How do you integrate $int 2/sqrt(x^2-4)dx$ using trigonometric substitution?

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Answer 1 · 2016-06-28T20:18:37

Use x = 2*sec(u) as a first substitution.

With $x = 2*sec(u), therefore dx = 2*sec(u)*tan(u)$

$sqrt(x^2 - 4) = sqrt(4*sec^2(u) - 4) = 2*sqrt(sec^2(u) - 1)$

From $sin^2(a) + cos^2(a) = 1$ , divide through by $cos^2(a)$ to obtain

$tan^2(a) + 1 = sec^2(a)$

So, we have:

$int 2/(sqrt(x^2-4) dx$ $= int (4*sec(u)*tan(u))/(2sqrt(tan^2(u))$ $du$

So, integral of $2*int sec(u) du$

Multiply numerator and denominator by $sec(u) + tan(u)$ to obtain

$2*int (sec^2(u) + sec(u)*tan(u))/(sec(u) + tan(u)) du$

Use substitution $r = sec(u) + tan(u)$ which gives

$2*int (dr)/r$

$= 2*ln(r) + C$

$= 2*ln(sec(u) + tan(u)) + C$

$= 2*ln(sec(arcsec(x/2) + tan(arcsec(x/2)) + C$

$= 2*ln(1/2*(x + sqrt(x^2 - 4))) + C$

And there we have it, let me know if you need any help with the last bit but it's fairly easy to figure out if you look at a few triangles.

How do you integrate int 2/sqrt(x^2-4)dxint 2/sqrt(x^2-4)dx using trigonometric substitution?