When f ‘(x) is negative, f(x) is
When f'(x) is negative, it means that the slope or gradient of the function f(x) is negative at that particular point x
When f'(x) is negative, it means that the slope or gradient of the function f(x) is negative at that particular point x. This indicates that as x increases, the function f(x) is decreasing.
In other words, when f'(x) is negative, the function f(x) is decreasing or getting smaller as x increases. This can be seen visually on a graph as a downward slope.
For example, let’s say we have a function f(x) = 3x^2. We take the derivative of f(x) to find f'(x) = 6x. Now, when f'(x) = 6x is negative, it means that x is negative because any negative value multiplied by 6 gives a negative result. Therefore, f(x) is decreasing or getting smaller as x becomes more negative.
In general, when f'(x) is negative, it signifies a decreasing behavior of the function f(x) in the neighborhood of that specific point x.
More Answers:
Understanding the Formal Definition of Derivatives: A Comprehensive Guide to Calculus FundamentalsUnderstanding the Alternate Definition of Derivatives: A Different Approach to Calculus
Understanding the Positive Derivative: Exploring Function Growth and Increased Values