Integrating a Tricky Rational Function with Substitution

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utkarshakash
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Homework Statement


[itex]\displaystyle \int^∞_0 \dfrac{dx}{a^2 + \left(x-\frac{1}{x} \right)^2}[/itex] a>=2


The Attempt at a Solution



[itex]\displaystyle \int^∞_0 \dfrac{x^2 dx}{x^2a^2 + (x^2-1)^2}[/itex]
 
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utkarshakash said:

Homework Statement


[itex]\displaystyle \int^∞_0 \dfrac{dx}{a^2 + \left(x-\frac{1}{x} \right)^2}[/itex] a>=2


The Attempt at a Solution



[itex]\displaystyle \int^∞_0 \dfrac{x^2 dx}{x^2a^2 + (x^2-1)^2}[/itex]

Put ##\displaystyle x=\frac{1}{t}## in the given integral. :wink:
 
utkarshakash said:

Homework Statement


[itex]\displaystyle \int^∞_0 \dfrac{dx}{a^2 + \left(x-\frac{1}{x} \right)^2}[/itex] a>=2


The Attempt at a Solution



[itex]\displaystyle \int^∞_0 \dfrac{x^2 dx}{x^2a^2 + (x^2-1)^2}[/itex]

Not sure about Pranav's hint but here is how I would have done it:

Making a tricky substitution of,

1/t = x-1/x

OR

In your attempt at solution, expand the denominator, then write numerator as x2-1+1, break the denominator, then in each integrand, divide both sides by x2, try making the denominator the perfect square, then in term like Y2 in the denominator, let Y=t...etc..