Linear interpolation: Difference between revisions

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A straight-line estimation method for determining an intermediate value.
A straight-line estimation method for determining an intermediate value.


For example, consider a set of cashflows which has a net present value (NPV) of +$4m at a yield of 5%, and an NPV of -$4m at a yield of 6%.
 
'''Example'''
 
Consider a set of cashflows which has:
 
Net present value (NPV) of +$4m at a yield of 5%.
 
Net present value (NPV) of -$4m at a yield of 6%.
 


Using linear interpolation, the estimated yield at which the cashflows have an NPV of $Nil is given by:
Using linear interpolation, the estimated yield at which the cashflows have an NPV of $Nil is given by:


5% + [+4/(+4 --4 = +8)] x (6 - 5)%  
5% + ( +4 / ( +4 - -4 = +8 ) ) x ( 6 - 5 )%  


= 5.5%.
= 5.5%.
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This involves the straight-line estimation of values outside the range of the data used to do the estimation with.  
This involves the straight-line estimation of values outside the range of the data used to do the estimation with.  
   
   
For example, using the data above, the estimated net present value at 7%, using extrapolation  
 
'''Example'''
 
Using the data above, the estimated net present value at 7%, using extrapolation:


= -$4m - $8m  
= -$4m - $8m  

Revision as of 16:18, 16 March 2015

A straight-line estimation method for determining an intermediate value.


Example

Consider a set of cashflows which has:

Net present value (NPV) of +$4m at a yield of 5%.

Net present value (NPV) of -$4m at a yield of 6%.


Using linear interpolation, the estimated yield at which the cashflows have an NPV of $Nil is given by:

5% + ( +4 / ( +4 - -4 = +8 ) ) x ( 6 - 5 )%

= 5.5%.

5.5% is the estimated internal rate of return (IRR) of the cashflows.


Interpolation is often used in conjunction with Iteration.

Using iteration the straight-line estimated IRR of 5.5% would then be used, in turn, to recalculate the NPV at the estimated IRR of 5.5%, producing a recalculated NPV even closer to $0.

5.5% and the recalculated NPV would then be used with interpolation once again to further refine the estimate of the IRR.

This iteration process can be repeated as often as required until the result converges on a sufficiently stable final figure.


Another closely related linear estimation technique is extrapolation.

This involves the straight-line estimation of values outside the range of the data used to do the estimation with.


Example

Using the data above, the estimated net present value at 7%, using extrapolation:

= -$4m - $8m

= -$12m.


See also