Sketch the graph of the function f(r) with the following characteristics: lim f(x) = -00 lim...
7) (9 points) Sketch the graph of a function f(x) having the following given characteristics. Domain of f(x)= (-0,-5) U (-5,0) lim f(x)=–00, and lim f(x)=0 lim f(x) = 3 5 x-00 /'(x) >0 on (-00,-5) U (-5,0) / '(x) < 0on (0,0) /"(x) > 0 on (- 0,-5) /"(x) <0 on (-5,0) f(x) > 3 on (-0, -5) f(x) > 0 on (-3,3) f(x) <0 on (-5, -3) U (3,0) 8
7) (9 points) Sketch the graph of a function f(x) having the following given characteristics. Domain of f(x)=(-0,-5) U (-5,00) lim S(x) = -, and lim f(x) = 0 lim f(x) = 3 S'(x) >0 on (-00,-5) U (-5,0) f'(x) <0 on (0,0) "(x) > 0 on (- , - 5) f"(x) <0 on (-5,00) f(x) > 3 on (-0,-5) f(x) > 0 on (-3,3) f(x) <0 on (-5, -3) U (3,0)
17. Sketch the graph of an example of a function f that satisfies all of the given conditions. f(0) = 0, f(1) = 1, lim f(x) = 0, fis odd 1400 18. Sketch the graph of an example of a function f that satisfies all of the given conditions. lim, f(x) = 00, lim f(x) = 3, lim f(x) -3 2-2 29-00 100 19. Evaluate the limit and justify each step by indicating theappropriate properties of limits. 3.x2 - X+4....
9. [4 pts] Sketch a graph of a function that satisfies the following conditions lim f(x) = -0, lim f(x) = 0 and lim f(x) = 2. Answer the following questions based on your graph a. Find all the vertical asymptotes of f(x) if it exists. b. Find the horizontal asymptotes of f(x) if it exists.
6. Use the following information to answer this problem: f(-1) does not exist lim f(r)- 00 z-+-1- lim f(r)00 2-1+ f'(x) <0 for e (1, 00) f'(z)>0 for r e (-oo,-1)U (-1,1) f"(a)<o for z E (-1, 00) f" (a)>0 for z E (-00,-1) a) (6 pts) Label all of the important r-values derived from the information provided above on the number line below. Then indicate the intervals along this line where f'(r) and f"(r) are positive or negative. f"(z)...
Math 180 Exam 3 (Question 7) 7) (9 points) Sketch the graph of a function f(x) having the following given characteristics. Domain of f(x)=(-0,-5)U(-5,00) lim S(x)=-, and lim f(x)=0 lim f(x) = 3 X-00 F'(x) > 0 on (- 0,- 5) U(-5,0) f'(x) < 0on (0,0) F"(x) > 0 on (0, -5) "(x) <0 on (-5,0) f(x) >3 on (-0,-5) f(x) > 0 on (-3,3) f(x) < 0 on (- 5. - 3) U (3,-)
1. (6) Sketch the graph f a function f that satisfies all of the given conditions. lim )3, im ()5, lim , lim+ =-oo.lim2--5, f is continuous from the left at x--1. 2 1. (6) Sketch the graph f a function f that satisfies all of the given conditions. lim )3, im ()5, lim , lim+ =-oo.lim2--5, f is continuous from the left at x--1. 2
Sketch a graph of a function f(x) that satisfies each of these conditions. f (x) has a jump discontinuity at x = -3, and a displaced point at x = -1 f (x) is continuous on lim f( -oo) lim f(x 2) lim f(r oo) -0+ F-1) f(0)=0 (-oo, -3), -3, 1), (-1,0, (0, o lim f( -oo) lim f(x 2) lim f(r oo) -0+ F-1) f(0)=0 (-oo, -3), -3, 1), (-1,0, (0, o
Sketch the graph of a function with the following characteristics: f(-2) = ( f(0) = 1 f(3) = 0 f(4) = 1 Vertical Asymptote at x = 2 Horizontal asymptote at y = 3 + + - f' number line -2 0 2 3 + + - fnumber line -2 0 2 {Label any relative extrema and points of inflection}
Sketch the graph of f(x) given the following: lim f(x) = 2 f(-1) =1 f(1) =1 lim f(x) = DNE 1--1 -> A function f is continuous at a number a if lim y(x) = f(a) ca requires the following 3 things: