Post by Eugene 2.0 on Nov 30, 2021 23:29:15 GMT
• Do every thing have its identical twin? Do every property have the same in another thing? Do every relations can be repeated elsewhere?
• If not, some unique things or events exist. Unique things for properties, and unrepeatable events for relations.
• What about a couple of parallel lines? Why mathematicians doubted so often the fifth postulate of Euclid? But what if these parallel lines exist?
• If there's something unique exist, then it might be that this unique thing is a couple of the parallel lines. If that thing is unique, then there is one and only one couple of the parallel lines. Could it be?
• Mathematically it does not seem to be possible. Indeed, let's say there are no such: then no other lines cannot repeat them, in what connection each of those lines has a specific length between those two lines.
• Let's doubt the doubters of that firth postulate of Euclid, because in my humble opinion such parallel lines are not contradiction at all. What should we do?
• We can imagine a square with sides named relatively as a, b, c, and d. Sides a and c, b and d are the opposite sides.
• Then let's imagine that either a couple of a and c, or b and d are endless, or have the infinite length. Since those opposite sides are parallel, we've got a couple of the parallel lines.
• If such a square exist, then no else squares can be the such. Moreover, none of squares can have the infinite length opposite sides.
• A brief conclusion: if there's a couple of parallel lines, then there are infinite number of parallel lines. So, parallel lines cannot be unique. And if one example of the parallel lines is possible, then endless examples of such is also possible.
• The same is about any unique thing. If one unique thing exist, then there are infinite number of such uniqueness exist.
• The answer can be quite impressive: no unique things exist.
• If not, some unique things or events exist. Unique things for properties, and unrepeatable events for relations.
• What about a couple of parallel lines? Why mathematicians doubted so often the fifth postulate of Euclid? But what if these parallel lines exist?
• If there's something unique exist, then it might be that this unique thing is a couple of the parallel lines. If that thing is unique, then there is one and only one couple of the parallel lines. Could it be?
• Mathematically it does not seem to be possible. Indeed, let's say there are no such: then no other lines cannot repeat them, in what connection each of those lines has a specific length between those two lines.
• Let's doubt the doubters of that firth postulate of Euclid, because in my humble opinion such parallel lines are not contradiction at all. What should we do?
• We can imagine a square with sides named relatively as a, b, c, and d. Sides a and c, b and d are the opposite sides.
• Then let's imagine that either a couple of a and c, or b and d are endless, or have the infinite length. Since those opposite sides are parallel, we've got a couple of the parallel lines.
• If such a square exist, then no else squares can be the such. Moreover, none of squares can have the infinite length opposite sides.
• A brief conclusion: if there's a couple of parallel lines, then there are infinite number of parallel lines. So, parallel lines cannot be unique. And if one example of the parallel lines is possible, then endless examples of such is also possible.
• The same is about any unique thing. If one unique thing exist, then there are infinite number of such uniqueness exist.
• The answer can be quite impressive: no unique things exist.