Profile
Settings
Refer your friends
Sign out
The differentiation of trigonometric functions is the term used to describe the process of determining the derivatives of trigonometric functions. Or, to put it another way, calculating the rate of change of a trigonometric function with respect to a variable is what differentiation of trigonometric functions is all about. The differentiation formulas for the six trigonometric functions can be utilised in a variety of applications of the derivative, and they are available for download here.
The six fundamental trigonometric functions are as follows: sine (sin x), cosine (cos x), tangent (tan x), cotangent (cot x), secant (sec x), and cosecant (cosec x), respectively (cosec x). It is the purpose of this article to present the derivatives of the trigonometric functions, along with their proofs. Differentiation of trigonometric functions has applications in a variety of domains, including electronics, computer programming, and the modelling of various cyclic functions, among others.
Among the most significant branches of mathematics, trigonometry is one in which we examine the relationship between the sides and angles of a triangle. Trigonometric functions are used to determine how the angles of a triangle are connected to the sides of the triangle. Circular functions, goniometric functions, and angle functions are some of the various names for trigonometric functions. Trigonometric functions, on the other hand, are often employed to describe this type of function. The trigonometric functions sine, cosine, tangent, cotangent, co-secant, and secant are the most often seen. Inverse trigonometric functions are the inverse functions of trigonometric functions, which are the inverse functions of trig functions. Inverse trigonometric functions are also referred to as arcus functions, cyclometric functions, and anti trigonometric functions, among other names.
Let us first determine the derivatives of several popular trigonometric functions before proceeding to the examples. The most effective strategy is usually to memorise them because they are utilised to discriminate between different types of functions that including trigonometric functions.
Differentiation of trigonometric functions :
Division of trigonometric functions is a mathematical procedure for estimating the rate of change of trigonometric functions with respect to a variable angle in trigonometry, which is referred to as the differentiation of trigonometric functions. It is possible to differentiate trigonometric functions using the derivatives of sin x and cos x by using the quotient rule for the derivatives of these two trigonometric functions. The differentiation formulas for each of the six trigonometric functions are provided in the following table:
To write the derivatives, we employ the d/dx notation. Using this notation, the tri derivatives are shown in the following table.
Application for differentiation of trigonometric functions :
Differentiation of trigonometric functions has a wide range of applications in both mathematics and real life, as seen in the following examples. Following is a list of some of them, which includes:
To get the slope of a tangent line to the trigonometric curve y=f, which is also a function of time, it is necessary to first find the slope of the trigonometric curve (x).
It is used to find the slope of a normal line drawn across a trigonometric curve y = f, for example (x).
It aids in the determination of the equation of a curve’s tangent line or normal line, among other things.
Differentiation of trigonometric functions has applications in a variety of domains, including electronics, computer programming, and the modelling of various cyclic functions, among others.
When determining the maximum and lowest values of certain functions, we employ the derivatives of trigonometric functions.
Inverse trigonometric functions can be differentiated :
Inverse trigonometric functions are differentiated by putting the function equal to y and using implicit differentiation. Let us enumerate the derivatives of the inverse trigonometric functions (arcsin x, arccos x, arctan x, arccot x, arcsec x, and arccosec x) together with their domains:
Example :
•Using the chain rule, demonstrate the differentiation of the trigonometric function cos x.
Solution : The differentiation chain rule is (f(g(x)))’ = f'(g(x)). g’(x). Now, in order to calculate the derivative of cos x using the chain rule, we will employ the following trigonometric properties and identities:
Using the three trigonometric characteristics described above, we can express the derivative of cos x as the derivative of sin (π/2 – x), or d(cos x)/dx = d (sin (π/2 – x))/dx. Applying the chain rule, we have
Using the chain rule, we have determined that the derivative of cos x is -sin x.
Conclusion :
The differentiation of trigonometric functions is the term used to describe the process of determining the derivatives of trigonometric functions. Or, to put it another way, calculating the rate of change of a trigonometric function with respect to a variable is what differentiation of trigonometric functions is all about. Division of trigonometric functions is a mathematical procedure for estimating the rate of change of trigonometric functions with respect to a variable angle in trigonometry, which is referred to as the differentiation of trigonometric functions. It is possible to differentiate trigonometric functions using the derivatives of sin x and cos x by using the quotient rule for the derivatives of these two trigonometric functions.
