Find the cylinder of maximum volume which can be inscribed in a cone of height h and semivertical angle `alpha`.

Show that the volume of the greatest cylinder which can be inscribed in a cone of height h and semi-vertical angle alpha, is (4)/(27) pi h^(3) tan^(2) alpha .

The volume of the greatest cylinder which can be inscribed in a cone of height h and semi- vertical angle alpha is

The volume of the cylinder of greatest volume which can be inscribed in a right circular cone of height h and semi vertical angle alpha is k pi h^(3)tan^(2)alpha , then 6k=

Show that height of the cylinder of greatest volume which can be inscribed in a right circular cone of height h and semi vertical angle alpha is one-third that of the cone and the greatest volume of cylinder is (4)/(27) pi h^(3) tan^(2) alpha .

Show that height of the cylinder of greatest volume which can be inscribed in a right circular cone of height h and semi vertical angle alpha is one - third that of the cone and the greatest volume of cylinder is (4pi)/(27)h^(3) tan^(2)alpha .

Show that the height of the cylinder of greatest volume which can be inscribed in a right circular cone of height h and semi-vertical angle alpha is one-third that of the cone anD greatest volume of cylinder is 4/27pi h^3tan^2 alpha

Show that height of the cylinder of greatest volume which can be inscribed in a right circular cone of height h and semi vertical angle alpha is one-third that of the cone and the greatest volume of cylinder is 4/27 pi h^3 tan^2 alpha

Show that t height of the cylinder of greatest volume which can be inscribed in a right circular cone of height h and semi vertical angle alpha is one-third that of the cone and the greatest volume of cylinver is (4)/(27) pi h^(3) tan^(2) alpha

Show that height of the cylinder of greatest volume which can be inscribed in a right circular cone of height h and semi vertical angle alpha is one-third that of the cone and the greatest volume of cylinder is 4/(27)pih^3tan^2alphadot