(7-4n)•6=

2 min read Jun 16, 2024
(7-4n)•6=

Simplifying the Expression: (7-4n)•6

This article will focus on simplifying the expression (7-4n)•6. Let's break down the steps involved:

Understanding the Expression

The expression (7-4n)•6 involves a few key components:

  • Parentheses: Indicate that the operation inside them must be performed first.
  • Multiplication: The symbol "•" represents multiplication.
  • Variables: The letter "n" represents an unknown value.

Applying the Distributive Property

To simplify the expression, we'll apply the distributive property of multiplication. This property states that multiplying a sum by a number is the same as multiplying each term in the sum by the number.

In our case, we multiply both terms within the parentheses by 6:

(7-4n)•6 = (7•6) + (-4n•6)

Simplifying Further

Now we can perform the multiplication operations:

(7•6) + (-4n•6) = 42 - 24n

Final Result

Therefore, the simplified form of the expression (7-4n)•6 is 42 - 24n.

Conclusion

This process demonstrates how to simplify algebraic expressions by using the distributive property and basic multiplication operations. Remember that the distributive property is a powerful tool for simplifying expressions, especially those involving parentheses.

Related Post


Featured Posts