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Which expression shows the results of applying the Comunitive Property of addition to the expression 6 1 9 7 2?
This question cannot be answered. There is no such word as "Comunitive" and so "the Comunitive Property of addition" does not exist. One possible alternative is the "commutative" property, but that is only of marginal relevance in terms of the given expression. Thus, it is not at all clear what property the question is about and why any such property should be invoked.
What is the difference between the commutative property and associative property?
In the case of addition: Commutative property: a + b = b + a Associative property: (a + b) + c = a + (b + c) Note that (1) the commutative property involves two numbers; the associative property involves three; and (2) the commutative property changes the order of the operands; the associative property doesn't. Repeatedly applying the two properties allow you to rearrange an addition that involves several numbers in any order.
What is (7x5) (7x2) in distributive property?
In the distributive property, we distribute the multiplication operation over addition or subtraction within parentheses. In this case, we have (7x5) (7x2). By applying the distributive property, we can simplify this expression as 7*(5+2), which equals 7*7. Therefore, the result of (7x5) (7x2) in distributive property is 49.
What is 7x multiply by x?
The expression ( 7x ) multiplied by ( x ) can be simplified by applying the properties of multiplication. This results in ( 7x^2 ), which means 7 times the square of ( x ).
What is the associative property in math?
The way in which numbers are grouped when added or multiplied does not change the sum or product.In symbols the associative property of addition says that (a+b) +c = a + (b +c) where a,b, and c are any numbers.The associative property for multiplication says that (ab)c=a(bc).Informally, the associative property says that grouping does not matter when applying the operation.
Which expression shows the results of applying the Comunitive Property of addition to the expression 6 1 9 7 2?
This question cannot be answered. There is no such word as "Comunitive" and so "the Comunitive Property of addition" does not exist. One possible alternative is the "commutative" property, but that is only of marginal relevance in terms of the given expression. Thus, it is not at all clear what property the question is about and why any such property should be invoked.
What is the difference between the commutative property and associative property?
In the case of addition: Commutative property: a + b = b + a Associative property: (a + b) + c = a + (b + c) Note that (1) the commutative property involves two numbers; the associative property involves three; and (2) the commutative property changes the order of the operands; the associative property doesn't. Repeatedly applying the two properties allow you to rearrange an addition that involves several numbers in any order.
What is (7x5) (7x2) in distributive property?
In the distributive property, we distribute the multiplication operation over addition or subtraction within parentheses. In this case, we have (7x5) (7x2). By applying the distributive property, we can simplify this expression as 7*(5+2), which equals 7*7. Therefore, the result of (7x5) (7x2) in distributive property is 49.
what property allows you to decompose a factor into smaller numbers?
knowing the multiplication tables and applying those in reverse allows you to factor.
What is 7x multiply by x?
The expression ( 7x ) multiplied by ( x ) can be simplified by applying the properties of multiplication. This results in ( 7x^2 ), which means 7 times the square of ( x ).
Are all algebraic expressions polynomials?
From Wikipedia: "In mathematics, an algebraic expression is an expression built up from constants, variables, and the algebraic operations (addition, subtraction, multiplication, division and exponentiation by an exponent that is a rational number)". So, the answer is yes - since any polynomial can be obtained by applying only a subset of these operations (additions, subtraction, multiplication).
Do you simplify while using the distributive property to write an expression?
When using the distributive property to write an expression, you do not simplify within the parentheses before applying the property. The distributive property involves multiplying the term outside the parentheses by each term inside the parentheses. Once you have distributed the term, you can then simplify the resulting expression by combining like terms. Simplifying before distributing would result in an incorrect application of the distributive property.
What is the awnser toThe distributive property combines blank and blank to make multiplying whole numbers eaiser?
The distributive property combines addition and multiplication to make multiplying whole numbers easier. This property states that for any three numbers a, b, and c, a x (b + c) = a x b + a x c. By applying the distributive property, we can break down complex multiplication problems into simpler steps, ultimately making calculations more manageable and efficient.
What is the associative property in math?
The way in which numbers are grouped when added or multiplied does not change the sum or product.In symbols the associative property of addition says that (a+b) +c = a + (b +c) where a,b, and c are any numbers.The associative property for multiplication says that (ab)c=a(bc).Informally, the associative property says that grouping does not matter when applying the operation.
What is arithmetic?
Arithmetic is the process of applying the four basic operations: addition, subtraction, multiplication and division to numbers.
Are putting on your socks and putting on your shoes a commutative process?
No. The non-mathematical definitions for "commutative" involve exchanging or converting in some fashion. The socks and shoes don't qualify there. Applying the mathematical formula would mean that putting on a sock and shoe would be the same as putting on a shoe and sock.
What do you do when there are 2 brackets in a BEDMAS equation?
Apply BEDMAS to all expressions you try to work out.You work out the innermost brackets first and then use that result in working out the outermost brackets.Example:6 x (9 - (4 + 3))Applying BEDMAS means you work out the bracketed expression:9 - (4 + 3)before doing the multiplication. So applying BEDMAS to this, you work out the bracketed expression:4 + 3before doing the subtraction:6 x (9 - (4 + 3)) = 6 x (9 - 7)= 6 x 2= 12
