In rolling a die .
Suppose the second player got a six on the top face. Does it mean that the third player would not have a chance of getting a six on the top face?

Consider a game where the player tosses a six sided fair die. If the face that comes up is 6, the player wins Rs. 36, otherwise he loses Rs. k^(2) , where k is the face that comes up k = {1, 2, 3, 4, 5}. The expected amount to win at this game in Rs. is

There are two die A and B both having six faces. Die A has three faces marked with 1 , two faces marked with 2 , and one face marked with 3 . Die B has one face marked with 1 , two faces marked with 2 , and three faces marked with 3 . Both dices are thrown randomly once. If E be the event of getting sum of the numbers appearing on top faces equal to x and let P(E) be the probability of event E , then P(E) is maximum when x equal to

A purse contains 2 six-sided dice. One is a normal fair die, while the other has two 1s two 3s,and two 5s. A die is picked up and rolled. Because of some secret magnetic attraction of the unfair die, there is 75% chance of picking the unfair die and a 25% chance of picking a fair die. The dice is rolled and shows up the face 3. The probability that a fair die was picked up is (a) 1/7 (b) 1/4 (c) 1/6 (d) 1/24

(a) Write the probability of getting each number on the top face when a die was rolled in the following table. (b) Find the sum of the probabilities of all outcomes.

A six sided die is marked 2 on one face 3 on two of its faces and 4 on the remaining faces the die is rolled twice if X denotes the total score in two throws Find the probability mass function

On a normal standard dic one of the 21 dots from any one of the six faccs is removéd at random with each dot equally likely to be chosen. The die is then rolled. The probability that the top face has an odd number of dots is

There are two die A and B both having six faces. Die A has three faces marked with 1, two faces marked with 2, and one face marked with 1, two faces marked with 2, and one face marked with 3. Die B has one face marked with 1, two faces marked with 2, and three faces marked with 3. Both dices are thrown randomly once. If E be the event of getting sum of the numbers appearing on top faces equal to x and let P(E) be the probability of event E, then When x = 4, then P(E) is equal to

A six sided die is marked 2 one one face 3 on two of its faces and 4 on the remaining faces the die is rolled twice if X denotes the total score in two thross Find P(4 lt x lt 7)

A pari of dice numbered 1,2,3,4,5,6 of a six faced die each are rolled let x denote the sum of this then the number of element in the inverse image of 8 is