Derivative of log x FAQs
What is derivative?
The derivative of the function is defined as the rate of change of the function with respect to a variable.
What is formula for derivative of log x?
Formula for derivative of log x is (d/dx) ( log x) = 1 / ( x ln 10 )
What is derivative of – log x?
The derivative of – log x is (d/dx) ( -log x) = -1 / ( x ln 10 )
What are different methods to prove derivative of log x ?
The different methods to prove derivative of log x are:
- By using the First Principle of Derivative
- By using Implicit Differentiation Method
- By using ln x Formula
What is derivative of ln x?
The derivative of ln x is (d/dx) ( ln x) = 1 / x
Derivative of Log x: Formula and Proof
Derivative of log x is 1/x. Log x Derivative refers to the process of finding change in log x function to the independent variable. The specific process of finding the derivative for log x functions is referred to as logarithmic differentiation. The function log x typically refers to the natural logarithm of x, which is the logarithm to the base e, where e is Euler’s number, approximately equal to 2.71828.
Let’s know more about Derivative of Log x formula and proof in detail below.
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