Quick Answer: What is the probability of rolling less than 10 with two dice?

What is the probability of rolling a number less than 10 on a standard die?

Probability of rolling a certain number or less for two 6-sided dice.

Two (6-sided) dice roll probability table.

Roll a… Probability
8 5/36 (13.889%)
9 4/36 (11.111%)
10 3/36 (8.333%)
11 2/36 (5.556%)

What is the probability of getting a sum of 10 when a dice is rolled twice?

Answer: 3/36 is the answer.

How many ways can a sum of 2 or a sum of 10 be rolled with a pair of standard dice?

Explanation: If you roll two dice, there are 6×6=36 possible outcomes.

What is the probability of rolling a 10?

Probabilities for the two dice

Total Number of combinations Probability
7 6 16.67%
8 5 13.89%
9 4 11.11%
10 3 8.33%

When a single die is rolled what is the probability of getting a number less than 7?

the probability of getting a number less than 7 in a throw of dice is 1.

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What is the probability of rolling a number less than 2?

2 Answers By Expert Tutors

The probablity of rolling a 2 or less would be 2/6 = 1/3 because you have 1 and 2 as possibilities out of the 6 numbers. One is the only number less than 2, though, so there’s only a 1/6 chance of rolling less than a 2.

How do you find the probability of rolling two dice?

If you want to know how likely it is to get a certain total score from rolling two or more dice, it’s best to fall back on the simple rule: Probability = Number of desired outcomes ÷ Number of possible outcomes.

When a dice is rolled twice there are possible outcomes?

There are 6 outcomes for the first roll and 6 for the second so the total number of possible outcomes is 6 times 6 = 36. There are 6 of these in which the two numbers are equal: (1,1), (2,2), (3,3), (4,4), (5,5), and (6,6).

What is the probability that the sum of two rolled dice is 9 given that at least one of the dice rolled is a 4?

So, there are only 2 combos that sum to 9 and have at least 1 of the die be a 4. So the probability is: (number of combos we want)/(total number of combos) = 2/36. Reduced, this is 1/18.