Indefinite Integral of 7^lnx | Summary and Q&A
TL;DR
Learn how to find the indefinite integral of 7 raised to the natural log of X.
Key Insights
- ✊ The indefinite integral of 7 raised to the natural log of X can be found by replacing 7 with e raised to the ln 7 and applying the power rule.
- 👻 Switching the exponents allows for easier manipulation of the equation.
- 🧑💻 The final answer involves multiplying 7 raised to the natural log of X with X and dividing by 1 plus the natural log of 7, and adding a constant of integration.
- ✊ The power rule is applicable to finding the indefinite integral of a variable raised to a constant.
Transcript
consider this problem what is the indefinite integral of 7 raised to the natural log of X feel free to try this problem now what we need to do is adjust this equation we could replace 7 with e raised to the ln 7 the base of the natural log is e and these two they cancel given a 7 so for instance 5 is equal to e raised to the ln 5 so that's our firs... Read More
Questions & Answers
Q: What is the indefinite integral being evaluated in this problem?
The indefinite integral being evaluated is 7 raised to the natural log of X.
Q: How is the equation simplified in the first step?
The equation is simplified by replacing 7 with e raised to the ln 7.
Q: What is the significance of switching the exponents?
Switching the exponents allows for the application of the power rule, making it easier to find the indefinite integral.
Q: What is the final answer to the problem?
The final answer to the problem is 7 raised to the natural log of X times X divided by 1 plus the natural log of 7, plus a constant of integration.
Summary & Key Takeaways
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The problem involves finding the indefinite integral of 7 raised to the natural log of X.
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By replacing 7 with e raised to the ln 7, the equation can be simplified.
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Switching the exponents and using the power rule, the indefinite integral is determined to be 7 raised to the natural log of X times X divided by 1 plus the natural log of 7, plus a constant of integration.