So, the balance after 6 years is approximately $1,938.84.
P = principal amount (the initial amount you borrow or deposit) r = annual rate of interest (as a decimal) t = number of years the amount is deposited or borrowed for. A = amount of money accumulated after n years, including interest. n = number of times the interest is compounded per year

Example:
An amount of $1,500.00 is deposited in a bank paying an annual interest rate of 4.3%, compounded quarterly.
What is the balance after 6 years? 
Solution:
Using the compound interest formula, we have that
P = 1500, r = 4.3/100 = 0.043, n = 4, t = 6.
Therefore,
So, the balance after 6 years is approximately $1,938.84.

Initial Investment  
Regular Investment  
Interest Rate  
Years  
Compounded  
Calculate  
Powered by CalculateStuff.com 
Write a comment