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John Dibling
John Dibling
00:18
Hello from the train to the suburbs!
Alf P. Steinbach
Alf P. Steinbach
user image
John Dibling
John Dibling
Lol
StackedCrooked
StackedCrooked
The progress bars in recent versions Windows seem to mostly overestimate in the beginning and then grow more accurate near the end.
So it goes faster than expected.
John Dibling
John Dibling
Maybe this is bills way of getting you to think that windows is efficient
StackedCrooked
StackedCrooked
Ah that Bill again...
jweyrich
jweyrich
00:44
'lo.
Runcible
Runcible
Facebook is a terrible website full of drama and tears.
/soapbox
jweyrich
jweyrich
and security breaches. Mainly data leaking.
jweyrich
jweyrich
01:07
Today a guy tried to assault me. He was on a motorcycle, came from my back slowing down, and grabbed my backpack. I didn't loose it, and the guy almost fell.. but the motorcycle dragged me and threw me on the floor... some injuries, but I'll be fine. My luck he didn't succeed, nor was armed.
Alf P. Steinbach
Alf P. Steinbach
@jweyrich "threw me on the floor" – an indoors motorcycle attack?
jweyrich
jweyrich
@AlfPSteinbach what is the correct term for the outside? I don't know. Sorry.
Alf P. Steinbach
Alf P. Steinbach
"ground"?
jweyrich
jweyrich
@AlfPSteinbach ah indeed. Thanks! bad memory.
Alf P. Steinbach
Alf P. Steinbach
you're welcome
sbi
sbi
01:11
@jweyrich Oh boy. Good you got away! Anything still hurt?
Alf P. Steinbach
Alf P. Steinbach
anyway, last week I was attacked by some very slippery ice, which collaborated with some very unyielding stairs. it's that time of year. wanton attacks from everywhere!
jweyrich
jweyrich
@sbi some cuts in the elbow, knee, hand, and some hematomas (is this correct?)
sbi
sbi
@jweyrich Ouch! (I wouldn't know. I'm not a native either. But I know what it means.) Was it a busy street or a dark corner?
Alf P. Steinbach
Alf P. Steinbach
@jweyrich sounds exactly like my injuries.
jweyrich
jweyrich
@AlfPSteinbach hahaha
@sbi empty street, it was about 7pm, full sunlight (daylight savings here), and it was 10 steps from my house. I was coming back from the uni.
James McNellis
James McNellis
01:20
Hey, look who joined Stack Overflow
1 1
c++ algorithm combinatorics permutation visual-studio-2010 templates variadic
sbi
sbi
@JamesMcNellis Wow. Sooner or later we'll get them all...
Alf P. Steinbach
Alf P. Steinbach
One token ring to bind them all
sbi
sbi
@jweyrich Well, what can i say? Stay alert!
Alf P. Steinbach
Alf P. Steinbach
sorry, i'm not very serious
annoyances.org/exec/show/article09-002
 
1 hour later…
Fred Nurk
Fred Nurk
02:47
annoyances.org/exec/show/article09-209
 
11 hours later…
Alf P. Steinbach
Alf P. Steinbach
13:20
This is a bit off-topic, but can anyone point to simple geometric proof of formula for sum of squares of integers 1 through n? I failed to cough up such proof. Formula from Knuth (vol 1 page 105) is (n/3)*(n+1/2)*(n+1) = n^3/3 + n^2/2 + n/6, but he just writes "we know that..." with no explanation.
Konrad Rudolph
Konrad Rudolph
he does that a lot …
that said, the formula you’ve given above can be solved by simple factorization.
Alf P. Steinbach
Alf P. Steinbach
yeah, but he does give geometric proof for sub of cubes (in exercise page 19). and that one's quite amazing. just square of sum of the integers...
Konrad Rudolph
Konrad Rudolph
to be honest, I stopped trying to solve the exercises
my math-FU fails by far
and even those I can solve simply take too much time for the most part
Alf P. Steinbach
Alf P. Steinbach
i just can't let go when I know that there's something simple, easy to understand, and that I lack the insight
@KonradRudolph uh, how do you factorize sum of squares?
Konrad Rudolph
Konrad Rudolph
@Alf: no idea … I was referring to what you had posted earlier: (n/3)*(n+1/2)*(n+1)
that can be factorized easily
forget it
Alf P. Steinbach
Alf P. Steinbach
13:32
huh? isn't it already factorized? what i don't understand is how to derive that formula
Konrad Rudolph
Konrad Rudolph
I meant expanded, not factorized
Alf P. Steinbach
Alf P. Steinbach
oh yeah, i gave the expansion
the only thing i can think of is horribly complicated. forming six times the the sum of squares of odd numbers as six pyramids put together to form cube, then subtracting the overlaps (which is where complication enters). i can't believe that's how to do it.
Alf P. Steinbach
Alf P. Steinbach
13:46
There is an almost-pattern. Sum of first powers, (n*(n+1))/2. Sum of second powers, (n*(n+1/2)*(n+1))/3. Sum of third powers, (n*n*(n+1)*(n+1))/4. But I don't get it.
 
4 hours later…
James McNellis
James McNellis
17:57
@AlfPSteinbach It must be nice to be so smart that you can just say "we know that..." and have everyone assume you are correct :-D
DeadMG
DeadMG
@James: Why, yes, it is nice
user32344
user32344
18:34
I got +20 to talk here
I need to learn math to understand that.
user32344
user32344
18:49
Cya later guys.
 
1 hour later…
DeadMG
DeadMG
19:50
see, what I really don't get is
why on earth people downvote when the question asks for C++ reference and I post MSDN
 
2 hours later…
Fred Nurk
Fred Nurk
21:42
@DeadMG: msdn has traditionally been very msvc-specific; but it has improved as a general C++ reference, I believe
but you only got one downvote anyway :)
 
2 hours later…
DeadMG
DeadMG
23:33
man
trying to understnad shadow mapping
not getting awfully far

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