Copper Round Bar Weight Calculator:
Enter the values of square of diameter of the bar, D(cm), and length of the bar, L(cm) to determine the value of copper round bar weight, W(g).
Copper Round Bar Weight Formula:
A copper round bar is a cylindrical object, so its volume is determined by its cross-sectional area and length.
Since the bar is a solid object, its weight directly correlates with both the diameter and length larger diameters and longer lengths will result in greater mass. This calculation is crucial in applications where precise measurements of weight are necessary for structural support, manufacturing processes, and material cost estimation.
The consistent density of copper ensures that these calculations are accurate, assuming uniformity in material and dimensions.
Copper round bar weight, W(g) in grams is calculated by dividing the product of square of diameter of the bar, D(cm) in centimetres, length of the bar, L(cm) in centimetres, density of copper bar, d(g/cm3) in grams per cubic centimetre and pi by 4.
Copper round bar weight, W(g) = 3.14 * D2(cm) * L(cm) * d(g/cm3) / 4
W(g) = copper round bar weight in grams, g.
D(cm) = diameter of the bar in centimetres, cm.
L(cm) = length of the bar in centimetres, cm.
d(g/cm3) = density of copper bar in grams per cubic centimetre, g/cm3.
Copper Round Bar Weight Calculation:
- A copper round bar has a diameter of 4 cm, a length of 50 cm, and the density of copper is 8.96 g/cm3. Calculate the weight of the bar.
Given: D(cm) = 4cm, L(cm) = 50cm, d(g/cm3) = 8.96g/cm3.
Copper round bar weight, W(g) = 3.14 * D2(cm) * L(cm) * d(g/cm3) / 4
W(g) = 3.14 * 42 * 50 * 8.96 / 4
W(g) = 3.14 * 16 * 50 * 8.96 / 4
W(g) = 5626.88g.
- A copper round bar has a diameter of 6 cm and weighs 8482.08 g. The density of copper is 8.96 g/cm3. Calculate the length of the bar.
Given: W(g) =8482.08g, D(cm) = 6cm, d(g/cm3) = 8.96g/cm3.
Copper round bar weight, W(g) = 3.14 * D2(cm) * L(cm) * d(g/cm3) / 4
L(cm) = W(g) * 4 / 3.14 * D2(cm) * d(g/cm3)
L(cm) = 8482.08 * 4 / 3.14 * 62 * 8.96
L(cm) = 33.5cm.