What are the absolute extrema of f(x)=(2x^3-x)/((x^2-64)f(x)=2x3x(x264) in [-8,8][8,8] ?

1 Answer
A. S. Adikesavan
Jan 5, 2017

In [-8, 8],[8,8], the absolute minimum is 0 at O. x = +-8x=±8 are the vertical asymptotes. So, there is no absolute maximum. Of course, |f| to oo|f|, as x to +-8x±8..

Explanation:

The first is an overall graph.

The graph is symmetrical, about O.

The second is for the given limits x in [-8, 8]x[8,8]

graph{((2x^3-x)/(x^2-64)-y)(y-2x)=0 [-160, 160, -80, 80]}

graph{(2x^3-x)/(x^2-64) [-10, 10, -5, 5]}

By actual division,

y = f(x) = 2x +127/2(1/(x+8)+1/(x-8)) y=f(x)=2x+1272(1x+8+1x8), revealing

the slant asymptote y = 2x and

the vertical asymptotes x = +-8x=±8.

So, there is no absolute maximum, as |y| to oo|y|, as x to +-8x±8.

y'=2-127/2(1/(x+8)^2+1/(x-8)^2)=0, at x = +-0.818 and x=13.832,

nearly.

y'= 127((2x^3+6x)/((x^2-64)^3), giving x= 0 as its 0. f''' is ne at

x=0. So, origin is the point of inflexion (POI). In -8, 8], with respect to the

origin, the graph ( in between the asymptotes x = +-8 ) is convex

in Q_2 and concave ib Q_4#.

So, the absolute minimum is 0 at the POI, O.

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