Find the indefinite integral.
{eq}\displaystyle \int \dfrac {1}{2} (\csc^2 x - \csc x \cot x)\ dx {/eq}.
Question:
Find the indefinite integral.
{eq}\displaystyle \int \dfrac {1}{2} (\csc^2 x - \csc x \cot x)\ dx {/eq}.
Indefinite integrals:
The indefinite integral can be executed using different methods especially when we can apply integration techniques. For one, when it is pretty difficult to directly apply the integral over the integrant, we must automatically explore the possibility of having to apply integration techniques.
Answer and Explanation: 1
Become a Study.com member to unlock this answer! Create your account
View this answerEvaluate the given integral. We can directly apply the integral over the terms of the integrand. We proceed with the solution.
{eq}\begin{align} \di...
See full answer below.
Learn more about this topic:
from
Chapter 7 / Lesson 14Learn the concept and rules of indefinite and definite integrals, as well as how to find an indefinite integral through examples. View a table of integrals.