Find the intervals on which \( f(x) \) is increasing, the intervals on which \( f(x) \) is decreasing, and the local extrema. \( f(x)=x^{3}-27 x+4 \) Select the correct choice below and, if necessary, fill in the answer box to complete your choice. A. The function is increasing on (Type your answer in interval notation. Type integers or simplified fractions. Use a comma to separate answers as needed.) B. The function is never increasing.

To determine the intervals on which the function \( f(x) = x^3 - 27x + 4 \) is increasing or decreasing, as well as to find the local extrema, we will follow these steps: 1. **Find the derivative \( f'(x) \)** to determine the critical points. 2. **Set the derivative equal to zero** to find the critical points. 3. **Analyze the sign of the derivative** to determine where the function is increasing or decreasing. 4. **Identify the local extrema** based on the critical points. Let's start by calculating the derivative of \( f(x) \): \[ f'(x) = \frac{d}{dx}(x^3 - 27x + 4) \] Now, I will calculate the derivative. Simplify the expression by following steps: - step0: Solution: \(3x^{2}-27\) The derivative of the function is: \[ f'(x) = 3x^2 - 27 \] Next, we will set the derivative equal to zero to find the critical points: \[ 3x^2 - 27 = 0 \] Now, I will solve this equation for \( x \). Solve the quadratic equation by following steps: - step0: Solve using square roots: \(3x^{2}-27=0\) - step1: Add or subtract both sides: \(3x^{2}=27\) - step2: Divide both sides: \(\frac{3x^{2}}{3}=\frac{27}{3}\) - step3: Divide the numbers: \(x^{2}=9\) - step4: Simplify the expression: \(x=\pm \sqrt{9}\) - step5: Simplify the expression: \(x=\pm 3\) - step6: Separate into possible cases: \(\begin{align}&x=3\\&x=-3\end{align}\) - step7: Rewrite: \(x_{1}=-3,x_{2}=3\) The critical points are: \[ x_1 = -3 \quad \text{and} \quad x_2 = 3 \] Next, we will analyze the sign of the derivative \( f'(x) = 3x^2 - 27 \) in the intervals determined by the critical points: \( (-\infty, -3) \), \( (-3, 3) \), and \( (3, \infty) \). 1. **Choose test points** in each interval: - For \( (-\infty, -3) \), choose \( x = -4 \) - For \( (-3, 3) \), choose \( x = 0 \) - For \( (3, \infty) \), choose \( x = 4 \) 2. **Evaluate the sign of \( f'(x) \)** at these test points. Let's calculate \( f'(-4) \), \( f'(0) \), and \( f'(4) \). Calculate the value by following steps: - step0: Calculate: \(3\times 0^{2}-27\) - step1: Calculate: \(3\times 0-27\) - step2: Multiply the numbers: \(0-27\) - step3: Remove 0: \(-27\) Calculate or simplify the expression \( 3*(4)^2 - 27 \). Calculate the value by following steps: - step0: Calculate: \(3\times 4^{2}-27\) - step1: Multiply the terms: \(48-27\) - step2: Subtract the numbers: \(21\) Calculate or simplify the expression \( 3*(-4)^2 - 27 \). Calculate the value by following steps: - step0: Calculate: \(3\left(-4\right)^{2}-27\) - step1: Multiply the terms: \(48-27\) - step2: Subtract the numbers: \(21\) The evaluations of the derivative at the test points are as follows: - \( f'(-4) = 21 \) (positive) - \( f'(0) = -27 \) (negative) - \( f'(4) = 21 \) (positive) Now we can summarize the behavior of the function \( f(x) \): - On the interval \( (-\infty, -3) \), \( f'(x) > 0 \) (increasing). - On the interval \( (-3, 3) \), \( f'(x) < 0 \) (decreasing). - On the interval \( (3, \infty) \), \( f'(x) > 0 \) (increasing). ### Summary of Intervals: - The function is increasing on \( (-\infty, -3) \) and \( (3, \infty) \). - The function is decreasing on \( (-3, 3) \). ### Local Extrema: - At \( x = -3 \), there is a local maximum (since the function changes from increasing to decreasing). - At \( x = 3 \), there is a local minimum (since the function changes from decreasing to increasing). Now, let's summarize the answers: A. The function is increasing on: \[ (-\infty, -3) \cup (3, \infty) \] B. The function is never increasing: **False** (the function is increasing in the specified intervals). Thus, the final answer is: A. The function is increasing on \( (-\infty, -3) \cup (3, \infty) \).