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

f(x)=x/(x^2)-9 Use the "Guidelines for sketching a curve A-H" A.) Domain B.) Intercepts C.) Symmetry D.)...

f(x)=x/(x^2)-9 Use the "Guidelines for sketching a curve A-H" A.) Domain B.) Intercepts C.) Symmetry D.) Asymptotes E.) Intervals of increase or decrease F.) Local Maximum and Minimum Values G.) Concavity and Points of Inflection H.) Sketch the Curve

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)

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, ∞)...

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

1. Use the techniques for curve sketching that you think are appropriate to sketch the curve...

1. Use the techniques for curve sketching that you think are appropriate to sketch the curve defined f(x)=(4-x^2)/(x^2-1). Label all key information. (limit analysis, find limit approaches -1 from the left, -1 from the right, f(-1)=?, +1 from the left, and +1 from the right, f(+1)=? 2. Solve the following equations and each of the variable 1. 3a-2b+c=0 2. 0=3a+b 3. 2=a+b+c+d 4. 3= -a+b-c+d

For the function f(x)=x^5+5x^4-4. Write "none" if there isn't an answer. (a) find all local extrema...

For the function f(x)=x^5+5x^4-4. Write "none" if there isn't an answer. (a) find all local extrema of this function, if any, and increasing and decreasing intervals. Local max:___ Local min:___ Increasing:___ Decreasing:___ (b) Find all the inflection points of this function, if ay. And concave up and concave down intervals. Inflection points:___ concave up:___ concave down:___ (c) Use part a and b to sketch the graph of the function. Must label important points and show proper concavity.

Consider the function f(x) = −x3 + 4x2 + 7x + 1. (a) Use the first...

Consider the function f(x) = −x3 + 4x2 + 7x + 1. (a) Use the first and second derivative tests to determine the intervals of increase and decrease, the local maxima and minima, the intervals of concavity, and the points of inflection. (b) Use your work in part (a) to compute a suitable table of x-values and corresponding y-values and carefully sketch the graph of the function f(x). In your graph, make sure to indicate any local extrema and any...

sketch the curve with the given polar equation by first sketching the graph of r as...

sketch the curve with the given polar equation by first sketching the graph of r as a function of theta in Cartesian coordinates. r= 1 + 3Sin(theta)

5. [20 pts] For the function ?(?) = (4?−8)/(?^2−?−6) answer the following to sketch the graph....

5. [20 pts] For the function ?(?) = (4?−8)/(?^2−?−6) answer the following to sketch the graph. Do not use a graphing calculator. a. [2 pts] Determine the domain of the function, write your answer in interval notation: b. [4 pts] Find the x-intercept(s), if any. c. [2pts] Find the y-intercept, if any. d. [2 pts] Find the vertical asymptotes, if any. e. [2 pts] Find the horizontal asymptote(s) or slant asymptote, if any. f. [4 pts] Determine whether the graph...

Sketch the graph of a function f that is continuous on (−∞,∞) and has all of...

Sketch the graph of a function f that is continuous on (−∞,∞) and has all of the following properties: (a) f0(1) is undefined (b) f0(x) > 0 on (−∞,−1) (c) f is decreasing on (−1,∞). Sketch a function f on some interval where f has one inflection point, but no local extrema.