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Browse High School Permutations/Combinations
Stars indicate particularly interesting answers or
good places to begin browsing.
 Combinations of Married Couples [11/08/1996]

What is the probability that 12 people can be grouped into 6 pairs where
each pair is a married couple?
 Combinations of Pegs [02/04/1997]

Given a square peg board with sixteen pegs, how many triangles can you
form by connecting three pegs?
 Combinations of Poker Hands [05/15/1998]

Counting three of a kind, two pair, and one pair poker hands.
 Combinations of Prisoners [09/02/1997]

Nine prisoners are taken for their daily exercise handcuffed together in
threes. How would the warden arrange the men each day so that no two men
are handcuffed together more than once over a six day period?
 Combinations of Three Words [8/28/1996]

I have three columns of 20 words each...
 Combinations of Toppings when Ordering a Pizza [05/19/2005]

I was working on calculating how many combinations of pizza can be
made using 6 different toppings with no double toppings allowed, and I
found that both c(6,0) + c(6,1) + c(6,2) + ... + c(6,6) and 2^6 gave
me the same correct answer of 64. Why do both methods work?
 Combinations of X's and Y's [10/27/1999]

X's and Y's are written in a row (e.g. XX...XXYY...Y). How many different
arrangements of the letters can there be?
 Combinations Totaling 100 [09/27/1999]

In how many ways can I achieve a sum of 100 adding together only 6
integers taken from the set of integers from 1 to 44?
 Combinations with Duplicate Objects [06/22/1999]

How many different combinations are there when choosing 3 letters from
the group {ABBCCC}?
 Combinatorial Probability by Degrees [01/08/2016]

A teen faces a word problem, and seeks clarity on its combinations ...
or are they permutations? By diagramming a simpler probability scenario
and then building it up, Doctor Ian models where the powers come from.
 Combinatorial Proof [6/13/1996]

Please prove this combinatorial proof.
 Combinatorial Proof [7/16/1996]

How do I prove that C(n,r)C(r,k) = C(n,k)C(nk,r
k) where k <= r <= n?
 Combinatorial Proof: Identity [02/10/2003]

Prove: C(2n,4) = 2C(n,4) + 2C(n,3)C(n,1) + (C(n,2))^2 for all n in N; n
greater than or equal to 4.
 Combinatorics [08/19/1997]

sum((1)^k*((4n choose 2k)/(2n choose k)) for k = 1 to 2n
 Combinatorics in a 4x4 Board with White and Black Tiles [07/27/2006]

8 white and 8 black tiles are arranged in a 4x4 square such that in each row and each column there are 2 white and 2 black tiles. In how many different patterns can the tiles be arranged?
 Combinatorics: Ramsey Theory [01/12/1998]

Could you help me with a detailed explanation of the theory and a
concrete example?
 Combinatorics: Unique Groupings [5/30/1996]

Twentyfour friends want to play as many rounds of golf as they can...
how many unique rounds of golf can they play?
 Comparing Corresponding Factors [03/04/2003]

Show that C(p1,k) = ((p1)*...*(pk))/(1*...*k) is congruent to (1)^
k mod p.
 Connect 4  Number of Winning Arrangements [6/20/1996]

Can you help us find the formula for the number of winning lines on a 7 x
6 Connect4 board?
 Connecting the Dots [03/14/1999]

If you have a few dots on a page, how many lines does it take to connect
them all to each other?
 Counterfeit Coin Challenge [05/12/2007]

In a set of 13 coins, either zero or two of them are counterfeit and
are lighter. You must identify the counterfeit coins, if any, after
four or fewer weighings on a balance scale.
 Counting Alternating Subsets [03/29/2003]

Find the number of alternating subsets of A_n.
 Counting Arrangements of Objects in a Set [01/17/2006]

How many different ways can you arrange the elements in a set? Two
elements (a and b) can be ab or ba, but it's harder with bigger sets.
An explanation of the math underlying the Multiplication Principle.
 Counting Digits [10/23/1998]

Using the Fundamental Principle of Counting, how many sixdigit numbers
can you make with two zeros, two twos, and two fours?
 Counting Handshakes [9/7/1995]

There are 20 people in a room, and each person shakes hands just once
with everyone else. Wouldn't this be 380 total handshakes? 19 * 20 = 380.
 Counting Intersections of Diagonals in Polygons [03/08/2000]

Can you help me find an equation for the maximum number of intersections
of the diagonals in a polygon?
 Counting Paths on a Grid [08/21/2006]

On a 4 x 5 grid, how many possible routes are there to go from one
corner to the diagonally opposite corner?
 Counting Paths With Factorials [07/24/2002]

In the diagram, how can I find the number of paths from point A to
point B, using factorials?
 Counting Patterns in Stacking Bricks [01/04/2009]

I have a number of bricks which are each 3 units long, 1 unit deep and
1 unit wide. I want to stack them in a tower 3 units wide, 1 unit deep
and 10 units high. How many ways can that be done?
 Counting Possible Combinations of Weights [10/07/2004]

If you have a set of weights, in sizes 50g, 25g, 15g, and 5g, how
would you go about determining how many possible combinations of
weights you could make to equal 85g?
 Counting Possible Letter Arrangements [10/25/2004]

In rearranging the letters of the word GUMTREE, how many ways can the
letter M be to the left of the two E's?
 Counting Possible Paths [05/30/2002]

How do I find the number of pathways from A to B?
 Counting Rectangles [05/23/2001]

How can I find the number of different rectangles in a square grid
containing "c" columns and "r" rows?
 Counting Squares in Bigger Squares [02/29/2000]

How many edge 2 squares (2x2 squares) can be found in an edge 4 square (a
4x4 square)?
 Counting Triangles [05/27/1999]

In a large triangle with 36 small ones inside, how many triangles are
there in all?
 Creating a List of Permutations with a Computer Program [07/31/2007]

I'm writing a computer program to list all the permutations of a given
set of numbers, but am not sure of the best way to do it. Any ideas?
 Creating an Organized List of Combinations [11/25/2008]

I know how to use the formula to determine the number of combinations
of 6 numbers drawn from 12 numbers (1 to 12 inclusive). But without
the formula, how can I make a list of all the possible combinations
and be confident that I've found them all?
 Cuisenaire Rod Combinations [11/13/2001]

We are to record 512 different combinations of each level (or color) of
rod, with the orange rod (the largest) being the last. Is there a formula
exist to find these combinations without literally manipulating the rods?
 Darts Tournament with Eight Players [10/05/2002]

There are eight players in a darts tournament. Each player plays one
game against each of the other players. How many dart games will be
played in the tournament?
 Data Compression [08/10/2003]

Is there an algorithm that can reduce any binary number to a much
smaller binary number, then later be reversed to regain the original
number? It has to work for any binary number.
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