Answer:
The probability it will take a resident of the city between 17.24 and 42.13 minutes to travel to work is 0.3046.
Step-by-step explanation:
The random variable X can be defined as the travel times to get to work.
The expected travel time is, μ = 38.3 minutes.
The distribution of random variable X can be defined as the distribution of time interval between which a person reaches their work place at a constant average rate.
This implies that X follows an Exponential distribution with parameter, [tex]\lambda=\frac{1}{\mu}=\frac{1}{38.3}[/tex].
The probability density function of X is:
[tex]f_{X}(x)=\lambda e^{-\lambda x};\ x\geq 0[/tex]
Compute the probability it will take a resident of the city between 17.24 and 42.13 minutes to travel to work as follows:
[tex]P(17.24\leq X\leq 42.13)=\int\limits^{42.13}_{17.24}{\frac{1}{38.3} e^{-x/38.3}}}\, dx[/tex]
[tex]=\frac{1}{38.3}\times \int\limits^{42.13}_{17.24}{ e^{-x/38.3}}}\, dx[/tex]
[tex]=\frac{1}{38.3}\times| \frac{e^{-x/38.3}}{-1/38.3}}|^{42.13}_{17.24}\\[/tex]
[tex]=-e^{42.13/38.3}+e^{17.34/38.3}\\=-0.3329+0.6375\\=0.3046[/tex]
Thus, the probability it will take a resident of the city between 17.24 and 42.13 minutes to travel to work is 0.3046.
Answer:
The probability for a person from the city is between 17.24 and 42.13 minutes to travel to work is 0.3046.
Step-by-step explanation:
