SECOND DERIVATIVE Meaning and
Definition
-
The second derivative, in the realm of calculus, is a mathematical tool used to measure the rate of change of the rate of change of a function. It represents the derivative of the derivative of a given function with respect to the independent variable, usually denoted as f''(x) or d²y/dx².
The second derivative grants additional insight into the behavior of a function by revealing information about its concavity or convexity. It helps identify key points like inflection points or local maxima/minima on a graph.
When the second derivative is positive at a specific point, it implies that the function is concave upward and has a local minimum at that point. Conversely, if the second derivative is negative, the function is concave downward, indicating a local maximum.
In terms of interpreting the second derivative numerically, the value can reflect how quickly the slope of the function's graph is changing. A positive second derivative implies the original function's graph is becoming steeper, while a negative second derivative signifies decreasing steepness.
Moreover, the second derivative test provides a valuable method for categorizing critical points as maxima, minima, or saddle points. By evaluating the sign of the second derivative at each critical point, it is possible to determine the nature of the critical points and gain insight into the overall shape and behavior of the original function.
Etymology of SECOND DERIVATIVE
The word "second" in "second derivative" refers to the second order of differentiation.
The term "derivative" comes from the Latin word "derivare", which means "to draw off or derive from". In mathematics, a derivative is a measure of how a function changes as its input value changes.
The concept of differentiation was introduced by Sir Isaac Newton and Gottfried Wilhelm Leibniz in the late 17th century. They developed a notation for derivatives using "d" to represent infinitesimally small changes.
The term "second derivative" specifically refers to the rate at which the slope of a function is changing. The first derivative measures the rate of change of the function itself, while the second derivative measures the rate of change of the first derivative.
