Find the number of ways in which 6 red roses and 3 white roses of different sizes can be made out to form a garland so that
no two white roses come together

Find the number of ways in which 6 red roses and 3 white roses of different sizes can be made out to form a garland so that all the white roses come together

The number of ways in which 7 red roses and 4 white roses of different sizes can be made out to form a garland so that all the white roses come together is

The number of ways in which 4 red roses , 4 white roses of different sizes can be made out to form a garland so that no two roses of the same colour are to come together is

The number of ways in which 5 red beeds and 4 yellow beeds of different sizes can be made out to form a necklace so that no two yellow beads come together is

The number of ways in which 5 red beeds and 4 yellow beeds of different sizes can be made out to form a necklace so that all the red beeds come together is

7 red roses and 3 white roses of different sizes be strung in the form of a garland at random. The probability that no two white roses come together is

Find the number of ways of arranging 6 red roses and 3 yellow roses of different sizes into a garland. In how many of them all the yellow roses come together.

I : the number of ways of arranging 4 boys and 3 girls arround a circle so that all the girls sit together is 144. II : The number of ways of arranging 6 red roses and 3 yellow roses of different sizes into a garlend so that no to yellow roses come together is 7200.

If 5 red roses and 5 white roses of different sizes are used in preparing a garland, the probability that red and white roses come alternately is