The volume of sphere can be calculated using the following formula:
[tex]V=\frac{4}{3}\pi r^{3}[/tex]
Here, r is radius of the sphere which is 8 cm. Putting the value,
[tex]V=\frac{4}{3}\pi r^{3}=\frac{4}{3}(3.14)(8 cm)^{3}=2143.57 cm^{3}[/tex]
This is equal to the volume of lead, density of lead is [tex]11.34 g/cm^{3}[/tex] thus, mass of lead can be calculated as follows:
[tex]m=d\times V=11.34 g/cm^{3}\times 2143.57 cm^{3}=2.43\times 10^{4}g[/tex]
Let the mass of ore be 1 g, 68.5% of galena is obtained by mass, thus, mass of galena obtained will be 0.685 g.
Now, 86.6% of lead is obtained from this gram of galena, thus, mass of lead will be:
m=0.685×0.866=0.5932 g
Therefore, 0.5932 g of lead is obtained from 1 g of ore, if the efficiency is 100%.
For 92.5% efficiency, mass of lead obtained will be:
[tex]m=\frac{92.5}{100}\times 0.5932=0.5487 g[/tex]
Thus, 1 g of lead obtain from [tex]\frac{1}{0.5487}=1.822[/tex] grams of ore.
Thus, [tex]2.43\times 10^{4} g[/tex] of lead obtain from:
[tex]2.43\times 10^{4}\times 1.822=4.42\times 10^{4}g=44.2 kg[/tex]
Therefore, mass of ore required to make lead sphere is 44.2 kg.
Answer:
44kg
Explanation:
Volume of the lead sphere is [tex]= 4/3*π*(r)3[/tex]
= 4/3*π*(8.0)3
= 4/3 * π * ( 512)
= 4/3 * 22/7 * (512)
= 2145.52 cm3
The consists of 68.5% galena while galena consists 86.6% lead.
Only 92.5% of the lead can be extracted.
Assuming X as the amount of ore needed
mass of ore can be determined as:
92.5% of 86.6% of 68.5% of X = 2145.52
0.925 * 0.866 * 0.685*X=2145.52
X=0.54871925/2145.52
[tex]=44kg[/tex]]
