if both have the same sign the answer is positive, if they have different signs the answer is negative.
They are not the same!The set of integers is closed under multiplication but not under division.Multiplication is commutative, division is not.Multiplication is associative, division is not.
I am not sure there are any fundamental operations of integers. The fundamental operations of arithmetic are addition, subtraction, multiplication and division. However, the set of integers is not closed with respect to division: that is, the division of one integer by another does not necessarily result in an integer.
The set of integers is not closed under division. While adding, subtracting, and multiplying integers always result in another integer, dividing two integers can produce a non-integer (for example, (1 \div 2 = 0.5)). Thus, division of integers does not guarantee that the result remains within the set of integers.
Yes, it can!
A fraction is a division expression where both dividend and divisor are integers.
They are not the same!The set of integers is closed under multiplication but not under division.Multiplication is commutative, division is not.Multiplication is associative, division is not.
No, they are not.
I am not sure there are any fundamental operations of integers. The fundamental operations of arithmetic are addition, subtraction, multiplication and division. However, the set of integers is not closed with respect to division: that is, the division of one integer by another does not necessarily result in an integer.
The set of integers is not closed under division. While adding, subtracting, and multiplying integers always result in another integer, dividing two integers can produce a non-integer (for example, (1 \div 2 = 0.5)). Thus, division of integers does not guarantee that the result remains within the set of integers.
Yes, it can!
The set of rational numbers is closed under division, the set of integers is not.
They are not the same. You can multiply by zero but division by zero is not defined.
A fraction is a division expression where both dividend and divisor are integers.
Integers are closed under division I think o.o. It's either counting numbers, integers or whole numbers . I cant remember :/
Whole numbers subtraction: YesDivision integers: No.
The set of nonzero integers is not closed under division. This is because dividing one nonzero integer by another can result in a non-integer. For example, ( 1 \div 2 = 0.5 ), which is not an integer. Therefore, the result of the division is not guaranteed to be a member of the set of nonzero integers.
Remainder is a concept appropriate to division of integers. The question is concerned neither with integers nor with division, and so is a nonsense question.