hint Augustus De Morgan

Hahaha yeah, I remember doing this

Maybe too much of a hint.

Maybe -_-

Indeed

A ∨ B = ¬(¬A ∧ ¬B)

Maybe?

Correct

Yeah

These things are easy to prove by manually checking all the values for A and B by the way

yay! I'm smarter than a 5th grader

Now go ahead and create your precious True and False

:)

Can I have one of them first?

@Benjamin Do we get XOR?

Of course not :)

Damn you

XOR would make it so easy

@AmaanCheval If you build it first

Oh, wait. That was probably your point

Wait a minute, what are you guys actually trying to do?

@Zirak You're basically creating a contradiction (something that is always false for any assignment) and a tautology (something that is always true, for every assignment)

@OctavianDamiean Fun, if you want to do the whole thing it's actually free to do, nand2tetris.org/01.php . Chapter 3 is an ALU and chapter 5 is an entire CPU iirc.

Ah!

Oh cool.

4 and 6 are creating assembly language that compiles to the CPU you built. Chapter 6-8 are creating a stack based virtual machine, 9 is tetris. 10-12 is implementing a compiler that compiles a Java like language to the VM you created (which compiles to assembly that runs on the CPU you built), fun stuff.

I looked at NAND2Tetris when I was in 9th grade, I think. It was disappointing that I didn't understand anything at all

@AmaanCheval Nah.

@AmaanCheval if you have any questions you can ask me, I tool it a while ago.

Let's focus on creating True and False for now though :)

Thanks! I might give it another go now

Yeah

I can't think of a way

I keep getting T = A ∧ A

But that doesn't make any sense

But that's wrong

@Zirak A ∧ A = A , evaluate it :)

A && A is simply A

Keep trying, it takes a while to figure out :)

I need to sleep

Damn you guys

T = A → A ∧ A

Better?

A || !B

When did you create → and not tell me?

No, nevermind

Damn it's long ago, but wasn't it something like T = A ∨ 1?

You can't have 1, smartass

@OctavianDamiean One isn't a thing (unless you tell me how you make it)

:/

Also, no spoilers, if you have an answer that works, say so but don't spoil

It's pretty easy to verify, you try to assign T to A and see if the result is T, then assign F and see if the result is still T

A → B = (A ∧ B) ∨ (A ∧ ¬B) ∨ (¬A ∧ ¬B)

Happy!?

Yeah. It's coming up with it

@Zirak In that case your solution A → A works (If A is true it's true, if A is false it's still true)

hm, guys, I'm having a hard time following what you want to do, especially since you're using unknown symbols. Quick recap?

Is there a solution without that?

But...but... :(

(well, not unknown symbols, but it's been a long time since I haven't seen them)

There must be

Damn logic

I said you're right

...I'm right?

Although A → B can also be written as ¬B ∨ A (de morgan that to get the only case that fails)

@BenjaminGruenbaum Sure, 1 = T = Vin <= 0.8V; 0 = F = Vin >= 2,4V in TTL. :D

Yeah your A → B is correct and A → A works

huzzah!

Then again A ∨ ¬A also works (Just read it as "either A or its opposite")

I was so close

Shit

That was dumb

Now create false without using true :)

That's what I had at first, but it didn't look...declarative enough

I said A || !B XD

A && !A

Yep

We can simply not the above expression

Without using true

It's the same thing as Amaan's (De-Morgan to the rescue)

Create Xor

Nice

I'm enjoying this

Studying at 4:44am

Oh man, not spoiling it is tough.

I keep circling back to defining it as T's antonym. Stop it brain.

I've done XOR, so it'd be spoiling it even though I don't remember now so I'd have to come up with it again

nand2tetris.org/lectures/PDF/lecture%2000%20introduction.pdf

comic sans ms?

After that (xor), to build a computer you pretty much only need multiplexer and de-multiplexer (select one of two bits based on a third bit, and the reverse) based on those you can easily define addition (adders) and continue from that onwards. It's all in the book and the course and is pretty fun

I'm off to bed. You're a good teacher, @Benjamin

:)

...that doesn't sound right.

nand2tetris.org/team.php

That pretty much covers the practical side, that's how you build a computer pretty much (in theory).

Mark Armbrust is a nerd. Confirmed.

From the theoretical debate (about what logic is ) I think the most important thing to take is really → not only is it fundamental it's also the basis of all proof, it's important to understand

@FlorianMargaine Noam Nisan taught me some classes, he's a pretty bad ass programmer, when he teaches Java he constantly has to stop himself from saying how stuff you can't do in Java is possible in Scheme and Python

Yea, however there's an extra step to take with adders. Most of the time you first come up with half adders, then expand to full adders from there.

XOR wasn't so bad A XOR B = (A ∧ ¬B) ∨ (¬A ∧ B)

Sounds about right :)

nods

F = A XOR A

Also works :)

\o/

I think another declarative solution might be A → ¬A "A implies that A is false"

Also, random fact, XOR is sometimes also called, anti-valence and XNOR is called equivalence.

At least that's what they taught me.

Damn it, I knew I should have notd it...

A → B ∧ A → B is a fun way to define equivalence

Two things that imply each other (Also, like Octavian said, that's "not xor")

heh

I think next time we might talk about another approach at 'computing'

The theoretical side is very interesting, but it's very hard to really discuss much further , it's more reading an exercise

Thanks, this was fun

(The blog I linked you to is good)

I'll try and give it a read

This is so much more awesome and productive than our usual discussions, like IDE vs. text editor.

Now with some foundation

We should do that more often. :)

Good luck :) If you have any questions feel free to ask.

Next time we can discuss computability, like, what a language is, what a DFA is (regular languages vs. languages that are not regular), and maybe turing machines. That sounds like fun :)

Can someone ping me when that happens? I'd like to at least read the transcript for that

@OctavianDamiean These sort of discussions require a higher degree a lower degree of outsiders than we usually have.

I suppose you're right.

I did "construction of the number system" here once (maybe with twiz?) to prove a point to andrewjackson (I don't even remember his alias today)

Oh right, Shea

Do you maybe have an exercise sheet or some more definition problems like these? I'll have some dead time tomorrow (today?) and this sounds like a nice way to fill it

Oh andrewjackson turned into Shea? totally not referring to Pokemon

@Zirak You should checkout the Coursera course on that topic.

Offline time

@Zirak nand2tetris.org , project 1 through 3 is full of these, you build an actual arithmetical logical unit

But I will

class.coursera.org/intrologic/lecture/preview

You can watch the lectures when you have time to.

@Octavian You took the same class?

Yea.

I didn't have the time to finish it though. :(

I didn't take it all the way (as I generally tend to do), but it was pretty awesome

I liked the tools they offered

( chat.stackoverflow.com/transcript/message/7626538#7626538 formal construction of numeral system btw, might have errors there)

They should totally teach that topic in secondary school in my opinion. Logic that is.

@OctavianDamiean They do in university math, it's considerably harder to grasp than most stuff you study in high school math.

Then again, limits are pretty mind-blowing too

Because it's more abstract?

Well, they could develop a very abstracted version.

@Zirak Yeah, people have a hard time dealing with abstract mathematical concepts, stuff like ∃x ∈ ℕ x>1 → x > x+2

True!

gist.github.com/Zirak/5609568 for a recap

Also, Chrome shouldn't have dropped MathML support.

It's a shame.

4x = 4 → 16*x^2 = 16 → x^2 = 1 → x = ±1

I just started with 4x=4 and ended up with the fact x might be -1, does that all add up?

When raising to the square, you also took into account (-4)(-4), which is the case for x = -1

The sign was lost

I'm allowed to raise to the square though right? I mean x=y → f(x) = f(y) for every function (and in particular squaring (f(x) = x^2) in this case)

Yeah, you're just creating two separate equation paths

(That's actually a part of how functions are defined, a function is a matching between two sets A and B where every element from A is matched to exactly one element from B)

So does it all add up? Is that statement true? I mean, I started with 4x=4 and ended up with x = -1 as valid, isn't that a problem?

Don't you have to define limits for that?

What do you mean? I started with x=1 and ended up with x=+-1 , isn't that a problem?

It is.

Let's give it another 5 minutes of thought shall we :) ?

Oh wait.

Give everybody a chance to think

No, it's not

Why?

You still have to take into account the origin

What do you mean?

x = 1 and x = -1 are possible answers to be confirmed

Again, the statement is 4x = 4 → 16*x^2 = 16 → x^2 = 1 → x = ±1

I'm pretty sure I didn't do anything illegal

You didn't, you simply also arrived to the result of a different, similar equation

However, there's still 4x = 4

So there is no problem with 4x = 4 → 16*x^2 = 16 → x^2 = 1 → x = ±1 ?

I mean, I started with 4x=4 and I showed that x=-1, didn't I?

I'd better say it as x ∈ ±1

You concluded from x=1 that (x=1 or x=-1)

You showed the possibility of x = -1

Yeah, but didn't I show that x=-1 is a possible outcome too? I mean, isn't x=-1 a solution?

(Consider what → means again)

It is a solution, but to what question? Not to this one

:)

All the above says is that if x is 1 then x might be -1. It's still true for any x

The direction of what you're showing is another pitfall, a lot of students start with an equation and then solve it reaching something true. For example, I ask on their homework to show that n^2 > 2n and they show that 1>0 . I know that 1>0 is true but all they show is that (n^2 > 2n) → (1>0) when they were asked to show the other direction, that is, something true implies what they were asked to show.

Isn't n^2 >= 2n, when 2 >= n >= 0?

Assume n is bigger than 1000 :) I was just making a point

hehe, yeah

It's a common 'gotcha' (starting with the bigger equation and simplifying it to something we know it true, rather than the other way around)

4x = 4 → 16*x^2 = 16 → x^2 = 1 → x = ±1 is still a tautology since if x is 1 it's true and if x is not 1 (for example x=-1) the left part is 'false' so we don't care about anything on the right side of the first →

That was a better phrasing of what I tried to blurb above