(x-7)^2

3 min read Jun 17, 2024
(x-7)^2

Understanding (x - 7)^2

The expression (x - 7)^2 is a simple but important example of a squared binomial. Understanding this expression is crucial for various mathematical concepts, including:

  • Algebraic manipulation
  • Quadratic equations
  • Graphing functions

Let's break down what (x - 7)^2 represents and how to work with it:

Expanding the Expression

(x - 7)^2 means (x - 7) multiplied by itself:

(x - 7)^2 = (x - 7) * (x - 7)

To expand this, we use the FOIL method:

  • First: x * x = x^2
  • Outer: x * -7 = -7x
  • Inner: -7 * x = -7x
  • Last: -7 * -7 = 49

Combining like terms, we get:

(x - 7)^2 = x^2 - 7x - 7x + 49 = x^2 - 14x + 49

Key Properties

  • Perfect Square Trinomial: (x - 7)^2 is a perfect square trinomial, meaning it is the result of squaring a binomial.
  • Symmetry: Notice the coefficients of the terms. The coefficient of the middle term (-14x) is twice the product of the terms in the original binomial (x and -7).
  • Constant Term: The constant term (49) is the square of the second term in the binomial (-7).

Applications

Understanding (x - 7)^2 has various applications:

  • Solving Quadratic Equations: (x - 7)^2 = 0 can be solved by taking the square root of both sides, leading to x = 7.
  • Graphing Parabolas: The expression represents a parabola shifted 7 units to the right.
  • Factoring Expressions: Recognizing (x - 7)^2 allows for easier factoring of related expressions.

Conclusion

(x - 7)^2 is a fundamental expression in algebra with significant implications in various mathematical fields. Understanding its expansion, properties, and applications provides a solid foundation for further mathematical exploration.

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