Well, the probability would be 1⋅16⋅16 because for three dice, there are six outcomes for the same number because there are six numbers, so put in a 1 for the first factor and every other outcome will be different numbers and you’re talking about six-sided dice, so use 16s for the next two factors.

## What is the probability of rolling a 6 with 3 dice?

Simply subtract 125 from 216 which will give us the chances a 6 WILL appear when three dice are rolled, which is **91**. 91 out of 216 or 42.1 %.

## What is the probability of rolling 3 dice and them all landing on the same number?

The probability of getting the same number is **1/6**. Throw the third die. The probability of getting the same number is again 1/6. So the probability of three numbers the same is 1/6×1/6.

## What is the probability of rolling a dice and landing on the number 6?

Two (6-sided) dice roll probability table

Roll a… | Probability |
---|---|

5 | 10/36 (27.778%) |

6 | 15/36 (41.667%) |

7 | 21/36 (58.333%) |

8 | 26/36 (72.222%) |

## What are the odds of rolling a 7?

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% |

## How do you find the probability of 3 dice?

We divide the total number of ways to obtain each sum by the total number of outcomes in the sample space, or 216. The results are: Probability of **a sum of 3: 1/216 = 0.5%** Probability of a sum of 4: 3/216 = 1.4%

## What is the probability that all three rolls are 2?

4 Answers. It’s just **(16)2** It’s the probability that the second roll is the same as the first (1/6) multiplied by the probability that the third roll is the same as the second (1/6).

## What is the probability that in 3 rolls of a pair of six sided dice exactly one total of 7 is rolled?

With 2, 6-sided dice, there are 6² (or (36)) possible number groups. Of these 36 number groups, 6 of them (see above) sum to 7. Therefore the Probability of achieving a sum of 7 by rolling the 2 dice is ( 6/36 ) = ( 1/6 ) = 0.1667 = =**16.67%**.

## What’s the probability that your second roll is a 6 given that first roll is a 6 already?

1 Answer. As other people have pointed out in comments, the correct answer to the question “what is the probability of rolling another 6 given that I have rolled a 6 prior to it?” is indeed **16**. This is because the die rolls are assumed (very reasonably so) to be independent of each other.

## What is the probability of rolling a 6 after 6 rolls?

Originally Answered: If I roll a dice 6 times, what’s the probability of rolling a 6 at least once? So to solve this, you take the chance of this NOT happening and make it to the power of however many times you roll the dice. So the probability is 0.6651 or **66.51%**. Thus, a 2/3 chance of getting at least one 6.