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Exercise
May 07'23
Answer
Solution: B
Observe that (where [math]Z[/math] is total hours for a randomly selected person)
[[math]]
\operatorname{E}[ Z ] = \operatorname{E}[ X + Y ] = \operatorname{E}[ X ] + \operatorname{E}[Y] = 50 + 20 = 70,
[[/math]]
[[math]]
\operatorname{Var}[ Z ] = \operatorname{Var}[ X + Y ] = \operatorname{Var}[ X ] + \operatorname{Var}[Y ] + 2\operatorname{Cov}[ X , Y ] = 50 + 30 + 20 = 100.
[[/math]]
It then follows from the Central Limit Theorem that [math]T[/math] is approximately normal with mean 100(70) = 7000 and variance 100(100) = 10,000 and standard deviation 100. The probability of being less than 7100 is the probability that a standard normal variable is less than (7100 –7000)/100 = 1. From the tables, this is 0.8413.
Copyright 2023. The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.