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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 3: 3.19 (page 98)

A total of 48 percent of the women and 37 percent of the men who took a certain 鈥渜uit smoking鈥� class remained nonsmokers for at least one year after completing the class. These people then attended a success party at the end of a year. If 62 percent of the original class was male,
(a) what percentage of those attending the party were women?
(b) what percentage of the original class attended the party?

Short Answer

Expert verified

$a.The percentageofthoseattendingthepartywerewomenis 44.29 % .$

$b.The percentageoftheoriginalclassattendedthepartyis 41.18 % .$

Step by step solution

01

Given information

Probability of women that attended the party is 0.38.

So, the probability of women that attended the party is 1-0.38=0.62

The probability that the person attended the party given she is woman is 0.48.

The probability that the person attended the party given she is woman is 0.37

02

Calculation of solution (Part a)

$The percentage of women that attended the party can be calculated as:$

$P (Women 鈭� Attended the party) = \frac{P (Women and Attended the party)}{P (Attended the party)}$

$= \frac{0.48 (0.38)}{0.48 (0.38) + (0.37) (0.62)}$

$= 0.4429$

$= 44.29 %$

role="math" localid="1646971453310" $Therefore, the required percentage is 44.29 % .$

03

Calculation of solution (Part b)

$The percentage of original class that attended the party can be calculated as:$

$P (\begin{array}{l} Attended the \\ party \end{array}) = P (\begin{array}{l} Attended the \\ party|Women \end{array}) P (Women) + P (\begin{matrix} Attended the \\ party | M e n \end{matrix}) P (M e n)$

$= 0.48 (0.38) + 0.37 (0.62)$

$= 0.4118$

$= 41.18 %$

$Thus, the required percentage is 41.18 % .$

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Most popular questions from this chapter

Let $A, B$ , and $C$ be events relating to the experiment of rolling a pair of dice.

(a) If localid="1647938016434" $P (A | C) > P (B | C)$ and localid="1647938126689" $P (A | C^{c}) > P (B | C^{c})$ either prove that localid="1647938033174" $P (A) > P (B)$ or give a counterexample by defining events $B$ and $C$ for which that relationship is not true.

(b) If localid="1647938162035" $P (A | C) > P (A | C^{c})$ and $P (B | C) > P (B | C^{c})$ either prove that $P (A B | C) > P (A B | C^{c})$ or give a counterexample by defining events $A, B$ and $C$ for which that relationship is not true. Hint: Let $C$ be the event that the sum of a pair of dice is $10$ ; let $A$ be the event that the first die lands on $6$ ; let $B$ be the event that the second die lands on $6$ .

In Example $3 f$ , suppose that the new evidence is subject to different possible interpretations and in fact shows only that it is $90$ percent likely that the criminal possesses the characteristic in question. In this case, how likely would it be that the suspect is guilty (assuming, as before, that he has the characteristic)?

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A simplified model for the movement of the price of a stock supposes that on each day the stock鈥檚 price either moves up $1$ unit with probability $p$ or moves down $1$ unit with probability $1 鈭� p .$ The changes on different days are assumed to be independent.

(a) What is the probability that after $2$ days the stock will be at its original price?

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