Net present value/Tutorials: Difference between revisions
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The ''' | 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> | ||
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*<math>t</math> is the time of the cash flow <br> | *<math>t</math> is the time of the cash flow <br> | ||
*<math>r</math> is the [[discount rate]] <br> | *<math>r</math> is the investor's [[discount rate]] <br> | ||
*<math>C_t</math> is the | *<math>C_t</math> is the cash flow (the inflow of cash) in year t <br> | ||
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. | |||
Revision as of 02:27, 26 February 2008
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
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.
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:
