Answer:
The value is [tex]\Delta h = 0.003 \ m[/tex]
Explanation:
From the question we are told that
The height of the water is [tex]h_1 = 10 \ cm = 0.10 \ m[/tex]
The density of oil is [tex]\rho_o = 950 \ kg/m^3[/tex]
The height of oil is [tex]h_2 = 6 \ cm = 0.06 \ m[/tex]
Given that both arms of the tube are open then the pressure on both side is the same
So
[tex]P_a = P_b[/tex]
=> Here
[tex]P_a = P_z + \rho_w * g * h[/tex]
where [tex]\rho_w[/tex] is the density of water with value [tex]\rho_w = 1000 \ kg/m^3[/tex]
and [tex]P_z[/tex] is the atmospheric pressure
and
[tex]P_b = P_z + \rho_o * g * h_2[/tex]
=> [tex]P_z + \rho_w * g * h = P_z + \rho_o * g * h_2[/tex]
=> [tex]\rho_w * h = \rho_o * h_2[/tex]
=> [tex]h = \frac{950 * 0.06 }{1000}[/tex]
=> [tex]h = 0.057 \ m[/tex]
The difference in height is evaluated as
[tex]\Delta h = 0.06 - 0.057[/tex]
[tex]\Delta h = 0.003 \ m[/tex]
