Neu (⟁) is a number which defines dividing any number by 0.
Axiom[]
Anything multiplied by 0 is always 0; Thus, there can't be a number that is not 0 when multiplied by 0. Neu basically ignores this axiom, because if we take x as a variable, we can divide x by 0 and that would be equal to Neu times x.
Issue[]
Because of Neu being defined as 1/0, that would mean that Neu multiplied by 0 would be 1. But that would also mean 0 divided by 0 is Neu multiplied by 0, which is 1. So basically Neu proves that 0 divided by 0 equals 1. Although 0 times 0 is 0, so 0 divided by 0 should be 0, but because any number (that's not Neu) multiplied by 0 is always 0, so practically 0 divided by 0 can be any number. This issue can be easily ignored. Since there is no known definition to 0 divided by 0, Neu adds a new definition for 0 divided by 0 which is 1.
Size[]
Since 1 divided by 0 is Neu multiplied by 1, that would also mean that 1 divided by 0 is equal to Neu itself. Because of the surprising definition of Neu, it is practically immeasurable (hence Neu being classless) because there are no other numbers known to be greater than 0 when multiplied by 0.