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Chance of a double in three dice
probability of getting a double six ($2$ dice) rolling them $24$ timesChance of getting six in three diceIf you are summing the rolls of three dice, how does the expected value and variance change if you add one dice and only sum the highest three?Chance of rolling one skull with these three dice?Three fair six-sided dice are rolled.Rolling two doubles with 4 and 5, 6 sided diceChances of rolling doubles on 2d6 vs 1d4 and 1d6.Probability of rolling x diceIn one roll of four standard six-sided dice, what is the probability of rolling exactly three different numbers?Probability: Rolling six, six-sided dice a single time
$begingroup$
What is the chance of rolling doubles in three six sided dice?
The answer I have is:
$$
frac16•frac16•frac32 = frac124
$$
probability
edited Oct 13 '13 at 20:37
Cehhiro
837720
asked Oct 13 '13 at 20:32
Peter BushnellPeter Bushnell
157126
$endgroup$
add a comment |
$begingroup$
What is the chance of rolling doubles in three six sided dice?
The answer I have is:
$$
frac16•frac16•frac32 = frac124
$$
probability
edited Oct 13 '13 at 20:37
Cehhiro
837720
asked Oct 13 '13 at 20:32
Peter BushnellPeter Bushnell
157126
$endgroup$
add a comment |
$begingroup$
What is the chance of rolling doubles in three six sided dice?
The answer I have is:
$$
frac16•frac16•frac32 = frac124
$$
probability
edited Oct 13 '13 at 20:37
Cehhiro
837720
asked Oct 13 '13 at 20:32
Peter BushnellPeter Bushnell
157126
$endgroup$
What is the chance of rolling doubles in three six sided dice?
The answer I have is:
$$
frac16•frac16•frac32 = frac124
$$
probability
probability
edited Oct 13 '13 at 20:37
Cehhiro
837720
asked Oct 13 '13 at 20:32
Peter BushnellPeter Bushnell
157126
edited Oct 13 '13 at 20:37
Cehhiro
837720
asked Oct 13 '13 at 20:32
Peter BushnellPeter Bushnell
157126
edited Oct 13 '13 at 20:37
Cehhiro
837720
edited Oct 13 '13 at 20:37
Cehhiro
837720
edited Oct 13 '13 at 20:37
Cehhiro
837720
837720
asked Oct 13 '13 at 20:32
Peter BushnellPeter Bushnell
157126
asked Oct 13 '13 at 20:32
Peter BushnellPeter Bushnell
157126
asked Oct 13 '13 at 20:32
Peter BushnellPeter Bushnell
157126
157126
add a comment |
add a comment |
6 Answers
6
active
oldest
votes
$begingroup$
The number of elements in the sample space = 216 or (6*6*6)
Of the three numbers two of them to be same is (1,1) (2,2) (3,3) (4,4) (5,5) (6,6) = 6 doublets.
Every one of this can happen in 3 different ways, that is (1,1,x) (1,x,1) (x,1,1) = 3 ways.
Now x can be any of the remaining 5 numbers.
So total number of ways two of them can be same = 6 x 3 x 5 = 90
So probability of the event = 90/216 = 5/12
answered Oct 13 '13 at 20:43
MDWMDW
18119
$endgroup$
add a comment |
$begingroup$
I will assume that "doubles" does not include triples.
Imagine the dice are coloured blue, white, and red. Record the outcome as a triple $(b,w,r)$, where $b$ is the number on the blue, and so on. There are $6^3$ possible outcomes, all equally likely.
How many doubles are there? The number we have two of can be chosen in $6$ ways. For each choice, the number we have one of can be chosen in $5$ ways, and its location (colour) can be chosen in $3$ ways, for a total of $(6)(5)(3)$. the required probability is therefore $frac(6)(5)(3)6^3$.
Another way: The probability all the tosses are the same is $frac136$, since whatever we get on the blue, we must get on the white and on the red.
The probability the tosses are all different is $frac56cdotfrac46$. So the probability of not getting a double is $frac136+frac2036$. It follows that the probability of a double is $frac1536$.
answered Oct 13 '13 at 20:47
André NicolasAndré Nicolas
454k36432819
$endgroup$
add a comment |
$begingroup$
$displaystyle%
mboxNo triplets
quadLongrightarrowquad
left[vphantomHuge A^A%
3timesleft(vphantomHuge A1 over 6times1 over 6times5 over 6right)
right]
times 6
=
color#ff0000large5 over 12
$
answered Oct 13 '13 at 20:53
Felix MarinFelix Marin
68.8k7109146
$endgroup$
add a comment |
$begingroup$
There are 36 possible permutations when rolling the first and second die. 6 of these produce doubles. Therefore the probability of rolling doubles with the first and second die is 6/36, or 1/6. There is also a 1/6 chance of rolling doubles with the first and third die. And a 1/6 chance of rolling doubles with the second and third die. Therefore the probability of rolling doubles with all three dice is 1/6 + 1/6 + 1/6 = 3/6 or 1/2 (including triples). The probability of rolling triples is 1/36 so the probability of rolling doubles with no triples is 18/36 - 1/36 = 17/36.
answered Oct 21 '17 at 19:43
user494128user494128
1
$endgroup$
add a comment |
$begingroup$
Between the first and the second dice there is a 1/6 chance of getting doubles, which is 36/216 possible outcomes. Between the first and third dice there is also a 1/6 chance of getting doubles but 6 of the 36 doubles in this set of outcomes have already been accounted for in the combination of the first and second die so that's another 30/216 possible outcomes. Between the second and third dice there is also a 1/6 chance of getting doubles but 6 of the 36 doubles in this set of outcomes have already been accounted for in the combination of the first and second die so that's another 30/216 possible outcomes. This leaves the total probability that you get doubles (including triples) to be 36/216+30/216+30/216 = 96/216 which simplifies to 4/9. Excluding triples makes the probability 96/216-6/216 = 90/216 which simplifies to 15/36.
*note the 6 duplicate doubles from the second and third dice outcomes and the first and third dice outcomes are all from the triples of each respective number so they could be counted in any of the three combinations of dice when looking at the question this way
answered Dec 15 '18 at 7:12
devlyn leopardidevlyn leopardi
1
$endgroup$
add a comment |
$begingroup$
Probability of all three dice the same = $1 times 1/6 times 1/6 = 1/36$. Probability of no dice the same = $1 times 5/6 times 4/6 = 20/36$. Probability of a pair = $1-1/36-20/36 = 15/36$.
edited Mar 17 at 20:41
Glorfindel
3,41581830
answered Mar 17 at 20:20
Robert EdgarRobert Edgar
1
$endgroup$
add a comment |
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6 Answers
6
active
oldest
votes
6 Answers
6
active
oldest
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active
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active
oldest
votes
$begingroup$
The number of elements in the sample space = 216 or (6*6*6)
Of the three numbers two of them to be same is (1,1) (2,2) (3,3) (4,4) (5,5) (6,6) = 6 doublets.
Every one of this can happen in 3 different ways, that is (1,1,x) (1,x,1) (x,1,1) = 3 ways.
Now x can be any of the remaining 5 numbers.
So total number of ways two of them can be same = 6 x 3 x 5 = 90
So probability of the event = 90/216 = 5/12
answered Oct 13 '13 at 20:43
MDWMDW
18119
$endgroup$
add a comment |
$begingroup$
The number of elements in the sample space = 216 or (6*6*6)
Of the three numbers two of them to be same is (1,1) (2,2) (3,3) (4,4) (5,5) (6,6) = 6 doublets.
Every one of this can happen in 3 different ways, that is (1,1,x) (1,x,1) (x,1,1) = 3 ways.
Now x can be any of the remaining 5 numbers.
So total number of ways two of them can be same = 6 x 3 x 5 = 90
So probability of the event = 90/216 = 5/12
answered Oct 13 '13 at 20:43
MDWMDW
18119
$endgroup$
add a comment |
$begingroup$
The number of elements in the sample space = 216 or (6*6*6)
Of the three numbers two of them to be same is (1,1) (2,2) (3,3) (4,4) (5,5) (6,6) = 6 doublets.
Every one of this can happen in 3 different ways, that is (1,1,x) (1,x,1) (x,1,1) = 3 ways.
Now x can be any of the remaining 5 numbers.
So total number of ways two of them can be same = 6 x 3 x 5 = 90
So probability of the event = 90/216 = 5/12
answered Oct 13 '13 at 20:43
MDWMDW
18119
$endgroup$
The number of elements in the sample space = 216 or (6*6*6)
Of the three numbers two of them to be same is (1,1) (2,2) (3,3) (4,4) (5,5) (6,6) = 6 doublets.
Every one of this can happen in 3 different ways, that is (1,1,x) (1,x,1) (x,1,1) = 3 ways.
Now x can be any of the remaining 5 numbers.
So total number of ways two of them can be same = 6 x 3 x 5 = 90
So probability of the event = 90/216 = 5/12
answered Oct 13 '13 at 20:43
MDWMDW
18119
answered Oct 13 '13 at 20:43
MDWMDW
18119
answered Oct 13 '13 at 20:43
MDWMDW
18119
answered Oct 13 '13 at 20:43
MDWMDW
18119
18119
add a comment |
add a comment |
$begingroup$
I will assume that "doubles" does not include triples.
Imagine the dice are coloured blue, white, and red. Record the outcome as a triple $(b,w,r)$, where $b$ is the number on the blue, and so on. There are $6^3$ possible outcomes, all equally likely.
How many doubles are there? The number we have two of can be chosen in $6$ ways. For each choice, the number we have one of can be chosen in $5$ ways, and its location (colour) can be chosen in $3$ ways, for a total of $(6)(5)(3)$. the required probability is therefore $frac(6)(5)(3)6^3$.
Another way: The probability all the tosses are the same is $frac136$, since whatever we get on the blue, we must get on the white and on the red.
The probability the tosses are all different is $frac56cdotfrac46$. So the probability of not getting a double is $frac136+frac2036$. It follows that the probability of a double is $frac1536$.
answered Oct 13 '13 at 20:47
André NicolasAndré Nicolas
454k36432819
$endgroup$
add a comment |
$begingroup$
I will assume that "doubles" does not include triples.
Imagine the dice are coloured blue, white, and red. Record the outcome as a triple $(b,w,r)$, where $b$ is the number on the blue, and so on. There are $6^3$ possible outcomes, all equally likely.
How many doubles are there? The number we have two of can be chosen in $6$ ways. For each choice, the number we have one of can be chosen in $5$ ways, and its location (colour) can be chosen in $3$ ways, for a total of $(6)(5)(3)$. the required probability is therefore $frac(6)(5)(3)6^3$.
Another way: The probability all the tosses are the same is $frac136$, since whatever we get on the blue, we must get on the white and on the red.
The probability the tosses are all different is $frac56cdotfrac46$. So the probability of not getting a double is $frac136+frac2036$. It follows that the probability of a double is $frac1536$.
answered Oct 13 '13 at 20:47
André NicolasAndré Nicolas
454k36432819
$endgroup$
add a comment |
$begingroup$
I will assume that "doubles" does not include triples.
Imagine the dice are coloured blue, white, and red. Record the outcome as a triple $(b,w,r)$, where $b$ is the number on the blue, and so on. There are $6^3$ possible outcomes, all equally likely.
How many doubles are there? The number we have two of can be chosen in $6$ ways. For each choice, the number we have one of can be chosen in $5$ ways, and its location (colour) can be chosen in $3$ ways, for a total of $(6)(5)(3)$. the required probability is therefore $frac(6)(5)(3)6^3$.
Another way: The probability all the tosses are the same is $frac136$, since whatever we get on the blue, we must get on the white and on the red.
The probability the tosses are all different is $frac56cdotfrac46$. So the probability of not getting a double is $frac136+frac2036$. It follows that the probability of a double is $frac1536$.
answered Oct 13 '13 at 20:47
André NicolasAndré Nicolas
454k36432819
$endgroup$
I will assume that "doubles" does not include triples.
Imagine the dice are coloured blue, white, and red. Record the outcome as a triple $(b,w,r)$, where $b$ is the number on the blue, and so on. There are $6^3$ possible outcomes, all equally likely.
How many doubles are there? The number we have two of can be chosen in $6$ ways. For each choice, the number we have one of can be chosen in $5$ ways, and its location (colour) can be chosen in $3$ ways, for a total of $(6)(5)(3)$. the required probability is therefore $frac(6)(5)(3)6^3$.
Another way: The probability all the tosses are the same is $frac136$, since whatever we get on the blue, we must get on the white and on the red.
The probability the tosses are all different is $frac56cdotfrac46$. So the probability of not getting a double is $frac136+frac2036$. It follows that the probability of a double is $frac1536$.
answered Oct 13 '13 at 20:47
André NicolasAndré Nicolas
454k36432819
edited Oct 14 '13 at 1:20
answered Oct 13 '13 at 20:47
André NicolasAndré Nicolas
454k36432819
answered Oct 13 '13 at 20:47
André NicolasAndré Nicolas
454k36432819
answered Oct 13 '13 at 20:47
André NicolasAndré Nicolas
454k36432819
454k36432819
add a comment |
add a comment |
$begingroup$
$displaystyle%
mboxNo triplets
quadLongrightarrowquad
left[vphantomHuge A^A%
3timesleft(vphantomHuge A1 over 6times1 over 6times5 over 6right)
right]
times 6
=
color#ff0000large5 over 12
$
answered Oct 13 '13 at 20:53
Felix MarinFelix Marin
68.8k7109146
$endgroup$
add a comment |
$begingroup$
$displaystyle%
mboxNo triplets
quadLongrightarrowquad
left[vphantomHuge A^A%
3timesleft(vphantomHuge A1 over 6times1 over 6times5 over 6right)
right]
times 6
=
color#ff0000large5 over 12
$
answered Oct 13 '13 at 20:53
Felix MarinFelix Marin
68.8k7109146
$endgroup$
add a comment |
$begingroup$
$displaystyle%
mboxNo triplets
quadLongrightarrowquad
left[vphantomHuge A^A%
3timesleft(vphantomHuge A1 over 6times1 over 6times5 over 6right)
right]
times 6
=
color#ff0000large5 over 12
$
answered Oct 13 '13 at 20:53
Felix MarinFelix Marin
68.8k7109146
$endgroup$
$displaystyle%
mboxNo triplets
quadLongrightarrowquad
left[vphantomHuge A^A%
3timesleft(vphantomHuge A1 over 6times1 over 6times5 over 6right)
right]
times 6
=
color#ff0000large5 over 12
$
answered Oct 13 '13 at 20:53
Felix MarinFelix Marin
68.8k7109146
answered Oct 13 '13 at 20:53
Felix MarinFelix Marin
68.8k7109146
answered Oct 13 '13 at 20:53
Felix MarinFelix Marin
68.8k7109146
answered Oct 13 '13 at 20:53
Felix MarinFelix Marin
68.8k7109146
68.8k7109146
add a comment |
add a comment |
$begingroup$
There are 36 possible permutations when rolling the first and second die. 6 of these produce doubles. Therefore the probability of rolling doubles with the first and second die is 6/36, or 1/6. There is also a 1/6 chance of rolling doubles with the first and third die. And a 1/6 chance of rolling doubles with the second and third die. Therefore the probability of rolling doubles with all three dice is 1/6 + 1/6 + 1/6 = 3/6 or 1/2 (including triples). The probability of rolling triples is 1/36 so the probability of rolling doubles with no triples is 18/36 - 1/36 = 17/36.
answered Oct 21 '17 at 19:43
user494128user494128
1
$endgroup$
add a comment |
$begingroup$
There are 36 possible permutations when rolling the first and second die. 6 of these produce doubles. Therefore the probability of rolling doubles with the first and second die is 6/36, or 1/6. There is also a 1/6 chance of rolling doubles with the first and third die. And a 1/6 chance of rolling doubles with the second and third die. Therefore the probability of rolling doubles with all three dice is 1/6 + 1/6 + 1/6 = 3/6 or 1/2 (including triples). The probability of rolling triples is 1/36 so the probability of rolling doubles with no triples is 18/36 - 1/36 = 17/36.
answered Oct 21 '17 at 19:43
user494128user494128
1
$endgroup$
add a comment |
$begingroup$
There are 36 possible permutations when rolling the first and second die. 6 of these produce doubles. Therefore the probability of rolling doubles with the first and second die is 6/36, or 1/6. There is also a 1/6 chance of rolling doubles with the first and third die. And a 1/6 chance of rolling doubles with the second and third die. Therefore the probability of rolling doubles with all three dice is 1/6 + 1/6 + 1/6 = 3/6 or 1/2 (including triples). The probability of rolling triples is 1/36 so the probability of rolling doubles with no triples is 18/36 - 1/36 = 17/36.
answered Oct 21 '17 at 19:43
user494128user494128
1
$endgroup$
There are 36 possible permutations when rolling the first and second die. 6 of these produce doubles. Therefore the probability of rolling doubles with the first and second die is 6/36, or 1/6. There is also a 1/6 chance of rolling doubles with the first and third die. And a 1/6 chance of rolling doubles with the second and third die. Therefore the probability of rolling doubles with all three dice is 1/6 + 1/6 + 1/6 = 3/6 or 1/2 (including triples). The probability of rolling triples is 1/36 so the probability of rolling doubles with no triples is 18/36 - 1/36 = 17/36.
answered Oct 21 '17 at 19:43
user494128user494128
1
answered Oct 21 '17 at 19:43
user494128user494128
1
answered Oct 21 '17 at 19:43
user494128user494128
1
answered Oct 21 '17 at 19:43
user494128user494128
1
1
add a comment |
add a comment |
$begingroup$
Between the first and the second dice there is a 1/6 chance of getting doubles, which is 36/216 possible outcomes. Between the first and third dice there is also a 1/6 chance of getting doubles but 6 of the 36 doubles in this set of outcomes have already been accounted for in the combination of the first and second die so that's another 30/216 possible outcomes. Between the second and third dice there is also a 1/6 chance of getting doubles but 6 of the 36 doubles in this set of outcomes have already been accounted for in the combination of the first and second die so that's another 30/216 possible outcomes. This leaves the total probability that you get doubles (including triples) to be 36/216+30/216+30/216 = 96/216 which simplifies to 4/9. Excluding triples makes the probability 96/216-6/216 = 90/216 which simplifies to 15/36.
*note the 6 duplicate doubles from the second and third dice outcomes and the first and third dice outcomes are all from the triples of each respective number so they could be counted in any of the three combinations of dice when looking at the question this way
answered Dec 15 '18 at 7:12
devlyn leopardidevlyn leopardi
1
$endgroup$
add a comment |
$begingroup$
Between the first and the second dice there is a 1/6 chance of getting doubles, which is 36/216 possible outcomes. Between the first and third dice there is also a 1/6 chance of getting doubles but 6 of the 36 doubles in this set of outcomes have already been accounted for in the combination of the first and second die so that's another 30/216 possible outcomes. Between the second and third dice there is also a 1/6 chance of getting doubles but 6 of the 36 doubles in this set of outcomes have already been accounted for in the combination of the first and second die so that's another 30/216 possible outcomes. This leaves the total probability that you get doubles (including triples) to be 36/216+30/216+30/216 = 96/216 which simplifies to 4/9. Excluding triples makes the probability 96/216-6/216 = 90/216 which simplifies to 15/36.
*note the 6 duplicate doubles from the second and third dice outcomes and the first and third dice outcomes are all from the triples of each respective number so they could be counted in any of the three combinations of dice when looking at the question this way
answered Dec 15 '18 at 7:12
devlyn leopardidevlyn leopardi
1
$endgroup$
add a comment |
$begingroup$
Between the first and the second dice there is a 1/6 chance of getting doubles, which is 36/216 possible outcomes. Between the first and third dice there is also a 1/6 chance of getting doubles but 6 of the 36 doubles in this set of outcomes have already been accounted for in the combination of the first and second die so that's another 30/216 possible outcomes. Between the second and third dice there is also a 1/6 chance of getting doubles but 6 of the 36 doubles in this set of outcomes have already been accounted for in the combination of the first and second die so that's another 30/216 possible outcomes. This leaves the total probability that you get doubles (including triples) to be 36/216+30/216+30/216 = 96/216 which simplifies to 4/9. Excluding triples makes the probability 96/216-6/216 = 90/216 which simplifies to 15/36.
*note the 6 duplicate doubles from the second and third dice outcomes and the first and third dice outcomes are all from the triples of each respective number so they could be counted in any of the three combinations of dice when looking at the question this way
answered Dec 15 '18 at 7:12
devlyn leopardidevlyn leopardi
1
$endgroup$
Between the first and the second dice there is a 1/6 chance of getting doubles, which is 36/216 possible outcomes. Between the first and third dice there is also a 1/6 chance of getting doubles but 6 of the 36 doubles in this set of outcomes have already been accounted for in the combination of the first and second die so that's another 30/216 possible outcomes. Between the second and third dice there is also a 1/6 chance of getting doubles but 6 of the 36 doubles in this set of outcomes have already been accounted for in the combination of the first and second die so that's another 30/216 possible outcomes. This leaves the total probability that you get doubles (including triples) to be 36/216+30/216+30/216 = 96/216 which simplifies to 4/9. Excluding triples makes the probability 96/216-6/216 = 90/216 which simplifies to 15/36.
*note the 6 duplicate doubles from the second and third dice outcomes and the first and third dice outcomes are all from the triples of each respective number so they could be counted in any of the three combinations of dice when looking at the question this way
answered Dec 15 '18 at 7:12
devlyn leopardidevlyn leopardi
1
answered Dec 15 '18 at 7:12
devlyn leopardidevlyn leopardi
1
answered Dec 15 '18 at 7:12
devlyn leopardidevlyn leopardi
1
answered Dec 15 '18 at 7:12
devlyn leopardidevlyn leopardi
1
1
add a comment |
add a comment |
$begingroup$
Probability of all three dice the same = $1 times 1/6 times 1/6 = 1/36$. Probability of no dice the same = $1 times 5/6 times 4/6 = 20/36$. Probability of a pair = $1-1/36-20/36 = 15/36$.
edited Mar 17 at 20:41
Glorfindel
3,41581830
answered Mar 17 at 20:20
Robert EdgarRobert Edgar
1
$endgroup$
add a comment |
$begingroup$
Probability of all three dice the same = $1 times 1/6 times 1/6 = 1/36$. Probability of no dice the same = $1 times 5/6 times 4/6 = 20/36$. Probability of a pair = $1-1/36-20/36 = 15/36$.
edited Mar 17 at 20:41
Glorfindel
3,41581830
answered Mar 17 at 20:20
Robert EdgarRobert Edgar
1
$endgroup$
add a comment |
$begingroup$
Probability of all three dice the same = $1 times 1/6 times 1/6 = 1/36$. Probability of no dice the same = $1 times 5/6 times 4/6 = 20/36$. Probability of a pair = $1-1/36-20/36 = 15/36$.
edited Mar 17 at 20:41
Glorfindel
3,41581830
answered Mar 17 at 20:20
Robert EdgarRobert Edgar
1
$endgroup$
Probability of all three dice the same = $1 times 1/6 times 1/6 = 1/36$. Probability of no dice the same = $1 times 5/6 times 4/6 = 20/36$. Probability of a pair = $1-1/36-20/36 = 15/36$.
edited Mar 17 at 20:41
Glorfindel
3,41581830
answered Mar 17 at 20:20
Robert EdgarRobert Edgar
1
edited Mar 17 at 20:41
Glorfindel
3,41581830
edited Mar 17 at 20:41
Glorfindel
3,41581830
edited Mar 17 at 20:41
Glorfindel
3,41581830
3,41581830
answered Mar 17 at 20:20
Robert EdgarRobert Edgar
1
answered Mar 17 at 20:20
Robert EdgarRobert Edgar
1
answered Mar 17 at 20:20
Robert EdgarRobert Edgar
1
1
add a comment |
add a comment |
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