Domain: (-infinity,1) U (1,3) U (3, infinity) f'(x)>0 for (x < -3), and (-1 < x < 1). f'(x)<0 for (-3 < x < -1), (1 < x < 3), and (x > 3). f''(x)>0 for (-2 < x < 1), (1 < x < 2), and (x > 3). f''(x)<0 for (x < -2) and (2 < x < 3). Limits:  Limit of x as it approaches 1, f(x) approaches infinity. Limit of x as it approaches 3 from the left, f(x) approaches - infinity. Limit of x as it approaches 3 from the right, f(x) approaches infinity. Limit of x as it approaches infinity, f(x) approaches 2. Points: f(-1) = 4 f(2) = 1

Calculus: Early Transcendentals
8th Edition
ISBN:9781285741550
Author:James Stewart
Publisher:James Stewart
Chapter1: Functions And Models
Section: Chapter Questions
Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...
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I'm having a bit of confusion in figuring out the concavity when considering the first derivative (increasing or decreasing). Can you please sketch a graph that satsify the below requirements and explain why the concavity is the way it is in regard to the first derivative. I am aware that f''(x)>0 is concave up while f''(x)<0 is concave down.

 

Domain: (-infinity,1) U (1,3) U (3, infinity)

f'(x)>0 for (x < -3), and (-1 < x < 1).

f'(x)<0 for (-3 < x < -1), (1 < x < 3), and (x > 3).

f''(x)>0 for (-2 < x < 1), (1 < x < 2), and (x > 3).

f''(x)<0 for (x < -2) and (2 < x < 3).

Limits: 

  • Limit of x as it approaches 1, f(x) approaches infinity.
  • Limit of x as it approaches 3 from the left, f(x) approaches - infinity.
  • Limit of x as it approaches 3 from the right, f(x) approaches infinity.
  • Limit of x as it approaches infinity, f(x) approaches 2.

Points:

  • f(-1) = 4
  • f(2) = 1
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