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SAT Derivative of Arctan And First Principle Formula with Examples
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Derivative of Arctan(x)
The derivative of the arctan function, often written as [latex]\frac{d}{dx}\left(\arctan(x)\right)[/latex], is the rate of change of the arctan function with respect to the variable [latex]x[/latex]. The derivative of arctanx is equal to [latex]\frac{1}{1+x^2}[/latex].
This result allows us to determine the slope or gradient of the arctan function at any point [latex]x[/latex] on its graph.
Arctan is the inverse tangent function, for example, if x and y are any variables then
Similarly,
Derivative of Arctan(x) Formula
Formula for derivative of Arctan function is
Derivative of Arctan(u)
The arctan function can also be applied to a function [latex]u[/latex] of [latex]x[/latex]. When we have [latex]u[/latex] as a function of [latex]x[/latex], the derivative of [latex]\arctan(u)[/latex] with respect to [latex]x[/latex] can be computed using the chain rule.
The formula for the derivative of [latex]\arctan(u)[/latex] is [latex]\frac{{du}}{{dx}} \cdot \frac{{1}}{{1 + u^2}}[/latex].
For example, let's consider [latex]u(x) = 3x^2 + 2x - 1[/latex].
The derivative of [latex]\arctan(u(x))[/latex] can be calculated as [latex]\frac{{d}}{{dx}} \arctan(3x^2 + 2x - 1) = \frac{{d}}{{dx}}(3x^2 + 2x - 1) \cdot \frac{{1}}{{1 + (3x^2 + 2x - 1)^2}}[/latex].
By differentiating [latex]u(x)[/latex] and substituting it into the formula, we can determine the derivative of [latex]\arctan(u)[/latex] for the given function [latex]u(x)[/latex].
Why is arctan differentiable?
The arctan function, also known as the inverse tangent function, is differentiable because it possesses a smooth and continuous graph. The arctan function is defined for all real numbers and its graph has no jumps.
Derivative of Arctan by Chain Rule
Let’s find the derivative of arctan by using the chain rule,
Step 1: Let’s take the function,
Step 2: Taking “tan” function on both sides of equation (1)
(by the law of inverse function) - Hence,
(equation 2)
Step 3: Differentiating equation 2 with respect to x,
Step 4: Now, according to the formula
Step 5: According to the chain rule,
Step 6: Using one of the trigonometric identities of
We get,
Step 7: Substituting y = arctan x , we finally get
Derivative of Arctan by First Principle
To find the derivative of arctan by first principle of derivatives,
Step 1: Let’s consider the function f(x), where x is a variable
Step 2: By the first principle in the given limit,
Step 3: We get the limit function as,
Step 4: Applying the evaluation of limits,
Solved Examples of Derivative of Arctan
Example 1: In a right-angled triangle if the base of the triangle is 5 units and the height of the triangle is 7 units, find the base angle.
Solution: In a right-angled triangle
The formula to find a base angle is given by,
= arctan (1.4)
=
Hence the base angle of a right-angled triangle is
Example 2: Find the derivative of y=arctan (4x).
Solution: Let f(x) = arctan (4x)
We know that,
Hence by chain rule,
Example 3: Find the derivative of
Solution:
Hence
By the chain rule,
The derivative of the given function is
Mastery of the derivative of arctan is essential in overcoming complex mathematical challenges, particularly in calculus and engineering sciences. Its smooth and well-behaved form lends itself well to practical applications such as signal processing and machine learning. Mastery of the derivative of arctan enables students to enhance their problem-solving ability and apply these principles in advanced mathematics with assurance.
Derivative of Arctan FAQs
Is arctan differentiable?
Arctan is a differentiable quantity.
What is the derivative of ln arctan?
Is arctan the same as inverse tan?
Yes, Arctan and inverse tan are the same quantities.
How do you convert arctan to tan?
We can convert arctan to tan by using Tan (arctan x) = arctan (tan x).
How do you convert arctan to degrees?
Multiplying the result by
Is arctan ever undefined?
If the value of the function “x” = 0, then arctan becomes undefined.