(2a-3)^2

2 min read Jun 16, 2024
(2a-3)^2

Understanding the Expansion of (2a - 3)^2

The expression (2a - 3)^2 represents the square of the binomial (2a - 3). To understand its expansion, we need to apply the concept of squaring a binomial.

The FOIL Method

The FOIL method is a handy acronym that helps us remember the steps involved in expanding a binomial squared:

  • First: Multiply the first terms of each binomial.
  • Outer: Multiply the outer terms of the binomials.
  • Inner: Multiply the inner terms of the binomials.
  • Last: Multiply the last terms of each binomial.

Applying FOIL to (2a - 3)^2

Let's apply the FOIL method to expand (2a - 3)^2:

  1. First: (2a) * (2a) = 4a^2
  2. Outer: (2a) * (-3) = -6a
  3. Inner: (-3) * (2a) = -6a
  4. Last: (-3) * (-3) = 9

Now, combine the terms:

4a^2 - 6a - 6a + 9

Finally, simplify by combining like terms:

4a^2 - 12a + 9

Conclusion

Therefore, the expansion of (2a - 3)^2 is 4a^2 - 12a + 9. This is a trinomial, which is a polynomial with three terms.

Understanding the FOIL method allows us to effectively expand and simplify expressions like this, making it easier to work with them in various mathematical contexts.

Featured Posts