Sketch the following function, y = 5x3 + 7x2 + 2x Label the coordinates for the...

Curve Sketching Practice Use the information to the side to sketch the graph of f. Label...

Curve Sketching Practice Use the information to the side to sketch the graph of f. Label any asymptotes, local extrema, and inflection points. f  is a polynomial function x —1 —6 3 —2 6 5 f  is a polynomial function x 1 —4 4 0 7 4

Sketch a graph of the function h(x)=3/2sec2x by first sketching a graph of y = 3/2cos2x...

Sketch a graph of the function h(x)=3/2sec2x by first sketching a graph of y = 3/2cos2x and then drawing the graph of y=h(x) on top of it. [Since you are drawing two graphs on the same set of axes, either use a different color to distinguish between the graphs or make one a dashed curve and the other solid.] Be sure to show work and intermediate steps to demonstrate that you did this WITHOUT a calculator or graphing program. On...

Analyze the function f and sketch the curve of f by hand. Identify the domain, x-intercepts,...

Analyze the function f and sketch the curve of f by hand. Identify the domain, x-intercepts, y-intercepts, asymptotes, intervals of increasing, intervals of decreasing, local maximums, local minimums, concavity, and inflection points. f(x) = 3x^4 − 4x^3 + 2

Clearly sketch the graph of y=x- 2 /(x+3)^2 and label in your graph everything (intercepts, asymptotes,...

Clearly sketch the graph of y=x- 2 /(x+3)^2 and label in your graph everything (intercepts, asymptotes, extrema, inflection points)

For the function y = -4x^3 + 1/2x^4 + 150 : a. write down the formula...

For the function y = -4x^3 + 1/2x^4 + 150 : a. write down the formula of the function you are analysing b. find the intervals of increase/decrease c. find the local max/min values, the intervals of concave up/down and the points of inflection, d.) sketch the graph of the function, ensuring that your graph displays the feautures found above

Sketch a graph of a function having the following properties. Make sure to label local extremes...

Sketch a graph of a function having the following properties. Make sure to label local extremes and inflection points. 1) f is increasing on (−∞, −2) and (3, 5) and decreasing on (−2, 0),(0, 3) and (5,∞). 2) f has a vertical asymptote at x = 0. 3) f approaches a value of 1 as x → ∞ 4) f does not have a limit as x → −∞ 5) f is concave up on (0, 4) and (8, ∞)...

1)         Prove (with an ε- δ proof) limx→22x3-x2-3x=6 2)         fx= x5-5x3       a)   Find the first derivative....

1)         Prove (with an ε- δ proof) limx→22x3-x2-3x=6 2)         fx= x5-5x3       a)   Find the first derivative. b)   Find all critical numbers. c)   Make a single line graph showing where the function is increasing and where it is decreasing. d) Find the coordinates of all stationary points, maxima, and minima. e)   Find the second derivative. Find any numbers where the concavity of the function may change. f) Make a single line graph showing the concavity of the function. Find the coordinates...

(10 marks) Analyze and sketch the curve y = x3 − 6x2 + 9x. A full...

Analyze and sketch the curve y = x3 − 6x2 + 9x. A full analysis includes the following: critical points, intervals of increase/decrease, concavity, points of inflection, domain and range, intercepts. Organize your work in chart form.

Suppose the utility function for a consumer is given by U = 5XY. X is the...

Suppose the utility function for a consumer is given by U = 5XY. X is the amount of Good X and Y is the amount of Good Y. a) Neatly sketch the utility function. [Ensure that you label the graph carefully and state any assumptions that you make in sketching the curve.] b) Does this utility function exhibit diminishing marginal utility? [Ensure that you explain your answer fully.] c) Calculate the marginal rate of substitution. [Ensure that you explain your...

Examine the function f(x, y) = 2x 2 + 2xy + y 2 + 2x −...

Examine the function f(x, y) = 2x 2 + 2xy + y 2 + 2x − 3 for relative extrema. Use the Second Partials Test to determine whether there is a relative maximum, relative minimum, a saddle point, or insufficient information to determine the nature of the function f(x, y) at the critical point (x0, y0), such that fxx(x0, y0) = −3, fyy(x0, y0) = −8, fxy(x0, y0) = 2.