Answer:
The specific gravity of the gel is 3.696.
Step-by-step explanation:
Given
V = 4.5 m³
D = 2 m ⇒ R = D/2 = 2 m/2 = 1m
Psurface = 1.2 atm
First, we have to calculate the gel's column height using the cylinder's volume, as follows:
V = π*R²*h ⇒ h = V/(π*R²)
⇒ h = 4.5 m³/(π*(1 m)²) = 1.4324 m
Then, as the pressure given at the bottom of the tank is the sum of the surface pressure and the gel's column pressure, we need to calculate only the gel's column pressure.
1 ft of water is a unit of pressure, but we need to convert it to atm and then to Pa, in order to calculate our results in the correct units. Therefore, the conversion factor is:
1 ft of water (4°C) = 0.0295 atm
58 ft of water*(0.0295 atm / 1 ft of water) = 1.711 atm
Pbottom = Psurface + Pgel
Pgel = Pbottom - Psurface
⇒ Pgel = 1.711 atm - 1.2 atm = 0.511 atm
Then, we apply the conversion factor as follows
Pgel = 0.511 atm*(101325 Pa/ 1 atm) = 51777.075 Pa
Now, to calculate the specific gravity, we need to find first the gel's density:
Pgel = ρ*g*h ⇒ ρgel = Pgel/(g*h)
⇒ ρgel = 51777.075 Pa/(9.81 m/s²*1.4324 m) = 3684.72 Kg/m³
SEgel = ρgel/ρH₂0
⇒ SEgel = 3684.72 Kg/m³ / 997 Kg/m³ = 3.696
The specific gravity of the gel is 3.696.