Wiki User
∙ 14y agoTotal number of possible outcomes = 6
Number of successful outcomes = 2
Probability = 2/6 = 1/3 = [ 33 and 1/3rd ] percent.
Wiki User
∙ 14y ago6/36
The probability that the sum of two dice is 7 is 6 in 36, or 1 in 6.Of all the combinations, this is the one with the highest probability.
A number cube has six faces, so the probability of any one of them showing on a fair throw is 1 in 6, or about 0.1667.
The probability is 0.2503
There could be many questions: What is the probability of rolling an even number. What is the probability of rolling an odd number. What is the probability of rolling a number less than 4. What is the probability of rolling a number more than 3. What is the probability of rolling 1,4, or 6. Basically it could be any question about the probability of rolling half of the faces.
6/36
It is 3/8 = 0.375
The probability is (1/2)*(1/2) = 1/4
If 0 is not one of the faces on the cube, then then probability of rolling a 0 is 0.
1/6 A dice has six faces. And '2' is on one if its faces. So the probability of getting a 2 on a dice is 1 over 6.
The probability that the sum of two dice is 7 is 6 in 36, or 1 in 6.Of all the combinations, this is the one with the highest probability.
The probability is 0.277... (repeating).
The probability of any event MUST be a number between 0 and 1. It is not possible to have a probability of 18 or 16. Furthermore, given that the dice are not normal, the question should also specify how many faces they have and what numbers are on these faces.
On a single roll, the probability is 1/2.
A number cube has six faces, so the probability of any one of them showing on a fair throw is 1 in 6, or about 0.1667.
The probability is 1/6.
Those are the names given to the two faces of a coin. From early days, coins had an image of important persons - kings, queens, emperors, on one face and that face was called heads. The reason for the other side being called "tails" is uncertain. These are the only two outcomes of a coin being tossed. Although there is a non-zero probability of the coin falling and remaining on its edge, it is small enough to be ignored in practice.