What is Derivative of Cot x?
The derivative of cot x is -cosec2x. The derivative of cot x is one of the six trigonometric derivatives that we have to study. It is the differentiation of trigonometric function cotangent with respect to the variable x in the present case. If we have cot y or cot θ then we differentiate the cotangent with respect to y or θ respectively.
Learn,
Derivative of Cot x Formula
The formula of the derivative of cot x is given by:
(d/dx)[cot x] = -cosec2x
or
(cot x)’ = -cosec2x
Derivative of Cot x
Derivative of Cot x is -cosec2x. It refers to the process of finding the change in the sine function with respect to the independent variable. Derivative of cot x is also known as differentiation of cot x which is the process of finding rate of change in the cot trigonometric function.
In this article, we will learn about the derivative of cot x and its formula including the proof of the formula using the first principle of derivatives, quotient rule, and chain rule as well.