Sujet : Re: question
De : peter (at) *nospam* tsto.co.uk (Peter Fairbrother)
Groupes : sci.mathDate : 18. May 2024, 04:14:05
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References : 1 2
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On 17/05/2024 13:56, Jim Burns wrote:
On 5/16/2024 7:41 PM, Peter Fairbrother wrote:
Is lim (cos pi/2n)^n = 1 as n -> infinity?
Yes, 1.
a) thanks
b) yikes! I remember doing some of the below math at school and university, and thinking I'd probably never need it again. This is now the second time I have needed something like that, in 50 years, so maybe I should learn it to immediately usable status, or maybe not: but in any case I will have to look at the details which you have so kindly provided.
It's about a physics thing, passing light through polarising filters: eg when n=1 the expression =0, no light passes through a pair of polarisers which are crossed at 90 degrees.
Hmmm, when n=0 does the expression (cos pi/2n)^n = 1/2?
Insert another suitably orientated filter in between those filters (n=2), and some light passes. Oooh, quantum weirdness, recent Nobel prizes, Bell's theorem, spooky-action-at-a-distance, and so on.
Insert lots and lots of filters in a rotating pattern, and all (1/2) the light passes through.
Except - suppose it's all really simple instead, and light which passes through a filter just has its polarisation changed a little. Then all the Bell hidden variables are irrelevant, as they change depending on their particles' history.
Note, there is necessarily a measurement of the photons in a polarising filter - but this does not necessarily involve a complete wavefunction collapse.
On to entanglement... - but that's another story, for later.
Take the logarithm of both sides,
Swap log and lim, because continuity.
Evaluate lim by L'Hôpital's rule .
Take the exponential of both sides.
lim(cos(1/n)^n
[n→inf])
exp(log(lim(cos(1/n)^n)))
[n→inf])))
exp(lim(log(cos(1/n)^n)))
[n→inf]))
continuity
exp(lim(
n*log(cos(1/n))
[n→inf]))
exp(lim(
log(cos(1/n))
⎯⎯⎯⎯⎯⎯⎯⎯⎯⎯⎯
1/n
[n→inf]))
exp(lim(
log(cos(x))
⎯⎯⎯⎯⎯⎯⎯⎯⎯
x
[x→0]))
exp(lim(
-sin(x)/cos(x)
⎯⎯⎯⎯⎯⎯⎯⎯⎯⎯⎯⎯
1
[x→0]))
L'Hôpital
exp(0)
1
Any formula for calculating it from a given n
(other than the obvious)?
What is it that is obvious?
just that F(n) =(cos pi/2n)^n and is easily calculated, (or perhaps F(x) =(cos pi/2x)^x) - can it be simplified?
Thanks again
Peter Fairbrother
question
Re: question