answersLogoWhite

0


Best Answer

0 is the identity element of a set such that 0 + x = x = x + 0 for all elements x in the set.

User Avatar

Wiki User

12y ago
This answer is:
User Avatar

Add your answer:

Earn +20 pts
Q: What is the definition for additive identity property of 0?
Write your answer...
Submit
Still have questions?
magnify glass
imp
Related questions

What is the definition of additive identity property?

The additive identity states that "Any number plus zero is equal to the original number."A + 0 = AHere is an example: 8+0=8 or 25+0=25


What is an example of identity property?

0 is the additive identity for numbers and the identity property is illustrated by 1+0 = 1


What is Additive Identity Property?

The additive identity for a set is a number (denoted by 0) such that a + 0 = 0 + a = a for all elements a which belong to the set.


What property is this 1315 x 0 equals 0?

It is a consequence of the property that 0 is the additive identity.


1X88 is an example of what property?

The Identity Property, Multiplicative Identity I think it's called... the Additive Identity Property is the number 0... asi: 0+88.


What does the word Additive Identify Property of 0?

Identity properties do not change a number. What can you add to a number that doesn't change it? 0 So the addition property for zero is additive identity.


What property is -4 plus 0 -4 in Algebra?

It is the additive identity property of the number 0.


What property states that adding 0 to a number does not change the number?

It is the additive identity property of zero.


How is the additive inverse property related to the additive identity property?

They have no real relations ofther than being mathmatical properties The additive identity states that any number + 0 is still that number; a+0 = a The additive inverse property states that any number added to its inverse/opposite is zero; a + -a = 0


What property is 6 times 0 equals 0?

It is the fact that 0 is the additive identity.


What is the difference between the zero property of multiplication and the identity property of addition?

Usually, the identity of addition property is defined to be an axiom (which only specifies the existence of zero, not uniqueness), and the zero property of multiplication is a consequence of existence of zero, existence of an additive inverse, distributivity of multiplication over addition and associativity of addition. Proof of 0 * a = 0: 0 * a = (0 + 0) * a [additive identity] 0 * a = 0 * a + 0 * a [distributivity of multiplication over addition] 0 * a + (-(0 * a)) = (0 * a + 0 * a) + (-(0 * a)) [existence of additive inverse] 0 = (0 * a + 0 * a) + (-(0 * a)) [property of additive inverses] 0 = 0 * a + (0 * a + (-(0 * a))) [associativity of addition] 0 = 0 * a + 0 [property of additive inverses] 0 = 0 * a [additive identity] A similar proof works for a * 0 = 0 (with the other distributive law if commutativity of multiplication is not assumed).


Which property is illustrated by this problem 99.78 plus 0 equals 99.78?

The property that 0 is the additive identity.