Let \(g\) be a continuous real-valued function defined on \(\mathbb R\) with the following properties.
\[g'(0)=0\]
\[g^{\prime\prime}(-1)\gt0\]
\[g^{\prime\prime}(x)\lt0\text{ if }0\lt x\lt 2.\]
Which of the following could be part of the graph of \(g\)?
Answer:
(A)
Answer Key:
Since \(g'(0)=0\), the slope of \(g\) at \(x=0\) is zero.
Since \(g^{\prime\prime}(-1)\gt0\), \(g\) is convex at \(x=-1\).
Since \(g^{\prime\prime}(x)\lt0\) for \(0\lt x\lt 2\), \(g\) is concave over \(0\lt x\lt 2\).
Think about this.
When \(g^{\prime\prime}\gt0\):
For \(g'\lt0\), the slope is getting less negative.
For \(g'\gt0\), the slope is getting more positive (steeper).
So, \(g\) is convex.
When \(g^{\prime\prime}\lt0\):
For \(g'\gt0\), the slope is decreasing (less steep).
For \(g'\lt0\), the slope is getting more negative.
So, \(g\) is concave.
Or, you can use memory trick like \(+\,\,_\cup+\) for convexity and \(-\,\,_\cap-\) for concavity.
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