volume of anything with straight sides and a pointy top
= (1/3) base area * height
volume of cone = 1/3 pi R^2 h
(1/3) * 3.14159 * 15.35^2 * 19.5
A factory wants to fill a conical storage tank with sand. The tank has a height of 19.5 meters and a diameter of 30.7 meters.
Calculate the volume of the storage tank to the nearest hundredth.
5 answers
WTH
volume of anything with straight sides and a pointy top
= (1/3) base area * height
volume of cone = 1/3 pi R^2 h
(1/3) * 3.14159 * 15.35^2 * 19.5
= (1/3) base area * height
volume of cone = 1/3 pi R^2 h
(1/3) * 3.14159 * 15.35^2 * 19.5
What’s the answer
A factory wants to fill a conical storage tank with sand. The tank has a height of 19.5 meters and a diameter of 30.7 meters.
4 answers