Onto but not one-to-one
One-to-one but not onto
One-to-one and onto
Neither one-to-one nor onto
Ler R1 and R2 be two relations defined as follows :
R1 = {(a, b) R2 : a2 + b2 Q} and R2 = {(a, b) R2: a2 + b2 Q}, where Q is the set of all rational numbers, then
R1 is transitive but R2 is not transitive.
R2 is transitive but R1 is not transitive.
Neither R1 nor R2 is transitive
R1 and R2 are both transitive.
Suppose f(x) is a polynomial of degree four, having critical points at – 1, 0, 1. If T = {x R |f(x) = f(0)}, then the sum of squares of all the elements of T is :
4
6
2
8
If the minimum and the maximum values of the function
are m and M respectively, then the ordered pair (m, M) = :
( - 4, 4)
( - 4, 0)
(0, 4)
If x = 1 is a critical point of the function f(x) = (3x2 + ax –2 – a) ex, then
x = 1 and x = are local minima of f
x = 1 is a local maxima and x = is a local minima of f.