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.
February 26, 2021 | education
| 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.
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