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A First Course in Probability

Sheldon M. Ross

$Math Studyset 91影视 Explanations$ Math

9th Edition 路 432 pages

ISBN: 9780321794772

Chapter 4: Q.4.13 (page 170)

Let X be a binomial random variable with parameters (n, p). What value of p maximizes P{X = k}, k = 0, 1, ... , n? This is an example of a statistical method used to estimate p when a binomial (n, p) random variable is observed to equal k. If we assume that n is known, then we estimate p by choosing that value of p that maximizes P{X = k}. This is known as the method of maximum likelihood estimation.

Short Answer

Expert verified

In the given information the answer is $p = \frac{k}{n}$

Step by step solution

01

Step 1:Given Information

We are require to find $p 鈭� (0, 1)$ which maximize the probability

$P (X = k) = (\begin{array}{l} n \\ k \end{array}) p^{k} 路 (1 - p)^{n - k}$

where $k$ is some fixed number. consider the logarithm of expression we have

$\log P (X = k) = \log (\begin{array}{l} n \\ k \end{array}) + k 路 \log p + (n - k) \log (1 - p)$

02

Step 2:Calculation

We need to maximize the function $p 鈫� k$ .

$\log p + (n - k) \log (1 - p)$ .call the function $g$ .

we have that

$\frac{d g}{d p} = \frac{k}{p} - \frac{n - k}{1 - p} = 0$

since, equation is equal to $k (1 - p) = (n - k) p$ .which is satisfied for $p = \frac{k}{n}$ .

03

Step 3:Final Answer

The answer is $p = \frac{k}{n}$ .

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Most popular questions from this chapter

If X has distribution function F, what is the distribution function of the random variable 伪X + 尾, where 伪 and 尾 are constants, $伪鈮� 0 ?$

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The random variable X is said to have the Yule-Simons distribution if

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(b) Show that E[X] = 2.

(c) Show that E[X2] = q

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Hint: Use integration by parts.

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