With respect to the derivative of f(x), when do relative maximums occur?
Relative maximums of a function occur when its derivative changes from positive to negative
Relative maximums of a function occur when its derivative changes from positive to negative. In other words, at a point where the derivative changes its sign from positive (increasing) to negative (decreasing), we have a relative maximum.
To understand this concept, we need to know a few key definitions:
1. Derivative: The derivative of a function f(x) represents its rate of change at any given point. It gives us information about how the function is changing (increasing or decreasing) at each point.
2. Positive and Negative Derivative: If the derivative of a function is positive at a particular point, it means the function is increasing at that point. If the derivative is negative, it means the function is decreasing.
3. Relative Maximum: A relative maximum of a function occurs at a point where the function reaches a peak value in its local neighborhood. In other words, in a small interval around that point, the function is not higher at any other point.
Now, back to the original question: when does a relative maximum occur with respect to the derivative of f(x)? As mentioned earlier, a relative maximum occurs when the derivative changes from positive to negative.
Let’s suppose f(x) is a function that is differentiable (has a well-defined derivative) in some interval I. If at a certain point c in I, the derivative of f(x) changes its sign from positive to negative, then there is a relative maximum at x = c.
To summarize, relative maximums occur at points where the derivative changes from positive to negative. Keep in mind that this explanation assumes the function is differentiable and satisfies certain conditions, such as continuity and smoothness, within the interval of consideration.
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