(21 x 2) + (25 x 2) = 46 x 2 = 92
This expression is an example of the Distributive Property. The expression a(b+c) = ab +ac is true because of the Distributive Property.
Using my knowledge of greatest common factors and the distributive property, I can tell that 45 + 63 is equal to 9(5 + 7) or 9 x 12, which is 108. Of course, I could also tell that from my knowledge of addition.
(6 x 7) + (6 x 16) = 6 x 23 = 138
40 + 32 = (5 x 8) + (4 x 8) = 9 x 8 = 72
(4 x 4) + (4 x 9) = 4 x 13 = 52
There is no evidence of the distributive property in the expression.
90
An expression equal to 15 + 35, using distributive property, is 5(3 + 7). Under distributive property, 5*3=15 and 5*7=35.
u have to do distributive property and try to fit the formula of the trapezoid in the expression da
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.
It is: 4(x+y+z)
The property used to rewrite 9x2 + 9x3 is the Distributive Property. Using the Distributive Property the expression can be rewritten as 9x2 + 9x2 + 9x2 or 27x2.
An unnecessary one. 42 + 96 = 138
This expression is an example of the Distributive Property. The expression a(b+c) = ab +ac is true because of the Distributive Property.
28ab
To expand the expression 7x(7y) using the distributive property, you distribute the 7x to both terms inside the parentheses. This results in 7x * 7y = 49xy. The distributive property allows you to multiply each term inside the parentheses by the term outside the parentheses, simplifying the expression.
90