Well I gotta tell ya, some of these personal icons are awesome. Jinn Fizz and Stupendous Man are two of my favorites. I'm interested in the meaning behind them. To some it just looks cool, to some there may be some history. Also, I think I know why BoXXi's is a box, but I don't know why he's BoXXi. What makes Corky_O Corky? Why does butch have a 123 and a motorcycle? What's a Jafo? Why did sbgFX kill the Spyder?

So if you got a minute, tell us why you chose your nickname and what, if anything, your icon represents.

I won't go first this time. Someone else.

Comments (Page 2)
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on Jan 22, 2005
Well I'm Half Native American and my middle name is Lynx, What i do for a living (professional Airbrushing, Art & Graphics Design), we ended up calling 'the Den, Hense-forth "Lynx's Den" I know, boring, but thats all i got for you.....LOL
on Jan 22, 2005
way back when; I was into doing graffiti and need a original name. I simply mixed together letters that i liked and had a moderate amount of skill using together. I stuck with it,only because it is original. although I havent even thought about graffiti for many years. I'ue used the name since 1997-98 I believe.


my avatar should be my car... another hobby aside from lurking on WC is drag racing.
on Jan 22, 2005
My best friend in high school called me goober coz I liked to joke and act crazy in class,just added the bean dont know y? 28 is my birthday. my avatar Zim because hes defiant dont take no crap,like when I was a kid growing up in the projects didnt take no crap. Sound stupid oh well!
on Jan 22, 2005

on Jan 22, 2005
Those are all my BoXXi icons, and even a BoXXi WB skin. the name comes from a company I used to own, called BoXXi Flight Cases.
on Jan 22, 2005
my nick came from when i played that Counter-Strike game and all i had was a 166mhz computer and so until i got a new computer (and i guess even after some) i caught bullets in the game really well and i really liked the sound of it, but as i surf the net its not as originial as i once believed oh well... the avatar is a really simple graphic of my middle initials: A.M.A put together back while i was daydreaming in middle school and ive hung onto it as kinda a logo for myself
on Jan 22, 2005
As far as my nick:



And as for "0197" those were the last 4 numbers of my first cell phone.

What can I say? I'm a bicycle nut.
on Jan 22, 2005
If you can't quess why I'm called what I am then you can just go.....fish. Besides how many times must we go through all this....why there must be a 10001 threads dealing with peoples nicks and such ... why I never....never mind.
on Jan 22, 2005

Do I have to do this again? Oh well, you asked for it

Fuzzy logic is a superset of conventional (Boolean) logic that has been
extended to handle the concept of partial truth -- truth values between
"completely true" and "completely false".  It was introduced by Dr. Lotfi
Zadeh of UC/Berkeley in the 1960's as a means to model the uncertainty
of natural language. (Note: Lotfi, not Lofti, is the correct spelling
of his name.)

Zadeh says that rather than regarding fuzzy theory as a single theory, we
should regard the process of ``fuzzification'' as a methodology to
generalize ANY specific theory from a crisp (discrete) to a continuous
(fuzzy) form (see "extension principle" in [2]). Thus recently researchers
have also introduced "fuzzy calculus", "fuzzy differential equations",
and so on (see [7]).

Fuzzy Subsets:

Just as there is a strong relationship between Boolean logic and the
concept of a subset, there is a similar strong relationship between fuzzy
logic and fuzzy subset theory.

In classical set theory, a subset U of a set S can be defined as a
mapping from the elements of S to the elements of the set {0, 1},

   U: S --> {0, 1}

This mapping may be represented as a set of ordered pairs, with exactly
one ordered pair present for each element of S. The first element of the
ordered pair is an element of the set S, and the second element is an
element of the set {0, 1}.  The value zero is used to represent
non-membership, and the value one is used to represent membership.  The
truth or falsity of the statement

    x is in U

is determined by finding the ordered pair whose first element is x.  The
statement is true if the second element of the ordered pair is 1, and the
statement is false if it is 0.

Similarly, a fuzzy subset F of a set S can be defined as a set of ordered
pairs, each with the first element from S, and the second element from
the interval [0,1], with exactly one ordered pair present for each
element of S. This defines a mapping between elements of the set S and
values in the interval [0,1].  The value zero is used to represent
complete non-membership, the value one is used to represent complete
membership, and values in between are used to represent intermediate
DEGREES OF MEMBERSHIP.  The set S is referred to as the UNIVERSE OF
DISCOURSE for the fuzzy subset F.  Frequently, the mapping is described
as a function, the MEMBERSHIP FUNCTION of F. The degree to which the
statement

    x is in F

is true is determined by finding the ordered pair whose first element is
x.  The DEGREE OF TRUTH of the statement is the second element of the
ordered pair.

In practice, the terms "membership function" and fuzzy subset get used
interchangeably.

That's a lot of mathematical baggage, so here's an example.  Let's
talk about people and "tallness".  In this case the set S (the
universe of discourse) is the set of people.  Let's define a fuzzy
subset TALL, which will answer the question "to what degree is person
x tall?" Zadeh describes TALL as a LINGUISTIC VARIABLE, which
represents our cognitive category of "tallness". To each person in the
universe of discourse, we have to assign a degree of membership in the
fuzzy subset TALL.  The easiest way to do this is with a membership
function based on the person's height.

    tall(x) = { 0,                     if height(x) < 5 ft.,
                (height(x)-5ft.)/2ft., if 5 ft. <= height (x) <= 7 ft.,
                1,                     if height(x) > 7 ft. }

A graph of this looks like:

1.0 +                   +-------------------
    |                  /
    |                 /
0.5 +                /
    |               /
    |              /
0.0 +-------------+-----+-------------------
                  |     |
                 5.0   7.0

                height, ft. ->

Given this definition, here are some example values:

Person    Height    degree of tallness
--------------------------------------
Billy     3' 2"     0.00 [I think]
Yoke      5' 5"     0.21
Drew      5' 9"     0.38
Erik      5' 10"    0.42
Mark      6' 1"     0.54
Kareem    7' 2"     1.00 [depends on who you ask]

Expressions like "A is X" can be interpreted as degrees of truth,
e.g., "Drew is TALL" = 0.38.

Note: Membership functions used in most applications almost never have as
simple a shape as tall(x). At minimum, they tend to be triangles pointing
up, and they can be much more complex than that.  Also, the discussion
characterizes membership functions as if they always are based on a
single criterion, but this isn't always the case, although it is quite
common.  One could, for example, want to have the membership function for
TALL depend on both a person's height and their age (he's tall for his
age).  This is perfectly legitimate, and occasionally used in practice.
It's referred to as a two-dimensional membership function, or a "fuzzy
relation".  It's also possible to have even more criteria, or to have the
membership function depend on elements from two completely different
universes of discourse.

Logic Operations:

Now that we know what a statement like "X is LOW" means in fuzzy logic,
how do we interpret a statement like

    X is LOW and Y is HIGH or (not Z is MEDIUM)

The standard definitions in fuzzy logic are:

    truth (not x)   = 1.0 - truth (x)
    truth (x and y) = minimum (truth(x), truth(y))
    truth (x or y)  = maximum (truth(x), truth(y))

Some researchers in fuzzy logic have explored the use of other
interpretations of the AND and OR operations, but the definition for the
NOT operation seems to be safe.

Note that if you plug just the values zero and one into these
definitions, you get the same truth tables as you would expect from
conventional Boolean logic. This is known as the EXTENSION PRINCIPLE,
which states that the classical results of Boolean logic are recovered
from fuzzy logic operations when all fuzzy membership grades are
restricted to the traditional set {0, 1}. This effectively establishes
fuzzy subsets and logic as a true generalization of classical set theory
and logic. In fact, by this reasoning all crisp (traditional) subsets ARE
fuzzy subsets of this very special type; and there is no conflict between
fuzzy and crisp methods.

Some examples -- assume the same definition of TALL as above, and in addition,
assume that we have a fuzzy subset OLD defined by the membership function:

    old (x) = { 0,                      if age(x) < 18 yr.
                (age(x)-18 yr.)/42 yr., if 18 yr. <= age(x) <= 60 yr.
                1,                      if age(x) > 60 yr. }

And for compactness, let

    a = X is TALL and X is OLD
    b = X is TALL or X is OLD
    c = not (X is TALL)

Then we can compute the following values.

height  age     X is TALL       X is OLD        a       b       c
------------------------------------------------------------------------
3' 2"   65      0.00            1.00            0.00    1.00    1.00
5' 5"   30      0.21            0.29            0.21    0.29    0.79
5' 9"   27      0.38            0.21            0.21    0.38    0.62
5' 10"  32      0.42            0.33            0.33    0.42    0.58
6' 1"   31      0.54            0.31            0.31    0.54    0.46
7' 2"   45      1.00            0.64            0.64    1.00    0.00
3' 4"   4       0.00            0.00            0.00    0.00    1.00

For those of you who only grok the metric system, here's a dandy
little conversion table:

  Feet+Inches = Meters
  --------------------
    3'   2"     0.9652
    3'   4"     1.0160
    5'   5"     1.6510
    5'   9"     1.7526
    5'  10"     1.7780
    6'   1"     1.8542
    7'   2"     2.1844

So there you have it. And as for the icon, a logical choice

on Jan 22, 2005
Essencay = my initials SNK. Avatar is a pic of my best hound Margaret "Queen Maggie May". She's a 80lb dobie & hound mix rescued from the streets of Manchester that had 101 bad habits, including sending one of my other hounds to the vets regularly for stitches. She just needed some hard lovin' and understanding to become the great dog she is today.
on Jan 22, 2005
...meh ..
on Jan 22, 2005
his spider is still there
on Jan 22, 2005
My motorcyle is a 2002 Harley Davidson Night Train http://www.geocities.com/nighttrainfxstb2002/

Avatar is a Happycat I pulled off the web somewhere. Cracks me up every time.
on Jan 22, 2005
I'm a Civil Engineer, specializing in Land Development (site planning, stormwater, roads, utilities, etc.) therfore a Land Tech. My main hobby has been fishin the coastal flats near my home on the Atlantic Ocean so I added the @ - @LanTec However the new site has a problem with non alphanumeric characters so I've settled for LanTec
on Jan 22, 2005
Well, boring one here, but I guess I'll tell it. RPGuere is my first initial, middle initial and last name. My name is unique enough that it's never taken so I always use it for nicknames. "Guere" is french for war. The icon is self explainitory.

I wanted to use the name "MiNdCRiME" but it was not available. That is from the amazing Queensryche album "Operation Mindcrime".
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