2*28228

4*14414 (3, 5, 63,5,6 are not factors of 5656)

7*878 (the next number, 88 has already appeared on the right, so we're done)

We want -5656, so we need bb and dd to have opposite signs. (One is positive and the other negative) they need to add up to -11 because we want a -x=-1xx=1x in the middle. +(d+b)x=-1x+(d+b)x=1x, so d+b=-1d+b=1.

Here's the list again:
1*56156
2*28228
4*14414
7*878
If one is positive and the other negative which pair do I want to get a sum of -11?

Looks like I want 77 and -88

Check to be sure

(x-8)(x+7)=x^2+7x-8x-56=x^2-x-56(x8)(x+7)=x2+7x8x56=x2x56 Good, that works.

Note
If there is a number (other than 11) in front of the x^2x2, we need

(ax+b)(cx+d)=(ac)x^2+(ad+bc)x+(bd)(ax+b)(cx+d)=(ac)x2+(ad+bc)x+(bd)

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