**Contents**show

## How many arrangements of beads are possible in a bracelet if there are 6 different designs of beads?

Since there are 6! linear arrangements of six distinct beads, the number of distinguishable circular arrangements is 6! 6=**5**!

## How many ways can nine beads be placed on a bracelet with no clasp?

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?

Thus for n=5, there are possible **4**!/2=12 different bracelets.

## How many ways 7 different beads can be arranged to form a necklace?

2520. **5040**.

## 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.

## Are the number of different ways in which objects can be arranged in order?

A **permutation** is an arrangement of all or part of a set of objects, with regard to the order of the arrangement. This means that XYZ is considered a different permutation than ZYX. The number of permutations of n objects taken r at a time is denoted by _{n}P_{r}.

## How many bracelets can be made by stringing 9 different colored beads together?

by stringing together 9 different coloured beads one can make **9!** **(9 factorial )** bracelet. 9! = 9×8×7×6×5×4×3×2×1 = 362880 ways.

## How many necklaces can be formed with 6 white and 5 red beads if each necklace is unique how many can be formed?

5! but correct answer is **21**.

## How many ways can you arrange things in a circle?

Coming back to the question – In how many ways can 5 distinct objects be arranged in a circle? Now there are 5! or **120 different linear arrangements possible**.