### Fix formulas in documentation

parent 1ae9ae42
 ... ... @@ -4,8 +4,8 @@ NULL #' Class mortalityTable.MakehamGompertz - Mortality table with Makeham-Gompertz's law #' #' A period life table following Makeham and Gompertz's law of a mortality rate #' $\mu$ increasing exponentially with age $x$ ($\mu_{x+t} = A + B c^{(x+t)}$). #' The only required slots are the parameters $A$, $B$ and $c$, all probabilities #' \eqn{\mu} increasing exponentially with age \eqn{x} (\eqn{\mu_{x+t} = A + B c^{(x+t)}}). #' The only required slots are the parameters \eqn{A}, \eqn{B} and \eqn{c}, all probabilities #' are calculated from them, for technical reasons a maximum age of 120 is #' technically assumed. Optionally, a name and loading can be passed #' (inherited from \code{\link{mortalityTable}}). ... ...
 ... ... @@ -4,8 +4,8 @@ NULL #' Class mortalityTable.Weibull - Mortality table with Weibull's law #' #' A period life table following Weibulls's law of a mortality rate #' $\mu$ increasing as a power of $t$ ($\mu_{x+t} = k * (x+t)^n$). #' The only required slots are the parameters $k>0$ and $n>0$, all probabilities #' \eqn{\mu} increasing as a power of \eqn{t}: \deqn{\mu_{x+t} = k * (x+t)^n$} #' The only required slots are the parameters \eqn{k>0} and \eqn{n>0}, all probabilities #' are calculated from them, for technical reasons a maximum age of 150 is #' technically assumed. Optionally, a name and loading can be passed #' (inherited from \code{\link{mortalityTable}}). ... ...  ... ... @@ -7,8 +7,8 @@ \title{Class mortalityTable.MakehamGompertz - Mortality table with Makeham-Gompertz's law} \description{ A period life table following Makeham and Gompertz's law of a mortality rate$\mu$increasing exponentially with age$x$($\mu_{x+t} = A + B c^{(x+t)}$). The only required slots are the parameters$A$,$B$and$c$, all probabilities \eqn{\mu} increasing exponentially with age \eqn{x} (\eqn{\mu_{x+t} = A + B c^{(x+t)}}). The only required slots are the parameters \eqn{A}, \eqn{B} and \eqn{c}, all probabilities are calculated from them, for technical reasons a maximum age of 120 is technically assumed. Optionally, a name and loading can be passed (inherited from \code{\link{mortalityTable}}). ... ...  ... ... @@ -7,8 +7,8 @@ \title{Class mortalityTable.Weibull - Mortality table with Weibull's law} \description{ A period life table following Weibulls's law of a mortality rate$\mu$increasing as a power of$t$($\mu_{x+t} = k * (x+t)^n$). The only required slots are the parameters$k>0$and$n>0$, all probabilities \eqn{\mu} increasing as a power of \eqn{t}: \deqn{\mu_{x+t} = k * (x+t)^n$} The only required slots are the parameters \eqn{k>0} and \eqn{n>0}, all probabilities are calculated from them, for technical reasons a maximum age of 150 is technically assumed. Optionally, a name and loading can be passed (inherited from \code{\link{mortalityTable}}). ... ...
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