How do you integrate $int 1/sqrt(9x^2-36x+37)$ using trig substitutions?

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How do you integrate $int 1/sqrt(9x^2-36x+37)$ using trig substitutions?

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Answer 1 · 2016-12-16T01:15:16

By substituting $x=u/3+2$ the square root becomes $sqrt(u^2+1)$ which is standard form or can be further substituted with $u=sinhv$ and then use $cosh^2 v - sinh^2v=1$ , $d/dx(sinh v)=cosh(v)$ etc.

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How do you integrate $int 1/sqrt(9x^2-36x+37)$ using trig substitutions?

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How do you integrate $int 1/sqrt(9x^2-36x+37)$ using trig substitutions?