How can I easily derive this tricky integral?

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Homework Help Overview

The discussion revolves around deriving a specific integral involving the expression \(\int \frac{dx}{\sqrt{x^2 + a^2}}\). Participants are exploring different approaches and interpretations related to this integral.

Discussion Character

  • Exploratory, Conceptual clarification, Mathematical reasoning

Approaches and Questions Raised

  • Some participants question the original poster's approach, suggesting that the integral may be related to the arctangent function rather than the logarithmic form presented. Others propose using hyperbolic functions or trigonometric substitutions as alternative methods for deriving the integral.

Discussion Status

The discussion is active, with participants offering different perspectives on the integral's derivation. There are suggestions for alternative methods, but no consensus has been reached regarding the correct approach or interpretation.

Contextual Notes

Participants are navigating potential misunderstandings about the integral's form and are considering various mathematical techniques, including substitutions and function properties, without resolving the discrepancies in their interpretations.

orthovector
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does anybody know how to derive this integral?

[tex]\int \frac{dx}_{\sqrt{x^2 + a^2}}[/tex] [tex]= ln(x+ \sqrt{x^2 + a^2})[/tex]
 
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Looks like you already took it, wrongly. Looks more to me like an arctan. Some things are worth memorizing. Not all, but some.
 
Dick said:
Looks like you already took it, wrongly. Looks more to me like an arctan. Some things are worth memorizing. Not all, but some.

corrections are made above.
 
The easy way is to use hyperbolic functions. Substitute x=a*sinh(t). Then figure out what the arcsinh function looks like by solving a quadratic. Otherwise a trig substitution like x=a*tan(t).
 

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