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Future value of an annuity (FVA): The future value of a stream of payments (annuity), assuming the payments are invested at a given rate of interest. There are several basic equations that represent the equalities listed above. The solutions may be found using (in most cases) the formulas, a financial calculator, or a spreadsheet. The formulas ...
Future value is the value of an asset at a specific date. [1] It measures the nominal future sum of money that a given sum of money is "worth" at a specified time in the future assuming a certain interest rate , or more generally, rate of return ; it is the present value multiplied by the accumulation function . [ 2 ]
FV is the nominal value of a cash flow amount in a future period (see Mid-year adjustment); r is the interest rate or discount rate, which reflects the cost of tying up capital and may also allow for the risk that the payment may not be received in full; [6] n is the time in years before the future cash flow occurs.
Therefore, the future value of your annuity due with $1,000 annual payments at a 5 percent interest rate for five years would be about $5,801.91.
In the 19th century, and possibly earlier, Persian merchants used a slightly modified linear Taylor approximation to the monthly payment formula that could be computed easily in their heads. [6] In modern times, Albert Einstein's supposed quote regarding compound interest rings true. "He who understands it earns it; he who doesn't pays it." [7]
It would take you 60 months (or five years) of $266.67 monthly payments to pay off the balance, and you’d end up paying $5,823.55 in interest over that time — about 37% of your total payments.
The fixed monthly payment for a fixed rate mortgage is the amount paid by the borrower every month that ensures that the loan is paid off in full with interest at the end of its term. The monthly payment formula is based on the annuity formula. The monthly payment c depends upon: r - the monthly interest rate. Since the quoted yearly percentage ...
Where, as above, C is annuity payment, PV is principal, n is number of payments, starting at end of first period, and i is interest rate per period. Equivalently C is the periodic loan repayment for a loan of PV extending over n periods at interest rate, i. The formula is valid (for positive n, i) for ni≤3.