[Meta] Community assistance!

[Vidcom]

- How do you know so much?
- Why do you know so much?
- Are you in college?
- How are you the age that you are, and why are you the age that you are? (TeeHee)
- Why do I find your smartness so sexy? @Vidcom (Lel JK )
- Why am I asking the questions that I'm asking? o. O
- If you're 25 Years old, are you married? x3


hehe, most of these are jokes x3

I read a lot
Because
Not yet
Because I was born at a given time, answers both
Because of my dashing appeal
Because you have nothing better to do in this futile existence
I'm not really 25, I just make a point of not telling people my real age. Also, not married.

 

[Sketz]

Because you have nothing better to do in this futile existence

>.>

 

[Finn_Bueno_]

Did I seriously made a typo ? >,<
FORGIVE ME ALMIGHTY VIDCOM.
But yea, it's 9, 2 , 2.

 

[Sketz]

Did I seriously made a type ?

I think you did it again... *COUGH*


Did I seriously make a typo?*

 

[Finn_Bueno_]

I think you did it again... *COUGH*


Did I seriously make a typo?*

THAT WAS SPELLING CHECK CORRECTION THING. NOT MY FAULT. MUHAHAHAHAHAHA

 

[Sketz]

THAT WAS SPELLING CHECK CORRECTION THING. NOT MY FAULT. MUHAHAHAHAHAHA

TeeHee :3

 

[Sketz]

What happened 4.6 Billion Years Ago?

 

[Vidcom]

What happened 4.6 Billion Years Ago?

About that time, the Earth started to take shape, but I imagine a lot of other stuff was happening too

 

[Sketz]

About that time, the Earth started to take shape, but I imagine a lot of other stuff was happening too

Yep, that one waz Ez doe. Anyone could answer that with google x3

 

[Sketz]

1) Find the adjacency matrix A of the graph G
2) Find the matrix giving the number of 3 step walks in G.
3) Find the generating function for walks from point i to j.
4) Find the generating function for walks from points 1 to 3.
The adjacency matrix L encodes the graph. The entry Lij is equal to k if there are k connections between node i and j. Otherwise, the entry is zero. Problem 2 asks to find the matrix which encodes all possible paths of length 3.
Generating function. To a graph one can assign for pair of nodes i,j a series

, where an(ij)is the number of walks from i to j with n steps. Problem 3) asks for a formula for f(z) and in problem 4) an explicit expression in the case i=1,j=3.

I do not take any credit for anything in this post.

 

[Simplicitee]

1) Find the adjacency matrix A of the graph G
2) Find the matrix giving the number of 3 step walks in G.
3) Find the generating function for walks from point i to j.
4) Find the generating function for walks from points 1 to 3.
The adjacency matrix L encodes the graph. The entry Lij is equal to k if there are k connections between node i and j. Otherwise, the entry is zero. Problem 2 asks to find the matrix which encodes all possible paths of length 3.
Generating function. To a graph one can assign for pair of nodes i,j a series

, where an(ij)is the number of walks from i to j with n steps. Problem 3) asks for a formula for f(z) and in problem 4) an explicit expression in the case i=1,j=3.

I do not take any credit for anything in this post.

Squirrels. That's the answer.

 

[HydroMan]

1) Find the adjacency matrix A of the graph G
2) Find the matrix giving the number of 3 step walks in G.
3) Find the generating function for walks from point i to j.
4) Find the generating function for walks from points 1 to 3.
The adjacency matrix L encodes the graph. The entry Lij is equal to k if there are k connections between node i and j. Otherwise, the entry is zero. Problem 2 asks to find the matrix which encodes all possible paths of length 3.
Generating function. To a graph one can assign for pair of nodes i,j a series

, where an(ij)is the number of walks from i to j with n steps. Problem 3) asks for a formula for f(z) and in problem 4) an explicit expression in the case i=1,j=3.

I do not take any credit for anything in this post.

I smell something...like illuminatish '_'

 

[Loony]

How-to life?

 

[jedk1]

How-to life?