Kenosymplirostic numbers
So, basically. I am now introducing a new number system called kenosymplirostic numbers.It is a type of number that you get when dividing by 0.So, what does kenosymplirostic mean?The name comes from two Greek words, ”keno” meaning ”gap” and ”sympliroste” meaning ”fill”.These numbers fill the gap that was left open, the gap people thought will never be closed.
Here is how it works:
The value of the numerator is the coefficient of ”kenosym unit” k.
So, what about 0/0?
The thing is, it will be 0. Why? Because 0*k(the kenosym unit) is still 0 by definition.
And now, we talk about its place in the complex plane, or with the addition ofkenosyymplirostic numbers, the complex space.It will go through the complex plane where it will meet in 0, the origin of real, imaginary andkenosymplirostic numbers.
ADDITION AND SUBTRACTION
So, let’s say we have:
It will be equal to:
Which will be
This means that subtraction is just the same, as we treat 0 as a normal number.
MULTIPLICATION
So, let’s say we have:
That would mean 3/0 * 5/0 which will be 15/0 or 15k.(K IS NOT TREATED AS A VARIABLE)Kenosymplirostic numbers cannot be divided since it will always equal to 0 per the propertiesof dividing fractions.
EXPONENT
The kenosym unit k acts like the real number 1, where k to the power of any number n is k.kenosym numbers with coefficients will just raise the coefficient to that power and justcopy the kenosym unit k.
RULES OF COEFFICIENTS
Only integers coefficients are allowed since there cant be a fourth dimension inthe complex space and to avoiid many numbers having the same kenosym.
Axioms:Addition:a+b=b+a (Commutativity)
a+(b+c)=(a+b)+c (Associativity)
a+0=a (Identity element exists)
a+(âa)=0 (Inverse exists)
Multiplication:
ab=ba (Commutativity)
a(bc)=(ab)c (Associativity)
a*1=a (Identity element exists)
Distributive Property:
a(b+c)=ab+acShoutouts:Herve Arki from the Mathematics G+ community for bringing up an issue. :)
As of now, there are some paradoxes that might arise, but I will resolve all once I gainmore knowledge.Also, if someone would help suggest to me a better kenosym unit, You can comment belowthis article.