e events E and T, are defined as E = the event that someone who is out of work and actively looking for work will find a job within the next month and T, = the event that someone who is currently it of work has been out of work for / months. For example, T, is the event that someone who is out of work has been out of work for 2 months. he following conditional probabilities are approximate and were read from a graph in a paper. P(E|T,) = 0.29 P(E|T) = 0.21 P(E|T5) = 0.19 P(E|T,) = 0.18 P(E|T,) = 0.17 P(E|T1) = 0.17 P(E|T,) = 0.28 P(E|T) = 0.20 P(E|T6) = 0.18 P(E|T) = 0.17 P(E|T10) = 0.17 P(E|T,2) = 0.17 a) Interpret the following two probabilities. (1) P(E|T,) = 0.29 O This is the probability that a person who has been out of work for a month will find work within the next month. O This is the probability that a person who has been out of work for three months will find work within the next three months. O This is the probability that a person who has been out of work for six months will find work within the next month. O This is the probability that a person who has been out of work for nine months will find work within the next three month. O This is the probability that a person who has been out of work for a year will find work within the next month. (ii) P(E|T) = 0.18 O This is the probability that a person who has been out of work for a month will find work within the next month. O This is the probability that a person who has been out of work for three months will find work within the next three months. O This is the probability that a person who has been out of work for six months will find work within the next month. O This is the probability that a person who has been out of work for nine months will find work within the next three month. O This is the probability that a person who has been out of work for a year will find work within the next month.

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The events E and T, are defined as E = the event that someone who is out of work and actively looking for work will find a job within the next month and T = the event that someone who is currently out of work has been out of work for i months. For example, T, is the event that someone who is out of work has been out of work for 2 months. The following conditional probabilities are approximate and were read from a graph in a paper. P(E|T,) = 0.29 P(E|T3) = 0.21 P(E|T5) = 0.19 P(E|T,) = 0.18 P(E|T,) = 0.17 P(E|T11) = 0.17 P(E|T,) = 0.28 P(E|T) = 0.20 P(E|T) = 0.18 P(E|TR) = 0.17 P(E|T10) = 0.17 P(E|T,2) = 0.17 (a) Interpret the following two probabilities. (1) P(E|T,) = 0.29 O This is the probability that a person who has been out of work for a month will find work within the next month. O This is the probability that a person who has been out of work for three months will find work within the next three months. O This is the probability that a person who has been out of work for six months will find work within the next month. O This is the probability that a person who has been out of work for nine months will find work within the next three month. O This is the probability that a person who has been out of work for a year will find work within the next month. (#) P(티To)=D 0.18 O This is the probability that a person who has been out of work for a month will find work within the next month. O This is the probability that a person who has been out of work for three months will find work within the next three months. O This is the probability that a person who has been out of work for six months will find work within the next month. O This is the probability that a person who has been out of work for nine months will find work within the next three month. O This is the probability that a person who has been out of work for a year will find work within the next month.