![]() ![]() Cylinder Volume: The central part of the capsule is a cylinder.To calculate its volume, we need to sum the volumes of the cylinder and the two hemispheres. The horizontal capsule tank is defined as a combination of a cylindrical section and two hemispherical end caps. In this case, w = 2r, and r = w/2, therefore, the formula can be re-written as follows: While the volume of filled liquid for this tank will be different from the corresponding filled volume of the horizontal oval tank, the total volume formula is the same: Since the calculator works in terms of the height of the cylinder, h, and h = 2r, the above formula can be re-written as follows: The volume of a horizontal oval tank with the stadium shape base and length l can be found as follows: The total surface area of the stadium shape can be found as πr² + 2ar. The inner rectangle has sides with the following lengths: a and 2r. Therefore, their combined area will be πr². Two semi-circles form one circle with radius r. The surface area of the stadium shape can be found by adding the rectangle surface area and the two semi-circles surface areas. The base area is represented by a stadium shape, as shown in the image below. To find the tank volume, we must multiply the base area by length. A stadium shape is defined as a rectangle with semicircles at opposite sides. This calculator defines an oval tank as a cylindrical tank with bases in a stadium shape. To find the volume of a rectangular prism, we have to multiply all three dimensions of the tank – width, length, and height: The rectangle is a 2D shape, and the tank is a rectangular prism. This tank shape is widely known as "rectangular tank," however, this is not its official name. V = π × r² × h = π × (d/2)² × h Rectangular tank (rectangular prism) ![]() The formula for the total volume of a vertical cylinder is the same as the formula for the horizontal cylinder, where the length, l, is replaced with the height, h: V = π × r² × l = π × (d/2)² × l Vertical cylinder tank Since r = d/2, the above formula can be re-written as follows: Multiplying that by the length, we will get the total tank volume: If the base is a circle of radius r, its area can be found as πr². To find the volume of a horizontal cylinder, we have to multiply its base area by its length. The symbols for the known dimensions will be demonstrated on the corresponding images for each tank shape. Let's look at the formulas for calculating the total volume of a tank. The filled depth must be greater than or equal to zero. All input values representing dimensions have to be greater than zero. This liquid volume calculator accepts integers, decimals, fractions, and numbers in e-notation as inputs. The calculator will return the total capacity of a tank and the filled volume. After inserting all values, press "Calculate." Filled depth is the only optional value, all other values must be filled in. If the tank is not full, enter the filled depth. Then input the known values into the corresponding fields. Directions for useįirst, choose the required tank shape from the drop-down menu to use this tank calculator. gallons, imperial gallons, liters, cubic meters, and cubic feet. Horizontal semi-elliptical tank with 2:1 semi-elliptical tank heads.So, to convert directly from L to gal you multiply by 0.26417203.This tank capacity calculator finds the total volume of the given tank and the volume of the liquid in the tank for situations when the tank is not completely full. Or, you can find the single factor you need by dividing the A factor by the B factor.įor example, to convert from liters to gallons you would multiply by 0.001 then divide by 0.003785412. To convert among any units in the left column, say from A to B, you can multiply by the factor for A to convert A into m/s 2 then divide by the factor for B to convert out of m 3. To convert from m 3 into units in the left columnĭivide by the value in the right column or, multiply by the reciprocal, 1/x. Multiply by the conversion value in the right column in the table below. To simply convert from any unit into cubic meters, for example, from 10 liters, just Where S is our starting value, C is our conversion factor, and Conversions are performed by using a conversion factor. By knowing the conversion factor, converting between units can become a simple multiplication problem: ![]()
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