Find the c value that satisfies the Mean Value Theorem of the function f (x) = x³ on the interval [0, 2]. c=

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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**Problem Statement:**

Find the \( c \) value that satisfies the Mean Value Theorem of the function \( f(x) = x^3 - x \) on the interval \([0, 2]\).

**Answer Box:**

\( c = \) [ ]

---

**Explanation:**

To solve this, you will apply the Mean Value Theorem which states that for a function \( f \) that is continuous on the closed interval \([a, b]\) and differentiable on the open interval \((a, b)\), there exists a number \( c \) in \((a, b)\) such that:

\[ f'(c) = \frac{f(b) - f(a)}{b - a} \]

For the given function \( f(x) = x^3 - x \):

1. **Find the derivative \( f'(x) \):**

   \[ f'(x) = 3x^2 - 1 \]

2. **Calculate \( f(a) \) and \( f(b) \):**

   - \( f(0) = 0^3 - 0 = 0 \)
   - \( f(2) = 2^3 - 2 = 8 - 2 = 6 \)

3. **Evaluate \(\frac{f(b) - f(a)}{b - a}\):**

   \[ \frac{6 - 0}{2 - 0} = \frac{6}{2} = 3 \]

4. **Set the derivative equal to the average rate of change and solve for \( c \):**

   \[ 3c^2 - 1 = 3 \]

   \[ 3c^2 = 4 \]

   \[ c^2 = \frac{4}{3} \]

   \[ c = \pm\sqrt{\frac{4}{3}} \]

However, since \( c \) must be in the interval \((0, 2)\), we only take the positive value:

\[ c = \sqrt{\frac{4}{3}} \]

---

Thus, the value of \( c \) that satisfies the Mean Value Theorem is \( c = \sqrt{\frac{4}{3}} \).
Transcribed Image Text:**Problem Statement:** Find the \( c \) value that satisfies the Mean Value Theorem of the function \( f(x) = x^3 - x \) on the interval \([0, 2]\). **Answer Box:** \( c = \) [ ] --- **Explanation:** To solve this, you will apply the Mean Value Theorem which states that for a function \( f \) that is continuous on the closed interval \([a, b]\) and differentiable on the open interval \((a, b)\), there exists a number \( c \) in \((a, b)\) such that: \[ f'(c) = \frac{f(b) - f(a)}{b - a} \] For the given function \( f(x) = x^3 - x \): 1. **Find the derivative \( f'(x) \):** \[ f'(x) = 3x^2 - 1 \] 2. **Calculate \( f(a) \) and \( f(b) \):** - \( f(0) = 0^3 - 0 = 0 \) - \( f(2) = 2^3 - 2 = 8 - 2 = 6 \) 3. **Evaluate \(\frac{f(b) - f(a)}{b - a}\):** \[ \frac{6 - 0}{2 - 0} = \frac{6}{2} = 3 \] 4. **Set the derivative equal to the average rate of change and solve for \( c \):** \[ 3c^2 - 1 = 3 \] \[ 3c^2 = 4 \] \[ c^2 = \frac{4}{3} \] \[ c = \pm\sqrt{\frac{4}{3}} \] However, since \( c \) must be in the interval \((0, 2)\), we only take the positive value: \[ c = \sqrt{\frac{4}{3}} \] --- Thus, the value of \( c \) that satisfies the Mean Value Theorem is \( c = \sqrt{\frac{4}{3}} \).
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