| V_E {DetLifeInsurance} | R Documentation |
Reserve Valuation for Pure Endowments
Description
Calculates the reserve for the Pure endowments up to the moment t.
Usage
V_E(
px,
x,
n,
cantprem = 1,
premperyear = 1,
i = 0.04,
data,
prop = 1,
assumption = "none",
cap,
t
)
Arguments
px |
A numeric value. The value of the premium paid in each period. |
x |
An integer. The age of the insuree. |
n |
The term of the endowment. An integer, for annual coverage, or a numeric for fractional coverage. |
cantprem |
An integer. The total number of premiums. |
premperyear |
An integer. The number of premiums to be paid per year. |
i |
The interest rate. A numeric type value. |
data |
A data.frame containing the mortality table, with the first column being the age and the second one, the probability of death. |
prop |
A numeric value. It represents the proportion of the mortality table used (between 0 and 1). |
assumption |
A character string. The assumption used for fractional ages ("UDD" for uniform distribution of deaths, "constant" for constant force of mortality and "none" if there is no fractional coverage). |
cap |
A numeric type value. The payment. |
t |
An integer. The moment of valuation (in months if it is a fractional coverage or in years if it is not). |
Value
A data frame with Premium, Risk, 1/E and reserve values up to the moment t.
References
Chapter 5 of Life Contingencies (1952) by Jordan, Chapter 11 of Actuarial Mathematics for Life Contingent Risks (2009) by Dickson, Hardy and Waters.
Examples
V_E(663.501989747591,20,10,1,1,0.04,CSO80MANB,1,"none",1000,10)
V_E(9383.64446819386/12,20,2,12,12,0.04,CSO80MANB,1,"constant",10000,24)
V_E(9383.64446819386/12,20,2,12,12,0.04,CSO80MANB,1,"constant",10000,24)