here 1/9 is probabilty of a sum of 5 on single roll of pair of dice
while for 2 rolls ;; probability that sum is 5 on both rolls of pair of dice=(1/9)*(1/9)=1/81
( please revert)
A pair of dice his tossed twice. Find the probability that both roles give a sum...
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. (
A pair of fair dice is tossed 6 times. Find probability that : 1) a total of 7 is obtained 3 times 3) a matching pair occurs 3 times 2) a totall of 7 and 11 is obtained 4 times 4) a total of 11 and matching pair occurs twice how to find these using excel
Suppose that five 9-sided dice are tossed. What is the probability that the sum on the five dice is greater than or equal to 7?
a) A pair of dice is tossed. Find the probability of getting (a) a total of 8: b) at most a total of 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.
3. A pair of fair dice are tossed. Find the probability of getting (a) a total of 4. (b) at most a total of 4
.1. A pair of fair dice is thrown, what is the probability that the sum of the two numbers is greater than 10. 2. A pair of fair dice is thrown. Find the probability that the sum is 9 or greater if a. If a 6 appears on the first die. b. If a 6 appears on at least one of the dice.
Two regular 6-sided dice are tossed. Compute the probability that the sum of the pips on the upward faces of the 2 dice is the following. (See the figure below for the sample space of this experiment. Enter your probability as a fraction.) At least 9
A pair of 7 sided dice are tossed. What is the probability that at least one of the dice has a value greater than or equal to 2?
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.