Answer: The integration of Sec2x is equal to (1/2) ln|Sec2x+tan2x|+C. So the formula for the integral of Sec 2x is given by
$\displaystyle \int \sec 2x~dx=\dfrac{1}{2}\ln|\sec 2x +\tan 2x|$ $+C$
where C denotes an integral constant.
Note: To find the integral of sec2x, we will use the integral of secx which is as follows: $\displaystyle \int \sec x~dx=\ln|\sec x +\tan x|$ $+C$.
What is the Integration of Sec2x?
Answer:
Here we need to find $\displaystyle \int \sec 2x~dx$.
Let us put $2x=z$. So $2dx=dz \Rightarrow dx=\dfrac{dz}{2}.$
Therefore, $\displaystyle \int \sec 2x~dx$
= $\displaystyle \int \sec z~\dfrac{dz}{2}$
= $\dfrac{1}{2}\displaystyle \int \sec z~dz$
= $\dfrac{1}{2}\ln|\sec z +\tan z|+C$
= $\dfrac{1}{2}\ln|\sec 2x +\tan 2x|+C$ as z=2x.
Comparison of Results
| Expression | Integral |
| sec(2x) | $\dfrac{1}{2}\ln|\sec 2x +\tan 2x|+C$ |
| sec2x | tan(x)+C |
| sec2(2x) | $\dfrac{1}{2}$ tan(2x)+C |
Also Study: Integral of sec2x
FAQs
Q1: What is the integral of sec2x?
Answer: The integral of sec2x is given by $\displaystyle \int \sec 2x~dx=\dfrac{1}{2}\ln|\sec 2x +\tan 2x|$ $+C$ where C is an arbitrary integration constant.