Ask Question
4 August, 22:12

Integrate 1 / ((x^5) * sqrt (9*x^2-1)) ... ?

+1
Answers (1)
  1. 5 August, 01:47
    0
    Let 9x^2-1 = y^2

    => 18xdx = 2ydy

    => ydy = 9xdx

    lower limit = sqrt (9*2/9 - 1) = sqrt (1) = 1

    upper limit = sqrt (9*4/9 - 1) = sqrt (3)

    Int. [sqrt (2) / 3,2/3] 1 / (x^5 (sqrt (9x^2-1)) dx

    = Int. [sqrt (2) / 3,2/3] xdx / (x^6 (sqrt (9x^2-1))

    = 81 * Int. [1, sqrt (3) ] ydy / ((y^2+1) ^3y)

    =81 * Int. [1, sqrt (3) ] dy / (y^2+1) ^3

    y=tanz

    dy = sec^2z dz

    =81*Int [pi/4, pi/3] cos^4 (z) dz

    =81/4*int [pi/4, pi/3] (1+cos (2z)) ^2 dz

    =81/4 * Int. [pi/4, pi/3] (1+2cos (2z) + cos^2 (2z)) dz

    =81/4 * (pi/3-pi/4) + 81/4 * (sin (2pi/3) - sin (pi/2)) + 81/8 * (pi/3-pi/4)

    + 81/32 * (sin (-pi/3) - sin (pi))

    =81 (pi/48+pi/96+1/4 * (sqrt (3) / 2 - 1) - 1/32 * sqrt (3) / 2)

    =81/32 * (pi+3sqrt (3) - 8)
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “Integrate 1 / ((x^5) * sqrt (9*x^2-1)) ... ? ...” in 📘 Mathematics if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers