(4+7a^2)^2=

2 min read Jun 16, 2024
(4+7a^2)^2=

Expanding the Square of a Binomial: (4 + 7a^2)^2

In mathematics, understanding how to expand expressions involving squares of binomials is crucial. This involves applying the distributive property or using a specific formula. Let's explore how to expand the expression (4 + 7a^2)^2.

The Formula for Squaring a Binomial

The formula for squaring a binomial (a + b) is:

(a + b)^2 = a^2 + 2ab + b^2

This formula tells us that to square a binomial, we need to square the first term, add twice the product of the first and second term, and finally add the square of the second term.

Applying the Formula to (4 + 7a^2)^2

Let's identify 'a' and 'b' in our expression:

  • a = 4
  • b = 7a^2

Now, we can apply the formula:

(4 + 7a^2)^2 = 4^2 + 2 * 4 * 7a^2 + (7a^2)^2

Simplifying the Expression

Let's simplify the expression step by step:

  • 4^2 = 16
  • 2 * 4 * 7a^2 = 56a^2
  • (7a^2)^2 = 49a^4

Finally, combine the terms to get the expanded form:

(4 + 7a^2)^2 = 16 + 56a^2 + 49a^4

Conclusion

Therefore, the expanded form of (4 + 7a^2)^2 is 16 + 56a^2 + 49a^4. This process demonstrates how to apply the formula for squaring a binomial to simplify complex expressions.

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