Let the number of elements of the sets A and B be p and q, respectively. Then, the number of relations from the set A to the set B is
2p + q
2pq
p + q
pq
Eleven apples are distributed among a girl and a boy, Then, which one of the following statements is true ?
atleast one of them will receive 7 apples
the girl receives atleast 4 apples or the boy receives atleast 9 apples
the girl receives atleast 5 apples or the boy receives atleast 8 apples
the girl receives atleast 4 apples or the boy receives atleast 8 apples
The domain of definition of the function
B.
Given, f(x) =
For domain, (1 - x) > 0 and
The function f(x) = satisfies the equation
f(x + 2) - 2f(x + 1) + f(x) = 0
f(x) + f(x + 1) = f{x(x + 1)}
f(x) + f(y) =
f(x + y) = f(x)f(y)
A mapping f : N ➔ N, where N is the set of natural numbers is defined as
f(n) = n2 for n odd
f(n) = 2n + 1, for n even
for n ∈ N. Then f is
surjective but not injective
injective but not surjective
bijective
neither injective nor surjective
A and B are two points on the Argand plane such that the segment AB is bisected at the point (0, 0). If the point A, which is in the third quadrant has principal amplitude 0, then the principal amplitude of the point B is
A function f: A B, where A = {x: } and B = {y: } is defined by the rule y = f(x) = 1 + x2 Which of the following statement is true ?
f is injective but not surjective
f is surjective but not injective
f is both injective and surjective
f is neither injective nor surjective