To determine what the two binomials look like, we can see that the first piece of each binomial in each parentheses will simply be an “x”, since those are the only 2 things that multiply to x².

 To determine the two numbers we need in each parentheses, we need to determine the two number that would multiply to the “c” value, and also add to the “b” value.

Given x²+ 5x + 6

(x + __) (x + __)

We know the beginning of each binomial will be just “x” we now look for two numbers that multiply to 6, but also add to 5. We have two choices of number pairs that multiply to 6: 1 · 6 and 2 · 3. We can see that the pair that also adds to 5 is 2 · 3. Therefore we can write:

(x + 2)(x + 3)

Here’s a video that shows some examples (for the first 3 minutes and 24 seconds):

1. x² + 8x + 7
2. x² + 14x + 24
3. x²– 4x – 21
4. x²– x – 2
5. x² – 6x + 8
6. 2x³– 18x² + 40x

Click here to schedule a 1:1 with a tutor, coach, and or sign up for a workshop. *If this link does not bring you directly to our platform, please use our direct link to "Academic Support" from any Brightspace course at the top of the navigation bar.