They are bot whole numbers and, if not 0, they form a pair of additive inverses.
Apart from zero (which is its own opposite), the opposites of whole numbers are also whole numbers. You have the set of whole numbers which is also known as the set of integers.
On a number line, zero is positioned at the center, with positive numbers to the right and negative numbers to the left. The concept of an opposite number means that when you add a number and its opposite, the result is zero. Since zero is neither positive nor negative, its opposite is itself; thus, adding zero to zero results in zero. This visually illustrates that zero is its own opposite on the number line.
A whole number is a non-negative integer that includes zero and all positive integers, such as 0, 1, 2, and so on. Between -0.5 and 0.9, the only whole number is 0. The opposite of 0 is also 0, as it remains the same when negated.
Zero is a natural number.
A decimal is a number out of a whole number that isn't zero or a fraction.
Apart from zero (which is its own opposite), the opposites of whole numbers are also whole numbers. You have the set of whole numbers which is also known as the set of integers.
Zero does not have an opposite * * * * * While it is true that zero has no multiplicative opposite (or inverse), it certainly has an additive inverse, and that is also zero, since 0 + 0 = 0
If zero is added to a whole number the answer would be the whole number because zero is the same as nothing
if the opposite you are saying is the inverse, then the answer is no.
What exactly do you mean when you say "the opposite of a whole number" . . .
A number and its opposite,which add to zero.
Apart from zero (which is its own opposite), the opposites of whole numbers are also whole numbers. You have the set of whole numbers which is also known as the set of integers.
Zero is a natural number.
Zero is both.
A decimal is a number out of a whole number that isn't zero or a fraction.
The opposite of zero is zero itself. This is because zero is a unique number that represents the absence of value, and when you consider its opposite, it remains unchanged. Therefore, the statement holds true: the opposite of zero is always zero.
The additive opposite is itself and its multiplicative opposite is not defined.