Answer: $62160.534
Explanation:
If the architect needs to cover a 100 ft x 89 ft ceiling with gold leaf sheets with a thickness of [tex]5(10)^{-6}in[/tex], he will need to cover a volume [tex]V[/tex] as follows (assuming the ceiling has a rectangular shape):
[tex]V=(length)(height)(width)[/tex] (1)
Where:
[tex]length=100 ft=1200in[/tex]
[tex]height=89 ft=1068in[/tex]
[tex]width=5(10)^{-6}in[/tex]
Then: [tex]V=(1200in)(1068in)(5(10)^{-6}in)=6408 in^{3}[/tex] (2)
On the other hand, density [tex]\rho[/tex] is defined as the relation between the mass [tex]m[/tex] of an object and its volume [tex]V[/tex]:
[tex]\rho=\frac{m}{V}[/tex] (3)
As we know the density of gold is [tex]\rho=19.32 g/cm^{3}[/tex] and the volume the architect needs to cover, we can find the mass.
[tex]m=\rho V[/tex] (4)
But first, we have to change the dimensions of the volume we calculated, in order to work with the same units:
[tex]V=6408 in^{3}=105.0083cm^{3}[/tex]
Substituting in (4):
[tex]m=(19.32 g/cm^{3})(105.0083cm^{3})[/tex] (5)
[tex]m=2028.76 g[/tex] (6) This is the amount of gold keaf sheets the architect needs.
Now, if we know [tex]31.1034768 g[/tex] cost $ 953, we can find how much [tex]2028.76 g[/tex] of gold cost:
[tex]2028.76 g \frac{\$ 953}{31.1034768 g}=\$62160.534[/tex]
Therefore, the architect will need $62160.534 to buy the necessary gold to cover the ceiling.
