The figure above shows the graph of the derivative of a function f. Which of the following could be the graph of f? ( ) A. B. C. D. E. 相关知识点: 试题来源: 解析 A Note the following: Also note that f' (x )=0 at x=-4,2,4, so the graph of f has a ...
The graph of the derivative {eq}f {/eq} of a continuous function {eq}f {/eq} is shown. Determine at what intervals is {eq}f {/eq} increasing or decreasing? Application of derivatives: The rate of change of a function at a point...
Answer to: The following is the graph of the derivative function, f'(x) of a differentiable function f defined on the interval (0, 11). At what...
Question: The graph of the derivative of f is shown above. Which of the following statements is true?(A) f(x) has a maximum at x=2(B) f(x) has a minimum at x=0(C) f(x) has a maximum at x=4(D) f(x) ...
The graph of the derivative f ′(x)is given. Determine the x-coordinates of all points of inflection of f(x),if any.(Assume that f(x)is defined and continuous everywhere in[−10,10].Enter your answers as a comm...
This chapter discusses the graphs and the derivative of functions. Calculus allows looking in an infinitesimal microscope at a graph before the whole graph. If f'(x) is a function undefined, something else may appear in the microscope but this is an exceptional case. The exact shape of the ...
相关知识点: 试题来源: 解析 4) Sketch the graph of the function that has the derivative:No marks will be awarded for working out.[1 mark]Any natural exponential graph will be sufficient. 反馈 收藏
This question does not ask where the graph is increasing, as the graph represents the derivative of g(x), not g(x) itself. Instead, note where the graph of g'(x) is positive, as those intervals correspond to the intervals upon which g(x) increases. Since g'(x) is positive on (-...
Sketch a graph of the derivative of {eq}f {/eq}. Slope of a Straight line: Let's say we have a line {eq}\displaystyle l {/eq} passing through the points {eq}\displaystyle (x_1,y_1) {/eq} and {eq}\displaystyle (x_2,y_2) {/eq}. The slope of th...
5. The derivative of a functionh(x)will have either a maxima or minima at the point of inflection (where, the graph of the functionh(x)undergoes a change in curvature). Answer and Explanation:1 f(x) f′(x) Learn more about this topic: ...