Consider the function f(x) = kx", where n is an even, positive integer. %3D (a) (3 points) If k < 0, sketch the graph of f(x).

Consider the function f(x)=kn^n, where n is an even, positive integer.

If k<0, sketch the graph of f(x)

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**Course Title:** Math 130B --- **Exercise 2:** Consider the function \( f(x) = kx^n \), where \( n \) is an even, positive integer. (a) **(3 points)** If \( k < 0 \), sketch the graph of \( f(x) \). **Graph Description:** The graph is a coordinate plane with the x-axis ranging from -5 to 5 and the y-axis also ranging from -5 to 5. There are grid lines to help visualize changes in slope and intercepts more clearly. The point of interest is sketching where \( f(x) \) falls when \( k \) is negative, indicating the reflection of a typical parabola (since \( n \) is even) upside down across the x-axis. For example, for select \( k \) and \( n \) values like \( k = -1 \) and \( n = 2 \), the graph of \( f(x) = -x^2 \) would resemble a downward-opening parabola. --- This content can help students understand the properties and behaviors of polynomial functions, specifically focusing on how a negative leading coefficient affects the graph's direction.