Answer:
The specific gravity of the unkown liquid is 15.
Explanation:
Gauge pressure, at the bottom of the tank in this case, can be calculated from
[tex]P_{bot}=\gamma_{oil}h_1 + \gamma_{unk}h_2,[/tex]
where [tex]h_1[/tex] and [tex]h_2[/tex] are the height of the column of oil and the unkown liquid, respectively. Writing for [tex]\gamma_{unk}[/tex], we have
[tex]\gamma_{unk} = \frac{P_{bot} - \gamma_{oil}h_1}{h_2} = \frac{65\frac{kN}{m^2} - 8.5\frac{kN}{m^3}\times 5m}{1.5m} = \mathbf{15 \frac{kN}{m^3}}. [/tex]
Relative to water, the unknow liquid specific weight is 15 times bigger, therefore this is its specific gravity as well.
