Logic versus Analogic
Posted: Tue Nov 04, 2025 10:46 am
If one wants a clear and phenomenal way of distinguishing the difference between our two methods of processing information afforded by our Grammar Matrix, Common Grammar, Arithmetic, Algebra and Geometry, it is this. Logic is not symmetrical while Geometry is. Let me explain; there are many applications for the idea of the binary pair of symmetrical and non-symmetrical, I am going to try and explain one of them.
Common Grammar, Arithmetic, and Algebra, we can write the information, but it is not symmetrical, i.e., I can write cat. But, I cannot, by any method get grammar to produce a cat, this is true of Arithmetic and Algebra
In geometry, an analogic, I can write a figure and use the figure to write the equations to it. Or, I can write the equation, and the equation will write the figure, thus geometry is, in its application as a grammar, symmetrical. The reason for this, is geometry is a pure binary system of grammar. In geometry we place a one-to-one correspondence between the two parts of speech, the elements of grammar, and the grammar itself. Not so, in logic.
Thus, of all the members of our Grammar Matrix, as Plato and other ancient philosophers claimed, Geometry, alone, can be used to prove any line of reasoning and it can provide a perceptible of any line of reasoning. If you are correct in writing geometry in either form, the result can produce its correlative.
This may help you understand why, the puzzle about the Mark of the Beast, put in many metaphors of the Bible, is so important. Geometry gives us a working method of proof, or judgment in a perceptible manner.
In geometry, we can learn judgment, or again, how to buy and sell behavior in a just manner.
Common Grammar, Arithmetic, and Algebra, we can write the information, but it is not symmetrical, i.e., I can write cat. But, I cannot, by any method get grammar to produce a cat, this is true of Arithmetic and Algebra
In geometry, an analogic, I can write a figure and use the figure to write the equations to it. Or, I can write the equation, and the equation will write the figure, thus geometry is, in its application as a grammar, symmetrical. The reason for this, is geometry is a pure binary system of grammar. In geometry we place a one-to-one correspondence between the two parts of speech, the elements of grammar, and the grammar itself. Not so, in logic.
Thus, of all the members of our Grammar Matrix, as Plato and other ancient philosophers claimed, Geometry, alone, can be used to prove any line of reasoning and it can provide a perceptible of any line of reasoning. If you are correct in writing geometry in either form, the result can produce its correlative.
This may help you understand why, the puzzle about the Mark of the Beast, put in many metaphors of the Bible, is so important. Geometry gives us a working method of proof, or judgment in a perceptible manner.
In geometry, we can learn judgment, or again, how to buy and sell behavior in a just manner.