Gas Tank Volume Calculation

How can we express the volume of a gas tank as a function of the radius r?

The volume of a gas tank with ends that are hemispheres of radius r feet and a cylindrical midsection that is 6 ft long can be expressed as a function of the radius r by calculating the volume of each component separately and then adding them together. 1. The two ends of the tank are hemispheres with a radius of r feet. The formula for the volume of a hemisphere is (2/3)πr^3. Since we have two hemispheres, we multiply this by 2 to get (4/3)πr^3. 2. The cylindrical midsection of the tank is 6 feet long. The formula for the volume of a cylinder is πr^2h, where r is the radius and h is the height. In this case, the height is 6 feet, and the radius is also r feet. So, the volume of the cylindrical midsection is 6πr^2. To find the total volume of the tank, we add the volume of the hemispheres to the volume of the cylindrical midsection: Total Volume = (4/3)πr^3 + 6πr^2 Therefore, the volume of the gas tank is expressed as a function of r as (4/3)πr^3 + 6πr^2. The unit of measurement for the volume will be in cubic feet due to working with feet as the unit for radius and length.

Calculating Gas Tank Volume

To calculate the volume of a gas tank with hemispherical ends and a cylindrical midsection, we follow these steps: 1. Volume of Hemispheres: The volume of a hemisphere with radius r is (2/3)πr^3. Since we have two hemispheres in the gas tank, the total volume contributed by the hemispheres is (4/3)πr^3. 2. Volume of Cylindrical Midsection: The volume of a cylinder with radius r and height h is πr^2h. In this case, the height of the cylindrical midsection is 6 feet, so its volume is 6πr^2. 3. Total Volume of Gas Tank: By adding the volumes of the hemispheres and the cylindrical midsection, we get the total volume of the gas tank: Total Volume = (4/3)πr^3 + 6πr^2 Therefore, the expression for the volume of the gas tank as a function of the radius r is (4/3)πr^3 + 6πr^2. This formula allows us to determine the volume of the gas tank based on the radius of the hemispheres.
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