Answer to Question #337393 in Algebra for Skyla

If the interest is compounded continuously for t years at a rate of r per year, then the compounded amount is given by:

"A=P\\cdot e^{rt},"

P: the principal, amount invested

A: the new balance

t: the time

r: the rate, (in decimal form).

So,

"1200=400\\cdot e^{0.15\\cdot t},\\\\\ne^{0.15\\cdot t}=3,\\\\\nt=\\cfrac{\\text {ln }3}{0.15}=7.324\\text{ years}\\approx7\\text{ years }4\\text{ months.}"