If R denotes the set of all real numbers, then the function f : defined f(x) = is :
one-one only
onto only
both one-one and onto
neither one-one nor onto
In Z, the set of all integers, the inverse of - 7 w.r.t. * defined by ab = a + b + 7 for all a,b Z is
- 14
7
14
- 7
In three element group {e, a, b} where e is the identity a5b4 is equal to
a
e
ab
b
A.
a
Here, first we prepare a table
Now, we have
x | e | a | b |
e | e | a | b |
a | a | b | e |
b | b | e | a |
a5b4 = [a3 . a2][b3 . b] = (e . a2)(e . b) = a2b
= b . b = b2 = a
The relation R = {(1, 1), (2, 2), (3, 3)} on the set { 1, 2, 3} is
symmetric only
reflexive only
an equivalence relation
transitrve only
Let M be the set of all 2 x 2 matrices with entries from the set ofreal number R. Then, the function f : M R defined by f(A) = for ever A M, is
one-one and onto
neither one-one nor onto
one-one but not onto
onto but not one-one
In the group (Q+, *) of positive rational numbers w.r.t. the binary operation * defined by a * b = , the solution of the 3 equation 5 * 4 = 4-1 in Q+ is
20
On the set Q of all rational numbers the operation * which is both associative and commutative is given by a * b, is :
a + b + ab
a2 + b2
ab + 1
2a + 3b
The function f : X Y defined by f(x) = sin(x) is one-one but not onto, if X and Y are respectively equal to :
R and R