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The Practice of Statistics for AP Examination

Daren Starnes, Josh Tabor

$Math Studyset Vaia Explanations$ Math

6th Edition · 837 pages

ISBN: 9781319113339

Chapter 6: Q. 77 (page 358)

Baby elk Biologists estimate that a randomly selected baby elk has a 44 % chance of surviving to adulthood. Assume this estimate is correct. Suppose researchers choose 7 baby elk at random to monitor. Let X= the number that survive to adulthood.

Short Answer

Expert verified

The given statement is correct because According to biologists, a baby elk chosen at random has a 44 percent chance of living to adulthood.

Step by step solution

01

Given Information

The Trials is conducted $(n) = 7$

Success of probability $P=44%=0.44$

02

According to the given question

The random variable X satisfies the following requirements:

a. Probability of success, defined as the likelihood of surviving to adulthood $(p)$ which corresponds corresponding $0.44$ is now fixed.

b. The number of baby elk chosen is set.

c. Baby elks are completely self-sufficient.

d. There are two possible outcomes: either the newborn elk survives to adulthood or it does not.

Here, all of the binomial criteria are met. As a result, it is possible to conclude that X the binomial distribution is followed.

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Most popular questions from this chapter

Benford’s law Exercise 9 described how the first digits of numbers in legitimate records often follow a model known as Benford’s law. Call the first digit of a randomly chosen legitimate record X for short. The probability distribution for X is shown here (note that a first digit can’t be 0). From Exercise 9, $E (X) = 3.441$ . Find the standard deviation of X. Interpret this value.

Large Counts condition To use a Normal distribution to approximate binomial probabilities, why do we require that both $n p$ and $n (1 - p)$ be a t least $10$ ?

Airlines typically accept more reservations for a flight than the number of seats on the plane. Suppose that for a certain route, an airline accepts $40$ reservations on a plane that carries $38$ passengers. Based on experience, the probability distribution of $Y =$ the number of passengers who actually show up for a randomly selected flight is given in the following table. You can check that $μ_{Y} = 37.4 and σ_{Y} = 1.24 .$

There is also a crew of two flight attendants and two pilots on each flight. Let $X =$ the total number of people (passengers plus crew) on a randomly selected flight.

a. Make a graph of the probability distribution of $X$ . Describe its shape.

b. Find and interpret role="math" $μ_{X}$ .

c. Calculate and interpret $σ_{X}$ .

.Life insurance The risk of insuring one person’s life is reduced if we insure many people. Suppose that we insure two $21$ -year-old males, and that their ages at death are independent. If $X_{1 a n d} X_{2}$ are the insurer’s income from the two insurance policies, the insurer’s average income W on the two policies is

$W = \frac{X_{1} + X_{2}}{2} = 0.5 X_{1} + 0.5 X_{2}$

Find the mean and standard deviation of $W$ . (You see that the mean income is the same as for a single policy but the standard deviation is less.)

Housing in San José How do rented housing units differ from units occupied by their owners? Here are the distributions of the number of rooms for owner-occupied units and renter-occupied units in San José, California:

Let X= the number of rooms in a randomly selected owner-occupied unit and Y = the number of rooms in a randomly chosen renter-occupied unit.

(a) Here are histograms comparing the probability distributions of X and Y. Describe any differences you observe.

(b) Find the expected number of rooms for both types of housing unit. Explain why this difference makes sense.

(c) The standard deviations of the two random variables are $σ_{X} = 1.640$ and $σ_{Y} = 1.308$ . Explain why this difference makes sense.

See all solutions

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