A container is filled to a depth of 20cm with water. on top of the water floats a 30.0 cm thick layer of oil with specific gravity of 0.700, what is the absolute pressure at the bottom?

To find the absolute pressure at the bottom of the container, we can use the formula:

P_total = P_atm + ρ_water * g * h_water + ρ_oil * g * h_oil

First, we know that the atmospheric pressure (P_atm) is about 101325 Pa.

Next, we can find the densities of the water and oil. The density of water is about 1000 kg/m³. The oil has a specific gravity of 0.700, so its density can be found by multiplying the specific gravity with the density of water:

ρ_oil = 0.700 * ρ_water = 0.700 * 1000 kg/m³ = 700 kg/m³

Now, we can find the weight of the water and the oil. To do this, we will use the gravitational acceleration (g), which is approximately 9.8 m/s². The height of the water (h_water) is 20 cm (0.2 meters), and the height of the oil (h_oil) is 30 cm (0.3 meters):

P_water = ρ_water * g * h_water
P_water = 1000 kg/m³ * 9.8 m/s² * 0.2 m
P_water = 1960 Pa

P_oil = ρ_oil * g * h_oil
P_oil = 700 kg/m³ * 9.8 m/s² * 0.3 m
P_oil = 2058 Pa

Finally, we can find the total pressure at the bottom:

P_total = P_atm + P_water + P_oil
P_total = 101325 Pa + 1960 Pa + 2058 Pa
P_total ≈ 104343 Pa

So the absolute pressure at the bottom of the container is approximately 104343 Pa.