Math 181 Miniproject 7: The Shape of a Graph.md --- --- tags: MATH 181 --- Math 181 Miniproject 7: The Shape of a Graph === **Overview:** In this miniproject you will be using the techniques of calculus to find the behavior of a graph. **Prerequisites:** The project draws heavily from the ideas of Chapter 1 and $2.8$ together with ideas and techniques of the first and second derivative tests from $3.1$. --- :::info We are given the functions $$ f(x)=\frac{12x^2-16}{x^3},\qquad f'(x)=-\frac{12(x^2-4)}{x^4},\qquad f''(x)=\frac{24(x^2-8)}{x^5}. $$ The questions below are about the function $f(x)$. Answer parts (1) through (10) below. If the requested feature is missing, then explain why. Be sure to include the work/test that you used to rigorously reach your conclusion. It is not sufficient to refer to the graph. (1) State the function's domain. ::: (1) Because x=0, the given function is undefined so domain is (-infinity,0)U(0,infinity) :::info (2) Find all $x$- and $y$-intercepts. ::: (2) for f(x)=0 12x^2- (16/x^3) =0 x^2=16/12 = 4/3 x= 2/sqrt3 x intercepts are (2/sqrt3,0) and (-2/sqrt3,0) for our y intercepts we plug x=0 but f(x) is undefined at x =0 so y intercept DNE :::info (3) Find all equations of horizontal asymptotes. ::: (3)y=L is a horizontal asymptote of the function y=f(x) as the lim approaches infinity (12/x - 16/x^3)=0 and also as the limit approaches negative infinity it equals 0 which means the horizontal asymptote is y=0 :::info (4) Find all equations of vertical asymptotes. ::: (4)x=L is a vertical asymptote of the function y=f(x) if the limit at this point is infinite as the limit approaches to the right of 0, (12/x-16/x^3)= -infinity since the limit is infinite, x=0 is the vertical asymptote :::info (5) Find the interval(s) where $f$ is increasing. ::: (5) f''= 12 (2-x)(x+2)/x^2 x= (-2,0)U(o,2) :::info (6) Find the $x$-value(s) of all local maxima. (Find exact values, and not decimal representations) ::: (6) The maxima is x=2 :::info (7) Find the $x$-value(s) of all local minima. (Find exact values, and not decimal representations) ::: (7) The minima is x=-2 :::info (8) Find the interval(s) on which the graph is concave downward. ::: (8)f''(x)=24(x^2 -8)/x^5 (-infinity,-2sqrt2),(0,2sqrt2) :::info (9) State the $x$-value(s) of all inflection points. (Find exact values, and not decimal representations) ::: (9 The inflection points are the y values -2sqrt2, 2sqrt2 :::info (10) Include a sketch of the graph of $y=f(x)$. Plot the different segments of the graph using the color code below. * **blue:** $f'>0$ and $f''>0$ * **red:** $f'<0$ and $f''>0$ * **black:** $f'>0$ and $f''<0$ * **gold:** $f'<0$ and $f''<0$ (In Desmos you could restrict the plot $y=f(x)$ on the interval $[2,3]$ by typing $y=f(x)\{2\le x\le 3\}$.) Be sure to set the bounds on the graph so that the features of the graph that you listed above are easy to see. ::: (10) --- To submit this assignment click on the Publish button . Then copy the url of the final document and submit it in Canvas.