Bearing Size Calculator
How to Use the Calculator?
- Input Values:
- Inner Diameter (ID): Enter the diameter of the hole inside the bearing (in millimeters).
- Outer Diameter (OD): Enter the diameter of the outside of the bearing (in millimeters).
- Length: Enter the length of the bearing (in millimeters).
- Perform Calculations:
- Inner Circumference: The distance around the inner edge of the bearing. Calculated using the formula: Inner Circumference=π×ID\text{Inner Circumference} = \pi \times \text{ID}Inner Circumference=π×ID
- Outer Circumference: The distance around the outer edge of the bearing. Calculated using the formula: Outer Circumference=π×OD\text{Outer Circumference} = \pi \times \text{OD}Outer Circumference=π×OD
- Volume: The amount of space inside the bearing, excluding the inner cylindrical hole. Calculated using the formula: Volume=π×((OD2)2−(ID2)2)×Length\text{Volume} = \pi \times \left( \left(\frac{\text{OD}}{2}\right)^2 – \left(\frac{\text{ID}}{2}\right)^2 \right) \times \text{Length}Volume=π×((2OD)2−(2ID)2)×Length
- View Results:
- After entering the values and clicking the “Calculate” button, the calculator displays:
- Bearing Size: Shows the inner diameter, outer diameter, and length as entered.
- Inner Circumference: The circumference of the inner part of the bearing.
- Outer Circumference: The circumference of the outer part of the bearing.
- Volume: The calculated volume of the bearing in cubic millimeters.
- After entering the values and clicking the “Calculate” button, the calculator displays:
Example Calculation:
Let’s say you enter the following values:
- Inner Diameter (ID): 10 mm
- Outer Diameter (OD): 20 mm
- Length: 50 mm
The calculator performs these calculations:
- Inner Circumference: π×10≈31.42 mm\pi \times 10 \approx 31.42 \text{ mm}π×10≈31.42 mm
- Outer Circumference: π×20≈62.83 mm\pi \times 20 \approx 62.83 \text{ mm}π×20≈62.83 mm
- Volume: π×((202)2−(102)2)×50≈2,356.19 mm3\pi \times \left(\left(\frac{20}{2}\right)^2 – \left(\frac{10}{2}\right)^2\right) \times 50 \approx 2{,}356.19 \text{ mm}^3π×((220)2−(210)2)×50≈2,356.19 mm3
The results will be displayed, showing the calculated circumferences and volume based on the input dimensions.
