How do you use distributive property to practice?
Distributive property with exponents
- Expand the equation.
- Multiply (distribute) the first numbers of each set, outer numbers of each set, inner numbers of each set, and the last numbers of each set.
- Combine like terms.
- Solve the equation and simplify, if needed.
How can I use factoring to create equivalent expressions?
To factor an expression, we use the distributive property to rewrite a sum as a product. The new expression is equivalent to the original expression. For example, we can factor the expression 20x+35 to get the equivalent expression 5(4x+7). A term is a part of an expression.
How do you write an expression as an equivalent expression?
You can write equivalent expressions by combining like terms. Like terms are terms that have the same variables raised to the same powers. For example, the list shows some pairs of like terms. the new coefficient is 9.
Which expression is equivalent to 48 18x?
| Monday | Tuesday | Thursday |
|---|---|---|
| Write an equivalent expression for 48 + 18x. | Use the distributive property to create an equivalent expression to 54 + 18x | Are the two expressions equivalent when x = 2? 7(8x + 5) 48x + 35 |
How do you use the distributive property to find an expression that is equivalent to 20 16?
Explain how to use the distributive property to find an expression that is equivalent to 20 + 16. First, I would find that the GCF of 20 and 16 is 4. Then, I would divide both 20 and 16 by 4. Last, I would use the distributive property to write the sum as 4(5 + 4).
How do you expand to write equivalent expressions?
To expand an expression, we use the distributive property to rewrite a product as a sum. The new expression is equivalent to the original expression. For example, we can expand the expression to get the equivalent expression .
How do you know if an expression is equivalent?
Generally, if two things are the same, then it is called equivalent. Similarly, in mathematics, the equivalent expressions are the expressions that are the same, even though the expression looks different. But if the values are plugged in the expression, both the expressions give the same result.
How can you use the distributive property and the GCF to find an equivalent expression 63 81?
The GCF of 63 and 81 is 9, so you can use that as the factor outside of the parentheses. Divide both numbers by 9 and write the sum as 9(7 + 9).
