Annuity factor: Difference between revisions
imported>Doug Williamson m (Changed style of headings within entry to make it distinct from See also and added more space before See also) |
imported>Doug Williamson m (Expand to clarify that Time 1 cash flows arise one period hence, and similarly for Time n cash flows.) |
||
Line 4: | Line 4: | ||
A method for calculating the total present value of a simple fixed [[annuity]]. | A method for calculating the total present value of a simple fixed [[annuity]]. | ||
Such an annuity is a finite series of fixed future cash flows, the first cash flow being at Time 1 period hence, and the last one at Time n periods hence. | |||
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. | 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. | ||
Line 20: | Line 22: | ||
= AF x Time 1 cash flow. | = AF x Time 1 cash flow. | ||
The Time 1 cash flow being the cash flow which occurs one period into the future. | |||
Today being Time 0. | |||
'''''Example''''' | '''''Example''''' | ||
For example, when the Annuity factor = 1.833 ''and'' the Time 1 cash flow = $10, then: | For example, when the Annuity factor = 1.833 ''and'' the Time 1 period hence cash flow = $10, then: | ||
Present value = AF x Time 1 cash flow | Present value = AF x Time 1 cash flow |
Revision as of 09:34, 12 July 2014
Financial maths.
(AF).
A method for calculating the total present value of a simple fixed annuity.
Such an annuity is a finite series of fixed future cash flows, the first cash flow being at Time 1 period hence, and the last one at Time n periods hence.
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
Also known as the Present Value Interest Factor of an Annuity (PVIFA).
Present value calculation
The present value of the annuity is calculated from the Annuity Factor (AF) as:
= AF x Time 1 cash flow.
The Time 1 cash flow being the cash flow which occurs one period into the future.
Today being Time 0.
Example
For example, when the Annuity factor = 1.833 and the Time 1 period hence cash flow = $10, then:
Present value = AF x Time 1 cash flow
= 1.833 x $10
= $18.33
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 two related Discount Factors:
AF2 = DF1 + DF2
= 1.06-1 + 1.06-2
= 0.9434 + 0.8900
= 1.833
The Annuity Factor is sometimes also known as the Annuity formula.