Using that equation, our P = 150, r = .08, t = 13, and n = 12 (because there are 12 months in a year). Filling in accordingly, we have [tex]A(t)=150(1+ \frac{.08}{12})^{(12)(13)} [/tex]. Simplifying a bit we have [tex]A(t)=150(1+.00666666)^{156}[/tex]. Doing the addition inside the parenthesis and then raising that number to the 156th power, we have [tex]A(t)=150(2.819469238)[/tex]. Multiply those and get A(t) = $422.92
