The formula we use for continuous compounding is [tex]A=Pe ^{rt} [/tex] where P is the initial amount invested, r is the rate as a decimal, and t is time in years. Our P = 1300, our r = .042, and our t = 5.75 (9 months is 3/4 of a year, and 3/4 in a decimal is .75). Putting all that into our formula we have [tex]A=1300(2.718) ^{(.042)(5.75)} [/tex]. We have to multiply those 2 powers together and then raise euler's number to it, then multiply by 1300. Doing all of that, we get the amount at the end to be $1,655.10
