Time value of money

It is well clear for everyone that $100 received today is worth more the same amount received in one year. The main reason is that the amount received today can be placed on a savings account and raise interests. Futhermore, anyone that have to wait for receiving an amount of money in the future should be compensated for that. Two other reasons can explain the Time Value of Money: firstly, due to inflation, the longer we wait, the less it will worth (due to loss of purchasing power). Secondly, there is always a possibility that we could never receive the promised amount of money.

Definition

The time value of money (TVM) is a necessary concept of finance that allows us to equate

1. (PV) the value of a dollar now to a future dollar : the value of a discount bond.
2. (FV) the value of a future dollar to a dollar now : value of your credit card debt if you don't pay up.
3. (PVPA) the value now of a perpetual annuity : the value of a bond, where you recover the principle at the end of its term, so it can be reinvested in perpetuity.
4. (PVA) the value of a dollar now to a (annuity) stream of future payments : how much mortgage you can afford.
5. (FVA) the value of a future dollar to a stream of payments (annuity) in between : the value of your portfolio after a lifetime of saving.

The premise is that you prefer to receive money today, rather than the same amount in the future, all else equal. As a result, you demand interest, paid either along the way or at the end. The interest compensates you for the time in which the money could be put to productive use, the risk of default, and the risk of inflation.

Equations

There are four basic equations that represent the four equalities listed above. The variables can be input into a financial calculator (and solved for any unknown). Or the variables can be input at any online calculator.

• The present value (PV) formula has four variables, each of which can be solved for:
  1. PV the value of a dollar at time=0
  2. FV the value of a dollar at time=n in the future
  3. r equals the interest rate that would be compounded for each period of time
  4. n is the period of time you want to equate.

     ${\displaystyle \left(PV\right)\ =\ {FV \over (1+r)^{n}}}$

• The future value (FV) formula is the same and uses the same variable.

${\displaystyle \left(FV\right)\ =\ PV(1+r)^{n}}$

• The PV of a perpetual annuity formula is simple division.

${\displaystyle \left(PVPA\right)\ =\ {A \over r}}$

• The present value of an annuity (PVA) formula has four variables, each of which can be solved for:
  1. PVA the value of the annuity at time=0
  2. A the value of the the individual payments in each compounding period
  3. r equals the interest rate that would be compounded for each period of time
  4. n is the number of payment periods.

     ${\displaystyle PVA\,=\,A\cdot {\frac {1-{\frac {1}{\left(1+r\right)^{n}}}}{r}}}$

• The future value of an annuity (FVA) formula has four variables, each of which can be solved for:
  1. FVA the value of the annuity at time=n
  2. A the value of the the individual payments in each compounding period
  3. r equals the interest rate that would be compounded for each period of time
  4. n is the number of payment periods.

     ${\displaystyle FVA\,=\,A\cdot {\frac {\left(1+r\right)^{n}-1}{r}}}$

For both calculations of annuities, you must decide whether the payments are made at the beginning of each time period, or (as in the formulas above) at the end. The calculator you use will allow the input somehow. You must also be clear that the time period used between payments is the same time period for the interest rate. e.g. The calculation for a mortgage paid monthly uses the monthly interest rate.

Examples

#1: Present value

One hundred euros to be paid 1 year from now, where the expected rate of return is 5% per year, is worth in today's money:

${\displaystyle P\ =\ F\times (P/F)\ =F\times \ {1 \over (1+r)^{n}}\ =\ {\frac {\ 100}{1.05}}\ =\ 95.23}$

So the present value of €100 one year from now at 5% is €95.23.

#2: Present value of an Annuity - solving for the payment amount

Consider a 30 year mortgage where the principal amount P is $200,000 and the annual interest rate is 6%.

The number of monthly payments is

${\displaystyle n=30{\rm {\ years}}\times 12{\rm {\ months\ per\ year}}=360{\rm {\ months}}}$

and the monthly interest rate is

${\displaystyle r={6{\rm {\%\ per\ year}} \over 12{\rm {\ months\ per\ year}}}=0.5{\rm {\%\ per\ month}}}$

The annuity formula for (A/P) calculates the monthly payment:

${\displaystyle A\ =\ P\times \left(A/P\right)\ =\ P\times {r(1+r)^{n} \over (1+r)^{n}-1}\ =\ \$200,000\times {0.005(1.005)^{360} \over (1.005)^{360}-1}}$

${\displaystyle =\ \$200,000\times 0.006\ =\ \$1,200{\rm {\ per\ month}}}$

See also

• option time value
• Discounting
• Discounted cash flow
• Exponential growth
• Hyperbolic discounting
• Internal rate of return
• Perpetuity
• Real versus nominal value
• Time preference theory of interest

External links

• Time Value of Money from studyfinance.com at the University of Arizona

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