1. The probability that the sum of the numbers rolled is either even or a multiple of 5 is 11/18
2. The probability that the sum of the numbers rolled is either a multiple of 3 or 4 is 5/9
Possible outcomes
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1. How to determine the probability of even or a multiple of 5
- Sample space (nS) = 36
- Event of even numbers (nE) = 18
- Event of multiply of 5 (n5) = 7
- NOTE = 3 are both even and multiple of 5
- Probability of even or a multiple of 5 [P(E or 5)] =?
P(E or 5) = P(E) + P(5) - P(3)
P(E or 5) = 18/36 + 7/36 - 3/36
P(E or 5) = (18 + 7 - 3) / 36
P(E or 5) = 22/36
P(E or 5) = 11/18
2. How to determine the probability of a multiple of 3 or 4
- Sample space (nS) = 36
- Event of multiply of 3 (n3) = 12
- Event of multiply of 4 (n4) = 9
- NOTE = 1 is both multiple of 3 and 4
- Probability of multiple of 3 or 4 [P(3 or 4)] =?
P(3 or 4) = P(3) + P(4) - P(1)
P(3 or 4) = 12/36 + 9/36 - 1/36
P(3 or 4) = (12 + 9 - 1) / 36
P(3 or 4) = 20/36
P(3 or 4) = 5/9
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