Let Lı denote the loss-at-time-zero random variable for a unit benefit fully continuous whole life insurance on (x) where it is assumed that the premium rate, π, is calculated using the equivalence p...
Let Lı denote the loss-at-time-zero random variable for a unit benefit fully continuous whole life insurance on (x) where it is assumed that the premium rate, π, is calculated using the equivalence principle. Let L2 denote the loss-at-time-zero random variable for the same insurance on (x) assuming that the premium rate, π2, is (4/3) . Find E(L2) and Var(L2) given the following: (c) δ-08. (a) Var(L1)-.5652, (b.) āz-5,
Let Lı denote the loss-at-time-zero random variable for a unit benefit fully continuous whole life insurance on (x) where it is assumed that the premium rate, π, is calculated using the equivalence principle. Let L2 denote the loss-at-time-zero random variable for the same insurance on (x) assuming that the premium rate, π2, is (4/3) . Find E(L2) and Var(L2) given the following: (c) δ-08. (a) Var(L1)-.5652, (b.) āz-5,