Derivative Calculator

The derivative calculator is a free online tool that displays the derivative of the given function. BYJU’S online derivative calculator tool makes the calculations faster, and it shows the first, second, third-order derivatives of the function in a fraction of seconds.

How to Use the Derivative Calculator?

The procedure to use the derivative calculator is as follows:

Step 1: Enter the function in the respective input field and choose the order of derivative

Step 2: Now click the button “Calculate” to get the derivative

Step 3: The derivative of the given function will be displayed in the new window

What is the Derivative of a Function?

In calculus, one of the basic concepts is the derivative of a function. It occupies the central concept in calculus. We know that differentiation and integration are the two important concepts. Differentiation is the process of finding the derivative of a function, whereas integration is the process of finding the antiderivative of a function. The derivative of a function describes the rate of change. That means that it shows the amount by which the function is changing at the given point.

Standard Form

The standard form to represent the derivative of a function is given below:

An infinitesimal change in the variable “x” is denoted by dx. Thus, the derivative of the variable “y” with respect to the variable “x” is given by dy/dx.

Frequently Asked Questions on The derivative calculator

What is the derivative of zero?

In calculus, differentiation is the process of finding the derivative of a function. We know that the differentiation of any constant value is zero. Thus, the derivative of 0 is 0.

What are the different methods to find the derivatives?

The different methods to find the derivative of a function are as follows:

  • Calculating the derivative by definition
  • Product Rule
  • Chain Rule
  • Implicit Differentiation
  • Quotient Rule

Define the first and second-order derivative.

Graphically, the first-order derivative defines the slope of the given function at a point. The second-order derivative explains how the slope changes over the independent variable for the given function.

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