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## How many ways can two dice be rolled such that their sum is not more than 7?

As the table shows there are **36 possible** outcomes. 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.

## How many ways can two dice be rolled such that their sum is not less than 3?

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.

## How many ways can two dice be rolled such that their sum is not less than 4?

Find the probability of rolling two dice and getting a sum of 4.

## How many ways can two dice be rolled such that their sum is not less than 10?

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

## How many ways can two dice be rolled such that their sum is between 5 and 10?

The number of ways of getting a sum of 10 is (6, 4), (4, 6), (5, 5). A sum of 10 is obtained 3 times. The number of ways in which either a sum of 5 or 10 can be got is the sum of the individual values for 5 and 10 or 4 + 3 = **7**.

## How many ways can two dice be rolled such that their sum is not more than 11?

Explanation: If 2 dice are thrown, there are 6×6=36 outcomes. There is only one way to get a total of 12. Therefore of the 36 possible outcomes there are **3** that do not meet the requirement of being less than 11.

## How many ways can you roll two dice and get a sum of 9?

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% |

## How many ways are there in getting a double when two dice are rolled?

There are **6 ways** we can roll doubles out of a possible 36 rolls (6 x 6), for a probability of 6/36, or 1/6, on any roll of two fair dice. So you have a 16.7% probability of rolling doubles with 2 fair six-sided dice.