A solid consists of a cone on top of a cylinder with a radius equal to that of the cone. The height of the cone is $33$ and the height of the cylinder is $14$ . If the volume of the solid is $2750 pi$ , what is the area of the base of the cylinder?

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A solid consists of a cone on top of a cylinder with a radius equal to that of the cone. The height of the cone is $33$ and the height of the cylinder is $14$ . If the volume of the solid is $2750 pi$ , what is the area of the base of the cylinder?

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Answer 1 · 2016-03-19T16:32:44

$110 pi$ [square units]

Explanation:

$V_T=V_("cylinder")+V_("cone")$
$V_T=S_circ*h_("cylinder")+(S_circ*h_("cone"))/3$
$V_T=pi*r^2*h_("cylinder")+(pi*r^2*h_("cone"))/3$
$pi*r^2*(h_("cylinder")+h_("cone")/3)=V_T$

$pi*r^2=S_("cylinder's base")=(3*V_T)/(3*h_("cylinder")+h_("cone"))=(3*2750pi)/(3*14+33)=(8250pi)/75=110pi$ [square units]

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A solid consists of a cone on top of a cylinder with a radius equal to that of the cone. The height of the cone is $33$ and the height of the cylinder is $14$ . If the volume of the solid is $2750 pi$ , what is the area of the base of the cylinder?

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A solid consists of a cone on top of a cylinder with a radius equal to that of the cone. The height of the cone is 33 33 and the height of the cylinder is 14 14 . If the volume of the solid is 2750 pi2750 pi, what is the area of the base of the cylinder?

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Explanation:

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A solid consists of a cone on top of a cylinder with a radius equal to that of the cone. The height of the cone is $33$ and the height of the cylinder is $14$ . If the volume of the solid is $2750 pi$ , what is the area of the base of the cylinder?