(2/36)(3/36)(4/36)(5/36)(6/36)(7/36)(8/36)(9/36...

Are you looking to calculate a specific or the combined probability of a range of rolls? Rolling dice: answers. - Paul Fleisher

If your "..." implies multiplying these terms together (from 2362 over 36 end-fraction 9369 over 36 end-fraction as written), the product is extremely small: (2/36)(3/36)(4/36)(5/36)(6/36)(7/36)(8/36)(9/36...

The numbers in your sequence correspond to the number of ways to achieve each sum, divided by the total 36 outcomes: 1361 over 36 end-fraction : Probability of rolling a (only one way: 1+1). 2362 over 36 end-fraction : Probability of rolling a 3 (two ways: 1+2, 2+1). 3363 over 36 end-fraction : Probability of rolling a 4 (three ways: 1+3, 2+2, 3+1). 4364 over 36 end-fraction Are you looking to calculate a specific or

When you roll two dice, each die has 6 faces, leading to a total of 2362 over 36 end-fraction : Probability of rolling

possible outcomes. These outcomes range from a minimum sum of 2 (rolling a 1 and 1) to a maximum sum of 12 (rolling a 6 and 6). 2. Map the probability sequence

∏n=29P(Sum=n)≈1.286×10-7product from n equals 2 to 9 of cap P open paren Sum equals n close paren is approximately equal to 1.286 cross 10 to the negative 7 power ✅ Summary

: Probability of rolling a (six ways: 1+6, 2+5, 3+4, 4+3, 5+2, 6+1). 3. Complete the distribution