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## What are all the possible sums of two dice?

How many total combinations are possible from rolling two dice? Since each die has 6 values, there are 6∗6=**36** 6 ∗ 6 = 36 total combinations we could get.

## What is the probability of rolling a 2 with two dice?

Two (6-sided) dice roll probability table

Roll a… | Probability |
---|---|

2 |
1/36 (2.778%) |

3 | 2/36 (5.556%) |

4 | 3/36 (8.333%) |

5 | 4/36 (11.111%) |

## What is the probability of getting a 7 when rolling 2 dice?

For each of the possible outcomes add the numbers on the two dice and count how many times this sum is 7. If you do so you will find that the sum is 7 for 6 of the possible outcomes. Thus the sum is a 7 in 6 of the 36 outcomes and hence the probability of rolling a 7 is **6/36 = 1/6**.

## What is the probability of rolling 2 standard dice which sum to 9?

When 2 dice are thrown, the probability of the sum being 9 is **1/9**.

## What is the probability of getting sum of 9 with two dice?

4. What is the probability of getting a sum 9 from two throws of a dice? Explanation: In two throws of a dice, n(S) = (6 x 6) = **36**.

## What is the probability of rolling a 6 with two dice?

When you roll two dice, you have a **30.5 % chance** at least one 6 will appear. This figure can also be figured out mathematically, without the use of the graphic.

## What is the probability of flipping tails and rolling a six?

Step-by-step explanation:

: When you flip a coin there are two possible outcomes (heads or tails) and when you roll a die there are six outcomes(1 to 6). Putting these together means you have a total of **2×6=12 outcomes**.

## When two dice are rolled the maximum total on the two faces of the dice will be?

Answer: When two dice are thrown simultaneously, thus number of event can be **62** = 36 because each die has 1 to 6 number on its faces.

## What is the probability of rolling a total of 7 with two dice at least once in 10 rolls?

With the help of a calculator we find that we will not get a total of 7 on any of the first 10 rolls approximately 16.15% of the time. This implies that we will get a total of 7 on at least one of the first 10 rolls 100%−16.15%=**83.85%** of the time.