Whether or not the distributive property can or should be used depends on what you wish to multiply 43.2 by. For example, if you wish to multiply 43.2 by 10, the distributive property is irrelevant!
Distributive Property
To apply the distributive property to an algebraic expression, you multiply each term inside the parentheses by the number or variable outside the parentheses. For example, to simplify 2(x + 3), you would multiply 2 by both x and 3, resulting in 2x + 6.
When applying distributive property to solve an equation, you multiply each term by term. For instance: a(b + c) = ab + ac
The distributive property of multiplication over addition.
Whether or not the distributive property can or should be used depends on what you wish to multiply 43.2 by. For example, if you wish to multiply 43.2 by 10, the distributive property is irrelevant!
Distributive Property
(40+200)+(5+80)
Distributive Property
An example of how to use the distributive property: If you have 6x(5+4) you multiply 6x by 5 and get 30x. Then you multiply 6x by 4 and get 24x and then you would have 30x+24x which = 54x
You multiply 5x5 then 9x1.
The distributive property.
To apply the distributive property to an algebraic expression, you multiply each term inside the parentheses by the number or variable outside the parentheses. For example, to simplify 2(x + 3), you would multiply 2 by both x and 3, resulting in 2x + 6.
distributive property
When applying distributive property to solve an equation, you multiply each term by term. For instance: a(b + c) = ab + ac
Here is how to multiply using the distributive property:First, the equation: 9 (x + 3) = 35There must be parentheses for the distributive property, and a number outside those parentheses. The next step is to multiply 9 by x and 9 by 3 individually, and put an addition symbol in the middle.The second equation: 9x + 27 = 35Then, subtract 27: 9x = 18Divide by 9 on both sides: x = 2.That is how you multiply using the distributive property.
Multiplication can be the first step when using the distributive property with subtraction. The distributive law of multiplication over subtraction is that the difference of the subtraction problem and then multiply, or multiply each individual products and then find the difference.