By: Tsegazeab Beteselassie
If any of you guys reading this have read my post, "Is Infinity possible?", (if you want to read it, click here) you probably realize that the concept, "infinity" isn't possible. At least, in non-numerable terms. However, when your dealing with numbers, there actually may be more than one infinity. How? Let me explain.
If you want proof of the multiple infinites, we can easily resort to simple math to find the proof. Let's use multiplication as the proof. What is, infinity times two? The answer is, of course, infinity. But that infinity is different from the normal infinity. If the normal infinity is I, then infinity times two is 2I. But what is the difference between the two infinites? Well, since infinity goes on forever, and the casual theory is that infinity was always there. But that will mean that infinity times two and infinity is the same thing. And that will mean that it will break the math rule that multiplication is either getting bigger or smaller (0.5 times 2). Three times two isn't the same as three times three, or three times four. So we will have to revise our casual infinity theory.
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| Multiple infinities: This is the multiple infinity. Link: axiomamnesia.com |
In order to make the two theories cooperate, you have to revise one of them. Since the math theory cannot be changed, we will have to change the infinity theory. What can we change it to? Well, we can change it so that infinity, like the big bang, has a starting point, when it was 1, but also like a ray, so that it never has an end point. Then, you can say that I and 2I, (remember those?) are different. But there is a catch. That means that infinity plus one is also different from infinity. And infinity plus two, and so on. Not to mention infinity divided by two. And three. And four. So what does this mean?
It means that there is more than one infinity. There are multiple infinities.
Email me at: tsegazeab12@gmail.com, or, tsegazeab12@outlook.com. Thank you.
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