Present value: Difference between revisions
imported>Charles Cresswell No edit summary |
imported>Charles Cresswell No edit summary |
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<math>DF = (1+r)^-n</math> | <math>DF = (1+r)^-n</math> | ||
r = cost of capital per period; ''and'' | :r = cost of capital per period; ''and'' | ||
:n = number of periods | |||
==Examples== | |||
For example, if $10m is receivable one year from now, and the cost of capital (r) is 6% per year, the Present value is: | For example, if $10m is receivable one year from now, and the cost of capital (r) is 6% per year, the Present value is: |
Revision as of 21:38, 28 June 2013
(PV).
Today’s fair value of a future cash flow, calculated by discounting the future cash flow at the appropriately risk adjusted current market cost of capital.
For example, if $110m is receivable one year from now, and the cost of capital (r) is 10% per year, the Present value is:
PV = $110m x 1.1-1
= $100m.
And more generally:
PV = Future value x Discount factor (DF)
Where:
<math>DF = (1+r)^-n</math>
- r = cost of capital per period; and
- n = number of periods
Examples
For example, if $10m is receivable one year from now, and the cost of capital (r) is 6% per year, the Present value is:
PV = $10m x 1.06-1
= $9.43m.
Now changing the timing in this example, if exactly the same amount of $10m is receivable but later, namely two years from now, and the cost of capital (r) is still 6% per year, the Present value falls to:
PV = $10m x 1.06-2
= $8.90m.
The longer the time lag before we receive our money, the less valuable the promise is today.
This is reflected in the lower Present value for the two years maturity cash flow of $8.90m, compared with $9.43m Present value for the cash flow receivable after only one year's delay.