Given that `x, y, z` are positive reals such that `xyz = 32`. The minimum value of ` x^2 +4xy +4y^2 + 2z^2` is equal to :

Given that x,y,z are positive real such that xyz=32. If the minimum value of x^(2)+4xy+4y^(2)+2z^(2) is equal m, then the value of m/16 is.

Given that x ,y ,z are positive real such that x y z=32. If the minimum value of x^2+4x y+4y^2+2z^2 is equal m , then the value of m//16 is.

Given that x ,y ,z are positive real such that x y z=32. If the minimum value of x^2+4x y+4y^2+2z^2 is equal m , then the value of m//16 is.

Given that x ,y ,z are positive real such that x y z=32. If the minimum value of x^2+4x y+4y^2+2z^2 is equal m , then the value of m//16 is.

Given that x,y,z are positive real numbers such that xyz=32 , the minimum value of sqrt((x+2y)^(2)+2z^(2)-15) is equal to

Given that x,y,z are positive real numbers such that xyz=32 , the minimum value of sqrt((x+2y)^(2)+2z^(2)-15) is equal to

Given that x,y,z are positive real numbers such that xyz=32 , the minimum value of sqrt((x+2y)^(2)+2z^(2)-15) is equal to

Given that x,y,z are positive real numbers such that xyz=32 , the minimum value of sqrt((x+2y)^(2)+2z^(2)-15) is equal to

Let x,y,z are positive reals and x +y+z=60 and x gt 3. Maximum value of xyz is :

Let x,y,z are positive reals and x +y+z=60 and x gt 3. Maximum value of xyz is :