When we throw a dice 3 times there are 6^3 = 216 possible outcomes which are
(1,1,1)
(1,1,2)
(1,1,3)
(1,1,4)
(1,1,5)
(1,1,6)
(1,2,1)
(1,2,2)
(1,2,3)
(1,2,4)
(1,2,5)
(1,2,6)
(1,3,1)
(1,3,2)
(1,3,3)
(1,3,4)
(1,3,5)
(1,3,6)
(1,4,1)
(1,4,2)
(1,4,3)
(1,4,4)
(1,4,5)
(1,4,6)
(1,5,1)
(1,5,2)
(1,5,3)
(1,5,4)
(1,5,5)
(1,5,6)
(1,6,1)
(1,6,2)
(1,6,3)
(1,6,4)
(1,6,5)
(1,6,6)
(2,1,1)
(2,1,2)
(2,1,3)
(2,1,4)
(2,1,5)
(2,1,6)
(2,2,1)
(2,2,2)
(2,2,3)
(2,2,4)
(2,2,5)
(2,2,6)
(2,3,1)
(2,3,2)
(2,3,3)
(2,3,4)
(2,3,5)
(2,3,6)
(2,4,1)
(2,4,2)
(2,4,3)
(2,4,4)
(2,4,5)
(2,4,6)
(2,5,1)
(2,5,2)
(2,5,3)
(2,5,4)
(2,5,5)
(2,5,6)
(2,6,1)
(2,6,2)
(2,6,3)
(2,6,4)
(2,6,5)
(2,6,6)
(3,1,1)
(3,1,2)
(3,1,3)
(3,1,4)
(3,1,5)
(3,1,6)
(3,2,1)
(3,2,2)
(3,2,3)
(3,2,4)
(3,2,5)
(3,2,6)
(3,3,1)
(3,3,2)
(3,3,3)
(3,3,4)
(3,3,5)
(3,3,6)
(3,4,1)
(3,4,2)
(3,4,3)
(3,4,4)
(3,4,5)
(3,4,6)
(3,5,1)
(3,5,2)
(3,5,3)
(3,5,4)
(3,5,5)
(3,5,6)
(3,6,1)
(3,6,2)
(3,6,3)
(3,6,4)
(3,6,5)
(3,6,6)
(4,1,1)
(4,1,2)
(4,1,3)
(4,1,4)
(4,1,5)
(4,1,6)
(4,2,1)
(4,2,2)
(4,2,3)
(4,2,4)
(4,2,5)
(4,2,6)
(4,3,1)
(4,3,2)
(4,3,3)
(4,3,4)
(4,3,5)
(4,3,6)
(4,4,1)
(4,4,2)
(4,4,3)
(4,4,4)
(4,4,5)
(4,4,6)
(4,5,1)
(4,5,2)
(4,5,3)
(4,5,4)
(4,5,5)
(4,5,6)
(4,6,1)
(4,6,2)
(4,6,3)
(4,6,4)
(4,6,5)
(4,6,6)
(5,1,1)
(5,1,2)
(5,1,3)
(5,1,4)
(5,1,5)
(5,1,6)
(5,2,1)
(5,2,2)
(5,2,3)
(5,2,4)
(5,2,5)
(5,2,6)
(5,3,1)
(5,3,2)
(5,3,3)
(5,3,4)
(5,3,5)
(5,3,6)
(5,4,1)
(5,4,2)
(5,4,3)
(5,4,4)
(5,4,5)
(5,4,6)
(5,5,1)
(5,5,2)
(5,5,3)
(5,5,4)
(5,5,5)
(5,5,6)
(5,6,1)
(5,6,2)
(5,6,3)
(5,6,4)
(5,6,5)
(5,6,6)
(6,1,1)
(6,1,2)
(6,1,3)
(6,1,4)
(6,1,5)
(6,1,6)
(6,2,1)
(6,2,2)
(6,2,3)
(6,2,4)
(6,2,5)
(6,2,6)
(6,3,1)
(6,3,2)
(6,3,3)
(6,3,4)
(6,3,5)
(6,3,6)
(6,4,1)
(6,4,2)
(6,4,3)
(6,4,4)
(6,4,5)
(6,4,6)
(6,5,1)
(6,5,2)
(6,5,3)
(6,5,4)
(6,5,5)
(6,5,6)
(6,6,1)
(6,6,2)
(6,6,3)
(6,6,4)
(6,6,5)
(6,6,6)
Out of which there are 21 cases where sum is 13:
(1, 6, 6), (6, 1, 6), (6, 6, 1),
(2, 5, 6) , (2, 6, 5), (5, 6, 2), (5 ,2, 6) ,(6, 2, 5), (6,5,2)
(3, 4, 6), (3, 6, 4), (4, 6, 3), (4, 3, 6), (6, 4, 3), (6, 3, 4)
(3, 5, 5), (5, 3, 5), (5, 5, 3)
(4, 4, 5), (4, 5, 4), (5, 4, 4)
Throwing a dice 3 times, X the combination of total values 13. How many possible combinations...
Throwing a dice 3 times, where X the combination of total values of 13. What are possible combinations of value 13
Throwing a dice 3 times, where X the combination of total values of 13. What is all possible combinations of value that X can take
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Suppose we roll a fair die two times; consider all the combinations of the numbers from each of the two rolls. (a) How many different samples are there? No of samples 36 (b) Consider each of the possible samples. Compute the mean and the standard deviation of all sample means and the distribution of population. (Round mean values to 1 decimal place and standard deviation values to 3 decimal places.) Consider using Excel as a time saver to show all...
Consider a cross between
two black gimos that are heterozygous (Bb).
to. How many possible
combinations will produce 13 black children and 4 white
children?
b. What is the probability
that 13 blacks and 4 whites appear in that order
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General Recursion C++ How many possible bridge hands are there ? This question is a specific case of the general question, “How many combination of X items can I make out of Y items ?” In the case of the bridge hand, X is 4 and Y is 8. The solution is given by the following formula: Combinations(Y, X) = Y if X = 1 1 if X = Y Combinations(Y-1, X-1) + Combinations(Y-1, X) if Y > X >...
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