Difference between revisions of "Combinatorics Challenge Problems"

Revision as of 09:31, 23 April 2020

How many distinguishable towers consisting of $8$ blocks can be built with $2$ red blocks, $4$ pink blocks, and $2$ yellow blocks?

Answer: $(420)$

How many ways are there to seat $6$ people around the circle if $3$ of them insist on staying together?(All people are distinct)

Answer: $(36)$

When $6$ fair $6$ sided dice are rolled, what is the probability that the sum of the numbers facing up top is $10$ ?

Answer: ( $\frac{7}{2592}$ )

Revision as of 09:31, 23 April 2020 (view source) Shiamk (talk \| contribs) (→‎Problem 2) ← Older edit		Revision as of 09:31, 23 April 2020 (view source) Shiamk (talk \| contribs) (→‎Problem 3) Newer edit →
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	Answer: <math>(36)</math>		Answer: <math>(36)</math>
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	==Problem 3==		==Problem 3==