Proof that the exponential function is convex

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L Navarro H
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Homework Statement
f(x)=e^(ax)
where a>0
Relevant Equations
A function f(x) is convex if the statement that is into the question marks proofs
I try to proof it but i got stuck right here, i want your opinions
Can I get a solution if i continue by this way? or Do I have to take another? and if it is so, what would yo do?
 

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Isn't it sufficient to say that ##f(x)## is convex on ##(-\infty, \infty)## if ##f''(x) > 0## for all ##x## in that interval? If ##f(x) = e^{ax}## then ##f''(x) = a^2 e^{ax} > 0, \forall x \in \mathbb{R}##.
 
L Navarro H said:
Relevant Equations:: A function f(x) is convex if the statement that is into the question marks proofs
What does the above mean?
It's hardly an equation, let alone relevant.
 
etotheipi said:
Isn't it sufficient to say that ##f(x)## is convex on ##(-\infty, \infty)## if ##f''(x) > 0## for all ##x## in that interval? If ##f(x) = e^{ax}## then ##f''(x) = a^2 e^{ax} > 0, \forall x \in \mathbb{R}##.
> gives strictly convex, we don't need that
 
pbuk said:
> gives strictly convex, we don't need that

Well I suppose that's true , but I did say 'if' and not 'iff'! So what I wrote is true st`atement 😜