Net present value/Tutorials: Difference between revisions

From Citizendium
Jump to navigation Jump to search
imported>Nick Gardner
mNo edit summary
imported>Nick Gardner
No edit summary
 
(4 intermediate revisions by the same user not shown)
Line 1: Line 1:
{{subpages}}
{{subpages}}
 
==Net present value==
The '''present value''' of an investment generating cash flows C during n  years is given by:
The present value of an investment generating cash flows C during n  years is given by:


::::<math>\mbox{V} = \sum_{t=1}^{n} \frac{C_t}{(1+r)^{t}}</math>
::::<math>\mbox{V} = \sum_{t=1}^{n} \frac{C_t}{(1+r)^{t}}</math>
Line 11: Line 11:
*<math>C_t</math> is the  cash flow (the inflow  of cash) in year t  <br>
*<math>C_t</math> is the  cash flow (the inflow  of cash) in year t  <br>


Tabulations of the factors to be applied each year at specified discount rates are to be found in many reference books.
Tabulations of the factors to be applied each year at specified discount rates are to be found in many reference books [http://www.netmba.com/finance/time-value/present/].
 
Present value becomes net present value when C is taken to be the net cash inflow after allowing for outflows at the time of purchase of an asset or during the launch phase of a project.


Present value becomes '''net present value''' when C is taken to be the '''''net''''' cash inflow after allowing for outflows at the time of purchase of an asset or during the launch phase of a project.




==Net present expected value==


The '''net present expected value''', E of a project having a probability P of a single outcome whose net present value is V is given by:
The net present expected value, E of a project having a probability P of a single outcome whose net present value is V is given by:


::::E&nbsp;=&nbsp;PV
::::E&nbsp;=&nbsp;PV
Line 26: Line 29:


::::<math>\mbox{E} = \sum_{y=1}^{n} P_y V_y</math>
::::<math>\mbox{E} = \sum_{y=1}^{n} P_y V_y</math>
==Internal rate of return==
The internal rate of return is that value of the discount rate, r in the above equations at which the present value V is zero. It is not recommended as an investment criterion because it is capable of producing inconsistent results
<ref> Gaylon E. Greer and  Phillip T. Kolbe: ''Investment analysis for real estate decisions''[http://books.google.com/books?id=8ELJnEyWEl0C&pg=PA227&lpg=PA227&dq=inconsistent+OR+indeterminate+%22internal+rate+of+return%22&source=bl&ots=DdvKG7pFCo&sig=re1GDQMDmTfQqjMWyQk8CVnz0dY&hl=en&ei=KYY5TODMEs2HuAes1PWQBA&sa=X&oi=book_result&ct=result&resnum=6&ved=0CCwQ6AEwBQ#v=onepage&q=inconsistent%20OR%20indeterminate%20%22internal%20rate%20of%20return%22&f=false] (Google books extract), Dearborn Real Estate, 2003</ref>.
{{reflist}}

Latest revision as of 03:15, 11 July 2010

This article is a stub and thus not approved.
Main Article
Discussion
Related Articles  [?]
Bibliography  [?]
External Links  [?]
Citable Version  [?]
Tutorials [?]
 
Tutorials relating to the topic of Net present value.

Net present value

The present value of an investment generating cash flows C during n years is given by:

Where

  • is the time of the cash flow
  • is the investor's discount rate
  • is the cash flow (the inflow of cash) in year t

Tabulations of the factors to be applied each year at specified discount rates are to be found in many reference books [2].

Present value becomes net present value when C is taken to be the net cash inflow after allowing for outflows at the time of purchase of an asset or during the launch phase of a project.



Net present expected value

The net present expected value, E of a project having a probability P of a single outcome whose net present value is V is given by:

E = PV

Where there are multiple possible outcomes y = 1 ...n with probabilities Py and present values Vy,

then the net present expected value is given by:

Internal rate of return

The internal rate of return is that value of the discount rate, r in the above equations at which the present value V is zero. It is not recommended as an investment criterion because it is capable of producing inconsistent results [1].

  1. Gaylon E. Greer and Phillip T. Kolbe: Investment analysis for real estate decisions[1] (Google books extract), Dearborn Real Estate, 2003