How Do You Integrate ∫x²e^(-2|ax|) dx with Absolute Values?

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Homework Help Overview

The problem involves integrating the function ∫x²e^(-2|ax|) dx, which includes an absolute value in the exponent. The subject area pertains to calculus, specifically integration techniques.

Discussion Character

  • Exploratory, Assumption checking, Mathematical reasoning

Approaches and Questions Raised

  • Participants discuss integration by parts as a potential method, with one noting difficulties leading to more complex integrals. There are attempts to substitute variables to simplify the integral, and questions arise about how to handle the absolute value in the expression.

Discussion Status

The discussion is ongoing, with various strategies being suggested, including integration by parts and factoring out constants. Some participants emphasize the importance of considering the absolute value, while others inquire about the presence of limits for the integral.

Contextual Notes

There is uncertainty regarding the treatment of the absolute value and whether limits are provided for the integral, which may affect the approach taken.

Felicity
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Homework Statement



∫x2e-2|ax| dx


The Attempt at a Solution



tried to integrate by parts but I just ended up with a more difficult integral including an x3 times the e-2|ax|

I've also tried substituting y=2ax

to get 1/(2a)∫y2e-y dx

but where do i go from there? and can I just ignor the absolute value?


Can anybody recommend another strategy? How can I accommodate the absolute value?

Thank you
 
Last edited:
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Well, yeah...intergrate by parts! and try to reduce x^2! that is write e^(whatever) as the u'...so that when you apply the formula, you actually differentiate x^2...thus making it 2x...then do it again...and make it 2...then you will have nothing more than an integral with e(whatever that was)...You were just applying the formula wrong...and probably writing x^2 as (1/3*x^3)' ...DONT DO THAT! =)
 
OH YEAH! DONT IGNORE THE ABSOLUTE VALUE...cause e^(-x) is a lot different that e^(x)...do you have limits on that integral?
 
Just factor out a: [tex]|ax| = |a||x|[/tex]. Keep the absolute sign there. Integration by parts works fine. Just do it twice.
 
Thank you!
 

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