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The Practice of Statistics for AP

David Moore,Daren Starnes,Dan Yates

$Math Studyset 91影视 Explanations$ Math

4th Edition 路 809 pages

ISBN: 9781319113339

Chapter 5: Q 98. (page 332)

Fundraising by telephone Tree diagrams can organize problems having more than two stages. The figure shows probabilities for a charity calling potential
donors by telephone. $21$ Each person called is either a recent donor, a past donor, or a new prospect. At the next stage, the person called either does or does not pledge to contribute, with conditional probabilities that depend on the donor class the person belongs to. Finally, those who make a pledge either do or don鈥檛 actually make a contribution.
(a) What percent of calls result in a contribution?
(b) What percent of those who contribute are recent donors?

Short Answer

Expert verified

Part (a) $22.40 %$

Part (b) The percentage who contribute are recent donor is $71.43 %$

Step by step solution

01

Part (a) Step 1. Given Information

P (R e c e n t) = 50 % = 0.5 P (P a s t) = 30 % = 0.3 P (N e w) = 20 % = 0.2

02

Part (a) Step 2. Concept used

Multiplication rule: $P (A 鈭� B 鈭� C) = P (A) 脳 P (B) 脳 P (C)$

03

Part (a) Step 3. Calculation

Multiply the probability along the branches with the following formula:

P (R e c e n t 鈭� P l e d g e 鈭� C o n t r i b u t e) = 0.5 脳 0.4 脳 0.8 = 0.1600 P (P a s t 鈭� P l e d g e 鈭� C o n t r i b u t e) = 0.3 脳 0.3 脳 0.6 = 0.054 P (N e w 鈭� P l e d g e 鈭� C o n t r i b u t e) = 0.2 脳 0.1 脳 0.5 = 0.01

Fill in the blanks with the corresponding probabilities:

P (C o n t r i b u t e) = 0.1600 + 0.0540 + 0.2240 = 0.2240 = 22.40 %

As a result, $22.40 %$ of phone calls result in a contribution.

04

Part (b) Step 1. Concept

Conditional probability: $P (A | B) = P (A 鈭� B) / P (A)$

05

Part (b) Step 2. Calculation

$P (C o n t r i b u t e) = 22.40 %$

Conditional probability: $P (A | B) = P (A 鈭� B) / P (A)$

As a result, we have:

$P (R e c e n t | C o n t r i b u t e) = \frac{P (R e c e n t 鈭� C o n t r i b u t e)}{P (C o n t r i b u t e)} = \frac{0.1600}{0.2240} 鈮� 0.7143 = 71.43 %$

As a result, $71.43 %$ of those who contribute are new donors.

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