Answer:
0.048 is the probability that more than 950 message arrive in one minute.
Step-by-step explanation:
We are given the following information in the question:
The number of messages arriving at a multiplexer is a Poisson random variable with mean 15 messages/second.
Let X be the number of messages arriving at a multiplexer.
Mean = 15
For poison distribution,
Mean = Variance = 15
[tex]\text{Standard Deviation} = \sqrt{\text{Variance}} = \sqrt{15} = 3.872[/tex]
From central limit theorem, we have:
[tex]z = \displaystyle\frac{x-n\mu}{\sigma\sqrt{n}}[/tex]
where n is the sample size.
Here, n = 1 minute = 60 seconds
P(x > 950)
[tex]P( x > 950) = P( z > \displaystyle\frac{950 - (60)(15)}{\sqrt{(15)(60)}}) = P(z > 1.667)[/tex]
[tex]= 1 - P(z \leq 1.667)[/tex]
Calculation the value from standard normal z table, we have,
[tex]P(x > 950) = 1 - 0.952 = 0.048[/tex]
0.048 is the probability that more than 950 message arrive in one minute.
