A pair of dice consisting of a six-sided die and a four-sided die is rolled and the sum is determined. Let A be the event that a sum of 5 is rolled and let B be the event that a sum of 5 or a sum of 9 is rolled. Find (a) P (A), (b) P (B), and (c) P (A / B)

Question

Rosa Benitez

Mathematics

17 September, 18:06

A pair of dice consisting of a six-sided die and a four-sided die is rolled and the sum is determined. Let A be the event that a sum of 5 is rolled and let B be the event that a sum of 5 or a sum of 9 is rolled. Find (a) P (A), (b) P (B), and (c) P (A / B)

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P (A) = 1 / 6

P (B) = 1 / 4

P (A/B) = 0

Step-by-step explanation:

It is given that the a six-sided die and a four-sided die is rolled

Thus,

the total number of outcome = 6 * 4 = 24

A = event that a sum of 5 is rolled

B = event that a sum of 5 or a sum of 9

Now,

a) For P (A)

The possible outcomes for event A = (1,4), (2,3), (3,2), (4,1)

Thus,

the total number of possible outcomes for the given event = 4

therefore,

P (A) = 4 / 24

or

P (A) = 1 / 6

b) For P (B)

The possible outcomes for event B = (5,4), (6,3) and possible outcomes for event A

thus,

the total number of possible outcomes for the given event = 2 + 4 = 6

therefore,

P (B) = 6 / 24

or

P (B) = 1 / 4

c) P (A/B)

Since,

it is impossible to get both the sum of 5 and sum of number = 9,

Hence, the P (A/B) = 0