5.4 Using the First Derivative Test for Relative Extrema

Cards (63)

  • At what values of x does the function \( f(x) = x^3 - 3x + 2 \) have relative extrema?
    -1 and 1
  • What are relative extrema of a function?
    Local maximum or minimum values
  • A relative minimum occurs when the derivative changes from negative to positive.
  • What type of relative extrema occurs at \( x = 2 \) for the function \( f(x) = x^2 - 4x + 3 \)?
    Relative Minimum
  • A relative maximum occurs when the derivative changes from positive to negative.
    True
  • What test is used to identify relative extrema in the function \( f(x) = x^3 - 3x + 2 \)?
    First Derivative Test
  • Steps of the First Derivative Test
    1️⃣ Find Critical Points
    2️⃣ Create a Sign Chart
    3️⃣ Determine Relative Extrema
  • What is the purpose of the First Derivative Test?
    Identify relative extrema
  • Match the sign of \( f'(x) \) with the behavior of the function:
    Positive ↔️ Increasing
    Negative ↔️ Decreasing
    Zero ↔️ Critical Point
  • What is the purpose of creating a sign chart in the First Derivative Test?
    Analyze function behavior
  • Steps to apply the First Derivative Test to f(x) = x^2 - 4x + 3
    1️⃣ Find critical points: f'(x) = 2x - 4 = 0, so x = 2 is the critical point
    2️⃣ Create a sign chart
    3️⃣ Analyze the sign of f'(x) in intervals (-∞, 2) and (2, ∞)
    4️⃣ Determine relative extrema
  • The First Derivative Test helps identify relative extrema by examining the behavior of the first derivative.
    True
  • What are relative extrema?
    Local maximum or minimum
  • The sign chart helps visualize the changes in the sign of the first derivative
  • Relative extrema refer to local maximum and minimum values of a function
  • The First Derivative Test finds relative extrema by analyzing the sign changes of the first derivative.

    True
  • If f'(x) changes from positive to negative, there is a relative maximum.
  • If f'(x) changes from negative to positive, there is a relative minimum at that critical point.

    True
  • A relative maximum occurs when the derivative changes from positive to negative.
    True
  • The First Derivative Test identifies relative extrema by analyzing the sign changes of the first derivative around a critical point.
    True
  • Steps of the First Derivative Test
    1️⃣ Find Critical Points
    2️⃣ Create a Sign Chart
    3️⃣ Determine Relative Extrema
  • Steps of the First Derivative Test
    1️⃣ Find Critical Points
    2️⃣ Create a Sign Chart
    3️⃣ Determine Relative Extrema
  • The First Derivative Test involves finding critical points and creating a sign chart.
  • If \( f'(x) \) changes from negative to positive, there is a relative minimum.
  • Creating a sign chart involves placing critical points on a number line and testing the sign of \( f'(x) \) in each interval.
  • If \( f'(x) \) changes from positive to negative at a critical point, the function has a relative maximum.

    True
  • What are critical points in the context of the First Derivative Test?
    Values where f'(x) = 0
  • If f'(x) is negative in an interval, the function is decreasing in that interval.

    True
  • What type of relative extremum occurs if f'(x) changes from negative to positive?
    Relative minimum
  • The function f(x) = x^2 - 4x + 3 has a relative minimum at x = 2
  • The sign chart visualizes the changes in the sign of the first derivative, which corresponds to the increasing and decreasing behavior of the function
  • If the first derivative, f'(x), is negative in an interval, the function is decreasing in that interval.

    True
  • A relative minimum occurs when the first derivative changes from negative to positive.
  • Steps to apply the First Derivative Test to find relative extrema:
    1️⃣ Find Critical Points
    2️⃣ Create a Sign Chart
    3️⃣ Determine Relative Extrema
  • If f'(x) changes from positive to negative, there is a **relative maximum** at that critical point.
  • Creating a sign chart involves testing the sign of f'(x) in each interval to analyze the function's behavior.
  • In the interval (-∞, 2), the value of f'(x) is negative, indicating the function is decreasing.
  • If f'(x) is positive in an interval, the function is increasing in that interval.
  • At x = -1, the derivative f'(x) changes from positive to negative, indicating a relative maximum.
  • To find critical points, set the first derivative equal to zero or determine where it is undefined.