Volume of Oloid Formula:
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The Volume of Oloid is the amount of space that an Oloid occupies or that is enclosed within the Oloid. An Oloid is a three-dimensional curved geometric object that was discovered by Paul Schatz in 1929.
The calculator uses the Oloid volume formula:
Where:
Explanation: The formula calculates the volume of an Oloid based on its height, using the constant 3.0524184684 which is derived from the geometric properties of the Oloid shape.
Details: Calculating the volume of an Oloid is important in various engineering and design applications, particularly in mechanical engineering, architecture, and industrial design where this unique geometric shape is utilized.
Tips: Enter the height of the Oloid in meters. The value must be positive and greater than zero for accurate calculation.
Q1: What is an Oloid?
A: An Oloid is a three-dimensional curved geometric shape that was discovered by Paul Schatz. It has the property that it rolls evenly on a flat surface.
Q2: What are the applications of Oloids?
A: Oloids are used in various applications including mixing technology, architectural design, and as mathematical objects of study in geometry.
Q3: How accurate is this formula?
A: The formula provides an exact mathematical calculation of the Oloid volume based on its geometric properties.
Q4: Can this calculator be used for any size of Oloid?
A: Yes, the formula is scalable and can be used for Oloids of any size, as long as the height is provided in consistent units.
Q5: What units should I use for the height input?
A: The calculator expects the height in meters, but you can use any unit as long as you're consistent. The volume will be in cubic units of whatever unit you used for height.