answersLogoWhite

0


Best Answer

the addition of integers is when adding negative and positive integers

User Avatar

Wiki User

โˆ™ 2011-07-12 06:20:33
This answer is:
๐Ÿ™
0
๐Ÿคจ
0
๐Ÿ˜ฎ
0
User Avatar
Study guides

Math and Arithmetic

26 cards

What is a pictorial representation of the frequency table

What is the associative property of addition

Math factors of 6

What is zero product property

โžก๏ธ
See all cards

Add your answer:

Earn +20 pts
Q: What is the addition of integers?
Write your answer...
Submit
Related questions

How do you do addition integers?

addition and subtract in integers


What is the rule of addition of integers?

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


Which operations on integers are commutative?

Addition and multiplication are operations on integers that are commutative.


How are addition and subtraction of integers related?

Addition and subtraction are inverse functions.


Why are odd integers closed under multiplication but not under addition?

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


Give example of closure property?

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


Are integers closed under addition?

yes


Is addition of integers commutative?

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.


What property links multiplication and addition?

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


What operation are closed for integers?

Addition, subtraction and multiplication.


Who discovered addition and subtraction of integers?

a math guy


Is the set of integers closed under addition?

Yes it is.


What does it mean to say that integers are closed under addition?

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


What is the adding integers and rational number rules?

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.


What is Adding integers and rational number rules?

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.


What do you do when adding integers with the same sign?

Do the addition. Keep the sign.


Is the set of all negative integers a group under addition?

no


Under which operation is the set of odd integers closed?

addition


How do you complete a magic circle addition of integers?

u can't


Explain how the subtraction of integers is related to the addition of integers?

Subtraction of integers is essentially addition of integers except the second integer is inverted. For example: 5 + 3 = 8 is a simple addition of integers. 5 - 3 = 5 is a simple subtraction of integers. It can be expressed by inverting the second value (the one right after the subration sign) and then switching the subtraction sign to an addition sign. So it would look like: 5 + (-3) = 5. Note that (-3) is the opposite of 3. So to do a more confusing subtraction problem like: 55 - (-5), we could rewrite this as: 55 + -(-5). From here it's easy to see that the two negatives cancel out. 55 + 5 = 60.


Is the set of negative integers a group under addition?

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


What are examples of the law of closure in Mathematics?

There is no law of closure. Closure is a property that some sets have with respect to a binary operation. For example, consider the set of even integers and the operation of addition. If you take any two members of the set (that is any two even integers), then their sum is also an even integer. This implies that the set of even integers is closed with respect to addition. But the set of odd integers is not closed with respect to addition since the sum of two odd integers is not odd. Neither set is closed with respect to division.


Examples to prove the set of integers is a group with respect to addition?

In order to be a group with respect to addition, the integers must satisfy the following axioms: 1) Closure under addition 2) Associativity of addition 3) Contains the additive identity 4) Contains the additive inverses 1) The integers are closed under addition since the sum of any two integers is an integer. 2) The integers are associative with respect to addition since (a+b)+c = a+(b+c) for any integers a, b, and c. 3) The integer 0 is the additive identity since z+0 = 0+z = z for any integer z. 4) Each integer n has an additive inverse, namely -n since n+(-n) = -n+n = 0.


ARe odd integers not closed under addition?

That is correct, the set is not closed.


Is the set of all negative integers closed for operation of addition?

yes