Q: What is the addition of integers?

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addition and subtract in integers

negetive integers are not closed under addition but positive integers are.

Addition and multiplication are operations on integers that are commutative.

Addition and subtraction are inverse functions.

yes

Yes it is : a + b = b + a for all integers a and b. In fact , if an operation is called addition you can bet that it is commutative. It would be perverse to call an non-commutative operation addition.

Add two positive integers and you ALWAYS have a positive integers. The positive integers are closed under addition.

a math guy

Yes it is.

Addition, subtraction and multiplication.

The numbers are not closed under addition because whole numbers, even integers, and natural numbers are closed.

The set of integers is closed with respect to multiplication and with respect to addition.

The set of integers is closed under addition so that if x and y are integers, then x + y is an integer.Addition of integers is commutative, that is x + y = y + xAddition of integers is associative, that is (x + y) + z = x + (y + z) and so, without ambiguity, either can be written as x + y + z.The same three rules apply to addition of rational numbers.

The set of integers is closed under addition so that if x and y are integers, then x + y is an integer.Addition of integers is commutative, that is x + y = y + xAddition of integers is associative, that is (x + y) + z = x + (y + z) and so, without ambiguity, either can be written as x + y + z.The same three rules apply to addition of rational numbers.

The rules for addition are as follows:The sum of two negative integers is a negative integerThe sum of two positive integers is a positive integerThe rules for subtraction are as follows:If they are two positive numbers, do it normallyIf there is a negative and a positive ,change it to addition and switch the SECOND integer sign

Any time you add integers, the sum will be another integer.

addition

u can't

no

Do the addition. Keep the sign.

Is the set of negative interferes a group under addition? Explain,

yes

Yes.

That is correct, the set is not closed.

Addition is an example.