The expression "0 is not defined" typically refers to situations such as division by zero, where the mathematical operation does not yield a meaningful result. For example, dividing a number by zero does not produce a unique quotient, as there is no number that, when multiplied by zero, gives a non-zero number. Therefore, in certain contexts, like calculus and algebra, division by zero is considered undefined to maintain mathematical consistency.
If defined, they are inverse operations. However, multiplication and division is a somewhat flawed example because division by 0 is not defined. So, if you have a number x, then x*0 = 0 but 0/0 is not x: it is not defined.
Yes: 02 = 0 x 0 = 0
-17
You can, but the result would be 0/0 which is not defined.
0 divided by 0 is not defined.
2-dimensional Cartesian space is naturally split into four quadrants, with one quadrant defined by x>0, y>0; one defined by x<0, y>0; one defined by x<0, y<0; and, one defined by x>0, y<0.
0
It is not defined.
Anything out of 0 is not defined.
No. For example, division by 0 is not defined.
If defined, they are inverse operations. However, multiplication and division is a somewhat flawed example because division by 0 is not defined. So, if you have a number x, then x*0 = 0 but 0/0 is not x: it is not defined.
Yes: 02 = 0 x 0 = 0
Division by zero is not defined.
0, because division by 0 is not defined.
4
-17
Not defined