1. Substitute [latex]n=5[/latex] into the formula. Evaluate the [latex]k=0[/latex] through [latex]k=5[/latex] terms. Simplify.

   [latex]\begin{align}{\left(x+y\right)}^{5} & =\left(\begin{gathered}5\\ 0\end{gathered}\right){x}^{5}{y}^{0}+\left(\begin{gathered}5\\ 1\end{gathered}\right){x}^{4}{y}^{1}+\left(\begin{gathered}5\\ 2\end{gathered}\right){x}^{3}{y}^{2}+\left(\begin{gathered}5\\ 3\end{gathered}\right){x}^{2}{y}^{3}+\left(\begin{gathered}5\\ 4\end{gathered}\right){x}^{1}{y}^{4}+\left(\begin{gathered}5\\ 5\end{gathered}\right){x}^{0}{y}^{5} \\ {\left(x+y\right)}^{5} & ={x}^{5}+5{x}^{4}y+10{x}^{3}{y}^{2}+10{x}^{2}{y}^{3}+5x{y}^{4}+{y}^{5} \end{align}[/latex]

2. Substitute [latex]n=4[/latex] into the formula. Evaluate the [latex]k=0[/latex] through [latex]k=4[/latex] terms. Notice that [latex]3x[/latex] is in the place that was occupied by [latex]x[/latex] and that [latex]-y[/latex] is in the place that was occupied by [latex]y[/latex]. So we substitute them. Simplify.
   [latex]\begin{align}{\left(3x-y\right)}^{4} & =\left(\begin{gathered}4\\ 0\end{gathered}\right){\left(3x\right)}^{4}{\left(-y\right)}^{0}+\left(\begin{gathered}4\\ 1\end{gathered}\right){\left(3x\right)}^{3}{\left(-y\right)}^{1}+\left(\begin{gathered}4\\ 2\end{gathered}\right){\left(3x\right)}^{2}{\left(-y\right)}^{2}+\left(\begin{gathered}4\\ 3\end{gathered}\right){\left(3x\right)}^{1}{\left(-y\right)}^{3}+\left(\begin{gathered}4\\ 4\end{gathered}\right){\left(3x\right)}^{0}{\left(-y\right)}^{4} \\ {\left(3x-y\right)}^{4} & =81{x}^{4}-108{x}^{3}y+54{x}^{2}{y}^{2}-12x{y}^{3}+{y}^{4} \end{align}[/latex]

Analysis of the Solution

Notice the alternating signs in part b. This happens because [latex]\left(-y\right)[/latex] raised to odd powers is negative, but [latex]\left(-y\right)[/latex] raised to even powers is positive. This will occur whenever the binomial contains a subtraction sign.