relative minimum
In mathematics, a relative minimum is a point on a function where the value of the function is lower than all the nearby points within a limited interval
In mathematics, a relative minimum is a point on a function where the value of the function is lower than all the nearby points within a limited interval. More formally, let’s consider a function f(x) defined on an open interval (a, b) with a local minimum at c, where a < c < b. We say that f(c) is a relative minimum if there exists an interval (c - δ, c + δ) such that f(c) ≤ f(x) for all x in the interval (c - δ, c + δ), except possibly for x = c. To determine the relative minimum of a function, we usually use techniques from calculus, such as finding the critical points and checking for the concavity of the function. Here's a step-by-step guide on how to find the relative minimum of a function: 1. Calculate the derivative of the function f(x) to find the critical points. Critical points occur where the derivative is either zero or undefined. Set f'(x) = 0 and solve for x to find these points. 2. Once you have the critical points, check the concavity. The concavity can be determined by calculating the second derivative f''(x). If f''(x) > 0 in the interval around the critical point, then the function is concave up, indicating a relative minimum. If f”(x) < 0 in the interval around the critical point, then the function is concave down, which could indicate a relative maximum. 3. After identifying the critical points and checking the concavity, evaluate f(x) at each critical point. Compare the function values at these points and the values of nearby points. The point with the lowest value would be the relative minimum. 4. Check the boundaries of the interval. If the interval (a, b) is closed or half-closed, you should also check the function values at the endpoints a and b. One of these points might yield the relative minimum if it has a lower value than the critical points. Remember that the concept of relative minimum applies to local/neighborhood behavior. It means that the point represents a low point within some interval, but it does not necessarily mean it is the absolute lowest point on the entire function's domain. Lastly, it is important to note that these steps provide a general guideline for finding relative minima, but there could be exceptions or additional considerations depending on the complexity of the function.
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