Total | Number of combinations | Probability |
---|---|---|

10 | 3 | 8.33% |

11 | 2 | 5.56% |

12 | 1 | 2.78% |

Total | 36 |
100% |

## What is the probability of getting sum of 11?

If you are rolling two dice the chances of getting an 11 and OVER is 2/12= **1/6**. You can roll a 6 and a 5 to equal 11 and you can roll a 6 and a 6 and get 12 which is OVER 11, therefore the answer should be 1/6.

## When two dice are rolled what is the probability of getting a sum of 11 or 7?

What is the probability that the sum will be a 7 or 11? There are 36 possible outcomes for the two dice. So, the probability is **8/36 = 2/9**.

## What is the probability of rolling a sum of 11 11 on a standard pair of six sided dice?

Two (6-sided) dice roll probability table

Roll a… | Probability |
---|---|

8 | 26/36 (72.222%) |

9 | 30/36 (83.333%) |

10 | 33/36 (91.667%) |

11 | 35/36 (97.222%) |

## When 2 dice are rolled find the probability of getting a sum less 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.

## What is the probability of rolling a sum less than 10?

That totals 8 combination out of 36 that could be ten or higher, so 8/36= 2/9. since I wanted less than ten 1-(2/9) = **7/9** probability of getting less than 10.

## What is the chace of getting 7 or 11 with 2 dice?

What about 7 OR 11? There are 6 x 6 or 36 options, all are equally likely, 7 occurs 6 times, so the chances are 6/36 or 1/6. 11 occurs 2 times so chances are **2/36 or 1/18**. 7 or 11 are 8 of the 36 options so 8/36 or 2/9.

## What is the probability of rolling a sum of 11 with three standard six-sided dice?

Probability of a sum of 11: 27/216 = **12.5%** Probability of a sum of 12: 25/216 = 11.6% Probability of a sum of 13: 21/216 = 9.7%

## What is the probability of rolling a sum less than or equal to 4?

Answer: The probability of getting a sum less than or equal to 4 is **1/6**.