Problem of the Week

Updated at Oct 18, 2021 8:24 AM

Recent Posts

Oct 18, 2021

To get more practice in algebra, we brought you this problem of the week:

How can we factor \(30{m}^{2}-26m+4\)?

Check out the solution below!

\[30{m}^{2}-26m+4\]

Find the Greatest Common Factor (GCF).

GCF = \(2\)

Factor out the GCF. (Write the GCF first. Then, in parentheses, divide each term by the GCF.)

\[2(\frac{30{m}^{2}}{2}+\frac{-26m}{2}+\frac{4}{2})\]

Simplify each term in parentheses.

\[2(15{m}^{2}-13m+2)\]

Split the second term in \(15{m}^{2}-13m+2\) into two terms.

\[2(15{m}^{2}-3m-10m+2)\]

Factor out common terms in the first two terms, then in the last two terms.

\[2(3m(5m-1)-2(5m-1))\]

Factor out the common term \(5m-1\).

\[2(5m-1)(3m-2)\]

Done