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The Second Partial Length of Bent Cuboid is the outer edge of vertical part of Bent Cuboid standing upright. It represents the length of the second part of the cuboid after bending and is calculated as the difference between the total length and the first partial length.
The calculator uses the formula:
Where:
Explanation: This formula calculates the remaining length of the cuboid after subtracting the first partial length from the total length, giving the second partial length of the bent cuboid.
Details: Calculating the second partial length is essential in geometry and engineering applications involving bent cuboids. It helps determine the dimensions of the bent structure and is crucial for accurate construction and design calculations.
Tips: Enter the total length and first partial length in meters. Both values must be positive numbers, and the first partial length cannot exceed the total length.
Q1: What is a Bent Cuboid?
A: A Bent Cuboid is a cuboid that has been bent along one of its edges, creating two partial lengths from the original total length.
Q2: Can the first partial length be zero?
A: Yes, if the first partial length is zero, the second partial length equals the total length, meaning no bending has occurred on the first part.
Q3: What units should I use for the inputs?
A: The calculator uses meters as the default unit, but you can use any consistent unit of length as long as both inputs are in the same unit.
Q4: What if the first partial length is greater than the total length?
A: The calculator will not accept such values as it would result in a negative second partial length, which is not physically meaningful.
Q5: Are there any limitations to this calculation?
A: This calculation assumes ideal geometric conditions and does not account for material thickness or bending deformation effects.