1.5 Three balanced dice are tossed. Find the probability of obtaining a nine, given:
a. The sum is odd.
b. The sum is less than or equal to nine.
c. None of the dice are odd. d. At least one of the dice is odd.
e. At least two of the dice are odd.
f. All dice are odd.
g. All dice are different.
h. Two of the dice are the same.
i. All dice are the same.
1.5 Three balanced dice are tossed. Find the probability of obtaining a nine, given: a. The...
Three balanced dice are tossed. Find the probability of obtaining a nine, given: a. The sum is odd. b. The sum is less than or equal to nine. c. None of the dice are odd. d. At least one of the dice is odd. e. At least two of the dice are odd. f. All dice are odd. g. All dice are different. h. Two of the dice are the same. i. All dice are the same.
Please Explain 2. If rolling two 6-sided dice, find the probability of obtaining a sum of 7. 2. If rolling two 6-sided dice, find the probability of obtaining a sum of 7.
A pair of dice is tossed. Find the probability that the sum of the pips on the two upward faces is NOT a 1 NOR a 12. (
What is the probability of rolling two six-sided dice and obtaining either an odd total or a total less than six?
Please show ALL work for my understanding and upvote. THANK YOU!! Two fair dice are tossed. One die is red and one die is green. Calculate the probability that the sum of the numbers on the two dice is an odd number given that the number that shows on the red die is larger than the number that shows on the green die.
Problem 2. (30 points) a) (5 points) In rolling 3 fair dice, what is the probability of obtaining a sum not greater than 77 b) (5 points) In rolling 2 fair dice, what is the probability of a sum greater than 3 but not exceeding 6? o) (5 points) Given that the frstroll was an odd number what is the probability that sum exceeds 6? The notation for this is P(A I B)- Probability(sum exceeds 6 given that the first...
Two dice are tossed and the two values shown are added. Find the probability of getting a sum of 6. (Round answers to TWO decimal places)
Two six-sided dice are rolled. Determine the probability of the following events: a) The second dice shows the number two. b) The sum of dice is nine or more. c) None of the dice show a one. I would like a full solution for all of these three questions, if possible please.
A pair of dice his tossed twice. Find the probability that both roles give a sum of five I got 1/9 and it was wrong
2. If rolling two 6-sided dice, find the probability of obtaining a sum of 7.