Understanding Decreasing Functions: Analyzing the Negative Derivative and Behavior of Functions

When f ‘(x) is negative, f(x) is

When the derivative of a function f(x), f'(x), is negative, it means that the function is decreasing

When the derivative of a function f(x), f'(x), is negative, it means that the function is decreasing.

Let’s understand this concept further:
– If f'(x) < 0 for all x in the domain, then the function f(x) is continuously decreasing. This means that as x increases, f(x) decreases. - If f'(x) < 0 over a specific interval, it indicates that the function is decreasing on that interval, but it could be increasing or constant on other intervals. To illustrate this, let's take an example: Consider the function f(x) = x^2 - 3x. We will find the derivative and analyze the sign of f'(x) to understand how f(x) behaves. 1. Calculate f'(x): To find the derivative of f(x), we apply the power rule and constant rule: f'(x) = d/dx(x^2 - 3x) = 2x - 3 2. Analyze the sign of f'(x): To determine the intervals where f(x) is increasing or decreasing, we solve the inequality f'(x) < 0: 2x - 3 < 0 Solving the inequality: 2x < 3 x < 3/2 So, f'(x) is negative (less than zero) when x < 3/2. 3. Determine the behavior of f(x): Since f'(x) < 0 when x < 3/2, we can conclude that f(x) is a decreasing function on the interval (−∞, 3/2). This means that as x increases from negative infinity (−∞) to 3/2, the values of f(x) decrease. In summary, when the derivative of a function f'(x) is negative, such as in the example above, it indicates that the function f(x) is decreasing.

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