Mathematics is a fabricated tool used in the minds of humans to help measure and discover the components of nature. Mathematical equations and numbers are simply used to represent and measure components in space and time, such as dimensions, matter, and other constituents of creation. They in fact, help prove the existence of natural constituents.
Let’s take a stroll into mathematics and start by discussing the basic Cartesian plane; you know the x and y plane representing second dimensional space. Y represents length, 1 dimension, and X represents width, another single dimension, which creates a plane. The most basic equations or functions are based upon this simple, two dimensional plane.
One of the most essential understandings of mathematics concerning equations and variables, being a component of equations in which we will discuss soon, is if there are three variables in a equation, there needs to be three equations to get definite answers or solutions. In another example, let’s say you have three variables, but only two equations; you get parametric or incomplete answers or solutions.
If you have two variables, you are dealing with a plane or second dimensional space, so the answer to this system is where the graphs of two lines cross, presuming that they do cross. If they do not cross there is no solution. If you have three variables, then we are dealing with three dimensional space, so the answer to this system, presuming there is one, is the point at which three planes intersect because three dimensional space is composed of three, two dimensional planes. In the context of three dimensional space; the first plane, Y and X, Y represents height or depth, and X represents width; the second plane, Y and Z, Y represents height or depth, and Z represents length, and lastly, the third plane, X and Z, X represents width, and Z represents length. Therefore, all together you have three dimensions, Y, height or depth, Z, length, and X, width.
The answer to the third dimensional system, the point at which three planes intersect, two planes intersect in a line and the third plane intersects that line at a single point. Now that dimensions are explained, let’s take a look into philosophical enigmas concerning dimensional space and the variables that represent them, specifically enigmas concerning the fabrication of these concepts.
Is there a place in nature where the first dimension just exists and is isolated from the construction of space as an entity composed of three dimensions as a product of nature? In contemporary mathematics and human comprehension it seems that nature or reality is only composed of three dimensional space and the only actual mathematics that represents tangible reality are equations with three variables.
For example, in reality, two dimensions does not truly exist because objects that we may think of having two dimensions are an illusion, they really have three dimensions. Take a piece of paper for example, there is the length represented by Z, the width represented by X, and then there is actually the height or depth represented by Y, which could be measured in micrometers.
So in fact, two dimensions is an illusion and does not truly exist in nature. An example of comparisons between circles and spheres or squares and cubes gives a better representation of this. The first dimension cannot be isolated, because it does not truly exist in nature, only three dimensional space exists in nature, the first dimension as a single entity is a fabricated, arbitrary concept that only exists in our minds. It is not real. The first dimension cannot exist even though we may think of the first dimension as length or width; however, there cannot be a width without length, or length without width. For example, imagine drawing a line, let’s say the line is X representing width, this line is a fabrication representing one dimension. In reality, the line has length, width, and depth, just measured in micrometers or even nanometers. This same example applies to a line drawn to represent length; in reality it too does have a length, width, and depth.
Both of these lines when representing single dimensions, length and width, to create a second dimension are just fabrications used to measure nature, but in reality they are confined to the same laws of nature being three dimensions. These dimensional fabrications are very similar to other mathematical fabrications such as numbers and the philosophical enigmas concerning numbers when measuring matter or distance, which will be discussed soon. See the chapter on the hierarchy of matter for reiteration on the true construction of nature.
Now that we have established that variables are simply representations of dimensions that help define space, let’s discuss them further. When discussing variables we know that one variable represents the first dimension, two variables represents the second dimension, three variables represents the third dimension, four variables represents the fourth dimension, five variables represents the fifth dimension, and infinite variables represents infinite dimensions. Now we are able to distinguish what aspects of mathematics are simply fabrications that do not actually exist, but are used to discover actual nature, and mathematical concepts that actually exist, because they represent true reality.
We now know that the first and second dimensions are fabrications, yet the third dimension is a true representation of nature as we know it. The fourth dimension is often referred to as time, which actually exists in nature depending on the context; this will be discussed in the section concerning time. However, in the context of mathematics time is not represented by four variables, the four variables in this context is concerning the construction of space. So from four variables to infinite variables, these mathematical concepts could simply be fabrications of our minds that do not exist in actual reality, but then again, they could be discovered to actually exist in nature based upon the truth on how space is truly constructed to create an aspect of nature or existence.
Let’s move unto numbers and how they are fabrications that do not truly exist in nature. Have you ever tasted the number two? Have you ever felt the number two? Have you ever heard the number two? We have not, because numbers, such as two, to infinity, do not actually exist in nature.
This is why when discussing philosophical enigmas such as traveling from point A to point B seems impossible, because there are an infinite amount of points in between point A and point B and that you will never reach point B because one has to stop at an infinite amount of points, but in fact this is just a problem that can never truly be solved because it is based upon mathematical fabrications that do not truly exist.
In fact, in true reality, one can travel the distance from point A to point B. This same example applies to the mathematical fabrications of numbers and units used to measure components of matter and nature, from subatomic particles being composed of fundamental particles (particles not being composed of anything but them self) and non-fundamental particles (particles being composed of other constituents) in terms of angstroms, to measuring the universe on a grand scale in terms of light years or astronomical units.
In the context of fabricated numbers it may seem that the composition of nature and matter is infinite in both directions of its composition, but in fact nature and matter may have an ending point. Thus, the composition of matter from negative infinity to positive infinity (see hierarchy of matter for further details about describing the composition of matter to the negative and positive infinity) may in fact be finite. In other words, the composition of the smaller components of nature has an ending point to the building blocks of nature, and the composition of nature on the grander scale, such as the entire universe has some sort of boundary.
However, maybe the composition of nature could be infinite from the negative infinity to the positive infinity and the fabrication of numbers and their property of infinity could be a true representation on the actual construction of nature.
In conclusion, we can see how mathematical concepts in a number of different ways are fabricated, arbitrary concepts that are intangible and do not exist in true reality. We can see how they can discover the truth to nature, about its form, composition, and even behavior, but we can also see how it can distort the true reality of nature.
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