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## How many bracelets can you create with 10 unique beads?

Answer: This is called a cyclic permutation. The formula for this is simply (n-1)!/2, since all the beads are identical. Hence, the answer is 9!/2 = 362880/2 = **181440**….

## How many ways can you make a bracelet with 5 different beads?

My answer is : There are possible (n-1)!/2 bracelets for n distinct colors, like in our case. Thus for n=5, there are possible **4**!/2=12 different bracelets.

## How many different necklaces can be formed using 9 different Coloured beads?

This leaves us with 18,150 – 6 = 18,144 strings. The total number of necklaces we can form with these strings is 18,144 ÷ 9 = **2016**.

## What is the longest number bracelet?

The longest friendship bracelet measures **660.48 m (2,166 ft 11.16 in)** and was created by Benchmark Senior Living (USA) in Ridgefield, Connecticut, USA on 3 August 2016. The residents of Benchmark Senior Living came together to attempt this record to raise awareness for the Alzheimer’s Association.

## How many ways can 12 beads be arranged on a bracket?

12 different beads can be arranged among themselves in a circular order in **(12-1)!=** **11!** **Ways**. Now, in the case of necklace, there is not distinction between clockwise and anti-clockwise arrangements.

## How many ways can 7 beads be strung into necklace?

2520. **5040**.

## How many ways can 7 beads be strung on a necklace with a clasp?

It would be 7! = **5040 diffrent necklaces**.

## How many ways can eight unique beads be arranged on a chain with a clasp?

2520 Ways 8 beads of different colours be strung as a necklace if can be wear from both side.

## How many necklaces can you make with 10 beads of colors?

This is easy: count all permutations of 10 beads, 10!, then divide by 20 because we counted each permutation 10 times due to rotation, and counted each of these twice because you can flip the necklace over. Thus the answer is 10!/20 = **181440**.

## How do you find the permutation of a word?

To calculate the amount of permutations of a word, this is as simple as evaluating **n!** , where n is the amount of letters. A 6-letter word has 6! =6⋅5⋅4⋅3⋅2⋅1=720 different permutations.

## How many ways can 3 people sit in a round table?

So there are two answers: There are 3! = **6 different ways** of placing these three people in three distinct chairs. However, it we decide to consider rotated arrangements as basically the same, then there are only 2 ways.

## What is the meaning of circular permutation?

**The number of ways to arrange distinct objects along a fixed** (i.e., cannot be picked up out of the plane and turned over) circle is. The number is. instead of the usual factorial.