Normally most "mathematical discoveries" you make are already made.
I think I've actually found one but I have no idea what to do with it.
I have found a method to put a limit to infinitely large numbers. E.g. the limit of x as it goes to infinity for 2^x.
I'm obviously not going to convince you here that I can do this. I can generate it for most simple equations at this point.
I'll give you the limit for 2^x, that is, it's "chart" before it repeats itself on a greater infinitive manifold. It's -(4+log_e(5))(log_10(1/e)) or 2.436147931949026.
Again, I'm not going to convince you of the method that I used to get this number. I have to control that until I understand the implications of it. However you can use it as a special number to integrate other functions like Euler's constant e.
The most immediate applications of this would be to create an integral for the gamma function. Not sure what to do with that. Can anyone give me other equations to look at where this would be useful?
I think I've actually found one but I have no idea what to do with it.
I have found a method to put a limit to infinitely large numbers. E.g. the limit of x as it goes to infinity for 2^x.
I'm obviously not going to convince you here that I can do this. I can generate it for most simple equations at this point.
I'll give you the limit for 2^x, that is, it's "chart" before it repeats itself on a greater infinitive manifold. It's -(4+log_e(5))(log_10(1/e)) or 2.436147931949026.
Again, I'm not going to convince you of the method that I used to get this number. I have to control that until I understand the implications of it. However you can use it as a special number to integrate other functions like Euler's constant e.
The most immediate applications of this would be to create an integral for the gamma function. Not sure what to do with that. Can anyone give me other equations to look at where this would be useful?
