If the pressure at the bottom of the can with water is 240 kPa, then what will be the height of the water in the can.

The hydrostatic pressure of the water column at the bottom of the can can be expressed in the formula:
Р = ρ * g * h, where Р is the water pressure at the bottom of the can (Р = 240 kPa = 240 * 10 ^ 3 Pa), ρ is the density of water (ρ = 1000 kg / m ^ 3), g is the acceleration of gravity (g = 10 m / s ^ 2), h is the height of the water in the bank.
Let’s express and calculate the height of the water in the bank:
h = P / (ρ * g) = (240 * 10 ^ 3) / (1000 * 10) = 24 m.
Check: m = Pa / ((kg / m ^ 3) * m / s ^ 2) = Pa * m ^ 3 * s ^ 2 / kg * m = (kg / m * s ^ 2) * m ^ 3 * s ^ 2 / kg * m = kg * m ^ 3 * s ^ 2 / (m * s ^ 2 * kg * m) = m.
Answer: The height of the water in the bank is 24 m.