Let c be a positive constant Show that when x, y, z 0 and x y z 3c, then function f(x,y,z) xyz largest value is c 3 (It follows that three non negative numbers x, y and z arithmetic average a 1 3(x y z) and geometric average g (xyz) 1 3 fulfill inequality a g)

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Question: Let c be a positive constant. Show that when x, y, z 0 and x + y + z = 3c, then function f(x,y,z) =

Let c be a positive constant. Show that when x, y, z 0 and x + y + z = 3c, then function f(x,y,z) = xyz largest value is c³.

(It follows that three non-negative numbers x, y and z arithmetic average a = 1/3(x + y +z) and geometric average g = (xyz)^1/3fulfill inequality a g)

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