Annuity factor: Difference between revisions
imported>Doug Williamson (Clarify wording.) |
imported>Doug Williamson (Clarify wording.) |
||
Line 57: | Line 57: | ||
'''Example''' | '''Example''' | ||
For example, when the periodic cost of capital (r) = 6% and the number of periods in the total time under review (n) = 2, then: | For example, when the periodic cost of capital (r) = 6% | ||
and the number of periods in the total time under review (n) = 2, then: | |||
Annuity factor = 1/r x [1-(1+r)<sup>-n</sup>] | Annuity factor = 1/r x [1-(1+r)<sup>-n</sup>] | ||
Line 66: | Line 68: | ||
This figure is also the sum of the | This figure is also the sum of the related Discount Factors: | ||
AF<sub>2</sub> = DF<sub>1</sub> + DF<sub>2</sub> | AF<sub>2</sub> = DF<sub>1</sub> + DF<sub>2</sub> |
Revision as of 22:02, 10 March 2015
Financial maths.
(AF).
Annuity factors are used to calculate present values of annuities, and equated instalments.
Present value calculations
An annuity factor is a method for calculating the total present value of a simple fixed annuity.
Mathematically, the Annuity Factor is the cumulative Discount factor for maturities 1 to n inclusive, when the cost of capital is the same for all relevant maturities.
Commonly abbreviated as AF(n,r) or AFn,r
Sometimes also known as the Present Value Interest Factor of an Annuity (PVIFA).
Present value
The present value of the annuity is calculated from the Annuity Factor (AF) as:
= AF x Time 1 cash flow.
Example
For example, when the Annuity factor = 1.833 and the Time 1 cash flow = $10m, then:
Present value = AF x Time 1 cash flow
= 1.833 x $10m
= $18.33m
Annuity factor calculation
The annuity factor for 'n' periods at a periodic yield of 'r' is calculated as:
AF(n,r) = 1/r x [1-(1+r)-n]
where
n = number of periods, and
r = periodic cost of capital.
Example
For example, when the periodic cost of capital (r) = 6%
and the number of periods in the total time under review (n) = 2, then:
Annuity factor = 1/r x [1-(1+r)-n]
= 1/0.06 x [1-(1 + 0.06)-2]
= 1.833
This figure is also the sum of the related Discount Factors:
AF2 = DF1 + DF2
= 1.06-1 + 1.06-2
= 0.9434 + 0.8900
= 1.833
Equated instalments
Annuity factors are also used to calculate equated loan instalments.
For a loan drawn down in full at the start, the equated loan instalment is given by:
Instalment = Principal/Annuity factor
Example
$20m is borrowed at an annual interest rate of 6%.
The loan is to be repaid in two equal annual instalments, starting one year from now.
The annuity factor is 1.833 (as before).
The loan instalment is:
$20m/1.833
= $10.9m
The Annuity Factor is sometimes also known as the Annuity formula.