(4a + 2)(6a 2 − A + 2)

2 min read Jun 16, 2024
(4a + 2)(6a 2 − A + 2)

Expanding the Expression (4a + 2)(6a² - a + 2)

This article will guide you through expanding the expression (4a + 2)(6a² - a + 2) using the distributive property.

Understanding the Distributive Property

The distributive property states that multiplying a sum by a number is the same as multiplying each addend separately by the number and then adding the products. In symbols, this is represented as:

a(b + c) = ab + ac

Applying the Distributive Property

To expand (4a + 2)(6a² - a + 2), we can think of it as:

4a(6a² - a + 2) + 2(6a² - a + 2)

Now, we apply the distributive property to each term:

  • 4a(6a² - a + 2) = 24a³ - 4a² + 8a
  • 2(6a² - a + 2) = 12a² - 2a + 4

Finally, we combine the like terms:

24a³ - 4a² + 8a + 12a² - 2a + 4

This simplifies to:

24a³ + 8a² + 6a + 4

Conclusion

Therefore, the expanded form of (4a + 2)(6a² - a + 2) is 24a³ + 8a² + 6a + 4. This process showcases the importance of understanding the distributive property and applying it to simplify complex expressions.

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