My analysis of night-club music: Convergence of beat frequency.

Question

mhchen · Answer

First, observe the natural log function:
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It gets smaller and smaller...but it doesn't converge!
This means that any positive number (greater than 1) can be represented by ln(x) where x is some positive number.

mhchen · Answer

Now consider a typical night-club music:
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mhchen · Answer

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We can model this
Say the first BURR BURR BURR BURR takes 4 seconds
then the second BURR BURR BURR BURR takes 2 seconds
then 1 second
then 1/2 second
as it gets faster and faster, it gets to the point where it stops altogether, pauses, the drops the bass *BOOM BOOM BOOM* and makes burping sounds or something.

Now, I've shown before that ln(x) doesn't converge but it does get smaller.
So say...the first BURR BURR BURR BURR takes 1/ln(1) seconds, then 1/ln(2) seconds, and so on...

would we get a never-ending
BURR BURR BURR BURR

and it'll just keep on stressing out the audience, never reaching the bass-drop point.

:o

mhchen · Answer

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are there detrimental effects to the ears if they listen to sound frequencies that are too high? hmm....

mhchen · Answer

night-club music is all electronic ones anyways,
so we can generate beats with a computer algorithm using MATH

Gdeinward · Answer

That is totally friggin awesome

Gdeinward · Answer

math is applicable to all walks of life. Which explains a lot, considering I hate life