Reese Craig
07/20/2024 · Junior High School
The graph of the function has one relative extreme point. Plot this point and check the concavity there. Using only this information, sketch the graph. \( f(x)=-x^{2}-4 x-2 \) The relative extreme point on the graph is \( (-2,2) \). (Type an ordered pair.) Since the value of \( f^{\prime \prime} \) at the relative extreme point is \( \square \), the graph is concave down
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The second derivative at the relative extreme point \( (-2, 2) \) is \( -2 \), indicating that the graph is concave down.
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