How do I evaluate #intsqrt(4x^2-9)/xdx#?
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The answer is #=sqrt(4x^2-9)-3arctan(1/3sqrt(4x^2-9))+C#
Let #u=sqrt(4x^2-9)#, then
#du=(8xdx)/(2sqrt(4x^2-9))=(4xdx)/sqrt(4x^2-9)#
The integral is
#I=int(sqrt(4x^2-9)dx)/(x)#
#=int(dusqrt(4x^2-9)*sqrt(4x^2-x))/(4x*x)#
#=int(u^2du)/(u^2+9)#
#=int((u^2+9)du)/(u^2+9)-int(9du)/(u^2+9)#
#=intdu-9int(du)/(u^2+9)#
#=u-9int(du)/(u^2+9)#
#I_1-I_2#
The second integral is
#I_2=9int(du)/(u^2+9)#
Let #v=u/3#, #=>#, #dv=(du)/3#
#I_2=9int(3dv)/(9v^2+9)#
#=27/9int(dv)/(v^2+1)#
#=3arctan(v)#
#=3arctan(u/3)#
Finally the integral is
#I=u-3arctan(u/3)#
#=sqrt(4x^2-9)-3arctan(1/3sqrt(4x^2-9))+C#
