A six-sided number cube is weighted so that the probabilities of throwing 2, 3, 4, 5, or 6 are equal, and the probability of throwing a 1 is twice the probability of throwing a 2. if the number cube is thrown twice, what is the probability that the sum of the numbers thrown will be 4 ?
Answer: The probability of rolling 4 in this scenario would be 5/49.
First, lets identify the probabilities of each event. Since, rolling a 1 is twice the probability as the other events, rolling a 1 would be 2/7 and the rest would be 1/7. Adding up these probabilities would give a total of 1 whole.
Second, let find all the possibilities of rolling 4 and add up their probabilities.
P(2, 2) = 1/7 x 1/7 = 1/49 P(1, 3) = 2/7 x 1/7 = 2/49 P(3, 1) = 1/7 x 2/7 = 2/49
