Lounge<C++>

user1804599

15:00

in D templates can take floats, and T!NaN and T!NaN are the same type.

user1804599

gist.github.com/mrmonday/361202c32f75f71ff5a4

milleniumbug

that's the behaviour I would expect from this language

Alex M.

mmmm

milleniumbug

as in, we want it to be different, but not that much different

user1804599

Vlinder will lack NaN.

milleniumbug

15:02

are these frogs on your pizza

Cat Plus Plus

Yes

They call it 'ze pizza'

ʎǝɹɟɟɟǝſ

NaN sounds like a NULL value designed for floating point numbers

What is it useful for?

milleniumbug

It was a good idea at the time

Cat Plus Plus

Missing values

user1804599

For making JavaScript programmers brag about how terrible their language is.

milleniumbug

15:03

@ʎǝɹɟɟɟǝſ It is

user1804599

Use option<float> for potentially missing values, or a Boolean and a float.

Cat Plus Plus

Or not

ʎǝɹɟɟɟǝſ

Or throw an exception if some operation would yield no floating point value

user1804599

Just like you'd do with any other type.

thecoshman

@elyse lol blow

Cat Plus Plus

15:04

Exceptions are not a direct replacement

ʎǝɹɟɟɟǝſ

I agree

Alex M.

@milleniumbug they're supposed to be jalapenos but I think they're regular hot peppers that you can find here

I mean I don't feel anything special

user1804599

Exceptions are for operations.

ʎǝɹɟɟɟǝſ

s/ special//

That's why I said "if some operation"

milleniumbug

@ʎǝɹɟɟɟǝſ Keep it in mind that there's not only one NaN value, there are about 2^24 of them (for float). So you can encode location of the error inside the NaN payload.

Cat Plus Plus

15:06

There are signalling NaNs

milleniumbug

Nobody does that now for some reason

Cat Plus Plus

Exceptions still don't fit for missing values

There's not really any support for constructing NaNs

ʎǝɹɟɟɟǝſ

What's an example of a missing value? Why can't you use optional<float>?

thecoshman

@CatPlusPlus Except when they are

ʎǝɹɟɟɟǝſ

@milleniumbug Are you telling me that out of 32 bits for floats, 24 are "wasted" for NaN? I don't remember that from my classes

Cat Plus Plus

15:07

That's not how that works, no

milleniumbug

Not bits, no

Only values

Cat Plus Plus

@ʎǝɹɟɟɟǝſ Because you want packed format for your dataset and/or hardware processing and/or your language doesn't have optional and/or ...

Evgeniy Moiseenko

@milleniumbug for 2^24 values you need at least 24 bits

ʎǝɹɟɟɟǝſ

@milleniumbug 2^24 values need at least 24 bits, no?

Cat Plus Plus

Really it's not that big of a deal

ʎǝɹɟɟɟǝſ

15:08

Never said it is

milleniumbug

That's not 2^32 / 2^24 non-NaN values. That's 2^32 - 2^24 non-NaN values

Benjamin Gruenbaum

@EvgeniyMoiseenko or, as one would typically say it "entropy, bitches."

milleniumbug

@ʎǝɹɟɟɟǝſ Any float with representation x111 1111 1xxx xxxx xxxx xxxx xxxx xxxx (where x is 0 or 1) is NaN

Benjamin Gruenbaum

@Mysticial lol, JS chat does that all the time :D

ThePhD

@BenjaminGruenbaum I keep thinking your picture is of Count Dracula from Sesame Street, but it's just someone on someone else's back in the wintertime or something.

user1804599

15:11

@milleniumbug so many values wasted :(

Cat Plus Plus

Fraction can't be 0, because that's infinity

Benjamin Gruenbaum

@ThePhD that's great to know.

@CatPlusPlus what?

ʎǝɹɟɟɟǝſ

@milleniumbug right

ThePhD

@BenjaminGruenbaum 1/0

user1804599

@ThePhD lol nice

Benjamin Gruenbaum

15:12

@ThePhD that's no defined, it's certainly not infinity.

ʎǝɹɟɟɟǝſ

Wait, so 1.0/0.0 yields infinity with floats?

ThePhD

For floats, it's considered infinity?

Cat Plus Plus

Floats have Inf representation too

user1804599

1/0 is UB because integer division by 0 is UB.

milleniumbug

Hmmm, doesn't this include infinities though

ThePhD

15:12

No, I mean like

Benjamin Gruenbaum

Well, the standard has a notion of +0 and -0

ThePhD

In the float

Cat Plus Plus

x111 1111 1000 0000 0000 0000 0000 0000 is +/-inf

ʎǝɹɟɟɟǝſ

That seems even more dumb (to yield infinity on 1.0f/0.0f)

milleniumbug

yep, not all of x111 1111 1xxx xxxx xxxx xxxx xxxx xxxx are NaNs. x111 1111 1000 0000 0000 0000 0000 0000 are infinities

so that's 2^24-2 NaNs in float

ʎǝɹɟɟɟǝſ

15:16

What operations currently yield NaN?

milleniumbug

@ʎǝɹɟɟɟǝſ That's conflating normal calculations with calculating limits.

Benjamin Gruenbaum

@ʎǝɹɟɟɟǝſ 0/0 for example

milleniumbug

Since normal calculations are undefined, you can extend the float arithmetic to calculate limits.

ʎǝɹɟɟɟǝſ

@BenjaminGruenbaum I see

Cat Plus Plus

NaN

In computing, NaN, standing for not a number, is a numeric data type value representing an undefined or unrepresentable value, especially in floating-point calculations. Systematic use of NaNs was introduced by the IEEE 754 floating-point standard in 1985, along with the representation of other non-finite quantities like infinities. Two separate kinds of NaNs are provided, termed quiet NaNs and signaling NaNs. Quiet NaNs are used to propagate errors resulting from invalid operations or values, whereas signaling NaNs can support advanced features such as mixing numerical and symbolic computation...

Benjamin Gruenbaum

15:17

@milleniumbug that's generally true to real numbers.

ʎǝɹɟɟɟǝſ

@milleniumbug ikr

edition

is it possible to have RAM that grows from a permanent core?

Alex M.

meh it was mediocre

I don't even know why I still order from pizza hut

Benjamin Gruenbaum

@ʎǝɹɟɟɟǝſ also, NaN is sticky, operations involving NaN all result in NaN.

ʎǝɹɟɟɟǝſ

Yeah, I would expect that

ThePhD

15:18

NaNbomb.

Benjamin Gruenbaum

In addition, some languages produce NaN for terrible reasons, like JavaScript which NaNs when it can't parse stuff.

ʎǝɹɟɟɟǝſ

Also inf / inf probably yields NaN

milleniumbug

yup

Benjamin Gruenbaum

Yes, it does.

milleniumbug

16 mins ago, by milleniumbug

It was a good idea at the time

ʎǝɹɟɟɟǝſ

15:19

I never remember, is 0 * inf mathematically defined? (I bet not)

Benjamin Gruenbaum

No, it's not.

There is a way to define it, but it's not how we typically define numbers.

ʎǝɹɟɟɟǝſ

But 0 * 0 is, right?

edition

maybe replicating neurons, or something, although maybe not being dedicated for RAM.

Benjamin Gruenbaum

@ʎǝɹɟɟɟǝſ Yes, that's just 0.

Alex M.

I think the only inf operations defined are

C + inf

inf + inf

inf - inf isn't

edition

15:20

although reliability would be a problem.

Cat Plus Plus

@ʎǝɹɟɟɟǝſ lol

Benjamin Gruenbaum

In typical college definition, you can't even write Infinity as a part of a calculation.

Alex M.

-inf + c is still -inf

Benjamin Gruenbaum

Infinity = Infinity for example is not defined.

Alex M.

or so I remember from high school

ʎǝɹɟɟɟǝſ

15:21

@CatPlusPlus Hey!

Cat Plus Plus

Did you know that

Benjamin Gruenbaum

You'd talk about limits, for example you can't write Infinity + 5, but you can say x + 5 as x approaches infinity.

Cat Plus Plus

0 * 1

is 0

ʎǝɹɟɟɟǝſ

Fuck you

Benjamin Gruenbaum

0 * anything is 0

edition

15:21

limits!

Benjamin Gruenbaum

Infinity is not (again, by regular definition) a number mathematically.

ʎǝɹɟɟɟǝſ

Except 0 * inf apparently

milleniumbug

The worst undefined symbol is 1^infinity

I can't explain it

Benjamin Gruenbaum

@ʎǝɹɟɟɟǝſ what does * Infinity even mean?

How would you even define that in actual math?

milleniumbug

Also the only one with a different operand than 0 or infinity

edition

15:22

numbers don't exist anyway.

so infinity makes sense

Benjamin Gruenbaum

0 is a number, Infinity is not a number by regular definition.

ʎǝɹɟɟɟǝſ

What's the regular definition of a number?

Benjamin Gruenbaum

Well, let's do natural numbers first, let's define natural numbers as such: 0 is a number, then for each number, if you add 1 to it you get a number.

Cat Plus Plus

"Not infinity"

Benjamin Gruenbaum

So 4 is a number since it's 0(+1)(+1)(+1)(+1)

ʎǝɹɟɟɟǝſ

15:24

Yes, I know about number sets

You can skip that

Benjamin Gruenbaum

Well, that's how you define numbers.

Cat Plus Plus

11

Q: 1 to the power of infinity, why is it indeterminate?

I've been taught that $1^\infty$ is undetermined case. Why is it so? Isn't $1*1*1...=1$ whatever times you would multiply it? So if you take a limit, say $\lim_{n\to\infty} 1^n$, doesn't it converge to 1? So why would the limit not exist?

Benjamin Gruenbaum

Infinity, does not meet this definition, you can't multiply and add stuff and suddenly get infinity.

You have to introduce a new operation called "limit" in order to get it.

Jon Clements

afternoon all

Benjamin Gruenbaum

Afternoon

Jon Clements

15:26

heya @Benjamin did your Python in 6 hours or something work out the other day?

edition

@JonClements morning

Benjamin Gruenbaum

@JonClements yes, it actually did :) We gave them really cool projects. They're not anywhere near Python experts now but they have a basic understanding of the language.

Nothing fancy, but enough to teach stuff using it like networking (which they do know)

Jon Clements

Excellent - what sort of thing did you go for in the end?

Benjamin Gruenbaum

Well, we gave them basic image processing tasks like converting an image to greyscale, we gave some of them client/server tasks and the ones that wanted to go to sleep got things that look simple but were pretty challenging to beginners

ʎǝɹɟɟɟǝſ

Why taking logarithm of 1^inf = 1 would yield 0 * inf = 0?

2

A: 1 to the power of infinity, why is it indeterminate?

There are many reasons. For example, let $1^\infty=1$. Taking logarithm, you have $\infty\cdot 0=0$. Similarly for other operations you will obtain some absurd.

Benjamin Gruenbaum

15:33

You can't just place infinity in an equation and expect things to work

ʎǝɹɟɟɟǝſ

So, outside of limits, where can "infinity" be used for?

Alex M.

jeffrey reminds me of a classmate back in high school when the prof asked him what he thinks infinity is

"a number that just doesn't end!"

R. Martinho Fernandes

@ʎǝɹɟɟɟǝſ log(a^b) = log(a)*b?

ʎǝɹɟɟɟǝſ

I also have an issue with 0.999... being 1, or with periodic rationals in general

R. Martinho Fernandes

And x=y => log(x) = log(y)

Benjamin Gruenbaum

15:34

@ʎǝɹɟɟɟǝſ absolutely nothing, you'd always use "x" and talk about "as x approaches infinity" which has a formal meaning if a limit exists.

@ʎǝɹɟɟɟǝſ well, the thing about 0.999... and 1 is pretty simple. If two numbers are differently, then clearly there must be a third number between them, right?

ʎǝɹɟɟɟǝſ

@BenjaminGruenbaum Yeah yeah, I know how to show that to be true.

I simply said I can't stomach it.

I know it makes sense

1/3 * 3 = 0.3333... * 3 = 0.9999...

1/3 * 3 = 1

@R.MartinhoFernandes I see

@R.MartinhoFernandes log base? 2?

Cat Plus Plus

Doesn't matter

R. Martinho Fernandes

Doesn't matter as long as the base is the same for all usages

ʎǝɹɟɟɟǝſ

Makes sense

I keep forgetting this stuff

How do you remember this

R. Martinho Fernandes

:)

Benjamin Gruenbaum

15:39

@ʎǝɹɟɟɟǝſ think about the "put a number between them" thing. Also - there are many representations for the same number, two shouldn't be hard to stomach :) For example 1/2 and 2/4 and 4/8 are all the same number

R. Martinho Fernandes

@Xeo solved the fucker

Xeo

gratz

ʎǝɹɟɟɟǝſ

@BenjaminGruenbaum Oh I'm fine with that.

Xeo

I know one ghostcube that has the linepattern drawn differently than the actual parts are cut

ʎǝɹɟɟɟǝſ

I'm still not fine with 0.999.... = 1 though. Can't explain it.

набиячлевэлиь

15:41

@ʎǝɹɟɟɟǝſ 1/3 * 3 = 3/3 = 1/1 = 1

bluefog

@ʎǝɹɟɟɟǝſ That is false

Alex M.

how exactly is 0.999... equal to 1?

ʎǝɹɟɟɟǝſ

5 mins ago, by ʎǝɹɟɟɟǝſ

1/3 * 3 = 0.3333... * 3 = 0.9999...

R. Martinho Fernandes

By virtue of being indistinguishable

Alex M.

I'm assuming you mean 0.(9)

Benjamin Gruenbaum

15:42

We show two numbers are different by showing a third number between them.

ʎǝɹɟɟɟǝſ

5 mins ago, by ʎǝɹɟɟɟǝſ

1/3 * 3 = 1

Benjamin Gruenbaum

In this case, you can't.

Alex M.

ah right you can't show that there's something between 0.(9) and 1

ʎǝɹɟɟɟǝſ

I can imagine the number between them.

Alex M.

I can't

Benjamin Gruenbaum

15:42

@ʎǝɹɟɟɟǝſ what is it?

ʎǝɹɟɟɟǝſ

It's 0.0000...1

R. Martinho Fernandes

That's not a real number.

Benjamin Gruenbaum

@ʎǝɹɟɟɟǝſ that number is smaller than any positive number right?

bluefog

@ʎǝɹɟɟɟǝſ if you could tell me where that 1 is you'd get a nobel

ʎǝɹɟɟɟǝſ

There's no correct representation of it that I know of

Benjamin Gruenbaum

15:43

That is, there is no positive number bigger than it

R. Martinho Fernandes

Well, it is a real number. It's zero.

Benjamin Gruenbaum

But, for a positive number x, we can always take x / 2 to be smaller then it - right?

R. Martinho Fernandes

But what you are looking for is not a real number.

Benjamin Gruenbaum

So 0.00000... 1 must not be a positive number, it's certainly not a negative one - so it must be zero.

ʎǝɹɟɟɟǝſ

It's lim (x -> inf) of (0.[x zeroes]1)

Benjamin Gruenbaum

15:44

4 lectures and you're good to go for life: youtube.com/watch?v=sqEyWLGvvdw

R. Martinho Fernandes

That's zero

Benjamin Gruenbaum

@ʎǝɹɟɟɟǝſ which is 0 :D

ʎǝɹɟɟɟǝſ

So / 2 that would be: lim (x -> inf) of (0.[x zeroes + 1]5)

Benjamin Gruenbaum

That's formally 1 / 10 ^ n as n approaches infinity, that's 0

Alex M.

btw a number of the form X.(Y)C doesn't make sense

Benjamin Gruenbaum

15:45

That's still 0

ʎǝɹɟɟɟǝſ

I'm using lim incorrectly

Benjamin Gruenbaum

You're using it fine, but both those limits are equal

ʎǝɹɟɟɟǝſ

I'm trying to express that there are n number of zeroes

Benjamin Gruenbaum

It is half of it, and both are zero, zero is half of zero

ʎǝɹɟɟɟǝſ

And n is infinity

Benjamin Gruenbaum

15:46

n approaches infinity

bluefog

no it approaches infinity

R. Martinho Fernandes

Yes. And when there is an infinite number of zero digits, the number is zero.

Deduplicator

@ʎǝɹɟɟɟǝſ 0.(9) = 0.(9) * 9 / 9 = (10 * 0.(9) - 0.(9)) / 9 = (9.(9) - 0.(9)) / 9 = 9 / 9 = 1

Alex M.

@ʎǝɹɟɟɟǝſ can you imagine your number and 0.(9) racing along a line forever

ʎǝɹɟɟɟǝſ

@R.MartinhoFernandes But right after that n, there's always another 1 there

Alex M.

15:46

and not one of them ever stopping for the other to be bigger?

since they're both racing infinitely

ʎǝɹɟɟɟǝſ

@AlexM. Yes, exactly

R. Martinho Fernandes

The limit is still zero.

Benjamin Gruenbaum

@ʎǝɹɟɟɟǝſ right, but we're talking about the limit, the limit is when there are "no other 1s there"

ʎǝɹɟɟɟǝſ

@R.MartinhoFernandes I know

Alex M.

so what's the matter in not being able to visualize why you can't show that there's something between 0.(9) and 1

R. Martinho Fernandes

15:47

Your number is not real.

ʎǝɹɟɟɟǝſ

No, forget the limit, take what Alex said

There's no way that I know of to mathematically express it. But I can imagine it.

Benjamin Gruenbaum

Right, if you take your number and 1 and race them forever no matter how much you go there will always be a difference between it and 1

No matter how big you take the number of zeros, there is always a bigger number of 0s

ʎǝɹɟɟɟǝſ

That's why the 1/3 * 3 thingy is what you should use against me in this argument

Benjamin Gruenbaum

But, this is exactly what limits do, limits are "what happens it we keep going on and on and on to infinity".

Alex M.

@ʎǝɹɟɟɟǝſ I'm having deja vu feelings from the last time you had a jeffrey moment

I think it was about cache localities

R. Martinho Fernandes

15:49

@ʎǝɹɟɟɟǝſ x in J such that x > 0.(9) and x < 1.

Benjamin Gruenbaum

@ʎǝɹɟɟɟǝſ no, because that's using incorrect math and does not give you any intuition, it's using the conclusion to prove what we're trying to show, what's there to say there is no number between 1/3 and 0.3333....

ʎǝɹɟɟɟǝſ

@AlexM. a what

R. Martinho Fernandes

There, I expressed it.

user1804599

this motherfucker github.com/reduceleft

Alex M.

you're essentially like "I know and I understand this but I'll just draw everyone into a discussion without aim"

ʎǝɹɟɟɟǝſ

15:49

And then you are going to claim that it's zero.

But that's not what I imagine it

R. Martinho Fernandes

No, it's not.

Benjamin Gruenbaum

I got 80 gh stars today. That's fun.

ʎǝɹɟɟɟǝſ

Oh, wait, it doesn't exist, is what you are going to say

R. Martinho Fernandes

Note how I carefully put it in a different set than the reals.

user1804599

@BenjaminGruenbaum Why?

R. Martinho Fernandes

15:50

It doesn't exist as much as √-1 doesn't.

ʎǝɹɟɟɟǝſ

@AlexM. Yeah, I do that sometimes, not now though.

Benjamin Gruenbaum

@elyse for github.com/benjamingr/PizzaHack

ʎǝɹɟɟɟǝſ

I'm just saying that if you want to show that 0.(9) = 1, you should use the 1/3 argument.

R. Martinho Fernandes

You just make new number sets.

ʎǝɹɟɟɟǝſ

Not the "there should be a difference between the two numbers" argument.

To convince me at least.

R. Martinho Fernandes

15:51

The difference here is that √-1 has more practical use.

Benjamin Gruenbaum

@AlexM. clearly, it is better to discuss booze and tits then have actual discussion about philosophy and math. We apologize.

user1804599

@BenjaminGruenbaum cool

user1804599

NEED MOAR JPEG

Alex M.

where did you get the booze and tits from

Benjamin Gruenbaum

15:52

@elyse haha. That's Hebrew by the way in case that wasn't obvious. We're teaching unpriviledged kids programming.

R. Martinho Fernandes

From the fridge, duh

ʎǝɹɟɟɟǝſ

I'm mostly interested in how tits are formed

user406009

.99999.... = 1, who could possible disagree?

Benjamin Gruenbaum

I'm teaching C++ next year, which will likely make the kids even less priviledged.

user406009

@BenjaminGruenbaum Why C++?

bluefog

15:53

1/3 can be perfectly represented only by 1/3 only

user1804599

@BenjaminGruenbaum Does the four-colour symbol also resemble a Hebrew symbol or is it just there as a separator?

Benjamin Gruenbaum

@Lalaland it's after they're learned C. The program has a systems programming bias I admit. Also, I did not get to make that choice.

@elyse yes, it represents the letter ש

copy

@BenjaminGruenbaum Especially if you keep spelling privileged wrong

user1804599

Amazing.

user406009

@BenjaminGruenbaum Hmm, that just seems like a poor choice for introductory programming.

Benjamin Gruenbaum

15:56

@copy I don't intend to apologize for my friends messing up my autocorrect :/

@Lalaland why would the language matter?

ThePhD

@Borgleader IT'S HERE!

user406009

C++ has a lot of garbage. It's a relatively complicated language.

Benjamin Gruenbaum

I don't think it's that complicated for day to day use.

ThePhD

THE TYRANNY IS OVER: 1920 x 1080 GLORIOUS RESOLUTION ON A THICK, JUICY MONITOR.

NYAAAAHAAAHAHAAAAAAA

NOW I CAN ... do homework in 1080p. :l

user406009

@ThePhD You got that one you were looking at before?

user406009

15:58

The next model of my monitor?

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