Question:

Integral of xarctan(6x)dx?

by  |  earlier

0 LIKES UnLike

Integral of xarctan(6x)dx?

 Tags:

   Report

3 ANSWERS


  1. Start off with integration by parts.

    Let u = arctan(6x), dv = x dx, v = (1/2)x^2, and du = [6/(1 + 36x^2)]dx.

    uv - ∫v du

    (1/2)x^2 arctan(6x) - 3∫x^2/(1 + 6x^2) dx

    For the second integral, you will have to apply polynomial long division (which gives you (1/6) + [1/(36x^2 + 6)].

    (1/2)x^2 arctan(6x) - 3∫[(1/6) - [1/(36x^2 + 6)])] dx

    The second term in the integral requires an inverse trig substitution (since it's in the form du/(u^2 + a^2), where a = √6 and u = 6x.  Answers to integrals like these are (1/a)arctan(u/a) + C).  Since u = 6x, du = 6dx, and the solution to that integral is (√6/36)arctan[(6x√6)/6] + C (with the denominators rationalized, though that step is optional).

    The final answer to your original integral, fully simplified, is:

    (1/2)x^2arctan(6x) - (1/2)x - (√6/12)arctan(x√6) + C


  2. ((36x^2+1)tan^-1(6x)-6x)/72

  3. lets try integration by parts

    u= arctan(6x)

    du = 6 / radical(1+x^2) dx

    dv= x dx

    v = 1/2 * x^2

    uv - integral(vdu)

    1/2 * x^2 * arctan(6x) - integral(1/2 * x^2 * 6 / radical(1+x^2))

    solve for that integral

    integral ( 3x^2 / radical(1+x^2) dx)

    and go from there

Question Stats

Latest activity: earlier.
This question has 3 answers.

BECOME A GUIDE

Share your knowledge and help people by answering questions.