...yesterday at 12 o'clock the SNOTEL snow depth reading for bert was 61.9". As of 12 o'clock today it was 76.6". The decimel points give me problems, but I'm pretty sure that there is a lot of snow falling up there. Who is going up in the morning?
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...yesterday at 12 o'clock the SNOTEL snow depth reading for bert was 61.9". As of 12 o'clock today it was 76.6". The decimel points give me problems, but I'm pretty sure that there is a lot of snow falling up there. Who is going up in the morning?
Nobody, the pass is closed. and pssst...don't look at the snow depth, it's next to useless. What is useful though is the water content.
If the snotel is anything like we have here it's more susecptible to blown snow than it is to fallen snow.
Inches of H2O is the number that matters.
Length or width?Quote:
Originally Posted by ptavv
Bow-chicka-wow-wow, you're getting boned by a huge snow dick.
Where's the subtlety?Quote:
Originally Posted by Steven S. Dallas
NOTE:
Huge Snow WANG!
Second Note:
I am an EXPERT Math Major.
OK, so what's the real connective k-theory of Brown Gitler Spectra?Quote:
Originally Posted by Odin
With or without redundant tangental illuminent spectra?
If they keep it closed into the morning tomorrow, there's allways butler gulch. Anyone?Quote:
Originally Posted by lemon boy
how bout the mod 2 cohomology of the Brown-gitler spectra
Let a=HF2(hf2) denote the mod 2 Steenrod algebra. Let B(n) denote the nth brown-gitler spectrum over HF2. For each integer n > 0, B(n) is a Z/2-complete specturm. Set B(0) =s0 completed at 2, and b(wn) ~ B(2n + 1). Then for N >2, there is an isomorphism of the left a-modules
Alpha blended with a mousse of equivariant normal bundles.Quote:
Originally Posted by Odin
You've found my PhD thesis.Quote:
Originally Posted by Odin
Let [n/2] denote the integer less than or equal to n/2 for an integer n.
Consider the sequence generated by {s(i+1)=s(i)+s([i/2]):s(0)=0, s(1)=1}.
Does lim(i->infinty) s(i+1)/s(i) converge?
What does "Let [n/2] denote the integer less than or equal to n/2 for an integer n." have to do with:
Consider the sequence generated by {s(i+1)=s(i)+s([i/2]):s(0)=0, s(1)=1}.
Does lim(i->infinty) s(i+1)/s(i) converge?
???
A famous sequence is the Fibonnacci sequence.Quote:
Originally Posted by ptavv
It looks like: 1, 1, 2, 3, 5, 8, 13, 21,... where the next element of the sequence is generated by adding the previous 2.
In that notation, I'd write {f(i+1) = f(i)+f(i-1), f(0)=1, f(1)=1}.
Note that lim(i->inf) f(i+1)/f(i) = (1+sqrt(5))/2, tao the golden proportion.
So the sequence I'm talking about is generated by adding the previous element with one from just below or equal to halfway down the previous elements.
Lets avoid trying to stee rhis coversation into a philosophical question.Quote:
Originally Posted by Buster Highmen
I kant take it
Aside from the fact that the limit as i goes to infinity of the fibonnacci sequence is phi, not tao, my point was that "Let [n/2] denote the integer less than or equal to n/2 for an integer n." has nothing to do with the sequence you outlined.Quote:
Originally Posted by Buster Highmen
threeve
...
You guys are ruining a perfectly good thread about giant snow dicks.
The limit of the quotient of the successive elements in the Fibonnacci sequence has been "tao" for some time.Quote:
Originally Posted by ptavv
And it has everything to do with it. Unless you can index a sequence by rational numbers.
I like beer.
to get this back on topic
http://www.doheth.co.uk/funny/misc/Snow_Sculpture.jpg
http://www.angelfire.com/az3/warrick/146.jpg
I betcha my snow dick is bigger than yours.
I just didn't see the point in it since we're an internet forum and not a mathematical journal.Quote:
Originally Posted by Buster Highmen
Also: Evidently tau and phi both refer to the same golden ratio. Phi is simply more common. The more you knew. doo dee doo.
Look for the square brackets in s definition: it uses [i/2] which is the floor of i/2, as defined earlier for n. But the answer is 42.Quote:
Originally Posted by ptavv
if....Quote:
Originally Posted by ptavv
I = a math journal then icemang must also = a math gournal which means that everyone is a math journal.
I hadn't realized that the two were mutually exclusive, nor a dog wart waterbowl tea cozy with doily completion.Quote:
Originally Posted by ptavv
Evidently is an anagram for devil enty. Are you Satan, Santa?Quote:
Also: Evidently tau and phi both refer to the same golden ratio. Phi is simply more common. The more you knew. doo dee doo.
Acrosticly I disagree.
In the theory of
diametrically opposed viewpoints
it is important that we
somehow find a common ground between the
at risk viewpoints of the avant garde and the
general viewpoints of the established
residents of the
educated institutions of the
elite.
Can you adjoin the roots of your equations to my algebra? Or shall we attempt to meet halfway at Zeno's Paradise?Quote:
Originally Posted by Odin
Tried that one time. Always made it halfway to the halfway point.Quote:
Originally Posted by Buster Highmen
Could never seem to get all the way commited.
Finally I figured out that by staying in one position I would eventually just arrive where I was.
Quote:
Originally Posted by Buster Highmen
is this Fibonnacci's wave theory?
Great nerd joke.Quote:
Originally Posted by Odin