critical points
-places on a graph where the derivative equals 0 or is undefined-take derivative; set derivative equal to 0 and solve; find values where the derivative is undefined
Critical points are points on a function where either the slope of the tangent line is zero or the derivative of the function does not exist. Critical points can provide important information about the behavior of a function, such as determining its maximum and minimum values.
To find the critical points of a function, we need to take the derivative of the function and set it equal to zero. In other words, we are looking for values of x where the derivative is either zero or undefined.
Once we have identified the critical points, we can use the first or second derivative test to determine whether those points correspond to a maximum, minimum or inflection point. The first derivative test involves analyzing the sign of the derivative function on either side of the critical point, while the second derivative test involves analyzing the concavity of the function at the critical point.
It is important to note that not all critical points correspond to a maximum or minimum. In some cases, a critical point may be an inflection point, where the curvature of the function changes from concave up to concave down or vice versa.
Overall, understanding critical points is an important part of analyzing the behavior of functions, particularly in applications such as optimization and curve fitting.
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