Compound Interest: The future value (FV) of an investment of present value (PV) dollars earning interest at an annual rate of r compounded m times per year for a period of t years is: Show
FV = PV(1 + r/m)mtor FV = PV(1 + i)n where i = r/m is the interest per compounding period and n = mt is the number of compounding periods. One may solve for the present value PV to obtain: PV = FV/(1 + r/m)mt Numerical Example: For 4-year investment of $20,000 earning 8.5% per year, with interest re-invested each month, the future value is FV = PV(1 + r/m)mt = 20,000(1 + 0.085/12)(12)(4) = $28,065.30 Notice that the interest earned is $28,065.30 - $20,000 = $8,065.30 -- considerably more than the corresponding simple interest. Effective Interest Rate: If money is invested at an annual rate r, compounded m times per year, the effective interest rate is: reff = (1 + r/m)m - 1. This is the interest rate that would give the same yield if compounded only once per year. In this context r is also called the nominal rate, and is often denoted as rnom. Numerical Example: A CD paying 9.8% compounded monthly has a nominal rate of rnom = 0.098, and an effective rate of: r eff =(1 + rnom /m)m = (1 + 0.098/12)12 - 1 = 0.1025. Thus, we get an effective interest rate of 10.25%, since the compounding makes the CD paying 9.8% compounded monthly really pay 10.25% interest over the course of the year. Mortgage Payments Components: Let where P = principal, r = interest rate per period, n = number of periods, k = number of payments, R = monthly payment, and D = debt balance after K payments, then R = P � r / [1 - (1 + r)-n] andD = P � (1 + r)k - R � [(1 + r)k - 1)/r] Accelerating Mortgage Payments Components: Suppose one decides to pay more than the monthly payment, the question is how many months will it take until the mortgage is paid off? The answer is, the rounded-up, where: n = log[x / (x � P � r)] / log (1 + r) where Log is the logarithm in any base, say 10, or e.Future Value (FV) of an Annuity Components: Ler where R = payment, r = rate of interest, and n = number of payments, then FV = [ R(1 + r)n - 1 ] / r Future Value for an Increasing Annuity: It is an increasing annuity is an investment that is earning interest, and into which regular payments of a fixed amount are made. Suppose one makes a payment of R at the end of each compounding period into an investment with a present value of PV, paying interest at an annual rate of r compounded m times per year, then the future value after t years will be FV = PV(1 + i)n + [ R ( (1 + i)n - 1 ) ] / i where i = r/m is the interest paid each period and n = m � t is the total number of periods. Numerical Example: You deposit $100 per month into an account that now contains $5,000 and earns 5% interest per year compounded monthly. After 10 years, the amount of money in the account is: FV = PV(1 + i)n + [ R(1 + i)n - 1 ] / i =
Value of a Bond: V is the sum of the value of the dividends and the final payment. You may like to perform some sensitivity analysis for the "what-if" scenarios by entering different numerical value(s), to make your "good" strategic decision. Replace the existing numerical example, with your own case-information, and then click one the Calculate.
WolframAlpha Assuming present and future value | Use or instead Calculate Future value: Interest rate: Interest periods: Also include: Powerful computation of the future value of moneyWolfram|Alpha can quickly and easily compute the future value of money in savings accounts or other investment instruments that accumulate interest over time. Plots are automatically generated to help you visualize the effects that different interest rates, interest periods or starting amounts could have on your future returns.  Learn more about:
Tips for entering queriesEnter your queries using plain English. Your input can include complete details about loan amounts, down payments and other variables, or you can add, remove and modify values and parameters using a simple form interface.
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Future value basicsThe future value formula is used to determine the value of a given asset or amount of cash in the future, allowing for different interest rates and periods.For example, this formula may be used to calculate how much money will be in a savings account at a given point in time given a specified interest rate. The effects of compound interest—with compounding periods ranging from daily to annually—may also be included in the formula. Plots are automatically generated to show at a glance how the future value of money could be affected by changes in interest rate, interest period or desired future value. What is the present value of $7000 to be received at the end of each 20 periods discounted at 5% compound interest?Answer and Explanation: The present value of $7,000 to be received at the end of each of 20 periods, discounted at 5% compound interest is $87,234.
What is the future value of $7000 at the end of 5 periods at 8% compounded interest?Thus, the future value of $7,000 at the end of 5 periods at 8% compounded interest is $10,285.30.
What is the future value of 15 deposits of 2000 each made at the beginning of each period and compounded at 10%?The future value of 15 deposits of $2,000 a period at compounded 10% is: $69,899.46 or $69,900 Interest = 10% (compounded) $2,000 x 31.77248 = $63,544.96 Period = 15 $63,544.96 x 1.10= $69,899.46 (d) What is the present value of six receipts of $3,000 each received at the beginning of each period, discounted at 9% ...
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What is the future value of 15 periodic payments of $7000 each made at the end of each period and compounded at 10 %?
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