distributive is just a longer way to show the equation and commutative is the numbers combined.
Example: 4(5+x) is the distibutive and the equal equation that is commutative is 20+4x
commutative, associative, distributive and multiplicative identity
You need the associative and commutative properties, but not the distributive property. n*4n*9 =n*(4n*9) (associative) = n*(9*4n) (commutative) = n*(36n) (associative) = 36n*n commutative = 36*n^2
the basic number properties in math are associative, commutative, and distributive associative: (for addition) a+(b+c)=(a+b)+c (for multiplication) a(bc)=(ab)c or a*(b*c)=(a*b)*c commutative: (for addition) a+b=b+a (for multiplication) a*b=b*a or ab=ba distributive: a(b+c)=ab+ac or a(b+c)=a*b + a*c
No.
Commutative Law: a + b = b + a Associative Law: (a + b) + c = a + (b + c)
You can use properties such as the distributive property, associative property, and commutative property to write equivalent expressions. For example, the distributive property allows you to expand or factor expressions, like rewriting (a(b + c)) as (ab + ac). The commutative property enables you to change the order of terms, such as (a + b) becoming (b + a), while the associative property lets you regroup terms, such as ((a + b) + c) being rewritten as (a + (b + c)). By applying these properties, you can create different but equivalent forms of the same expression.
Properties of operations, such as the commutative, associative, and distributive properties, can be used to manipulate expressions in ways that preserve their value while changing their form. By applying these properties systematically, one can generate equivalent expressions that are easier to work with or better suited to a specific problem. This can streamline the problem-solving process by simplifying complex expressions or rearranging terms to highlight patterns or relationships.
Properties of algebra, such as the distributive, associative, and commutative properties, allow us to manipulate and rearrange algebraic expressions to create equivalent forms. For example, the distributive property enables us to expand expressions, while the associative property lets us regroup terms. By applying these properties, we can simplify complex expressions or rewrite them in a different format without changing their value, making it easier to solve equations or analyze relationships. This flexibility is essential in algebra for various applications, including solving equations and simplifying calculations.
commutative, associative, distributive
There are four properties. Commutative . Associative . additive identity and distributive.
They are the associative property, distributive property and the commutative property.
commutative, associative, distributive and multiplicative identity
distributive, associative, commutative, and identity (also called the zero property)
Properties of MathThe properties are associative, commutative, identity, and distributive. * * * * *There is also the transitive propertyIf a > b and b > c then a > c.
Basic number properties (including three properties) and distributive property.
Are you asking for an explanation of the Associative, Distributive, and Commutative Properties? The answer is a little long. The first link is a simpler explanation, the second one is more detailed:
You need the associative and commutative properties, but not the distributive property. n*4n*9 =n*(4n*9) (associative) = n*(9*4n) (commutative) = n*(36n) (associative) = 36n*n commutative = 36*n^2