Indefinite Integral | Summary and Q&A
TL;DR
The indefinite integral of x cos^2(x) tan(x) can be found by simplifying the expression, using the double-angle formula, and applying integration by parts.
Key Insights
- 😑 Simplification of the expression is an important step in finding the indefinite integral.
- 👨💼 The double-angle formula provides a useful substitution for sine and cosine terms.
- 🥳 Integration by parts is a valuable technique for solving complex integrals.
- ❓ Understanding the properties and derivatives of trigonometric functions is crucial in solving integral problems.
Transcript
what is the indefinite integral of x cosine squared x times tangent x feel free to try this problem if you want to go ahead and pause the video take a minute to work on it now the first thing we need to do is simplify if possible cosine squared is basically cosine x times cosine x tangent is sine divided by cosine so at this point we can cancel a c... Read More
Questions & Answers
Q: How do we simplify the expression x cos^2(x) tan(x)?
We can simplify the expression by canceling out a cosine term, which transforms it into x sin(x) cos(x).
Q: What is the double-angle formula used in this problem?
The double-angle formula used is sine 2x = 2sin(x)cos(x), which is derived from sine squared x + cosine squared x = 1.
Q: What is the formula for integration by parts?
The formula for integration by parts is ∫udv = uv - ∫vdu, where u and v are functions of x.
Q: How is integration by parts applied in this problem?
In this problem, x is chosen as the u variable and sin(2x)dx is chosen as dv. By substitution and integration, the final result is obtained.
Summary & Key Takeaways
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The first step is to simplify the expression by cancelling out a cosine term.
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The double-angle formula is used to replace sine and cosine terms, resulting in the expression one-half sine 2x.
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Integration by parts is then applied to find the integral of the simplified expression.