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In a dice game, the only way that a player wins on her second turn is 23 Jan 2015, 07:34
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In a dice game, the only way that a player wins on her second turn is if the sum of the dice she rolls on her second turn matches the sum from her first. On each turn, a player simultaneously rolls two, fair, six-sided dice. If Lindsey's total from her first turn is 6, what is the probability that she will win on her second turn?

A. 1/12
B. 5/36
C. 1/6
D. 7/36
E. 17/36
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B
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In a dice game, the only way that a player wins on her second turn is 23 Jan 2015, 07:42
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ANS B 5/36....
way to get sum as 6..(1,5)(5,1)(2,4)(4,2)(3,3)
so 5/36
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In a dice game, the only way that a player wins on her second turn is 23 Jan 2015, 07:48
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Bunuel
In a dice game, the only way that a player wins on her second turn is if the sum of the dice she rolls on her second turn matches the sum from her first. On each turn, a player simultaneously rolls two, fair, six-sided dice. If Lindsey's total from her first turn is 6, what is the probability that she will win on her second turn?

A. 1/12
B. 5/36
C. 1/6
D. 7/36
E. 17/36

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call dice_1 a; call dice_2 b --> a+b = 6; few cases unfold

1) a=1 and b=5 probability is 1/36(2) we multiply by two to include the case in which b=1 and a=5
2) a=2 and b=4 again probability 1/18
3) a=3 and b=3 probability 1/36

since every one of these cases is equally likely to yield the wanted result --> 1/18(2)+1/36 = 5/36

Answer B.
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In a dice game, the only way that a player wins on her second turn is 23 Jan 2015, 08:08
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5/36......(1,5)(5,1)(2,4)(4,2)(3,3)
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In a dice game, the only way that a player wins on her second turn is 23 Jan 2015, 12:43
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To win, she must roll a 6 on her second turn.

Pr(x+y = 6) = 2*Pr(1 + 5) + 2*Pr(2+4) + Pr(3+3) = 2(1/6)^2 + 2(1/6)^2 + (1/6)^2 = 5/36

There are 2 ways to roll 1 and 5, and 2 ways to roll 2 and 4 because order matters.
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In a dice game, the only way that a player wins on her second turn is 23 Jan 2015, 12:43
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To win, she must roll a 6 on her second turn.

Pr(x+y = 6) = 2*Pr(1 + 5) + 2*Pr(2+4) + Pr(3+3) = 2(1/6)^2 + 2(1/6)^2 + (1/6)^2 = 5/36

There are 2 ways to roll 1 and 5, and 2 ways to roll 2 and 4 because order matters.
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In a dice game, the only way that a player wins on her second turn is 23 Jan 2015, 21:40
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Bunuel
In a dice game, the only way that a player wins on her second turn is if the sum of the dice she rolls on her second turn matches the sum from her first. On each turn, a player simultaneously rolls two, fair, six-sided dice. If Lindsey's total from her first turn is 6, what is the probability that she will win on her second turn?

A. 1/12
B. 5/36
C. 1/6
D. 7/36
E. 17/36

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Note that the question has been written to feel more complicated than it actually is. We have no relevance of first turn or second turn. The question simply says that two dice will be rolled and what is the probability that the sum rolled is 6?

We obtain 6 in 3 ways - 1 and 5, 2 and 4, 3 and 3.

Now assume that the dice are distinct i.e. one red and the other yellow. So you can get the sum of 6 in the following ways
1 on Red, 5 on Yellow or the other way around - 2 ways
2 on Red, 4 on Yellow or the other way around - 2 ways
3 on Red, 3 on Yellow - 1 way

Total 5 ways.

There are a total of 6*6 = 36 ways in which we can get different numbers on the roll of 2 distinct dice.

Hence, probability = 5/36
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In a dice game, the only way that a player wins on her second turn is 26 Jan 2015, 04:34
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Bunuel
In a dice game, the only way that a player wins on her second turn is if the sum of the dice she rolls on her second turn matches the sum from her first. On each turn, a player simultaneously rolls two, fair, six-sided dice. If Lindsey's total from her first turn is 6, what is the probability that she will win on her second turn?

A. 1/12
B. 5/36
C. 1/6
D. 7/36
E. 17/36

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VERITAS PREP OFFICIAL SOLUTION:

Since six things can happen on each individual roll, and she'll roll two dice, there are 6(6) = 36 total possibilities for the denominator. Then you need to count how many ways she can win, which are:

1 and 5

2 and 4

3 and 3

4 and 2

5 and 1

Accordingly, 5 of the 36 outcomes allow Lindsey to win, so her probability is 5/36.
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In a dice game, the only way that a player wins on her second turn is 08 Oct 2015, 14:12
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Can someone please explain why we count the outcome [3,3] only once? There are two die, [3,3] can occur two different ways, it seems to me.
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In a dice game, the only way that a player wins on her second turn is 08 Oct 2015, 16:20
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Hi joejackson,

It helps to think about the possible outcomes in the format "first die, second die":

To get a total of 6, you need to have one of the following outcomes (presented in 'first, second' format):

1 and 5
2 and 4
3 and 3
4 and 2
5 and 1

That's a total of 5 'winning' outcomes out of 36 possible outcomes.

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In a dice game, the only way that a player wins on her second turn is 08 Oct 2015, 21:23
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joejackson
Can someone please explain why we count the outcome [3,3] only once? There are two die, [3,3] can occur two different ways, it seems to me.
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Yes, say the two dice are distinct in colour - say one is red and the other is yellow.
You can get 2 on the Red one and 4 on the Yellow one. This is different from 2 on the Yellow one and 4 on the Red one - fine
How about this? You get 3 on the Red one and 3 on the Yellow one. How is it any different from 3 on the Red one and 3 on the Yellow one? They are the same case, right? So you should count it only once.
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In a dice game, the only way that a player wins on her second turn is 18 Sep 2025, 09:27
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