How many different necklaces can formed with 6 white and 5 red beads?

How many necklaces can be made using 7 beads?

It would be 7! = 5040 diffrent necklaces.

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.

How many ways can 10 different colored beads be threaded on a string?

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 6 beads be arranged in a string?

6P6 = 720 or 6!

How many ways 5 different beads can be arranged to form a necklace?

So, we have to divide 24 by 2. Therefore the total number of different ways of arranging 5 beads is 242=12 .

How many necklaces can you make with 6 beads of 3 colors?

The first step is easy: the number of ways to colour 6 beads, where each bead can be red, green or blue, is 36 = 729. Next we put the beads on a necklace, and account for duplicate patterns.

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How many necklaces can be formed with 8 colored beads?

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

How many different bangles can be formed from a different colored beads?

How many different bangles can be formed from 8 different colored beads? Answer: 5,040 bangles .

How many different ways can the 8 persons be seated in a circular table?

ways, where n refers to the number of elements to be arranged. = 5040 ways.

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 the 7 persons be seated in a circular table?

Since in this question we have to arrange persons in a circle and 7 persons have to be arranged in a circle so that every person shall not have the same neighbor. Hence there are 360 ways to do the above arrangement and therefore the correct option is A. So, the correct answer is “Option A”.