In how many ways can a team 11 players be formed out of 25 players, if 6 out of them are always to be included and 5 always to be excluded a. `2020` b. `2002` c. `2008` d. `8002`

In how many ways can a football team of 11 players be selected from 16 players ? How many of them will (j) Include 2 particular players ? (ii) Exclude 2 particular players ?

In how many ways can a cricket team of eleven players be chosen out a batch 15 players, if (i) a particular is always chosen. (ii) a particular player is never chosen?

In how many ways can a team of 6 horses be selected out of a stud of 16, so that there shall always be three out of A B C A B C, but never A A, B B or C C together

The number of ways in which a team of eleven players can be selected from 22 players always including 2 of them and excluding 4 of them is

In how many ways can one select a cricket team of eleven from 17 players in which only 5 players can bowl if each cricket team of 11 must include exactly 4 bowlers?

How many different words can be formed by using all the letters of the word MATHEMATICS ? In how many of them, vowels are always together ?

There are 12 volleyball players in all in a college, out of which a team of 9 players is to be formed. The captain always remains the same, then in how many ways can the team be formed

How many different selections of 6 books can be made from 11 different books, if (i) two particular books are always selected. (ii) two particular books are never selected?

If n denotes the number of ways of selecting r objects of out of n distinct objects (rgeqn) with unlimited repetition but with each objet included at least once in selection, then n m is equal is a. ^r-1C_(r-n) b. ^r-1C_n c. ^r-1C_(n-1) d. none of these

6 balls marked as 1,2,3,4,5 and 6 are kept in a box. Two players A and B start to take out 1 ball at a time from the box one after another without replacing the ball till the game is over. The number marked on the ball is added each time to the previous sum to get the sum of numbers marked on the balls taken out. If this sum is even, then 1 point is given to the players. the first player to get 2 points is declared winner. at the start of the game, the sum is 0. if A starts to take out the ball, find the number of ways in which the game can be won.