To conserve rice from a cooperative there is a foil of area A=24cm^2 . The cooperatives want to build a barn in the shape of a parallelopiped square rectangle without cover. What should be the symmetrical dimensions for the volume to be maximum?


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Question Number 69211 by Mikael last updated on 21/Sep/19

$T o c o n s e r v e r i c e f r o m a c o o p e r a t i v e t h e r e i s$ $a f o i l o f a r e a A = 24 {c m}^{2} . T h e c o o p e r a t i v e s$ $w a n t t o b u i l d a b a r n i n t h e s h a p e o f a p a r a l l e l o p i p e d$ $s q u a r e r e c t a n g l e w i t h o u t c o v e r .$ $W h a t s h o u l d b e t h e s y m m e t r i c a l d i m e n s i o n s f o r$ $t h e v o l u m e t o b e m a x i m u m ?$
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