Answer:
The answer to the question is
The difference in water surface elevation between the tanks is 0.477 m
Step-by-step explanation:
Bernoulli's Equation is given by
Volume flow rate = 600 L/s
P₁ + 1/2·ρ·v₁²+ρ·g·h₁ = P₂ + 1/2·ρ·v₂² + ρ·g·h₂
If we take the tanks as open to the atmosphere then we have
P₁ = P₂ Hence
1/2·ρ·v₁²+ρ·g·h₁ = 1/2·ρ·v₂² + ρ·g·h₂
From where we calculate the velocity of the water thus
Q = V × A where A are of the pipe conveying the water, hence A = π × r² and r = D/2 = (50 cm)/2 = 25 cm or 0.25 m and A = π × 0.25² = 0.196 m²
Then v = Q/A = (600 L/s)/(0.196 m²) = (0.6 m³/s)/(0.196 m²) = 3.06 m/s
If v₂ = 0 just before the valve is opened we have
1/2·ρ·v₁²+ρ·g·h₁ = ρ·g·h₂ or 1/2·ρ·v₁² = ρ·g·h₂ -ρ·g·h₁
That is the v₁² = 2 × g × (h₂ - h₁)
Therefore the difference in the fluid level is
(3.06 m/s)² = 2 × 9.81 m/s² × (h₂ - h₁)
and (h₂ - h₁) = 0.477 m
The water level difference between the two tanks is 0.477 m