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Integration by parts can be used to evaluate complex integrals. For each equation, assign parts to variables following the equation below.

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Presentation on theme: "Integration by parts can be used to evaluate complex integrals. For each equation, assign parts to variables following the equation below."— Presentation transcript:

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2 Integration by parts can be used to evaluate complex integrals. For each equation, assign parts to variables following the equation below.

3 Take the problem below as an example. Assign parts of the integral to be either u or dv. To determine which part should be u, follow the acronym LIPET. Logarithms Inverses Polynomials Exponential Functions Trigonometry

4 In this equation, there are no logarithms or inverse functions, but there is a polynomial. Because of this, u=, and dv=sinx.

5 Now, we must solve for du and v. To do this, differentiate u and integrate dv.

6 Refer back to the equation given on the first slide, and substitute the corresponding parts accordingly.

7 In this case, we are left with another integral which is too complex, meaning we must integrate by parts again. Following the LIPET acronym, u=2x.

8 Substitute the parts from the second integration into the result from the first integration.

9 Finally, integrate the last part of the equation, yielding a final answer.

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