exp^[3/2](x) > sinh^[1/2](exp(x)) ?

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exp^[3/2](x) > sinh^[1/2](exp(x)) ?

tommy1729 Offline

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04/21/2015, 01:21 PM

We can simplify this by looking in the interval
x E [0,e^e] for the curves exp^[1/2] and sinh^[1/2].

This suggests that it is true.
But that very likely gives counter-intuitive results.

I Will clarify later.
Formal proofs and plots are still Desired and appreciated.

Regards

Tommy1729

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Messages In This Thread

exp^[3/2](x) > sinh^[1/2](exp(x)) ? - by tommy1729 - 04/21/2015, 12:09 PM

RE: exp^[3/2](x) > sinh^[1/2](exp(x)) ? - by tommy1729 - 04/21/2015, 01:21 PM

RE: exp^[3/2](x) > sinh^[1/2](exp(x)) ? - by tommy1729 - 04/23/2015, 04:38 PM

RE: exp^[3/2](x) > sinh^[1/2](exp(x)) ? - by sheldonison - 04/24/2015, 12:40 AM

RE: exp^[3/2](x) > sinh^[1/2](exp(x)) ? - by tommy1729 - 04/23/2015, 04:54 PM

RE: exp^[3/2](x) > sinh^[1/2](exp(x)) ? - by tommy1729 - 04/24/2015, 02:07 PM

RE: exp^[3/2](x) > sinh^[1/2](exp(x)) ? - by sheldonison - 04/24/2015, 02:59 PM

RE: exp^[3/2](x) > sinh^[1/2](exp(x)) ? - by tommy1729 - 10/26/2015, 01:07 AM

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