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统计exam代写 Statistics I代写 函数代写

2021-09-28 15:35 星期二 所属: 统计作业 浏览:524

Statistics I 

统计exam代写 1.In a given community, the monthly savings of an individual follow a Normal distribution with mean 150 m.u. and standard deviation 40 m.u.

REMEMBER TO DEFINE ALL RANDOM VARIABLES, ETC. CAREFULLY JUSTIFY ALL YOUR ANSWERS.

 

1.

In a given community, the monthly savings of an individual follow a Normal distribution with mean 150 m.u. and standard deviation 40 m.u.

(1,0) a) Calculate the probability of an individual from the community saving more than 200 m.u. in a month.

(1,0) b) What is the highest savings amount amongst the 25% bottom savers?

(1,5) c) Two friends from the community decided to set up a joint account in order to gather funds for throwing a party, and deposited 10% of their monthly savings for 9 months. The budget for the party is 300 m.u. What is the probability of, after those 9 months, the two friends having saved at least 95% of the budgeted amount?

(1,0) d) What is the probability of, in a given month, at least 5 of 10 randomly selected individuals saving more than 200 m.u.? (If you have not solved question a), consider – incorrectly – the answer to be 0,15)

 

2.  统计exam代写

To decorate the party, the two friends decided to buy several meters of party ribbon. They have obtained an attractive pricing quote from a supplier; notwithstanding, the supplier has informed the two friends that the product is of slightly inferior quality, as parts of the ribbon may be defective. On average, for every 10 meters of ribbon, one defect is found.

(1,0) a) State which conditions must be satisified so that variable X – number of defects per linear meter of ribbon is adequately described by a Poisson distribution? What would be the respective parameters?

(1,0) b) Assuming the conditions from the previous question to be satisfied, what is the probability of finding at most 5 defects if the two friends decide to buy 100 meters of ribbon?

 

3.  统计exam代写

Let X and W be two independent random variables, normally distributed with mean 0. The standard deviations of X and W are 3 and 4, respectively. Calculate the following probabilities:

 

 

4.

Let X be a Bernoulli population and let X, X, ⋯ , Xn be a random sample drawn from that population.

Additionally, consider the following estimator for the defining parameter of X:

 

统计exam代写
统计exam代写

 

(1,0) a) Conclude about the unbiasedness of T.

(1,0) b) Is ?0 consistent in Mean Square Error for the defining parameter of X?

 

 

5.  统计exam代写

Consider a population X with the following probability mass function:

f(x) = θ (1 − θ)x-1

with 0 ≤ θ ≤ 1 and x = 1, 2, 3, …

(1,0) a) Find the Maximum Likelihood estimator for parameter θ.

(0,5) b) A random sample was obtained from X: (1; 2; 2; 1). What value do you propose for θ?

 

 

6.  统计exam代写

The unemployment rates of a group of municipalities were obtained. The municipalities under study were split according to their geographic location (Northeast or Southeast) and community type (touristic, commercial or industrial). The data are represented on the box-and-whiskers plots below, according to location and community type:

 

 

(1,0) a) State and interpret the (approximate) median unemployment rate for the commercial community in each of the two locations.

(1,5) b) Compare and comment on the dispersion of the unemployment rate by community type, in the Southeast region. State the dispersion measure on which you are basing your comments on.

 

7.  统计exam代写

Consider the following independent random variables, X and Y, such that:

E[X] = VAR[X] = E[Y] = VAR[Y] = 10

Let Z = 4X – 5.

Calculate:

(1,0) a) E[Z] and VAR[Z].

(1,5) b) Covariance between X and (Z-Y).

 

8.

Consider the bivariate random variable that encompasses the information about the number of parking spots available to a household (X) and the number of automobiles belonging to that same household (Y), in an old neighbourhood of Lisbon. The joint probability mass function is – partially – provided below:

 

统计exam代写
统计exam代写

 

(1,0) a) Calculate the marginal probability functions of X and Y.

(1,0) b) What is the probability of a household having one automobile, given that the number of parking spots available is 0?

(1,0) c) If, for each automobile belonging to a household, the monthly expense on fuel is 50 EUR and the yearly expense on maintenance and insurance is 700 EUR, what is the average yearly cost per household?

 

 

 

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