(a-3b)^2

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

Understanding (a - 3b)^2

The expression (a - 3b)^2 represents the square of the binomial (a - 3b). This means we are multiplying the binomial by itself:

(a - 3b)^2 = (a - 3b)(a - 3b)

To expand this expression, we can use the FOIL method (First, Outer, Inner, Last):

  • First: Multiply the first terms of each binomial: a * a = a^2
  • Outer: Multiply the outer terms: a * -3b = -3ab
  • Inner: Multiply the inner terms: -3b * a = -3ab
  • Last: Multiply the last terms: -3b * -3b = 9b^2

Now, combine the terms:

a^2 - 3ab - 3ab + 9b^2

Finally, simplify by combining the like terms:

a^2 - 6ab + 9b^2

Therefore, the expanded form of (a - 3b)^2 is a^2 - 6ab + 9b^2.

Key Points

  • Squaring a binomial: Remember that squaring a binomial means multiplying it by itself.
  • FOIL method: This is a helpful technique to expand binomials by systematically multiplying all the terms.
  • Combining like terms: After applying FOIL, ensure to simplify the expression by combining terms with the same variables and exponents.

Applications

Understanding how to expand binomials like (a - 3b)^2 is crucial in various mathematical concepts:

  • Algebraic manipulation: Expanding binomials is essential for simplifying expressions and solving equations.
  • Quadratic equations: The expression (a - 3b)^2 can be a factor in quadratic equations, helping to solve for the roots.
  • Calculus: Understanding binomial expansion is vital in topics like differentiation and integration.

By grasping the concept of expanding binomials, you can navigate more complex mathematical concepts with greater ease.

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