Find the general indefinite integral.
{eq}\displaystyle \int \left (\theta - \csc \theta \cot \theta \right)\ d \theta {/eq}.
Question:
Find the general indefinite integral.
{eq}\displaystyle \int \left (\theta - \csc \theta \cot \theta \right)\ d \theta {/eq}.
Indefinite Integrals:
The problems related to the indefinite integrals are solved using the simple anti-derivative rules. An arbitrary constant is always added at the last of computation in the indefinite integrals.
Answer and Explanation: 1
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To compute: {eq}\displaystyle \int \left (\theta - \csc \theta \cot \theta \right)\ \text d \theta
{/eq}.
Now using the rules:
- {eq}\displaystyle\in...
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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.