In the group G = {1, 5, 7, 11} under multiplication modulo 12, the solution of is equals :
5
1
7
11
If f : R R is defined by f(x) = lxl, then
f-1(x) = - x
f-1 =
the function f-1(x) does not exist
On the set of all natural numbers N, which one of the following * is a binary operation?
a * b = a + 3b
a * b = 3a - 4b
C.
a * b = a + 3b
On the set of integers Z, define f : Z Z as f(n) = , then 'f' is
injective but not surjective
neither injective nor surjective
surjective but not injective
bijective
The inverse of 2010 in the group Q* of all positive rational under the binary operation * defined by a * b = is
2009
2011
1
2010
Define a relation R on A = {1, 2, 3, 4} as xRy if x divides y. R is
reflexive and transitive
reflexive and symmetric
symmetric and transitive
equivalence
On the set of all non-zero reals, an operation * is defined as a * b = . In this group, a solution of (2 * x) * 3-1 = 4-1 is
6
1
1/6
3/2
If A and B have n elements in common, then the numberofelements common to A x B and B x A is
n
2n
n2
0
Which of the following is false ?
(N, *) is a group
(N, +) is a semi-group
(Z, +) is a group
Set of even integers is a group under usual addition
Let S be the set of all real numbers. A relation R has been defined on S by aRb , then R is
symmetric and transitive but not reflexive
reflexive and transitive but not symmetrIc
reflexive and symmetric but not transitive
an equivalence relation