Consider the binomial expansion of (1 + x)ⁿ, which is the binomial theorem.
[tex](1 + x)^{n} = \sum_{r = 0}^{n}\left(\begin{array}{ccc}n\\r\end{array}\right)(1)^{n - r}(x)^{r}[/tex]
Thus, we can say that the expansion of (3 + x)⁵ is:
[tex](3 + x)^{5} = \sum_{r = 0}^{5}\left(\begin{array}{ccc}5\\r\end{array}\right)(3)^{5 - r}(x)^{r}[/tex]
We can see that the only way to have an x-value in the expansion is when r = 1. Substituting r = 1 into the expansion, we get:
[tex]\text{Coefficient of x: }\left(\begin{array}{ccc}5\\1\end{array}\right)(3)^{5 - 1}[/tex]
[tex]= 5 \cdot 3^{4}[/tex]
[tex]= 5 \cdot 81[/tex]
[tex]= 405[/tex]
Thus, the coefficient of the x term is 405, based on our binomial theorem.
