Review - Fall \( 2024-5 \% \) \( f(x)=2 x-4 x^{3}-x^{5} \) Use the Leading Coefficient Test to determine the end behavior of the polynomial function.

To determine the end behavior of the polynomial function \( f(x) = 2x - 4x^3 - x^5 \) using the Leading Coefficient Test, we first identify the leading term, which in this case is \(-x^5\). Since the degree of the polynomial is odd (5) and the leading coefficient is negative (-1), the end behavior of the function will be as follows: as \( x \) approaches positive infinity, \( f(x) \) will approach negative infinity, and as \( x \) approaches negative infinity, \( f(x) \) will approach positive infinity. In simpler terms, the graph will rise to the left and fall to the right, creating a sort of "downward swoop" as you move across the x-axis. This is important for sketching the function and understanding where it may cross the x-axis!