additive inverse

The additive inverse is usually found using a translation table.

K can even be a rig, but then there is no additive inverse.

That is to say, each is the additive inverse of its own second derivative.

For example, since addition of real numbers is associative, each real number has a unique additive inverse.

This is known as its additive inverse.

A4 asserts each integer has an additive inverse.

Hence subtraction can be defined as the addition of the additive inverse:

Zero is the additive inverse of itself.

Conversely, additive inverse can be thought of as subtraction from zero:

The additive identity and the additive inverse are unique.

Subtraction is the same as the addition except that the additive inverse of the second operand needs to be computed first.

The additive inverse of a convex function is a concave function.

Now, we add each F(x) along with its additive inverse, so that the resulting quantity is equal:

Additive inverse is closely related to subtraction, which can be viewed as an addition of the opposite:

This additive inverse does always exist.

In such a ring, multiplication is commutative and every element is its own additive inverse.

The concept of evenness or oddness is only defined for functions whose domain and range both have an additive inverse.

Subtraction can be thought of as a kind of addition-that is, the addition of an additive inverse.

That is, the negation of a positive number is the additive inverse of the number.

Every real number has an additive inverse (i.e. an inverse with respect to addition) given by .

In mathematics, it is often useful to view or even define subtraction as a kind of addition, the addition of the additive inverse.

In abstract algebra, a semiring is an algebraic structure similar to a ring, but without the requirement that each element must have an additive inverse.

In particular, a semiadditive category is additive if and only if every morphism has an additive inverse.

The negation (or additive inverse) of an integer is obtained by reversing the order of the pair:

In keeping with the characteristic being 2, the nimber additive inverse of the ordinal α is α itself.