Let g(x):R->R^+ be a measurable function. Suppose {x:g(x)>0}=(a,b). If (x)−g(x−α)>=g(y)−g(y−α),x<y,α>=0 Can we say g(.) is concave? How can show this?

Find the local maximum and minimum values and saddle points of the function. If you have three-dimensional graphing software, graph the function with a domain and viewpoint that reveal all the important aspects of the function
$f(x,y)=x^3-6xy+8y^3$

$\frac{1}{\sec <!--\; \; -->(x)}$ in derivative?

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