Math and Arithmetic

Give example of closure property?

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Answered 2009-07-11 13:20:29

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

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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.

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.. =]

In Relational algebra allows expressions to be nested, just as in arithmetic. This property is called closure.

In mathematics, closure is a property of a set, S, with a binary operator, ~, defined on its elements.If x and y are any elements of S then closure of S, with respect to ~ implies that x ~ y is an element of S.The set of integers, for example, is closed with respect to multiplication but it is not closed with respect to division.

one example sentence is: Closure of the docks had been agreed.

Commutative property: a + b = b + a; example: 4 + 3 = 3 + 4 Associative property: (a + b) + c = a + (b + c); example: (1 + 2) + 3 = 1 + (2 + 3) Closure property: The sum of two numbers of certain sets is again a number of the set. All of the above apply similarly to addition of fractions, addition of real numbers, and multiplication of whole numbers, fractions, or real numbers.

No. For example, the square root of two plus (minus the square root of two) = 0, which is not an irrational number.

its when a mathamatical persistince is also whennyou d the oppsite of the equation

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, an identity element, inverse elements, associative property, commutative property

The Michael Jackson memorial was partially intended to give the public some closure in dealing with his untimely demise.

Closure of the set of integers under addition.

What is cleavage? Give an example of a mineral with this property.

Yes there is.Closure means that if x and y are any two whole numbers then x - y must be a whole number.

The closure property is an attribute of a set with respect to a binary operation, not only a binary operation. A set S is closed with respect to multiplication if, for any two elements, x and y, belonging to S, x*y also belongs to S.

Yes it has closure, identity, inverse, and an associative property.

The man was charged with deliberate destruction of property.

Every subset of a frequent itemset is also frequent. Also known as Apriori Property or Downward Closure Property, this rule essentially says that we don't need to find the count of an itemset, if all its subsets are not frequent. This is made possible because of the anti-monotone property of support measure - the support for an itemset never exceeds the support for its subsets. Stay tuned for this.

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