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Time value of money

A separate article treats the time value of an option.

The time value of money (TVM) or the present discounted value is one of the basic concepts of finance. We know that if we deposit money in a bank account we will receive interest. Because of this, we prefer to receive money today rather than the same amount in the future. Money we receive today is more valuable to us than money received in the future by the amount of interest we can earn with the money. This is referred to as the time value or cash value of money. It is the change in purchasing power of money over time.

It also takes into account default risk and inflation. 100 monetary units today is a sure thing and can be enjoyed now. In 5 years that money could be worthless or not returned to the investor.

To adjust for this time value, we use two simple formulae. The present value formula is used to discount future money streams: that is, to convert future amounts to their equivalent present day amounts. The future value formula is used to convert today's money into the equivalent amount at some time in the future (i.e., to compound money...either a lump sum or streams of payments).

Contents

Future value

One hundred units invested today at a 5% per year interest rate will yield:

${\rm Future\ value} ={\rm present\ amount}\times(1+{\rm interest\ rate})^{\rm term}=\ 100\times{(1+0.05)^1}=\ 105$

after 1 year. So, the future value of 100 units in 1 year at 5% per year is 105 units. See future value for details. The above is for a single lump sum amount. There is a separate formula to calculate Future Value of annuities. For future value of annuities, use this formula --> FV annuity = ((((1+r)^n)-1)/r) * (payment amount); r = interest rate; n = number of periods.

Present value

One hundred units 1 year from now at 5% interest rate is today worth:

${\rm Present\ value}=\frac{\rm future\ amount}{(1+{\rm interest\ rate})^{\rm term}}=\frac{\ 100}{1.05}=\ 95.23.$

So the present value of 100 units 1 year from now at 5% is 95.23 units. See present value for details. A different way of stating the formula --> PV = FV/((1+r)^n)); r = interest rate; n = number of periods. Alternative formula 1: Present Value = Future Value * ((1 + interest rate r)^(negative period n)). --> Restated: PV=FV*((1+r)^(-n)). Note: All of the above is in regards to a single lump sum amount. There is a separate formula to calculate PV of annuities. For present value of annuities, use this formula --> PV annuity = ((1-((1+r)^-n))/r) * (payment amount).

Annuity

Perpetuity

External links

Time value of money, Prof. Rock Mathis NJIT
Time Value of Money from studyfinance.com at the University of Arizona

Categories: Basic financial concepts

Science Fair Project Encyclopedia Contents Page

09-23-2007 01:00:40
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