ans = 
Prove that
f(x) = 53.989/21.233 * (log(log(x)))^(4/3)/(log(x))^(1/3)
is monotonically increasing (i.e. by showing that its derivative is > 0) and f(e^e) > 1.
Proving one function is greater than other?
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I want to see where is this inequality true
where x in (e^e,∞).
6 Commenti
Matt J
il 9 Giu 2024
The notation is ambiguous. We must know whether 
is to be interpreted as 
or as 
.
is to be interpreted as or as .Risposta accettata
Matt J
il 10 Giu 2024
Modificato: Matt J
il 10 Giu 2024
Make the change of variables 
and rearrange the inequality as,
and rearrange the inequality as,
Since 
is a convex function on 
such that 
>0 and 
, it readily follows that 
for all . QED.
is a convex function on such that >0 and , it readily follows that for all . QED.10 Commenti
Matt J
il 10 Giu 2024
I want to thank both of you for your efforts.
You're welcome, but please Accept-click the answer if it has resolved your question.
Più risposte (1)
Torsten
il 9 Giu 2024
Modificato: Torsten
il 10 Giu 2024
syms x y
f = 53.989/21.233 * (log(log(x))).^(4/3)./(log(x)).^(1/3);
%x is solution where f starts getting greater than 1
xstart = vpasolve(f==1,x,5)
log(log(xstart))/(21.233*log(xstart))
1/(53.989*log(xstart)^(2/3)*log(log(xstart))^(1/3))
ftrans = subs(f,x,exp(exp(y)));
%exp(exp(y)) is solution where f ends being greater than 1
yend = vpasolve(ftrans==1,y,13)
log(log(exp(exp(yend))))/(21.233*log(exp(exp(yend))))
1/(53.989*log(exp(exp(yend)))^(2/3)*log(log(exp(exp(yend))))^(1/3))
3 Commenti
Sam Chak
il 10 Giu 2024
Hi Fatima, can you provide the paper or link, or a cropped section for study purposes? Sounds like an interesting problem.
While I know what a log function is, I never use log(log(x)) or exp(exp(x)) in this approach.
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