CIV E 444 - APPLIED HYDRAULICS
SPRING 2016
LAB No. 8 SOLUTION

Diameter D = 0.3 m
Head loss h_f/L = 0.008
Relative roughness k_s/D = 0.0006
A^* = D^1.5 (g h_f/L )^0.5 = (0.3)^1.5 (9.81 × 0.008)^0.5 = 0.046
ν = 1.14 × 10^-6
Q = -2.22 A^* D log [ (k_s/D)/(3.7) + (1.78 ν/A^*)]
Q = -2.22 × 0.046 × 0.3 × log [ (0.0006/3.7) + (1.78 × 1.14/(10⁶ × 0.046 ) ) ]
Q = - 2.22 × 0.046 × 0.3 × (-3.68)
Q = 0.113 m³/s = 113 L/s ANSWER.
Q = 0.113 m³
Head loss h_f/L = 0.008
Absolute roughness k_s = 0.00018 m
B* g h_f/L = 9.81 × 0.008 = 0.07848
D = 0.66 { [k_s^1.25 Q^9.5 / B*^4.75] + [ν Q^9.4 / B*^5.2 ] }^0.04
D = 0.66 { [ 0.00018^1.25 × 0.113^9.5 / 0.07848^4.75 ] + [ 1.00 × 10^-6 × 0.113^9.4 / 0.07848^5.2 ] } ^0.04
D = 0.305 m.
Three energy balance equations and continuity equation:
z_A = z_D + p_D/γ + f_AD (L_AD /D_AD ) V_AD² / (2g)
z_B = z_D + p_D/γ + f_BD (L_BD /D_BD ) V_BD² / (2g)
z_D + p_D/γ = f_DC (L_DC /D_DC ) V_DC² / (2g)
V_AD A_AD + V_BD A_BD = V_DC A_DC
A_AD = 0.7845 ft²
A_BD = 0.1963 ft²
A_DC = 0.7854 ft²
State continuity equation as follows: V_AD A_AD + V_BD A_BD - V_DC A_DC = X
The solution is by trial and error.
Assume p_D/γ and calculate resulting velocities using energy equations; then plug velocities and areas in continuity equation until X = 0.
First assume V_AD = 0.
Then p_D/γ = 60.0 ft.
Start by assuming a somewhat lessr value:
p_D/γ = 50 ft. Eventually, choose p_D/γ = 39 ft.
p_D/γ = 39 ft: X = -0.27
p_D/γ = 38.9 ft: X = 0.006
The final velocities are:
V_AD = 3.008 fps.
V_BD = 4.555 fps.
V_DC = 4.139 fps.
Q_AD = 0.7854 × 3.008 = 2.362 cfs.
Q_BD = 0.1963 × 4.555 = 0.894 cfs.
Q_DC = 0.7854 × 4.139 = 3.250 cfs.
p_D = 38.9 ft × 62.4 lb/ft ³ = 2,371 lb/ft²
a = [ (f₂/f₁) (L₂/L₁) ] ^1/2 (D₁/D₂)^2.5
Use simplified formula:
a = [ (0.03/0.02) (1500/1000) ] ^1/2 (0.3/0.5)^2.5
a = 0.418
Q₁ = a Q / (a + 1) = 0.2947 m³
Q₂ = Q / (a + 1) = 0.7051 m³
h_L1 = 0.02 × (1000/0.3) V₁²/(2g) = 59.06 m.
h_L2 = 0.03 × (1500/0.5) V₂²/(2g) = 59.06 m.