Answer:
a
[tex]\% E = 0.9 \%[/tex]
b
[tex]\%E_1 = 10.1 \%[/tex]
Step-by-step explanation:
From the question we are told that
The probability that an employees suffered lost-time accidents last year is [tex]P(e) = 0.06[/tex]
The probability that an employees suffered lost-time accident during the current year is
[tex]P(c) = 0.05[/tex]
The probability that an employee will suffer lost time during the current year given that the employee suffered lost time last year is
[tex]P(c | e) = 0.15[/tex]
Generally the probability that an employee will experience lost time in both year is mathematically represented as
[tex]P(c \ n \ e) = P(e) * P(c \ |\ e)[/tex]
=> [tex]P(c \ n \ e) = 0.06* 0.15[/tex]
=> [tex]P(c \ n \ e) = 0.009[/tex]
Generally the percentage of employees that will experience lost time in both year is mathematically represented as
[tex]\% E = P(e \ n \ c ) * 100[/tex]
=> [tex]\% E = 0.009 * 100[/tex]
=> [tex]\% E = 0.9 \%[/tex]
Generally the probability that an employee will experience at least one lost time accident over the two-year period is mathematically represented as
[tex]P(e \ u \ c) = P(e) + P(c) - P(e \ n \ c)[/tex]
=> [tex]P(e \ u \ c) = 0.06 + 0.05 - 0.009[/tex]
=> [tex]P(e \ u \ c) = 0.101[/tex]
Generally the percentage of the employees who will suffer at least one lost-time accident over the two-year period is mathematically represented as
[tex]\%E_1 = P(e \ u \ c) * 100[/tex]
=> [tex]\%E_1 = 0.101* 100[/tex]
=> [tex]\%E_1 = 10.1 \%[/tex]
