73,595 views
22 votes
22 votes
People at the state fair were surveyed about which type of lemonade they preferred. The results are shown below. Pink lemonade: 156 males, 72 females Yellow lemonade: 104 males, 48 females The events "prefers pink lemonade" and "female" are independent because P(pink lemonade | female) = P(pink lemonade) = 0.6. P(female | pink lemonade ) = P(pink lemonade) = 0.3. P(pink lemonade | female) = 0.3 and P(pink lemonade) = 0.6. P(female | pink lemonade ) = 0.3 and P(pink lemonade) = 0.6.

User Dallonsi
by
2.8k points

2 Answers

14 votes
14 votes

Answer:

P(pink lemonade | female) = P(pink lemonade) = 0.6.

Explanation:

A

User Doron Brikman
by
2.7k points
24 votes
24 votes

Answer:


P(pink) = P(pink |\ female) = 0.6

Explanation:

Given


\begin{array}{ccc}{} & {Male} & {Female} & {Pink} & {156} & {72} \ \\ {Yellow} & {104} & {48} \ \end{array}

Required

Why
prefers\ pink\ lemonade and
female are independent

First, calculate
P(pink |\ female)

This is calculated as:


P(pink |\ female) = (n(pink\ \&\ female))/(n(female))


P(pink |\ female) = (72)/(48+72)


P(pink |\ female) = (72)/(120)


P(pink |\ female) = 0.6

Next, calculate
P(pink)


P(pink) = (n(pink))/(n(Total))


P(pink) = (156 + 72)/(156 + 72 + 104 + 48)


P(pink) = (228)/(380)


P(pink) = 0.6

So, we have:


P(pink) = P(pink |\ female) = 0.6

Hence, they are independent

User HXH
by
2.7k points
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