1161. Allow G to be a limited gathering. Allow H to be a subgroup of G. Then, at that point, which of the accompanying partitions request of G.

A. Order of H
B. Index of H
C. Order of G
D. All of these *

1162. Let G be a group of order 36 and let a E G. The order of a is :

A. 11
B. 15
C. 18 *
D. 21

1163. Let G be a group of order 37 and a E G. Then order of a is :

A. Even number
B. Odd number
C. Prime number *
D. Composite number

1164. Let G be a group of order prime number then :

A. G is abelian *
B. G is trivial
C. G has 3 subgroups
D. None

1165. Let G be a group which have no proper subgroup . Then order of G is :

A. 15
B. 14
C. 47 *
D. 81

1166. Let G be group and H be subgroup of G or order 8. Then order of G is :

A. 22
B. 32 *
C. 42
D. 52

1167. Let G be infinite cyclic group . The number of generator of G is :

A. 1
B. 2 *
C. 3
D. 4

1168. Which of the following is cyclic group:

A. Z *
B. Q
C. R
D. C

1169. Let G be a cyclic gropu of order 24 Then order a4 is :

A. 2
B. 4
C. 6 *
D. 8

1170. Let G be a cyclic group of order 24 then order of a9 is :

A. 2
B. 4
C. 6
D. 8 *