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A box contains one green marble, two yellow marbles, and six pink marbles. If one marble is drawn at random, find P(green|not yellow).1/76/71/61

User Marco Frost
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1 Answer

9 votes
9 votes

Step-by-step explanation

We are asked to resolve a conditional probability question

For the given question, we will have to find the probability of obtaining a green marble given not yellow

We have the box containing one green marble, two yellow marbles, and six pink marbles

Green = 1

Yellow = 2

Pink = 6

Probability is the ratio of the number of possible outcomes to the total outcomes

we will apply the formula


P(G|Y^(\prime))=\frac{P(G\text{ n Y'})}{P(Y^(\prime))}

Where


P(G)=probability\text{ of green marble=G=}(1)/(9)


\begin{gathered} P(Y)=probability\text{ of Yellow = }(2)/(9) \\ \\ P(Y^(\prime))=probab\imaginaryI l\imaginaryI ty\text{ of not Yellow=1-}(2)/(9)=(7)/(9) \end{gathered}

Thus


\begin{gathered} P(G\text{ n }Y^(\prime))=(1)/(9) \\ \\ P(Y^(\prime))=(7)/(9) \end{gathered}

Therefore, we will have the answer as


P(G|Y^(\prime))=(1)/(9)/(7)/(9)=(1)/(9)*(9)/(7)=(1)/(7)

Therefore, the answer will be


(1)/(7)

User Argus Duong
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