Net present value/Tutorials: Difference between revisions

Latest revision as of 04:15, 11 July 2010

Net present value

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

{\mbox{V}}=\sum _{t=1}^{n}{\frac {C_{t}}{(1+r)^{t}}}

Where

$t$ is the time of the cash flow
$r$ is the investor's discount rate
$C_{t}$ 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 P_y and present values V_y,

then the net present expected value is given by:

{\mbox{E}}=\sum _{y=1}^{n}P_{y}V_{y}

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].

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

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

[1]

@@ Line 1: / Line 1: @@
 {{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>
@@ Line 13: / Line 13: @@
 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.
-<math>\mbox{r} = \sum_{j=1}^{n}{ y_j}{B_ij}</math>
+==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
@@ Line 29: / Line 29: @@
 ::::<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}}

Net present value/Tutorials: Difference between revisions

Latest revision as of 04:15, 11 July 2010

Net present value

Net present expected value

Internal rate of return

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