In a group G = {1, 3, 7, 9} under multiplication modulo 10, the i

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 Multiple Choice QuestionsMultiple Choice Questions

31.

20 persons are invited for a party. In how many different ways can they and the host be seated at circular table, if the two particular persons are to be seated on either side of the host?

  • 20!

  • 2(18!)

  • 18!

  • None of these


32.

There are 5 letters and 5 different envelopes. The number of ways in which all the letters can be put in wrong envelope, is

  • 119

  • 44

  • 59

  • 40


33.

The number of ways of painting the faces of a cube of six different colours is

  • 1

  • 6

  • 6!

  • 36


34.

In how many ways 6 letters be posted in 5 different letter boxes?

  • 56

  • 65

  • 5!

  • 6!


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35.

In how many number of ways can 10 students be divided into three teams, one containing four students and the other three?

  • 400

  • 700

  • 1050

  • 2100


36.

Let A = {1, 2, 3, ... , n} and B = {a, b, c}, then the number of functions from A to B that are onto is:

  • 3n - 2n

  • 3n - 2n - 1

  • 3(2n - 1)

  • 3n - 3(2n - 1)


37.

Everybody in a room shakes hands with everybody else. The total number of hand shakes is 66. The total number of persons in the room is:

  • 9

  • 12

  • 10

  • 14


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38.

In a group G = {1, 3, 7, 9} under multiplication modulo 10, the inverse of 7 is :

  • 7

  • 3

  • 9

  • 1


B.

3

The identify element for multiplication modulo 10, is 1 and 3X107 = 1.

So, the inverse of 7 is 3.


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39.

The sides AB, BC, CA of triangle ABC have 3, 4 and 5 interior points respectively on them. Find the number of triangles that can be constructed using these points as vertices

  • 201

  • 120

  • 205

  • 435


40.

The number of ways of distributing 8 distinct toys among 5 children will be

  • 58

  • 85

  • P58

  • 40


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