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The Width of Large Rectangle of Skewed Cuboid given Left Face Area is the length of the shorter edge of the larger rectangular base surface of a Skewed Cuboid, calculated using the left face area, height, and width of the small rectangle.
The calculator uses the formula:
Where:
Explanation: This formula calculates the width of the larger rectangular base by utilizing the relationship between the left face area, height, and the width of the smaller rectangular top surface.
Details: Calculating the width of the large rectangle is essential for determining the geometric properties of skewed cuboids, which is important in various engineering and architectural applications involving irregular 3D shapes.
Tips: Enter the left face area in square meters, height in meters, and width of small rectangle in meters. All values must be positive numbers with appropriate units.
Q1: What is a Skewed Cuboid?
A: A Skewed Cuboid is a three-dimensional geometric shape where the top and bottom faces are rectangles of different sizes, and the side faces are parallelograms rather than rectangles.
Q2: Why is the left face area important in this calculation?
A: The left face area provides information about one of the side surfaces, which helps determine the relationship between the different dimensions of the skewed cuboid.
Q3: Can this formula be used for other geometric shapes?
A: No, this specific formula is designed for calculating the width of the large rectangle in skewed cuboids and may not apply to other geometric shapes.
Q4: What are the units for the inputs and outputs?
A: All inputs should be in meters (for lengths) and square meters (for areas), and the output will be in meters.
Q5: What if I get a negative result?
A: A negative result may indicate that the input values are not consistent with a valid skewed cuboid geometry. Please double-check your input values.