Conclusion of Differentiation Formulas
Differentiation formulas are essential tools in calculus that help us find the rate at which things change. By using these formulas, we can determine the slope of a curve at any point, understand how one variable affects another, and solve many real-world problems involving rates of change. These formulas simplify the process of finding derivatives, making it easier to analyze and predict the behavior of various functions.
Differentiation Formulas
Differentiation Formulas: Differentiation allows us to analyze how a function changes over its domain. We define the process of finding the derivatives as differentiation. The derivative of any function f(x) is represented as d/dx.f(x)
In this article, we will learn about various differentiation formulas for Trigonometric Functions, Inverse Trigonometric Functions, Logarithmic Functions, etc., and their examples in detail.
Table of Content
- What is Differentiation?
- Differentiation Formula
- Basic Differentiation Formulas
- Differentiation of Trigonometric Functions
- Differentiation of Inverse Trigonometric Functions
- Differentiation of Hyperbolic Functions
- Differentiation Rules
- Differentiation of Special Functions
- Implicit Differentiation
- Higher Order Differentiation
- Examples of Differentiation Formulas
- Practice Problems on Differentiation Formulas