Difference between revisions of "Combinatorics Challenge Problems"
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How many distinguishable towers consisting of <math>8</math> blocks can be built with <math>2</math> red blocks, <math>4</math> pink blocks, and <math>2</math> yellow blocks? | How many distinguishable towers consisting of <math>8</math> blocks can be built with <math>2</math> red blocks, <math>4</math> pink blocks, and <math>2</math> yellow blocks? | ||
− | Answer: | + | Answer: <math>(420)</math> |
==Problem 2== | ==Problem 2== |
Revision as of 09:31, 23 April 2020
Problem 1
How many distinguishable towers consisting of blocks can be built with red blocks, pink blocks, and yellow blocks?
Answer:
Problem 2
How many ways are there to seat people around the circle if of them insist on staying together?(All people are distinct)
Answer: (36)
Problem 3
When fair sided dice are rolled, what is the probability that the sum of the numbers facing up top is ?
Answer: ()