Critical Numbers of Functions

Questions on the critical numbers of functions are presented below. These questions are designed to help you gain a deep understanding of critical numbers in calculus. Answers are also provided.

Questions and Solutions

Question 1

A critical number \(c\) of a function \(f\) is a number in the domain of \(f\) such that:

• (A) \(f'(c) = 0\)
• (B) \(f'(c)\) is undefined
• (C) (A) or (B) above
• (D) None of the above

Question 2

True or False: The function \(f(x) = |x|\) has no critical points.
Answer: False. The derivative is \[ f'(x) = \frac{x}{|x|} \] which is undefined at \(x = 0\). Therefore, \(x = 0\) is a critical point.

Question 3

True or False: If \(c\) is a critical number, then \(f(c)\) is either a local maximum or minimum.
Answer: False. For example, \(f(x) = x^3\) has a critical number at \(x = 0\), but \(f(0)\) is neither a local maximum nor minimum.

Question 4

True or False: If \(c\) is not a critical number, then \(f(c)\) is neither a local minimum nor maximum.
Answer: True. This is the contrapositive of Fermat's theorem: if \(f(c)\) is a local maximum or minimum, then \(c\) must be a critical number.

Question 5

The values of parameter \(a\) for which the function \[ f(x) = x^3 + ax^2 + 3x \] has two distinct critical numbers are in the interval:

• (A) \((- \infty , + \infty)\)
• (B) \((- \infty , -3] \cup [3 , +\infty)\)
• (C) \((0 , + \infty)\)
• (D) None of the above

Question 6

If \(f(x)\) has one critical point at \(x = c\), then:

• (A) \(f(x - a)\) has one critical point at \(x = c + a\)
• (B) \(-f(x)\) has a critical point at \(x = -c\)
• (C) \(f(kx)\) has a critical point at \(x = \frac{c}{k}\)
• (D) None of the above
• (E) (A) and (C) only

More references on calculus: questions with answers and tutorials and problems.