The number of ways in which we can get a score of 11 by throwing three dice is a. `18` b. `27` c. `45` d. `56`

There are four letters and four directed envelopes. The number of ways in which all the letters can be put in the wrong envelope is a. 8 b. 9 c. 16 d. none of these

Find the number of ways in which we can choose 3 squares on a chess board such that one of the squares has its two sides common to other two squares.

The number of ways in which 12 books can be put in three shelves with four on each shelf is a. (12 !)/((4!)^3) b. (12 !)/((3!)(4!)^3) c. (12 !)/((3!)^3 4!) d. none of these

The number of ways in which we can distribute m n students equally among m sections is given by a. ((m n !))/(n !) b. ((m n)!)/((n !)^m) c. ((m n)!)/(m ! n !) d. (m n)^m

Two packs of 52 cards are shuffled together. The number of ways in which a man can be dealt 26 cards so that he does not get two cards of the same suit and same denomination is a. ^52C_(26). 2^(26) b. ^104 C_(26) c. ^(52)C_(26) d. none of these

The number of ways in which three distinct numbered in an increasing A.P. can be selected from the set {1,2,3……24} is

The total number of ways in which 2n persons can be divided into n couples is a. (2n !)/(n ! n !) b. (2n !)/((2!)^3) c. (2n !)/(n !(2!)^n) d. none of these

The number of ways of partitioning the set {a,b,c,d} into one or more non empty subsets is

In an examination of nine papers, a candidate has to pass in more papers than the number of paper in which he fails in order to be successful. The number of ways in which he can be unsuccessful is a. 256 b. 266 c. 193 d. 319

The number of ways in which we can select four numbers from 1 to 30 so as to exclude every selection of four consecutive numbers is a. 27378 b. 27405 c. 27399 d. none of these