Answer:
[tex]1 a. P(X=1)=0.3809\\\\b. P(X\geq 1)=0.5721\\c. \mu_x=0.81, \ \ \ \sigma_x=0.7371\\d. Increase \ n[/tex]
[tex]2.a. 0.2438\\b. 0.6227\\c. \mu_8=17.6, \ \sigma_8=4.1952[/tex]
Step-by-step explanation:
The purchase of a house has binomial distribution with p=9% and n=9
a. To find the probability of one house being sold:
[tex]p(x)={n\choose x}p^x(1-p)^{n-x}[/tex]
The value of x is 1:
[tex]p(x)={n\choose x}p^x(1-p)^{n-x}\\\\\\P(X=x)={9\choose 1}0.09(1-0.09)^8\\\\=0.3809[/tex]
Hence, the probability that one house is sold that day is 0.3809
b.The probability of at least one house is the same as the 1 minus the probability that no house was sold:
[tex]p(x)={n\choose x}p^x(1-p)^{n-x}\\\\P(X\geq 1)=1-P(X=0)\\\\=1-{9\choose 0}0.09^0(0.91)^9\\\\=1-0.4279\\\\=0.5721[/tex]
Hence,the probability that at least one house is sold that day is 0.5721
c. The mean of a binomial distribution is the product of the number of events times the probability of success=np
From a above, n=9 and p=0.09:
[tex]\mu_x=np, \ n=9 , \ p=0.09\\\\=9\times 0.09\\\\=0.81[/tex]
#The standard deviation is calculated as np(1-p):
[tex]\sigma_x=np(1-p),\ n=9, p=0.09\\\\=9\times 0.09\times 0.91\\\\=0.7371[/tex]
Hence, the distribution has a mean of 0.81 and a standard deviation of 0.7371
d. Given that the probability of success is low, the overall successful events can only be increased by increasing the sample size, say n should be increased to 1000.
2. a.Given a Poisson distribution with mean=2.2
-The probability in a Poisson distribution is expressed as:
[tex]P(x;\mu)=\frac{e^{-\mu}\mu^x}{x!}[/tex]
The probability of one person showing up is calculated as:
[tex]P(x;\mu)=\frac{e^{-\mu}\mu^x}{x!}\\\\P(1,2.2)=\frac{e^{-2.2}2.2^1}{1!}\\\\=0.2438[/tex]
Hence , the probability that exactly one person shows up during a 1-hour period is 0.2438
b. the probability that at most 2 people will show up during a 1-hour period is calculated as:
[tex]P(x;\mu)=\frac{e^{-\mu}\mu^x}{x!}\\\\P(x\leq2 ;\mu)=P(x=0;\mu)+P(x=1;\mu)+P(x=2 ;\mu)\\\\=\frac{e^{-2.2}2.2^0}{0!}+\frac{e^{-2.2}2.2^1}{1!}+\frac{e^{-2.2}2.2^2}{2!}\\\\=0.1108+0.2438+0.2681\\\\=0.6227[/tex]
Hence,the probability that at most 2 people will show up during a 1-hour period is 0.6227
c. The mean and variance of a Poisson distribution is equal:
[tex]E(X)=\mu=Var(X)=\sigma^2, \mu=2.2\\\\8E(X)=8(2.2)=\mu_8\\\\\mu_8=17.6\\\\V(X)=\sigma^2=17.6\\\\\sigma=4.1952[/tex]
Hence the mean after 8 hrs is 17.6 and the standard deviation will be 4.1952
