![]() ![]() Semendyayev, Gerhard Musiol, Heiner Mühlig. The pi (π) is approximately equal to 3.14159265359 and represents the ratio of any circle's circumference to its diameter, or the ratio of a circle's area to the square of its radius in Euclidean space. l arc is the length of the arc of the side surface of a fluid, where the fluid comes in contact with the circular base of the horizontal cylindrical tank.This is the angle that draws a half of the side arc with length ½l arc) The first radial line intercects the top surface of fluid, and the second radial line coincides with the line of the depth of fluid h. α is the angle created by 2 radial lines.How to find the radius of a horizontal tank?.How to find the diameter of a horizontal tank?.How to find the length of arc created by rotating radius r from the left‐most to the right‐most point of fluid within a horizontal tank?.How to find the angle that draws a half of the side arc of fluid within a horizontal tank?.What is the valid range of values for the depth of fluid?.How to find the area of the total surface of fluid in a horizontal tank?. ![]() How to find the area of the bottom surface of fluid in a horizontal tank?.How to find the area of the top surface of fluid in a horizontal tank?.Note, this side of fluid comes in contact with the circular base of the horizontal cylindrical tank.Ī side = r² ×(π ⁄ 2−arcsin(1−h ⁄ r))−(r−h)× √ h×(2×r−h) How to find the area of the side surface of fluid in a horizontal tank?.How to find the amount of fluid in a horizontal tank of a cylindrical shape?.About this page: Horizontal tank calculator.
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