exercise:4ebfb94ef1: Difference between revisions

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In [[guide:448d2aa013#exam 4.1.5 |Example]], we used the Life Table (see Appendix C) to compute a conditional probability.  The number 93,53 in the table, corresponding to 40-year-old males, means that of all the males born in the United States in 1950, 93.753% were
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\newcommand{\mathds}{\mathbb}</math></div>  In [[guide:448d2aa013#exam 4.1.5 |Example]], we used the Life Table (see Appendix C)
to compute a conditional probability.  The number 93,53 in the table, corresponding to
40-year-old males, means that of all the males born in the United States in 1950, 93.753\% were
alive in 1990.  Is it reasonable to use this as an estimate for the probability of a male, born
alive in 1990.  Is it reasonable to use this as an estimate for the probability of a male, born
this year, surviving to age 40?
this year, surviving to age 40?

Latest revision as of 23:42, 12 June 2024

In Example, we used the Life Table (see Appendix C) to compute a conditional probability. The number 93,53 in the table, corresponding to 40-year-old males, means that of all the males born in the United States in 1950, 93.753% were alive in 1990. Is it reasonable to use this as an estimate for the probability of a male, born this year, surviving to age 40?