A Step-by-Step Guide to Finding the Integral of sec²(x) using Integration by Substitution

integral of sec²x

The integral of sec²(x) can be found by using a technique called integration by substitution

The integral of sec²(x) can be found by using a technique called integration by substitution. Here’s how:

Let’s start by using a trigonometric identity to rewrite sec²(x). The identity we will use is:

sec²(x) = 1 + tan²(x)

Now, let’s rewrite the integral:

∫sec²(x) dx = ∫(1 + tan²(x)) dx

Now, we can split this integral into two separate integrals:

∫(1 + tan²(x)) dx = ∫1 dx + ∫tan²(x) dx

The first integral, ∫1 dx, is simply the integral of a constant, which is x:

∫1 dx = x + C1 (C1 is the constant of integration)

The second integral, ∫tan²(x) dx, requires the use of a trigonometric identity. The identity we will use is:

tan²(x) = sec²(x) – 1

Now, let’s rewrite the integral again:

∫tan²(x) dx = ∫(sec²(x) – 1) dx

∫tan²(x) dx = ∫sec²(x) dx – ∫1 dx

Substituting back the original integral, we have:

∫tan²(x) dx = ∫sec²(x) dx – x

Now, we can solve for the integral of sec²(x):

∫sec²(x) dx = ∫tan²(x) dx + x

Finally, using a trigonometric identity, we can simplify the integral of tan²(x):

Using the identity tan²(x) = sec²(x) – 1:

∫sec²(x) dx = ∫(sec²(x) – 1) dx + x

∫sec²(x) dx = ∫sec²(x) dx – ∫1 dx + x

Rearranging the equation, we get:

0 = – ∫1 dx + x

∫1 dx = x + C2 (C2 is another constant of integration)

Therefore, the integral of sec²(x) is:

∫sec²(x) dx = tan(x) + x + C (where C = C1 + C2)

So, the final answer is:

∫sec²(x) dx = tan(x) + x + C, where C is the constant of integration.

More Answers:
Integration Guide | How to Find the Integral of csc(x)cot(x) using Substitution
The Step-by-Step Guide to Finding the Integral of sec(x)tan(x) Using U-Substitution
Solving the Integral of csc²x Using Trigonometric Identities and Integration Techniques

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