Over what intervals is # f(x)=(9x^2-x)/(x-1) # increasing and decreasing?

1 Answer
Nov 16, 2015

#f# is increasing on #(-oo,(3-2sqrt2)/3)# and on #((3+2sqrt2)/3,oo)# and it is decreasing on #((3-2sqrt2)/3,1)# and on #(1,(3+2sqrt2)/3)#

Explanation:

#f'(x) = ((18x-1)(x-1)-(9x^2-x)(1))/(x-1)^2#

# = (9x^2-18x+1)/(x-1)^2#

#f'(x) = 0#, at solutions to #9x^2-18x+1=0#.
Solve by completing the square of by using the quadratic formula.
#x=(3+-2sqrt2)/3#

#f'(x)# is not defined at #x=0#

Test the sign of #f'# on each interval:

#{: (bb"Interval:",(-oo,(3-2sqrt2)/3),((3-2sqrt2)/3,1),(1,(3+2sqrt2)/3),((3+2sqrt2)/3,oo)), (darrbb"Factors"darr,"========","======","=====","======"), (9x^2-18x+1, bb" +",bb" -",bb" -",bb" +"), ((x-1)^2,bb" +",bb" +",bb" +",bb" +"), ("==========","========","======","=====","======"), (bb"Product"=f'(x),bb" +",bb" -",bb" -",bb" +") :}#