Limit Definition of Derivative
The limit definition of derivative is a mathematical expression that defines the derivative of a function at a particular point
The limit definition of derivative is a mathematical expression that defines the derivative of a function at a particular point. The derivative of a function represents the rate at which the function is changing at that point.
Let’s consider a function f(x) and a specific point a. The limit definition of derivative states that the derivative of f(x) at point a is given by the limit of the difference quotient as x approaches a:
f'(a) = lim (f(x) – f(a))
x->a ————-
(x – a)
In this expression, (f(x) – f(a))/(x – a) represents the average rate of change of the function over a small interval around a. As x approaches a, this expression approaches the instantaneous rate of change of the function at a.
To understand this definition better, let’s break it down further:
1. Choose a point a: The derivative is calculated at a specific point on the function.
2. Find the difference quotient: Subtract the value of the function at point a (f(a)) from the value of the function at a general point x (f(x)), and divide it by the difference between x and a (x – a).
3. Take the limit: As x approaches a, calculate the limit of the difference quotient. This represents the instantaneous rate of change of the function at point a.
The derivative of a function provides information about the slope of the function’s graph at a given point. It can be used to determine whether the function is increasing or decreasing at that point and to find tangent lines or slopes of curves.
Using the limit definition of derivative, we can calculate derivatives and understand the behavior of functions extensively.
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