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Deepest Mandelbrot fractal zoom as of yet (video zooming to x2.1x10^275) Options
 
embracethevoid
#1 Posted : 3/28/2013 11:29:33 PM

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Found this pretty cool. My mind is blasted at one question. Do these fractals exist outside of the perception of some entity that can enumerate them? You can zoom in and in and there will always be a perfectly precise boundary to the Mandelbrot zones.


Let's suppose they are stand-alone, eternal and unchanging. Why then is their structure like THAT as opposed to some other configuration?

But then suppose the Mandelbrot fractal didn't exist until the universe became sufficiently complex to create some creature capable of enumerating it, let's say a single celled organism (keep the anthropocentrism outta this Razz). Where is our single celled organism deriving this Mandelbrot pattern from? It's drinking water from a tap, so to speak, but where the hell did that water come from?!?


Either way I look at it, I only come to one conclusion. There is something eternal, unchanging, which bestows all mathematical objects with their structure. I only have one word for it, which is 'Nature', literally the inherent nature of a thing. But it always comes down to that age old question - Why are things the way they are, and not anything else? Why is 1=1 and 1+1=2 a truthful and eternal construct, what makes blueness blue and green-ness green?


Above all, where my mind is blasted is that these things seem to be unchanging objects in a reality which is always in a perpetual state of change. Other than mathematical objects, are there any other kind of "unchangeables" like so? These things appear perfect, whole, complete. Yet clearly looking around I abide in a universe which is only rendered complete, perfect, whole by its process of continous adapting unto itself.
 

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ntwhtyouknw
#2 Posted : 3/28/2013 11:50:25 PM

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Why is blueness blue and greeness green? Within the visible spectrum of light their are different wavelengths, plants for instance do not need the wavelengths of greenlight so it refracts back out and makes plants apear green. Same is true for all color, scientificly speaking. But then again even scientists have to admit beyond that we aint got an f'n clue so they are actually just as stumped as any of us.
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embracethevoid
#3 Posted : 3/29/2013 2:17:52 AM

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Mulling this over, I get the impression that this eternal structure, an aspect of which is shown in the video in the OP, it permeates everything. It is the fabric of existence itself from which all shapes and forms derive their appearance in the here and now.


How could one brick know Mandelbrot's fractal without every other brick in the wall also knowing it?

For instance when you have something like a car crash, we can model that with things like Finite Element Analysis. Lots of wacky mathematics in the movements right there. But isn't it evident that the mathematics is already "there" and things only make it apparent? For a car to accelerate, a whole range of mathematical values have to change. But not only that, all the formulas which control these values, they stay constant. But the values of the formulae which are indirectly derived from them, they change. All at once, 'instantaneously'. If X changes, then X^2 changes, sin(X) changes, etc. But something does not change, can anybody actually explain what THAT is?


Science can't explain anything here because it only creates even more words to explain the existing ones. What's green? A wavelength of light somewhere around 530nm. What's 530? What's nano? What's meter? Wavelength? Light? Etc. It doesn't get to IT. Science draws circles around IT then people declare that they have fully described IT. All you've managed to do is to throw a tiny fishing net in the ocean in the hopes of catching frickin Cthulhu himself.
 
cyb
#4 Posted : 3/29/2013 8:00:56 AM

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embracethevoid wrote:
All you've managed to do is to throw a tiny fishing net in the ocean in the hopes of catching frickin Cthulhu himself.


So Cthulhu is the 'IT' we're after... Very happy

Great vid...I'm off to dig out my Lovecraft papers and do some re-reads...

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Global
#5 Posted : 3/29/2013 11:13:13 AM

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embracethevoid wrote:

For instance when you have something like a car crash, we can model that with things like Finite Element Analysis. Lots of wacky mathematics in the movements right there. But isn't it evident that the mathematics is already "there" and things only make it apparent? For a car to accelerate, a whole range of mathematical values have to change. But not only that, all the formulas which control these values, they stay constant. But the values of the formulae which are indirectly derived from them, they change. All at once, 'instantaneously'. If X changes, then X^2 changes, sin(X) changes, etc. But something does not change, can anybody actually explain what THAT is?



I think what you might be getting at is that we do not have to be consciously aware of the mathematics taking place for them to be taking place no? There's plenty of mathematics going on inside your body, organ systems, organs, cells, organelles, atoms, subatomic particles, etc...happening all the time that we remain completely unaware of (for the most part). Just because information is not revealed to consciousness, doesn't exclude its immanence. When driving a car, the driver is for the most part unaware of how the car works, but those who engineered and created it have a better (yet perhaps imperfect) idea of how the mathematics come together to make that car run in the way it does.

Color perception is linked to both cultural conditioning as well as genetics. You may find this Radiolab podcast on color (particularly blue) to be of interest.

Why Isn't the Sky Blue?
"Science without religion is lame. Religion without science is blind" - Albert Einstein

"The Mighty One appears, the horizon shines. Atum appears on the smell of his censing, the Sunshine- god has risen in the sky, the Mansion of the pyramidion is in joy and all its inmates are assembled, a voice calls out within the shrine, shouting reverberates around the Netherworld." - Egyptian Book of the Dead

"Man fears time, but time fears the Pyramids" - 9th century Arab proverb
 
primordium
#6 Posted : 3/29/2013 2:56:01 PM

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embracethevoid wrote:
But it always comes down to that age old question - Why are things the way they are, and not anything else? Why is 1=1 and 1+1=2 a truthful and eternal construct, what makes blueness blue and green-ness green?


These are exactly the questions that drive the Pythagorean/Platonist tradition in Western philosophy. In fact, they are the reason I am a theist.

The philosopher Eric Steinhart has succinctly addressed the "platonic ontology" of fellow philosopher John Leslie. I fully agree with Leslie's view (at least the views expressed below).

Eric Steinhart wrote:
Over the course of his writings, Leslie develops a Platonic ontology. As a Platonist, Leslie posits a background of logically possible abstract objects. This is the Abstract Background (see Leslie, 1970: secs. 6 & 7; 1978: 182, 191; 1993b: 72-73; 1997). The Indispensability Argument can be used to justify this Background (Colyvan, 2001). The Abstract Background exists with an absolute logical necessity: “an infinite realm of logical possibilities has of course to exist, eternally and unconditionally” (2012: 1).

The Abstract Background is ontologically plentiful. Following traditional Platonism, it is reasonable to say that the Background contains at least three types of abstract objects. The first type includes all Platonic ideals like truth, beauty, and goodness. The second type includes all consistently definable mathematical objects. For example, the Background includes the maximal iterative hierarchy of pure sets. And, if there are mathematical objects that are not sets, then it contains those objects too. The third type of abstract object includes all forms. Forms are represented by statements in logical languages. Among forms there are the propositions (forms with zero open places); the properties (forms with one open place); and the relations (forms with many open places).

[...]

Among the necessarily existing abstract objects, there are objective ideals like truth, beauty, and goodness. Plato said that goodness is creatively effective: an abstract goodness causes This Pattern rather than That Pattern to be instantiated.


In other words, The Good exists; not only that, goodness goods, thereby creating this world rather than other possible worlds (described in clearer argumentation by Gottfried Wilhelm Leibniz).

embracethevoid wrote:
Above all, where my mind is blasted is that these things seem to be unchanging objects in a reality which is always in a perpetual state of change. Other than mathematical objects, are there any other kind of "unchangeables" like so? These things appear perfect, whole, complete. Yet clearly looking around I abide in a universe which is only rendered complete, perfect, whole by its process of continous adapting unto itself.


One speculation, from cosmologist Max Tegmark, is that all unchanging mathematical structures appear as changing physical worlds from the inside.

Max Tegmark wrote:
To understand this, it helps to distinguish between two ways of viewing our external physical reality. One is the outside overview of a physicist studying its mathematical structure, like a bird surveying a landscape from high above; the other is the inside view of an observer living in the world described by the structure, like a frog living in the landscape surveyed by the bird.

One issue in relating these two perspectives involves time. A mathematical structure is by definition an abstract, immutable entity existing outside of space and time. If the history of our universe were a movie, the structure would correspond not to a single frame but to the entire DVD. So from the bird’s perspective, trajectories of objects moving in four-dimensional space-time resemble a tangle of spaghetti. Where the frog sees something moving with constant velocity, the bird sees a straight strand of uncooked spaghetti. Where the frog sees the moon orbit the Earth, the bird sees two intertwined spaghetti strands. To the frog, the world is described by Newton’s laws of motion and gravitation. To the bird, the world is the geometry of the pasta.
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InMotion
#7 Posted : 3/29/2013 9:12:19 PM
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Interesting but off-topic: Universe likely is not a fractal new study suggests: http://www.newscientist....e-is-a-big-smoothie.html


"Let's suppose they are stand-alone, eternal and unchanging. Why then is their structure like THAT as opposed to some other configuration?" This is a fallacy in and of itself, known as "an irrelevant conclusion". Not unlike saying, "Let's suppose that roads are pink, who made them that way?". Sure it may be fun to think about, but using deductive reasoning we can derive no meaning from such a discussion.

So I will proceed to address the questions prior to this conclusion...

Do mathematical objects exist in observable reality(EXCLUDING OBSERVING THE MATH)? No.
Do mathematical models exist in observable reality? No.

1 = 1 because someone said 1 represented a single entity in numerology, the first whole number. On another planet the symbol 1 could mean soup, or 4 here on earth. Blue is blue and green is green because people said blue was blue and green was green and that is how it is taught. Just like math. Math unfortunately though a very logical and useful thought construct cannot prove its own existence by its own means. No system I no of can.

So mathematicians use "axioms", things we believe to be true, and that's what all of this is based on. In math they call them "self evident truths", but ultimately they are not and lapse in on each other in funny ways. In fact an axiom is about as logical as saying "you can do this, because it's just how it works".

Want to watch me break math in a fun way?

Let infinity be defined by the summation of 1+1 a number of N+1 times.(Aka add 1+1 forever)

1/3 = 0.3333(repitan)
1/3 * 3 = 1
therefore 0.333(repitan) * 3 = 0.999(repitan)
.: 0.999 = 1

Thus, infinite is the summation of 0.999(repitan)+0.999(repitan) forever.

When we do this summation we find that with an infinite number of digits infinity(as I defined it) is equal to infinity - 1.

Infinity = Infinity - 1
Therefor by substitution
Infinity = (Infinity - 1) - 1)
Infinity = (Infinity - 1) - 1) - 1)
...(repeat this operation an infinite number of times as I have defined infinity)
Infinity = 0.

Back on topic:
Ultimately I find the conclusion incredibly weak. The conclusion that it is logical that mathematical objects are infinite and existed before a mind created them. That is the same as saying a word existed before a mind/body created it.

A word obviously being a linguistic element represented either phonetically or written. It is quite obvious that these words are created by people. As words change meanings, and languages die, and are born every day(so many kids and films create fictional languages IE: such as game of thrones).

Sure if I tell you that a rose smells delightful. Then someone else says that the meal you prepared was delightful there is some wonder and maybe initially it may seem that there is endless applicability to such a word and it's potential implications. Yes there may actually even be an infinite number of things to call delightful or not delightful while the word delightful still holds its meaning. Though this gives us no insight into the origin of the thought construct that is, "delight".

Fractals appear endless because that is what they are by their mathematical description. Just as the variable X can be any number. It can be put into any equation and mean absolutely anything. Does this mean that the variable X existed at the birth of the universe? Or even better yet, the notion or word "infinite"? Are these too eternal and spawned at a so called begining of the universe or single celled organism? Most certainly not. It is easy for one to confuse the extents at which mathematics and sciences play a role in reality, as well as philosophy. I really recommend reading at least the preface in Hegels' Phenenomology of the Spirit to potentially scrub these notions clean.

 
InMotion
#8 Posted : 3/29/2013 9:25:34 PM
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Ironically the op says to keep the anthropocentrism out of the discussion. Although I would state that claiming a human made thought construct is eternal and was birthed before humanity, is by definition anthropocentrism. That's all I have to offer for the moment.
 
primordium
#9 Posted : 3/29/2013 10:18:10 PM

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InMotion wrote:
1 = 1 because someone said 1 represented a single entity in numerology, the first whole number. On another planet the symbol 1 could mean soup, or 4 here on earth. Blue is blue and green is green because people said blue was blue and green was green and that is how it is taught. Just like math. Math unfortunately though a very logical and useful thought construct cannot prove its own existence by its own means. No system I no of can.


So, Fermat's Last Theorem is only true on our planet?

InMotion wrote:
So mathematicians use "axioms", things we believe to be true, and that's what all of this is based on. In math they call them "self evident truths", but ultimately they are not and lapse in on each other in funny ways. In fact an axiom is about as logical as saying "you can do this, because it's just how it works".


Using axioms, from set theory or other possible base, doesn't necessarily prove that truths derived therefrom are inherently arbitrary or fictional.

InMotion wrote:
Want to watch me break math in a fun way?


I'm not sure you "broke" infinity, any more than Cantor's transfinite numbers "broke" infinity. It's analogous to claiming that the Monty Hall problem "breaks" probability.

InMotion wrote:
Back on topic:
Ultimately I find the conclusion incredibly weak. The conclusion that it is logical that mathematical objects are infinite and existed before a mind created them. That is the same as saying a word existed before a mind/body created it.


Words can denote truly existing physical objects, right? Likewise, numbers can denote truly existing abstract objects.
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InMotion
#10 Posted : 3/29/2013 10:52:57 PM
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"Fermats Last Theorem" only exists as a thought construct. It may exist on other planets if mathematics is done in a similar fashion there. Probably proved in another way, but I won't attempt to calculate the likelihood of such an event, as that seems perilous. Perhaps an alien race might not even percieve euclidean space and have an entirely different system for dealing with what they observe. Or maybe aliens think counting is bad and just live in Zen, who knows?

No axioms don't prove math as fictional. They do however show deductive reasoning's extent in mathematics. They also define a limit to the tool. Axioms are one of mathematics greatest strengths. We just have to accept these axioms because they cannot be described from the ground up. However axioms are also why math is hindered from a logical perspective.

I only intended to show that there are funny loop holes in math that do not make sense in reality. Depending on how we set the rules. Also I wanted to 'break' an algebraic axiom for kicks. The well known 0.999(repitan) = 1 thing, really bugs some people who cling to math too tightly.

Words can denote things that exist, sure. Are they the thing that exists? No! Just as a mathematical model can mimic an observable phenomenon. Is the model the phenomenon? Most certainly not! Every mathematician will tell you their proofs are not "reality" nor are the concepts. They are tools, made in ones mind, to try to explain our surroundings or potential surroundings(at least in an applied perspective). Much like a description of an event.

I would invite one to read a passage from hegel's phenemenology of the spirit because it is so beautifully expressed here:
Quote:
Φ 42. As to mathematical truths, we should be still less inclined to consider anyone a geometer who had got Euclid’s theorems by heart (auswendig) without knowing the proofs, without, if we may say so by way of contrast, getting them into his head (inwendig). Similarly, if anyone came to know by measuring many right-angled triangles that their sides are related in the way everybody knows, we should regard knowledge so obtained as unsatisfactory. All the same, while proof is essential in the case of mathematical knowledge, it still does not have the significance and nature of being a moment in the result itself; the proof is over when we get the result, and has disappeared. Qua result the theorem is, no doubt, one that is seen to be true. But this eventuality has nothing to do with its content, but only with its relation to the knowing subject. The process of mathematical proof does not belong to the object; it is a function that takes place outside the matter in hand. Thus, the nature of a right-angled triangle does not break itself up into factors in the manner set forth in the mathematical construction which is required to prove the proposition expressing the relation of its parts. The entire process of producing the result is an affair of knowledge which takes its own way of going about it. In philosophical knowledge, too, the way existence, qua existence, comes about (Werden) is different from that whereby the essence or inner nature of the fact comes into being. But philosophical knowledge, for one thing, contains both, while mathematical knowledge sets forth merely the way an existence comes about, i.e. the way the nature of the fact gets to be in the sphere of knowledge as such. For another thing, too, philosophical knowledge unites both these particular movements. The inward rising into being, the process of substance, is an unbroken transition into outwardness, into existence or being for another; and conversely, the coming of existence into being is withdrawal into the inner essence. The movement is the twofold process in which the whole comes to be, and is such that each at the same time posits the other, and each on that account has in it both as its two aspects. Together they make the whole, through their resolving each other, and making themselves into moments of the whole.

Φ 43. In mathematical knowledge the insight required is an external function so far as the subject-matter dealt with is concerned. It follows that the actual fact is thereby altered. The means taken, construction and proof, contain, no doubt, true propositions; but all the same we are bound to say that the content is false. The triangle in the above example is taken to pieces, and its parts made into other figures to which the construction in the triangle gives rise. It is only at the end that we find again reinstated the triangle we are really concerned with; it was lost sight of in the course of the construction, and was present merely in fragments, that belonged to other wholes. Thus we find negativity of content coming in here too, a negativity which would have to be called falsity, just as much as in the case of the movement of the notion where thoughts that are taken to be fixed pass away and disappear.

Φ 44. The real defect of this kind of knowledge, however, affects its process of knowing as much as its material. As to that process, in the first place we do not see any necessity in the construction. The necessity does not arise from the nature of the theorem: it is imposed; and the injunction to draw just these lines, an infinite number of others being equally possible, is blindly acquiesced in, without our knowing anything further, except that, as we fondly believe, this will serve our purpose in producing the proof. Later on this design then comes out too, and is therefore merely external in character, just because it is only after the proof is found that it comes to be known. In the same way, again, the proof takes a direction that begins anywhere we like, without our knowing as yet what relation this beginning has to the result to be brought out. In its course, it takes up certain specific elements and relations and lets others alone, without its being directly obvious what necessity there is in the matter. An external purpose controls this process.

Φ 45. The evidence peculiar to this defective way of knowing – an evidence on the strength of which mathematics plumes itself and proudly struts before philosophy – rests solely on the poverty of its purpose and the defectiveness of its material, and is on that account of a kind that philosophy must scorn to have anything to do with. Its purpose or principle is quantity. This is precisely the relationship that is non-essential, alien to the character of the notion. The process of knowledge goes on, therefore, on the surface, does not affect the concrete fact itself, does not touch its inner nature or Notion, and is hence not a conceptual way of comprehending. The material which provides mathematics with these welcome treasures of truth consists of space and numerical units (das Eins). Space is that kind of existence wherein the concrete notion inscribes the diversity it contains, as in an empty, lifeless element in which its differences likewise subsist in passive, lifeless form. What is concretely actual is not something spatial, such as is treated of in mathematics. With unrealities like the things mathematics takes account of, neither concrete sensuous perception nor philosophy has anything to do. In an unreal element of that sort we find, then, only unreal truth, fixed lifeless propositions. We can call a halt at any of them; the next begins of itself de novo, without the first having led up to the one that follows, and without any necessary connection having in this way arisen from the nature of the subject-matter itself. So, too – and herein consists the formal character of mathematical evidence because of that principle and the element where it applies, knowledge advances along the lines of bare equality, of abstract identity. For what is lifeless, not being self-moved, does not bring about distinction within its essential nature; does not attain to essential opposition or unlikeness; and hence involves no transition of one opposite element into its other, no qualitative, immanent movement, no self-movement, It is quantity, a form of difference that does not touch the essential nature, which alone mathematics deals with. It abstracts from the fact that it is the notion which separates space into its dimensions, and determines the connections between them and in them. It does not consider, for example, the relation of line to surface, and when it compares the diameter of a circle with its circumference, it runs up against their incommensurability, i.e. a relation in terms of the notion, an infinite element, that escapes mathematical determination.

Φ 46. Immanent or so-called pure mathematics, again, does not oppose time qua time to space, as a second subject-matter for consideration. Applied mathematics, no doubt, treats of time, as also of motion, and other concrete things as well; but it picks up from experience synthetic propositions – i.e. statements of their relations, which are determined by their conceptual nature – and merely applies its formulae to those propositions assumed to start with. That the so-called proofs of propositions like that concerning the equilibrium of the lever, the relation of space and time in gravitation, etc., which applied mathematics frequently gives, should be taken and given as proofs, is itself merely a proof of how great the need is for knowledge to have a process of proof, seeing that, even where proof is not to be had, knowledge yet puts a value on the mere semblance of it, and gets thereby a certain sense of satisfaction. A criticism of those proofs would be as instructive as it would be significant, if the criticism could strip mathematics of this artificial finery, and bring out its limitations, and thence show the necessity for another type of knowledge.

As to time, which, it is to be presumed, would, by way of the counterpart to space, constitute the object-matter of the other division of pure mathematics, this is the notion itself in the form of existence. The principle of quantity, of difference which is not determined by the notion, and the principle of equality, of abstract, lifeless unity, are incapable of dealing with that sheer restlessness of life and its absolute and inherent process of differentiation. It is therefore only in an arrested, paralysed form, only in the form of the quantitative unit, that this essentially negative activity becomes the second object-matter of this way of knowing, which, itself an external operation, degrades what is self-moving to the level of mere matter, in order thus to get an indifferent, external, lifeless content.
 
primordium
#11 Posted : 3/29/2013 11:13:12 PM

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InMotion wrote:
Every mathematician will tell you their proofs are not "reality" nor are the concepts. They are tools, made in ones mind, to try to explain our surroundings or potential surroundings(at least in an applied perspective). Much like a description of an event.


Untrue.

Gerald B. Folland wrote:
It is a truth universally acknowledged that almost all mathematicians are Platonists, at least when they are actually doing mathematics rather than philosophizing about it. As Hardy [8, §22] said, “I believe that mathematical reality lies outside us, that our function is to discover or observe it, and that the theorems which we prove, and which we describe grandiloquently as our ‘creations’, are simply the notes of our observations.”


Source: http://oz.berkeley.edu/u.../aldous/Blog/folland.pdf

Heck, one of the most significant mathematicians of the 20th century was a mathematical platonist: Kurt Gödel.
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InMotion
#12 Posted : 3/30/2013 12:17:32 AM
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A thought construct existing universally is possible. I think what happened here was I got so caught up in refuting the premises in the original post, that I didn't look for where the truth in the idea laid. I was confusing the existence of mathematical objects with the existence of mathematical concepts.

I can see that mathematics is a process of discovery using a certain hierarchy of knowledge. It is evident that these discoveries 'exist' in some sense prior to discovery. The connections would not have been made yet, however that doesn't mean the connections are not possible.

Was a lot of fun thinking about this Smile. Thanks for the thought inspiration primordium and other posters.
 
embracethevoid
#13 Posted : 3/30/2013 1:00:45 AM

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Some numbers are woven into the fabric of the universe for sure.

Fine structure constant. Mass ratios of all fundamental particles. All force:force strength ratios, etc. There are many dimensionless constants which are just there e.g. 1/137 (fine structure), golden ratio. All definite numbers.

Also, the total amount of information in the universe is a definite and fixed number moment by moment.
 
primordium
#14 Posted : 3/30/2013 6:06:50 PM

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InMotion wrote:
Was a lot of fun thinking about this Smile. Thanks for the thought inspiration primordium and other posters.


For sure!

Just so you know, you were arguing for nominalism. I don't think it holds up well, but some philosophers certainly do.
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#15 Posted : 4/8/2013 4:36:30 PM

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cyb wrote:
embracethevoid wrote:
All you've managed to do is to throw a tiny fishing net in the ocean in the hopes of catching frickin Cthulhu himself.


So Cthulhu is the 'IT' we're after... Very happy

Great vid...I'm off to dig out my Lovecraft papers and do some re-reads...

Thumbs up


You definitely DON'T want to catch Cthulhu. If you are fishing in waters where he might be found, you better turn around pronto and sail back to shore... and even then pray to all your gods that he doesn't follow you home.

Hehehehe.

"The most merciful thing in the world, I think, is the inability of the human mind to correlate all its contents... some day the piecing together of dissociated knowledge will open up such terrifying vistas of reality, and of our frightful position therein, that we shall either go mad from the revelation or flee from the light into the peace and safety of a new Dark Age."

— H.P. Lovecraft (The Call Of Cthulhu)
"Curiouser and curiouser..." ~ Alice

"Do not believe in anything simply because you have heard it. Do not believe in anything simply because it is spoken and rumored by many. Do not believe in anything simply because it is found written in your religious books. Do not believe in anything merely on the authority of your teachers and elders. Do not believe in traditions because they have been handed down for many generations. But after observation and analysis, when you find that anything agrees with reason and is conducive to the good and benefit of one and all, then accept it and live up to it." ~ Buddha
 
 
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