![]() Legend says that Archimedes was so excited about this discovery that he popped out of his bathtub and ran naked through the streets of Syracuse. Knowing the irregular object's volume and its weight, he could calculate the density and compare it with the density of pure gold. From this observation, he deduced that volume of water displaced must be equal to the volume of the part of his body he had submerged. The idea came to him when he was taking a bath - stepping into a bathtub, he noticed that the water level rose. If it's an irregular shape, you can try to do the very thing that caused Archimedes to shout the famous word Eureka! Probably you heard that story - Archimedes was asked to find out if the Hiero's crown is made from pure gold or just gold-plated - but without bending or destroying it. For a right triangular prism, the equation can be easily derived, as well as for a right rectangular prism, which is apparently the same shape as a box.įor regular three-dimensional objects, you can easily calculate the volume by taking measurements of its dimensions and applying the appropriate volume equation. Prism = A h Ah A h, where A A A is a base area and h h h is the height. For a pyramid with a regular base, another equation may be used as well: Pyramid = ( n / 12 ) h s 2 cot ( π / n ) (n/12) h s^2 \cot(\pi/n) ( n /12 ) h s 2 cot ( π / n ), where n n n is a number of sides s s s of the base for a regular polygon. Pyramid = ( 1 / 3 ) A h (1/3)Ah ( 1/3 ) A h where A A A is a base area and h h h is the height. Rectangular solid (volume of a box) = l w h lwh lw h, where l l l is the length, w w w is the width and h h h is the height (a simple pool may serve as an example of such shape). Sphere = ( 4 / 3 ) π r 3 (4/3)\pi r^3 ( 4/3 ) π r 3, where r r r is the radius.Ĭylinder = π r 2 h \pi r^2h π r 2 h, where r r r is the radius and h h h is the height.Ĭone = ( 1 / 3 ) π r 2 h (1/3)\pi r^2h ( 1/3 ) π r 2 h, where r r r is the radius and h h h is the height. Here are the formulas for some of the most common shapes:Ĭube = s 3 s^3 s 3, where s s s is the length of the side. The type of tanks supported include circular tanks, cyclindrical tanks, spherical tanks, cone or frustrum tanks, rectangular hopper tanks, and standard rectangular tanks.There is no simple answer to this question, as it depends on the shape of the object in question. For example the screenshot shown here shows the calculation of properties for a cone shaped tank. Pipe Flow Advisor has a different volume calculation screen for each different style of tank. ![]() Volume of Different Shaped Tank Containers ![]() By entering dimension criteria for a specific type of tank the Pipe Flow Advisor software is able to perform the calculations to determine weight, capacity and fluid volume for a given level of liquid.Ĭalculations results can be copied and pasted into other programs and there is even a copy screen image button, which then allows you to paste a visual image of the tank and its associated properties. ![]() Pipe Flow Advisor can calculate tank weight, tank capacity, tank expansion due to temperature change and used volume for a given height of fluid.ĭifferent types of tank have differing shapes and dimension parameters. Tank Volume, Tank Weight, & Fluid Volume Calculator ![]()
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