Discrete math surjective function proof. Let E, F and G be given sets and let the functions f:E rightarrow F and g:F rightarrow G be given.

Kendra Hudson

Kendra Hudson

Answered question

2022-09-05

Discrete math surjective function proof
Let E,F and G be given sets and let the functions f : E F and g : F G be given. Consider the claim:
if f is surjective and g is surjective g f is surjective.
The claim is either true or false. If it is true, prove it. If it is false, give example of 3 sets of E,F,G and two functions f,g where the fuctions f : E F and g : F G are surjective but g f isn't surjective.
How should I think about all of this? We've had so few tasks in our course on this subject

Answer & Explanation

zagrebova1c

zagrebova1c

Beginner2022-09-06Added 10 answers

Step 1
A function h : A B is surjective if and only if for all y B there exists an x A such that h ( x ) = y.
Thus, let us consider a generic y G. Since g is surjective, by definition there exists w F such that h ( x ) = y.
Step 2
Also, since f is surjective, there exists x E such that f ( x ) = w.
So for a generic y G, we have guaranteed the existence of x such that g ( f ( x ) ) = g ( w ) = y.
Konner Parker

Konner Parker

Beginner2022-09-07Added 12 answers

Step 1
A variant (more synthetic) proof:
g f is surjective means the image ( g f ) ( E ) = G.
Step 2
This is true because
( g f ) ( E ) = g ( f ( E ) ) = g ( F ) ( f  is surjective) = G ( g  is surjective).

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