- #1
tandoorichicken
- 245
- 0
How do I do this
[tex]
\int x\sqrt[3]{x-1}\,dx
[/tex]
?
[tex]
\int x\sqrt[3]{x-1}\,dx
[/tex]
?
\int x\sqrt[3]{x-1}\,dx?The first step in solving this integration problem is to use the power rule to rewrite \sqrt[3]{x-1} as (x-1)^{1/3}. Then, we can use integration by parts or substitution to evaluate the integral.
No, the power rule alone cannot be used to solve this integration problem. It requires additional techniques such as integration by parts or substitution.
The purpose of solving integration problems is to find the antiderivative of a given function. This allows us to find the original function from its derivative and to calculate the area under a curve.
One tip for solving this integration problem is to try substitution with u = x-1. Additionally, keeping track of the power of x in the original function can help determine the best approach for solving the problem.
You can check your solution by taking the derivative of the antiderivative you found. If the derivative is equal to the original function, then your solution is correct. You can also use online integration calculators or ask a math tutor for verification.