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Side slope z = 2: φ = 26.565o
Angle of repose θ = 30o
Tractive force ratio K = [1 - (sin2φ/sin2θ)]1/2 = [1 - (0.2/0.25)]1/2 = 0.4472
Assume b/y > 10. Then: Cs = 0.78 (coefficient of tractive force based on material on the sides)
The acting shear stress on the sides: Ts = 0.78 γ y So = (0.78) (62.4) (y) (0.00065) = 0.0316 y Permissible tractive stress on level ground: τL = 0.2 lb/ft2 Permissible tractive stress on the sides: τs = K τL = (0.4472) (0.2) = 0.08944 lb/ft2 Under equilibrium: Ts = τs Thus: 0.0316 y = 0.08944 From which flow depth y is: y = 2.83 ft. The Manning equation is: Q = (1.486/n) A R2/3 S1/2 = (1.486/0.02) A (A2/3/P2/3) (S)1/2 Q = (1.486/0.02) (A5/3/P2/3) (0.00065)1/2 Q = 1.894 (A5/3/P2/3) A = (b + zy) y = (b + 2y) y P = b + 2 y (1+z2)1/2 = b + 2 y (1+22)1/2 = b + 4.472 y With y = 2.83 ft, try several values of b, until design Q is satisfied.
Choose b = 74 ft; y = 2.83 ft; from which b/y = 26 > 10. OK.
With b/y = 26, the coefficient of tractive force based on material on the bottom: Cb = 1.0
The acting shear stress on level ground is: TL= 1.0 γ y So = (1.0) (62.4) (2.83) (0.00065) = 0.115 lb/ft2 TL= 0.115 < 0.2 = τL Therefore, the sides control the design. b= 74 ft; y = 2.83 ft. ANSWER.
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