How do you find the indefinite integral of #int root3x/(root3x-1)#? Calculus Techniques of Integration Integration by Substitution 1 Answer 1s2s2p Mar 20, 2018 #(root3x-1)^3+(9(root3x-1)^2)/2+9(root3x-1)+3ln(abs(root3x-1))+C# Explanation: We have #int root3x/(root3x-1)dx# Substitute #u=(root3x-1)# #(du)/(dx)=x^(-2/3)/3# #dx=3x^(2/3)du# #int root3x/(root3x-1)(3x^(2/3))du=int(3x)/(root3x-1)du=int(3(u+1)^3)/udu=3int(u^3+3u^2+3u+1)/udu=int3u^2+9u+9+3/udu=u^3+(9u^2)/2+9u+3ln(abs(u))+C# Resubstitute #u=root3x-1#: #(root3x-1)^3+(9(root3x-1)^2)/2+9(root3x-1)+3ln(abs(root3x-1))+C# Answer link Related questions What is Integration by Substitution? How is integration by substitution related to the chain rule? How do you know When to use integration by substitution? How do you use Integration by Substitution to find #intx^2*sqrt(x^3+1)dx#? How do you use Integration by Substitution to find #intdx/(1-6x)^4dx#? How do you use Integration by Substitution to find #intcos^3(x)*sin(x)dx#? How do you use Integration by Substitution to find #intx*sin(x^2)dx#? How do you use Integration by Substitution to find #intdx/(5-3x)#? How do you use Integration by Substitution to find #intx/(x^2+1)dx#? How do you use Integration by Substitution to find #inte^x*cos(e^x)dx#? See all questions in Integration by Substitution Impact of this question 1345 views around the world You can reuse this answer Creative Commons License