Permutation of rings in Discrete Math. If we have 4 different beads, how many braclets can we make if it can't be flipped and rotations resulting in similar results? 4!/4. If we are allowed to flip? 4!/4/2

Gavyn Whitehead

Gavyn Whitehead

Answered question

2022-09-06

Permutation of rings in Discrete Math
If we have 4 different beads, how many braclets can we make if it can't be flipped and rotations resulting in similar results?
- 4!/4
If we are allowed to flip?
- 4!/4/2
Consider the size of all bracelets with distinct beads where the size of the bracelet is the number of beads. What is the counting sequence?
I do not know what it means by counting sequence, can someone explain to me what it wants?

Answer & Explanation

Karla Bautista

Karla Bautista

Beginner2022-09-07Added 16 answers

Step 1
Consider the set of all bracelets with distinct beads, where the size of the bracelet is the number of beads. What is the counting sequence?
Step 2
Let B n be the number of distinct bracelets with n distinct beads, and let b n = | B n | , the number of such bracelets. For example, in the first part you found that b 4 = 4 ! 4 = 3 !, assuming that flipped bracelets are considered distinct, but rotated ones are not. The counting sequence for this class of bracelets is the sequence b n : n N , and you’re being asked to find a closed formula for bn in terms of n.

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