amaw
The closure property of addition says that if you add together any two numbers from a set, you will get another number from the same set. If the sum is not a number in the set, then the set is not closed under addition.
Closure of the set of integers under addition.
No. Consider the set of odd integers.
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amaw
The closure property of addition says that if you add together any two numbers from a set, you will get another number from the same set. If the sum is not a number in the set, then the set is not closed under addition.
It is called the property of "closure".
Closure of the set of integers under addition.
No. Consider the set of odd integers.
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closure property is the sum or product of any two real numbers is also a real numbers.EXAMPLE,4 + 3 = 7 The sum is real number6 + 8 = 14add me in facebook.. lynnethurbina@yahoo.com =]
No. Closure is the property of a set with respect to an operation. You cannot have closure without a defined set and you cannot have closure without a defined operation.
The relevant property is the closure of the set of rational numbers under the operation of addition.
Closure with respect to addition and multiplication. Cummutative, Associative properties of addition and of multiplication. Distributive property of multiplication over addition.
Real Numbers are said to be closed under addition because when you add two Real Numbers together the result will always be a Real Number.
Add two positive integers and you ALWAYS have a positive integers. The positive integers are closed under addition.