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Heh hard one for Allie

Started by Racenata, September 01, 2010, 10:19:00 PM

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Racenata

"Find x > 3 such that

ln(x) < x^(0.1)"


How do you solve this type of problem? I plugged it into my TI-89 solver and didn't get anything. As a hint, the number is unbelievably huge.

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Santa

2^60 = 1,152,921,504,606,846,976

That's one such number, but there are infinitely many more, some smaller and most larger. The proof for x=2^60 is pretty straightforward, though.

First notice that the condition
ln(x) < x^(0.1)
is equivalent to
x < e^( x^(0.1)),
so it is sufficient to show this latter property holds.

Let x = 2^60.
Then x^(0.1) = 2^6 = 64.

Since 2 < e,

2^60 < e^60
< e^64
= e^(2^6)

zomniethe4

Quote from: RedEyes on September 01, 2010, 10:24:48 PM
2^60 = 1,152,921,504,606,846,976

That's one such number, but there are infinitely many more, some smaller and most larger. The proof for x=2^60 is pretty straightforward, though.

First notice that the condition
ln(x) < x^(0.1)
is equivalent to
x < e^( x^(0.1)),
so it is sufficient to show this latter property holds.

Let x = 2^60.
Then x^(0.1) = 2^6 = 64.

Since 2 < e,

2^60 < e^60
< e^64
= e^(2^6)
My head hurts  :'(

Zom

GavinGill

September 01, 2010, 11:18:06 PM #3 Last Edit: September 02, 2010, 01:35:37 AM by GavinGill

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Quote from: GavinGill on September 01, 2010, 11:18:06 PM
You have a hard one for Allie? What?
HAHAHAHAHAHAHAHAHAHAHAHAHAHAHAHAHAHAHAHAHAHAHAHAHA.. :3.

S



Xrow


Corr


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the heh ruined whole pic for me, sorry.
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