Difference between revisions of "Manuals/calci/IRR"
Jump to navigation
Jump to search
(One intermediate revision by the same user not shown) | |||
Line 4: | Line 4: | ||
*<math>Accuracy</math> is the correct of decimal places of the result. | *<math>Accuracy</math> is the correct of decimal places of the result. | ||
*<math>NoOfIterations</math> is the number of iterations. | *<math>NoOfIterations</math> is the number of iterations. | ||
+ | **IRR(), returns the internal rate of return for a series of cash flows. | ||
==Description== | ==Description== | ||
Line 49: | Line 50: | ||
|} | |} | ||
− | #=IRR(A1:A6)=11.88% | + | #=IRR(A1:A6)=11.88% |
#=IRR(A1:A5,20%) = -3.45% | #=IRR(A1:A5,20%) = -3.45% | ||
#=IRR(B1:B7) = 7.31%% | #=IRR(B1:B7) = 7.31%% | ||
#=IRR(B1:B5,5%)= -12.47% | #=IRR(B1:B5,5%)= -12.47% | ||
+ | #IRR([-100000,10000,28000,20000,32500,59000,1000]) = 0.12040035641121027 | ||
==Related Videos== | ==Related Videos== |
Latest revision as of 04:52, 27 May 2022
IRR (CashFlowEvents,StartGuess,Accuracy,NoOfIterations)
- is the array of values.
- is the number is close to the result of IRR.
- is the correct of decimal places of the result.
- is the number of iterations.
- IRR(), returns the internal rate of return for a series of cash flows.
Description
- This function gives the internal rate of return of a cash flow stream associated with an investment.
- The Internal Rate of Return is the interest rate that makes the Net Present Value zero.
- is similar to the net present value calculation.
- In , is an values which is the array or a reference to cells that contain numbers for which you want to calculate the internal rate of return.
- is the guess which is indicating the number that you guess is close to the result of .
- must have atleast one positive and one negative value to find the internal rate of return.
- The value of can be array or reference argument contains text, logical values or empty cells, the values which are ignored.
- The value is optional, when we are omitting the value,by default it will consider the value as 10%(0.1).
- The calculation of uses an iterative method.
- The value is starting from g value and doing the calculation until the result is accurate within 0.00001%.
- Also can't find the result that works after 20 tries.
- The calculating for cash flows occurring at any other regular intervals like quarterly or semi annual by using respective factor.
- is also called effective interest rate, or rate of return.
- It is used to evaluate an investment or project.
- The function will return the result as error after the 20 tries in the iterative method.
Examples
A | B | |
---|---|---|
1 | -100000 | -500000 |
2 | 10000 | 32000 |
3 | 28000 | 45000 |
4 | 20000 | 100000 |
5 | 32500 | 150000 |
6 | 59000 | 275000 |
7 | 1000 | 67000 |
- =IRR(A1:A6)=11.88%
- =IRR(A1:A5,20%) = -3.45%
- =IRR(B1:B7) = 7.31%%
- =IRR(B1:B5,5%)= -12.47%
- IRR([-100000,10000,28000,20000,32500,59000,1000]) = 0.12040035641121027
Related Videos
See Also
References