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The Width of Large Rectangle of Skewed Cuboid is the length of the shorter edge of the larger rectangular base surface of a Skewed Cuboid. It is an important dimension in determining the geometric properties of this three-dimensional shape.
The calculator uses the formula:
Where:
Explanation: This formula calculates the width by dividing the bottom face area by the length of the large rectangle, based on the rectangular area formula.
Details: Accurate calculation of the width dimension is crucial for determining the complete geometric properties of skewed cuboids, which is important in various engineering, architectural, and mathematical applications involving three-dimensional shapes.
Tips: Enter the bottom face area in square meters and the length of the large rectangle in meters. Both values must be positive numbers greater than zero.
Q1: What is a Skewed Cuboid?
A: A skewed cuboid is a three-dimensional shape where the base is a rectangle, but the sides are not perpendicular to the base, creating a slanted or oblique shape.
Q2: Why is this calculation important?
A: This calculation helps determine the complete dimensions of a skewed cuboid when the area and one dimension are known, which is essential for volume calculations and spatial analysis.
Q3: Can this formula be used for regular cuboids?
A: Yes, the same formula applies to regular cuboids since they are a special case of skewed cuboids where all angles are right angles.
Q4: What units should be used?
A: Consistent units must be used throughout the calculation. The calculator uses meters for length and square meters for area.
Q5: Are there any limitations to this calculation?
A: This calculation assumes that the bottom face is a perfect rectangle and that the given measurements are accurate for the specific geometric configuration.