Suppose you roll two dice. What is the probability of rolling a sum of 8?

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Suppose you roll two dice. What is the probability of rolling a sum of 8?

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Answer 1 · 2018-06-11T18:32:36

$5/36$

Explanation:

[Assuming we're dealing with $6$ -sided dice]

We know we're dealing with two dice. Since each die has $6$ different possibilities, the outcomes of rolling two dice are given by

$6xx6$ , which is $36$ . This will be our denominator.

How many ways can we get $8$ with two dice?

$2+6=8$

$3+5=8$

$4+4=8$

$5+3=8$

$6+2=8$

These are all ways to get $8$ with two dice. There's $5$ ways, so this will be our numerator. We have

$P$ (sum of $8$ with two dice)= $5/36$

Hope this helps!

Answer 2 · 2018-06-11T18:35:17

$5/36$

Explanation:

So if you have 2 dice (supposing that they are 6 sided, we know that all the possible combinations of the dice are $36$ So now we have to make a process of elimination:

$2+6$ / $6+2$ / $3+5$ / $5+3$ / $4+4$ ( '/' seperates numbers)

We have repeated some because (let's say a dice is $a$ and the other is $b$ ) $a$ could be $3$ but $b$ could also be $3$ .

So if we know that there are five know combinations for rolling sum of $8$ then we write it as a fraction so $5/36$

We write it over the possible outcomes because of a simple rule:

the desired outcome / all possible outcomes

Hope this helped you out!

Answer 3 · 2018-06-11T18:42:54

$5/36$

Explanation:

Lets produce a table:
Tony B

The total count of available combined values is $6xx6=36$

Inspection of the table shows that there are 5 lots of 8 so we have:

$("red")/("green and red") ->5/36$

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Suppose you roll two dice. What is the probability of rolling a sum of 8?

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