Integral of e^sqrt(x) | Summary and Q&A
TL;DR
Learn how to find the integral of e raised to the square root of X through u substitution and integration by parts.
Key Insights
- 💄 U substitution is a technique used to simplify integrals by making a substitution for a variable.
- ✊ The power rule is used to find the derivative of a function with a variable raised to a constant power.
- 🥳 Integration by parts is a method that involves breaking down the integral of a product into two parts and using a formula to simplify it.
- 🎓 The formula for integration by parts is integral u * dv = u * v - integral v * du.
Transcript
in this video we're going to talk about how to find the integral of e raised to the square root X DX so how can we do it well first we need to start with u substitution we're gonna make u equal to the square root of x and the square root of x is basically x raised to the one half so now we'll need to find D u used in a power rule so it's gonna be 1... Read More
Questions & Answers
Q: How do we find the integral of e raised to the square root of X?
To find the integral, start with u substitution by letting u equal the square root of X, then apply integration by parts using the formula integral u * dv = u * v - integral v * du.
Q: What is the next step after isolating dx and replacing variables?
The next step is to apply integration by parts by using the formula integral u * dv = u * v - integral v * du. In this case, u is equal to u and v is equal to e to the u.
Q: How do we simplify the integral expression after applying integration by parts?
After distributing the constant 2 and simplifying the integral expression, it becomes 2u * e to the u - 2 * e to the u + C.
Q: How do we find the final answer for the integral of e to the square root of X DX?
To find the final answer, replace the u variable with the square root of X in the simplified expression, resulting in 2 square root X * e to the square root X - 2e to the square root X + C.
Summary & Key Takeaways
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Start with u substitution by letting u equal the square root of X.
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Use the power rule to find du, which becomes 1/2X^(1/2).
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Multiply both sides of the equation by 2 square root X to isolate dx, resulting in dx on the right side.
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Replace the square root of X with the variable u and dx with 2 square root X du.
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Apply integration by parts by using the formula integral u * dv = u * v - integral v * du.