Classify the following functions as injection, surjection or bijection:
f : R → R, defined by f(x) = 5x3 + 4
TIP: – One – One Function: – A function 
is said to be a one – one functions or an injection if different elements of A have different images in B.
So, 
is One – One function
⇔ a≠b
⇒ f(a)≠f(b) for all 
⇔ f(a) = f(b)
⇒ a = b for all 
Onto Function: – A function 
is said to be a onto function or surjection if every element of A i.e, if f(A) = B or range of f is the co – domain of f.
So, 
is Surjection iff for each 
, there exists 
such that f(a) = b
Bijection Function: – A function 
is said to be a bijection function if it is one – one as well as onto function.
Now, f : R → R, defined by f(x) = 5x3 + 4
Check for Injectivity:
Let x,y be elements belongs to R i.e 
such that
⇒ f(x) = f(y)
⇒ 5x3 + 4 = 5y3 + 4
⇒ x3 = y3
⇒ x = y
Hence, f is One – One function
Check for Surjectivity:
Let y be element belongs to R i.e 
be arbitrary, then
⇒ 5x3 + 4 = y
⇒ 5x3 + 4 – y = 0
Now, we know that for 3 degree equation has a real root
So, let 
be that root
⇒ 
Thus for clearly 
, there exist 
such that f(x) = y
Therefore f is onto
Thus, It is a Bijective function