For example, if you wanted to know the probability of rolling a 4, or a 7: 3/36 + 6/36 = 9/36.

## What is the probability of getting a sum of 6 or 4?

Probabilities for the two dice

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

4 | 3 | 8.33% |

5 | 4 | 11.11% |

6 | 5 | 13.89% |

7 | 6 | 16.67% |

## What is the probability of getting a sum of 4 or getting a sum greater than 10 when rolling two dice?

The probability of rolling a 10 or greater as the sum of four dice will be **1 minus the probability of having rolled a 9 or less**.

## What is the probability of getting either a sum of 7 or at least one 4?

As noted in some of the other answers, the probability of getting one or more 4’s is **11/36**. Also, the probability of the total being 7 is 6/36.

## What is a probability of getting a 7 in a single die?

6 Sided Dice **probability** (worked example for two dice). Two (6-sided) dice roll **probability** table. **Single die** roll **probability** tables.

…

Two (6-sided) dice roll **probability** table.

Roll a… | Probability |
---|---|

6 | 15/36 (41.667%) |

7 |
21/36 (58.333%) |

8 | 26/36 (72.222%) |

9 | 30/36 (83.333%) |

## What is the probability of obtaining a sum of 6?

Probability of getting a total of 6 = **5/36**.

## What is the probability of rolling a sum of 7 and 11?

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 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 probability of rolling a sum less than 6?

There are: 6×6=36 possible outcomes. Of these there are **10** totals which are less than 6 .

## What is the probability of getting a sum of 7 when two dice are thrown?

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**.