What is Integral of Sec x?
Integral of the secant function, denoted as ∫(sec x).dx represents the area under the curve of secant from a given starting point to a specific endpoint along the x-axis. Mathematically, the integral of secant function is commonly expressed as
∫(sec x).dx = ln| sec(x) + tan(x)| + C
where (C) represents the constant of integration. This integral often arises in calculus problems involving trigonometric functions and has various applications in fields such as physics, engineering, and mathematics.
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Integral of Sec x
Integral of sec x is ∫(sec x).dx = ln| sec x + tan x| + C. Integration of the secant function, denoted as ∫(sec x).dx and is given by: ∫(sec x).dx = ln| sec(x) + tan(x)| + C. Sec x is one of the fundamental functions of trigonometry and is the reciprocal function of Cos x. Learn how to integrate sec x in this article.
In this article, we will understand the formula of the integral of sec x, Graph of Integral of sec x, and Methods of Integral of sec x.
Table of Content
- What is Integral of Sec x?
- Integral of Sec x Formula
- Integral of Sec x by Substitution Method
- Integral of Sec x by Partial Method
- Integral of Sec x by Trigonometric Formula
- Integral of Sec x by Hyperbolic Functions