Is there a greatest common factor between all of the terms in the given expression? If so, factor that out first.
2(2c-11)^2
Practice makes perfect
We want to completely factor the given expression. To do so, we will first identify and factor out the greatest common factor (GCF), a common factor of the terms in the expression. It is the common factor with the greatest coefficient and the greatest exponent. The GCF of the given expression is 2.
Notice that 4c^2=(2c)^2, 121=11^2, and - 44c=(- 2)* 11* 2c. Therefore, we can rewrite the given expression as perfect square trinomial.
2(4c^2-44c+121) ⇔ 2(2c-11)^2
Checking Our Answer
Check Our Answer âś“
We can expand our answer and compare it with the given expression.
We can see above that after expanding and simplifying, the result is the same as the given expression. Therefore, we can be sure our solution is correct!
