![]() ![]() The two important methods to find the local maximum is the first derivative test, and the second derivative test. What Are the Methods To Find Local Maximum? The relative maxima is the maximum point in the domain of the function, with reference to the points in the immediate neighborhood of the given points. The local maximum is a point within an interval at which the function has a maximum value. What Is the Difference Between Local Maximum and Relative Maxima? The first derivative test or the second derivative test is helpful to find the local maximum of the given function. Further, these turning points can be checked through different methods to find the local maximum. ![]() The local maximum is found by differentiating the function and finding the turning points at which the slope is zero. The following topics help for a better understanding of local maximum.įAQs on Local Maximum How Do You Find The Local Maximum? The maximum height reached by a ball, which has been thrown in the air and following a parabolic path, can be found by knowing the local maximum.For a parabolic equation, the local maximum helps in knowing the point at which the vertex of the parabola lies.The number of seeds to be sown in a field to get the maximum yield can be found with the help of the concept of the local maximum.In the food processing units, the humidity is represented by a function, and the maximum humidity at which the food is spoilt can be found using the local maximum.The voltage in an electrical appliance, at which it peaks can be identified with the help of the local maximum, of the voltage function.The price of a stock, if represented in the form of a functional equation and a graph, is helpful to find the points where the price of the stock is maximum.Let us find some of the important uses of the local maximum. The concept of local maximum has numerous uses in business, economics, engineering. If the second derivative is lesser than zero \(f''(x_2)Here if f ′(x) changes sign from positive to negative as x increases through c, i.e., if f ′(x) > 0 at every point sufficiently close to and to the left of c, and f ′(x) 0\), then the limiting point \((x_1)\) is the local minimum. Let the function f(x) be continuous at a critical point c in the interval I. we define a function f(x) on an open interval I. The first derivative test helps in finding the turning points, where the function output has a maximum value. Let us understand more details, of each of these tests. The first derivative test and the second derivative test are useful to find the local maximum. The local maximum can be identified by taking the derivative of the given function. ![]()
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