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On a camping trip, Kimberly kept a log of the types of snakes she saw. She noted their colors and approximate lengths. 1 foot long 2 feet long Red 4 4 Bright orange 1 3 Bright green 2 3 What is the probability that a randomly selected snake is 1 foot long given that the snake is bright orange? Simplify any fractions

User Hathors
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1 Answer

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To solve this problem we use the conditional probability formula:


P(A|B)=(P(A\cap B))/(P(B))

Where P(A|B) is the probability of a given B.

P(A∩B) is the probability of A and B.

ANd P(B) is the probability of B.

In this case, we are asked for the probability that a randomly selected snake is 1 foot long given that the snake is bright orange. Thus:


\begin{gathered} A\longrightarrow\text{Snake being 1 foot long} \\ B\longrightarrow Snake\text{ is bright orange} \end{gathered}

We find from the table the probability of A an B, P(A∩B), which is the probability of selecting a snake that is 1 foot long and bright orange:


P=\frac{Number\text{ of favorable cases}}{Total\text{ number of cases}}

For the snake to be 1 ft long and bright orange, the number of favorable cases:

And the total number of cases we find by adding all of the numbers from the table:


4+4+1+3+2+3=17

Thus:


P(A\cap B)=(1)/(17)

And the probability P(B) is the probability that the snake is bright orange. For this, the number of favorable cases is:

And the total number of cases is the same, 17.

Thus P(B) is:


P(B)=(4)/(17)

Now that we have this, we can calculate the conditional probability:


P(A|B)=(P(A\cap B))/(P(B))

Substituting the known probabilities:


P(A|B)=((1)/(17))/((4)/(17))=(1)/(4)

The probability is 1/4.

Answer: 1/4

On a camping trip, Kimberly kept a log of the types of snakes she saw. She noted their-example-1
On a camping trip, Kimberly kept a log of the types of snakes she saw. She noted their-example-2
User Max Gaurav
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