Activity 1.4.2. For each given graph of y = f(x), sketch an approximate graph of its derivative function, y = f'(x), on the axes immediately below. The scale of the grid for the graph of f is 1 x 1; assume the horizontal scale of the grid for the graph of f' is identical to that for f. If necessary, adjust and label the vertical scale on the axes for f'. When you are finished with all 8 graphs, write several sentences that describe your overall process for sketching the graph of the derivative function, given the graph the original function. What are the values of the derivative function that you tend to identify first? What do you do thereafter? How do key traits of the graph of the derivative function exemplify properties of the graph of the original function?
Activity 1.4.2. For each given graph of y = f(x), sketch an approximate graph of its derivative function, y = f'(x), on the axes immediately below. The scale of the grid for the graph of f is 1 x 1; assume the horizontal scale of the grid for the graph of f' is identical to that for f. If necessary, adjust and label the vertical scale on the axes for f'. When you are finished with all 8 graphs, write several sentences that describe your overall process for sketching the graph of the derivative function, given the graph the original function. What are the values of the derivative function that you tend to identify first? What do you do thereafter? How do key traits of the graph of the derivative function exemplify properties of the graph of the original function?
Activity 1.4.2. For each given graph of y = f(x), sketch an approximate graph of its derivative function, y = f'(x), on the axes immediately below. The scale of the grid for the graph of f is 1 x 1; assume the horizontal scale of the grid for the graph of f' is identical to that for f. If necessary, adjust and label the vertical scale on the axes for f'. When you are finished with all 8 graphs, write several sentences that describe your overall process for sketching the graph of the derivative function, given the graph the original function. What are the values of the derivative function that you tend to identify first? What do you do thereafter? How do key traits of the graph of the derivative function exemplify properties of the graph of the original function?
Please try not to use derivatives or integrals to calculate the stuff. Thank you.
With differentiation, one of the major concepts of calculus. Integration involves the calculation of an integral, which is useful to find many quantities such as areas, volumes, and displacement.
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