LifeTable¶
Commutation functions and actuarial notations
The LifeTable
Space provides
commutation functions and actuarial notations, such as
\(D_{x}\) and \(\require{enclose}{}_{f|}\overline{A}_{x}\).
Mortality tables are read from input.xlsx into an ExcelRange object.
The ExcelRange object is bound to a Reference, MortalityTable
.
This Space is included in:
Parameters
LifeTable
Space is parameterized with Sex
,
IntRate
and TableID
:
>>> simplelife.LifeTable.parameters
('Sex', 'IntRate', 'TableID')
Each ItemSpace represents commutations functions actuarial notations
for a combination of Sex
, IntRate
and TableID
.
For example, LifeTable['M', 0.03, 1]
contains commutation functions
and actuarial notations for Male, the interest rate of 3%, mortality table 1.
- Sex¶
‘M’ or ‘F’ to indicate male or female column in the mortality table.
- Type:
str
- IntRate¶
The constant interest rate for discounting.
- Type:
float
- TableID¶
The identifier of the mortality table
- Type:
int
References
- MortalityTable¶
ExcelRange object holding mortality tables. The data is read from MortalityTables range in input.xlsx.
Example
An example of LifeTable
in the simplelife
model:
>>> simplelife.LifeTable['M', 0.03, 1].AnnDuenx(40, 10)
8.725179890621531
Cells
|
The present value of an annuity-due. |
|
The present value of a lifetime annuity due. |
|
The present value of a lifetime assurance on a person at age |
|
The present value of an assurance on a person at age |
|
The commutation column \(\overline{C_x}\). |
|
The commutation column \(D_{x} = l_{x}v^{x}\). |
|
The value of an endowment on a person at age |
|
The commutation column \(M_x\). |
|
The commutation column \(N_x\). |
|
The discount factor \(v = 1/(1 + i)\). |
|
The number of persons who die between ages |
|
The number of persons remaining at age |
|
Probability that a person at age |
- AnnDuenx(x, n, k=1, f=0)[source]¶
The present value of an annuity-due.
\[\require{enclose}{}_{f|}\ddot{a}_{x:\enclose{actuarial}{n}}^{(k)}\]- Parameters:
x (int) – age
n (int) – length of annuity payments in years
k (int, optional) – number of split payments in a year
f (int, optional) – waiting period in years
- AnnDuex(x, k, f=0)[source]¶
The present value of a lifetime annuity due.
- Parameters:
x (int) – age
k (int, optional) – number of split payments in a year
f (int, optional) – waiting period in years
- Ax(x, f=0)[source]¶
The present value of a lifetime assurance on a person at age
x
payable immediately upon death, optionally with an waiting period off
years.\[\require{enclose}{}_{f|}\overline{A}_{x}\]
- Axn(x, n, f=0)[source]¶
The present value of an assurance on a person at age
x
payable immediately upon death, optionally with an waiting period off
years.\[\require{enclose}{}_{f|}\overline{A}^{1}_{x:\enclose{actuarial}{n}}\]