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A quick quiz consists of a multiple choice question with 6 possible answers followed by multiple choice question with 3 possible answers if both questions are answered with random guesses find the probability that both responses are correct

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DeanR
We have a probability of [tex]\frac 1 6 [/tex] to get the first correct and [tex]\frac 1 3 [/tex] to get the second correct so a combined probability of

 [tex]\frac 1 6 \times \frac 1 3 = \frac 1 {18}[/tex] 

Bakerboyt

Answer:

Prob = 5.6%

Step-by-step explanation:

If every multiple choice question just have 1 correct response, the probability that the first question is correct is 1/6 and the probability that the second question is correct is 1/3. Because the first question has 6 possible answers and the second question has 3 possible answers.

So, the probability that both responses are correct is calculated as a multiplication between the both probabilities as:

1/6 x 1/3 = 1/18 = 0.0555

Then, if the answer needs to be as a percentage rounded to one decimal place accuracy, we need to multiply by 100% and round as:

Prob = 0.0555*100%=5.6%

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