New ATOT game.

[Yax]

Alright, I'm bored so lets play a new game. I'll ask a question and if you are the first to answer it right, you get to ask one and so on.

First question:
What is the symbol for Pi? (You'll have to type in the symbol to win).

 

[Kalvin00]

~
||

 

[GasX]

~
II

 

[rh71]

π

😉 holy shiat it worked.

 

[Kalvin00]

.

 

[Yax]

Originally posted by: Kalvin00
~
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I don't know about that one.

 

[SackOfAllTrades]

Originally posted by: rh71
ð

😉 holy shiat it worked.

how did you do that?

 

[rh71]

Think HTML. Someone will have to ask a new question for me... I gots ta go pick up my 2 Philly CHeeeeeeeeeeeses.

 

[Amorphus]

?
check...

how about this one.... capital Pi...

nope. doesn't work.

next:
?

*edit*
NO. what the heck. I wonder what font face Fusetalk supports...

 

[Yax]

Originally posted by: rh71
ð

😉 holy shiat it worked.

Nice.

 

[sygyzy]

So unorganized. What is the next question?

 

[Yax]

Originally posted by: sygyzy
So unorganized. What is the next question?

From Amorphus:
how about this one.... capital Pi...

 

[Yax]

Alright, here's another question:

Which theorem is this (What's the name of the theorem?):

Let f(x) be a function and a,b,c be real numbers such that a < c < b. Suppose the following conditions hold true:

A. f(x) is differentiable on (a,b)

B. f(x) is continuous on [a,b]

Then there is at least one number c such that (b-a)f'(c) = f(b)-f(a).

 

[fs5]

Originally posted by: cheapbidder01
Alright, here's another question:

Which theorem is this (What's the name of the theorem?):

Let f(x) be a function and a,b,c be real numbers such that a < c < b. Suppose the following conditions hold true:

A. f(x) is differentiable on (a,b)

B. f(x) is continuous on [a,b]

Then there is at least one number c such that (b-a)f'(c) = f(b)-f(a).

is this a homework thread in disguise?
&pi;

 

[rival]

this game sucks

 

[rh71]

A slice of philly cheese to whomever could tell me the code for: ¬

 

[Yax]

Originally posted by: fivespeed5

Originally posted by: cheapbidder01
Alright, here's another question:

Which theorem is this (What's the name of the theorem?):

Let f(x) be a function and a,b,c be real numbers such that a < c < b. Suppose the following conditions hold true:

A. f(x) is differentiable on (a,b)

B. f(x) is continuous on [a,b]

Then there is at least one number c such that (b-a)f'(c) = f(b)-f(a).

is this a homework thread in disguise?
&eth;

You're too late on the Pi. This is an easy one. Answer it and give us a harder question already.

 

[Syringer]

That's weird, it comes up as PI in the post, but not in the quotes..

 

[rh71]

Originally posted by: Syringer
That's weird, it comes up as PI in the post, but not in the quotes..

I went back to edit it and it turned out like that. So I had to edit the edit in my original post to get it like pi again. &not;

 

[Yax]

Originally posted by: cheapbidder01

Originally posted by: fivespeed5

Originally posted by: cheapbidder01
Alright, here's another question:

Which theorem is this (What's the name of the theorem?):

Let f(x) be a function and a,b,c be real numbers such that a < c < b. Suppose the following conditions hold true:

A. f(x) is differentiable on (a,b)

B. f(x) is continuous on [a,b]

Then there is at least one number c such that (b-a)f'(c) = f(b)-f(a).

is this a homework thread in disguise?
&eth;

You're too late on the Pi. This is an easy one. Answer it and give us a harder question already.

Guess that's too hard for ATOT'rs. The answer is: Mean Value Theorem

Here's an easier one: What's the name of the big red dog in the kids cartoon "... The Big Red Dog" ?

 

[InverseOfNeo]

Originally posted by: cheapbidder01

Originally posted by: cheapbidder01

Originally posted by: fivespeed5

Originally posted by: cheapbidder01
Alright, here's another question:

Which theorem is this (What's the name of the theorem?):

Let f(x) be a function and a,b,c be real numbers such that a < c < b. Suppose the following conditions hold true:

A. f(x) is differentiable on (a,b)

B. f(x) is continuous on [a,b]

Then there is at least one number c such that (b-a)f'(c) = f(b)-f(a).

is this a homework thread in disguise?
&eth;

You're too late on the Pi. This is an easy one. Answer it and give us a harder question already.

Guess that's too hard for ATOT'rs. The answer is: Mean Value Theorem

Here's an easier one: What's the name of the big red dog in the kids cartoon "... The Big Red Dog" ?

CLIFFORD!

 

[Yax]

Originally posted by: InverseOfNeo

Originally posted by: cheapbidder01

Originally posted by: cheapbidder01

Originally posted by: fivespeed5

Originally posted by: cheapbidder01
Alright, here's another question:

Which theorem is this (What's the name of the theorem?):

Let f(x) be a function and a,b,c be real numbers such that a < c < b. Suppose the following conditions hold true:

A. f(x) is differentiable on (a,b)

B. f(x) is continuous on [a,b]

Then there is at least one number c such that (b-a)f'(c) = f(b)-f(a).

is this a homework thread in disguise?
&eth;

You're too late on the Pi. This is an easy one. Answer it and give us a harder question already.

Guess that's too hard for ATOT'rs. The answer is: Mean Value Theorem

Here's an easier one: What's the name of the big red dog in the kids cartoon "... The Big Red Dog" ?

CLIFFORD!

You got it! So ask us a question already?

 

[Zee]

what was chandler bing's job before he went into advertising?

 

[MikeMike]

¬

alt + 0172

§

now tell me that one, and YOU get the slice of cheese

MIKE

 

[jst0ney]

What rhymes with orange?