Revision as of 00:03, 28 April 2023 by Admin
ABy Admin
Apr 28'23
Exercise
The probability that a visit to a primary care physician’s (PCP) office results in neither lab work nor referral to a specialist is 35%. Of those coming to a PCP’s office, 30% are referred to specialists and 40% require lab work. Calculate the probability that a visit to a PCP’s office results in both lab work and referral to a specialist.
- 0.05
- 0.12
- 0.18
- 0.25
- 0.35
ABy Admin
Apr 28'23
Solution: A
Let
[math]R[/math] = event of referral to a specialist
[math]L[/math] = event of lab work
We want to find
[[math]]
\begin{align*}
\operatorname{P}[R∩L] &= \operatorname{P}[R] + \operatorname{P}[L] – \operatorname{P}[R∪L] \\ &= \operatorname{P}[R] + \operatorname{P}[L] – 1 + \operatorname{P}[~(R∪L)] \\
&= \operatorname{P}[R] + \operatorname{P}[L] – 1 + \operatorname{P}[~R∩~L] \\ &= 0.30 + 0.40 – 1 + 0.35 \\ &= 0.05 .
\end{align*}
[[/math]]