-ummarize the pertinent information obtained by applying the graphing strategy and sketch the graph of \( f(x)=5 x e^{-0.5 x} \) Type your answer in interval notation. Use integers or decimals for any numbers in the expression. Use a comma to separate answers as needed.) A. The function is increasing on B. The function is increasing on \( (-\infty, 2) \). It is decreasing on \( (2, \infty) \). C. The function is decreasing on A. It is never increasing. the location of any local extrema of \( f(x) \). Select the correct choice below and, if necessary, fill in the answer box local maximum at \( x=\square \) and there is a local minimum at \( x=\square \). (Type integers or decimals. Use a comma to separate answers as needed.) B. There is a local maximum choice. (Type an integer or a decimal. Use a comma to separate answers as needed.) C. There is a local minimum at \( x=\square \). There is no local maximum. (Type an integer or a decimal. Use a comma to separate answers as needed.) D. There are no local extrema.
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To analyze the function \( f(x) = 5x e^{-0.5x} \), we can determine its behavior by finding its critical points. The function is increasing on the interval \( (0, 2) \) and decreasing on \( (2, \infty) \). So, the correct intervals are: A. The function is increasing on \( (0, 2) \) and decreasing on \( (2, \infty) \). For local extrema, there is a local maximum at \( x=2 \) and no local minimum. Therefore, the answers are: local maximum at \( x=2 \) and there is no local minimum. To summarize in interval notation: A. The function is increasing on \( (0, 2) \). B. There is a local maximum at \( x=2 \), and no local minimum.
