Respuesta :
Answer:
a) 0.017
b) 0.92
c) 51
Step-by-step explanation:
Hi!
Lets define the random variable:
X = number of calls before you get connected
So if you the connect in the 10th call, X=9. If q is the probability of a busy signal, then q = 1 - p = 0.98
a) As the calls are independent, the probability of 9 consecutive calls obtaining a busy signaln and th 10th connecting is [tex](q^9)p=0.83*0.02=0.017[/tex]. Thus, 0.017 is the probability tha the first call that connects is the 10th.
We can generalize to:
[tex]P(X=n) =f(n) =p(1-q)^n[/tex]
b) The probability of that it requires more tha five calls to get connected is:
[tex]P(X\geq 5) = \sum_{n=5}^{\infty} f(n) = p \sum_{n=5}^{\infty} (1-p)^n[/tex]
We need to sum the geometric series (the formula is in allmost any text about infinite series). The sum is:
[tex]\sum_{n=5}^{\infty} (1-p) =\sum_{n=0}^{\infty} (1-p)^n -\sum_{n=0}^{4} (1-p)^n = 1/p -\sum_{n=0}^{4} (1-p)^n [/tex]
Then:
[tex]P(X\geq 5) = 1 - 0.02 \sum_{n=0}^{4} 0.98^n = 0.92[/tex]
c) The mean E(X) is:
[tex]E(X) = \sum_{n=0}^{\infty} nf(n) = p\sum_{n=0}^{\infty} n(1-p)^n[/tex]
This sum can also be found in many math texts. the result is:
[tex]E(X) = \frac{1}{p(1-p)}= 51[/tex]
a. The probability of your first call that connects is your 10th call is 0.17.
b. The probability that it requires more than five calls for you to connect is 0.92.
c. The mean number of calls needed to connect is 51.
What is probability?
Probability means possibility. It deals with the occurrence of a random event. The value of probability can only be from 0 to 1. Its basic meaning is something is likely to happen. It is the ratio of the favorable event to the total number of events.
Given
Each of your calls to a popular radio station has a probability of 0.02 of connecting, that is, of not obtaining a busy signal.
Let X be the number of calls before you get connected.
So if you connect in the 10th call, X = 9. If q is the probability of a busy signal, Then q will be.
[tex]\rm q= 1 -p\\q = 1 - 0.02\\q = 0.98[/tex]
a. The probability of your first call that connects is your 10th call.
[tex]\rm P(X = n)= f(n) = p(1-q)^{n }\\\\P(X = 9) = 0.02 *(0.98)^{9}\\\\P(X = 10) = 0.17[/tex]
b. The probability that it requires more than five calls for you to connect.
[tex]\rm P(X\geq 5) = \Sigma_{n=5}^{\infty} f(n) = p \Sigma_{n=5}^{\infty} (1-p)^{n}\\[/tex]
The sum of the geometric series will be
[tex]\Sigma _{n=5}^{\infty} (1-p) = \Sigma _{n=0}^{\infty} (1-p)^n - \Sigma _{n=0}^{4} (1-p)^n = \dfrac{1}{p} - \Sigma _{n=0}^{4} (1-p)^n\\\\[/tex]
Then
[tex]\rm P(X\geq 5 ) = 1 - 0.02 \Sigma _{n=0}^{4} 0.98^n = 0.92[/tex]
c. The mean number of calls needed to connect.
[tex]E(X) = \Sigma_{n=0}^{\infty} nf(n) = p\Sigma _{n=0}^{\infty} n (1-p)^n[/tex]
This sum can also be found in many math texts. The result is
[tex]\rm E(X) = \dfrac{1}{p(1-p)} = 51[/tex]
More about the probability link is given below.
https://brainly.com/question/795909
