Consider the expression$11n^3-55n^2+44n$

The objective is to factor the expression completely by using the trial and error method.   

The GCF of the three terms in the expression is $11n$. So factor the GCF from the expression we get

$\begin{array}{rcl}11n^3-55n^2+44n& =& 11n·n^2-11n·5n+11n·4\\ & =& 11n(n^2-5n+4)\end{array}$

The factors of the first term and the last term of the trinomial $n^2-5n+4$

$$\begin{gathered} n^2=n·n \\ 4=2·2 or 4·1 \end{gathered}$$

Consider all the combinations of factors   

So the other factors are $(n-4)(n-1)$.

Thus, $11n^3-55n^2+44n=11n(n-1)(n-4)$

Multiply the factors to check the solution 

$\begin{array}{rcl}11n(n-1)(n-4)& =& 11n(n^2-4n-n+4)\\ & =& 11n(n^2-5n+4)\\ & =& 11n^3-55n^2+44n\end{array}$

And we get the given expression. So the expression is correctly factored.