(x+2)^2(x-1)^2

4 min read Jun 16, 2024
(x+2)^2(x-1)^2

Exploring the Polynomial (x+2)²(x-1)²

The expression (x+2)²(x-1)² represents a polynomial function. Let's delve into its characteristics and how we can analyze it.

Understanding the Structure

  • Factors: The expression is formed by two factors: (x+2)² and (x-1)². Each of these factors is a square of a binomial.
  • Expansion: We can expand the expression to get a polynomial in standard form: (x+2)²(x-1)² = (x² + 4x + 4)(x² - 2x + 1) = x⁴ + 2x³ - 3x² - 4x + 4
  • Degree: The highest power of x in the expanded form is 4, making it a fourth-degree polynomial.

Key Properties

  • Roots: The roots of the polynomial are the values of x that make the expression equal to zero. Since the expression is factored, we can easily find the roots:
    • (x+2)² = 0 implies x = -2 (multiplicity 2)
    • (x-1)² = 0 implies x = 1 (multiplicity 2)
  • Symmetry: The graph of the polynomial will be symmetrical about the line x = -1/2. This is due to the even powers of both factors.
  • End Behavior: As x approaches positive or negative infinity, the polynomial will approach positive infinity. This is because the leading term is x⁴, which has a positive coefficient and an even power.

Graphing the Polynomial

To visualize the polynomial, we can use the following steps:

  1. Find the x-intercepts: Plot the roots at x = -2 and x = 1.
  2. Determine the y-intercept: Set x = 0 and evaluate the polynomial: y = 4.
  3. Analyze the end behavior: The graph will rise on both ends.
  4. Consider the multiplicity of the roots: The multiplicity of 2 for both roots indicates that the graph will touch the x-axis at these points but not cross it.

By combining these steps, we can sketch a rough graph of the polynomial.

Applications

This type of polynomial function can arise in various applications, including:

  • Modeling physical phenomena: The equation could represent the motion of an object or the shape of a curve.
  • Solving engineering problems: It could be used in calculations related to structures, circuits, or other engineering systems.
  • Financial modeling: The polynomial could model growth patterns or investment returns.

By understanding the properties and behavior of (x+2)²(x-1)², we gain valuable insights into its applications and its role in various fields.

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