1. In this problem, we will only work with functions with domain R and codomain R. Therefore, if we say that two functions f and g are equal (f = g), it means that Vr E R, f(r) = g(x). We need a new definition. We say that a function 'f is faithful when "For every two functions g and h, fog=foh g= h." (a) Prove that if a function is one-to-one, then it is faithful. (b) Prove that if a function is NOT one-to-one, then it is NOT faithful.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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1. In this problem, we will only work with functions with domain R and codomain R. Therefore,
if we say that two functions f and g are equal (f = g), it means that
Vr E R, ƒ(x) = g(x).
We need a new definition. We say that a function f is faithful when
"For every two functions g and h, fog= foh = g= h."
(a) Prove that if a function is one-to-one, then it is faithful.
(b) Prove that if a function is NOT one-to-one, then it is NOT faithful.
Transcribed Image Text:1. In this problem, we will only work with functions with domain R and codomain R. Therefore, if we say that two functions f and g are equal (f = g), it means that Vr E R, ƒ(x) = g(x). We need a new definition. We say that a function f is faithful when "For every two functions g and h, fog= foh = g= h." (a) Prove that if a function is one-to-one, then it is faithful. (b) Prove that if a function is NOT one-to-one, then it is NOT faithful.
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