Respuesta :
Answer:
0.637 m
Explanation:
Data provided:
Side of the hollow cubical box = 0.766 m
Total volume of the box, V = (0.766)³ = 0.449 m³
Depth under the water, d = 1/6 of the total depth = 0.766/6
Now, according to the Archimedes principle,
Weight of box = weight of water displaced( = density × volume of water displaced)
now, the volume of water displaced = volume of box submerged
= 0.766² × (0.766/6) = 0.0749 m³
also, density of water = 1000 kg/m³
thus,
weight of the box = 0.0749 m³ × 1000 = 74.9 kg
now,
When water is poured such that the total weight of water equals the weight of the remaining volume of box, the box will begin to sink.
therefore,
Remaining volume of the box = Total volume - submerged volume
or
Remaining volume of the box = 0.449 m³ - 0.0749 m³ = 0.374 m³
Thus, the height of 0.374 m³ of water when box starts to sink
volume = area of the box × depth of the water
or
0.374 m³ = 0.766² × depth of the water
or
depth of the water = 0.637 m
