No, it is an operation, not an element.
There is and there can be no answer to the question about the origins of addition (and subtraction) in classical, modern nor intuitionistic mathematics. This is because 'addition' itself as a quality does not play any role in addition of things in mathematics. Things are brought together with space which makes the bringing together and inside which addition itself resides left out completely. And so you add one orange to another oranges to get two oranges without knowing what makes it possible. This problem is solved in transfigural mathematics in which one thing is a flow in the other. There you can see that addition itself is a number, a number that flows in things than flow in it. The origins of addition and subtraction are shown to be space itself in transfigural mathematics.
Addition.
Addition is the aggregation or augmentation of elements so that a smaller set becomes a larger set. It seeks to combine two or more smaller quantities in order to obtain a single larger quantity called the sum or total.
The 4 fundamental operations in mathematics are: addition, subtraction, division and multiplication
johann widman
Parentheses, Exponentials, Multiplication, and. Addition.
Addition is a common function.
Euclid's elements are a set of 13 books on mathematics written by the Greek mathematician Euclid around 2,300 years ago.
a set having no elements, or only zeros as elements.
The term "commutative" in mathematics refers to operations that satisfy the property of moving elements back and forth without affecting the result. For example, in addition, 2 + 3 = 3 + 2 because addition is commutative.
addition, subtraction, multiplication, and division.
Subtraction is the inverse of addition. It involves the removing or taking away of elements so that a larger set becomes a smaller set. It seeks to find the difference between two quantities.