This supposition likewise can be used in math and science to test or prove ambiguous glitches in mathematical operations like the units of measurement, rules like division by zero, or the existence of non-existence numbers.
If division by zero is not conventionally defined, then the reciprocal of zero, which is its multiplicative inverse, is therefore undefined. This rule makes every number divided by zero undefined. So, x/0 is undefined, where x = n. However, according to Lawsin, this is incorrect. Any number divided by zero is actually mathematically defined but merely invalid as proven in the video clip. When numbers are subjected to mathematical operations approaching near the zero limits, all these numbers divided by themselves are all equal to one, and therefore 0/0 is obviously similarly equal to one.
This is also true with units of measurement. If a unit is divided by the same unit, the result should be unitless. However, to keep the integrity and presence of the unit, the unit must always carry a superscript represented by a degree symbol (^0). The symbol in the unit means it is equivalent to one, which also means the unit is still dimensionally measurable as long as the unit is raised to the power of zero. These are the two examples of the Lawsin Conjecture.
The existence of a non-existence number can be found in the book Originemology.
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