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NAME _____________________________ ID Number__________________________ Problem 1 (30 points) 1. (12 points) True/False Questions. Please circle whether the statement is true or false. If the statement is false, please provide a correction in the space provided. No partial credit will be given if the reasoning is wrong if the answer is False (i.e. Score will be either 0 or 2) (a) (2 points) (T/F) Density of a certain liquid is 1360 kg/m3, then the specific gravity of the liquid would be 1.36 kg/m3. _______________________________________________________ ____________________________________________________________ (b) (2 points) (T/F) The no-slip boundary condition is an experimental observation that the velocity of a fluid in contact with a solid surface is equal to the velocity of the surface, and it is only valid for liquids. False. Viscous fluid (not only liquids also gases) always tends to cling to a solid surface in contact with it. (c) (2 points) (T/F) When an interface is a plane so that the radius of curvature is infinite, the pressure difference across the interface is zero, i.e., the pressure is equal on both sides of the plane interface despite the surface tension. ___________________________________________________________________ _______________________________________________________________ (d) (2 points) (T/F) Fluid in which shear stress is not directly proportional to shear strain rate is called non-Newtonian. If the apparent viscosity decreases with increasing shear strain rate, such fluid is called dilatant. Two possible answers 1)Such fluid is called pseudoplastic or shear thinning_________________ 2)Apparent viscosity increases with increasing shear strain rate (e) (2 points) (T/F) The buoyant force is essentially caused by the difference between the pressure at the top of the object and the pressure at the bottom of the object where the pressure at the bottom is always greater than that at the top, generating an upward net force on a submerged object. ____________________________________________________________ ____________________________________________________________ (f) (2 points) (T/F) Cavitation occurs when liquid pressure rises above the vapor pressure due to fluid motion. Drops below__________________________________________________ ____________________________________________________________ NAME _____________________________ ID Number__________________________ 2. (7.5 points) Multiple Choice Questions: Choose only ONE best answer for each problem. (1.5 points) The following figure illustrates the differences between solid and fluid and the arrows indicate shear and normal stresses acting on the surfaces. Which of the stresses A, B, C, D, has a quantity of zero (0)? (a) (b) (c) (d) (e) A only B only C&D A& D A, B, & C (A) (1.5 points) Which of the following is NOT true about fluid properties? (a) The viscosity of the liquid decreases with increasing temperature because of weakening of hydrogen bonding at higher temperature. (b) Contact angle of fluid on a wetting surface is larger than 90°. (c) Surface tension is caused by the inward attraction at the interface of two fluids, due to various intermolecular forces. (d) Fluid viscosity can either increase or decrease with increase in temperature. (e) Pressure is one of the most dynamic variables in fluid and its difference drives a fluid flow. (B) (1.5 points) A wire is attached to a block of metal that is submerged in a tank of water as shown below. Which of the following graphs most correctly describes the relation between the force in the wire and time as the block is pulled slowly NAME _____________________________ ID Number__________________________ out of the water? (d) (C) (1.5 points) Consider constant altitude, steady flow along a streamline with a flow that satisfies the assumptions necessary for Bernoulliβs question shown below. 1 p + ΟV 2 + Ο gz = const 2 Which of the following must have a constant value along the streamline? (a) (b) (c) (d) (e) Internal energy Stagnation pressure only Stagnation and total pressure Dynamic pressure only Static and Dynamic pressure (D) (1.5 points) The laminar velocity profile for a Newtonian fluid is shown above. Which of the following best describes the variation of shear stress with distance from the surface? (c) NAME _____________________________ ID Number__________________________ 3. (10.5 points) Short answer problems (A) (8 points) Viscosity (a) (3 points) An infinite plate is moved over a second plate on a layer of liquid as shown. For small gap width, d, we assume a linear velocity profile in the liquid. Derive the relations of ππ as a function of u, y, and µ (dynamic viscosity) where ππ is the shear stress applied on the liquid by the plate. Make appropriate assumptions and a small angle approximation for the shearing strain. NAME _____________________________ ID Number__________________________ (b) (1 points) What is the SI unit of the dynamic viscosity µ ? (c) (4 points) Suppose a layer of water flows down an inclined surface with the velocity profile shown below. What is the magnitude of the shear stress that the water exerts on the surface if U = 2 m/s and h = 0.1 m (the dynamic viscosity of water is 1.0×10-3 kg/mβ sec)? ππ ππππ οΏ½ ππππ ππ=ππ ππ ππ = ππππ( β ππππ/ππππ )= ππππ = ππ. ππππππ β ππ β π‘π‘ π‘π‘ ππ ππ.ππ = ππ. ππππππ/ππππ (B) (2.5 points) Surface tension problem Surface tension force can be strong enough to allow a double-edge steel razor blade to float on water as shown below. Assume that the surface tension forces act at an angle ΞΈ relative to the water surface as shown. NAME _____________________________ ID Number__________________________ The mass of the double-edge blade is 0.64 × 10β3 kg and the total length of its sides is 206 mm, Determine the value of ΞΈ required to make the blade float. Neglect the effect of buoyant force. Surface tension Ο water / air = 0.073 N/m and gravitational acceleration is 9.8 m/s2. ππππ = π π π π π π π π π π π π π π π‘π‘π‘π‘π‘π‘π‘π‘π‘π‘π‘π‘π‘π‘ 0.64 × 10β3 × 9.8 = 206 × 10β3 × 0.073 × sin ππ ππ = 24.65° νΉμ0.43(ππππππ) NAME _____________________________ ID Number__________________________ Problem 2 (20 points) (a) (4 points) Since the atmospheric pressure is applied on both sides, we donβt have to consider the atmospheric pressure for the net hydrostatic force. πΉπΉ = πππΆπΆπΆπΆ π΄π΄ = ππππβπΆπΆπΆπΆ π΄π΄ = 9.8 × 1000 × 1.5 sin(60°) × 3 × 2 = 76383 = ππ. ππ × ππππππ [ππ] The F acts in the direction normal to the gate (and onto the gate). Partial point: βππππ (+1 point) Deduction: without direction (-1 point) (b) (3 points) CG is 1.5 m from the hinge. The original of the coordinate system is on CG. π¦π¦πΆπΆπΆπΆ = βπΌπΌπ₯π₯π₯π₯ ππππ sin(60°) πππΆπΆπΆπΆ π΄π΄ = βπΌπΌπ₯π₯π₯π₯ ππππ sin(60°) ππππβπΆπΆπΆπΆ π΄π΄ =β πΌπΌπ₯π₯π₯π₯ ππππ sin(60°) ππππ1.5 sin(60°)π΄π΄ 1 ×2×33 = β 12 = β0.5 [ππ] 1.5×2×3 Therefore, the distance between the hinge and CP is 1 m. Partial point: π¦π¦πΆπΆπΆπΆ = β0.5 (+1 point) Deduction: use miscalculated F(form(a)) (-2 point) (c) (8 points) Momentum equilibrium w.r.t the hinge β ππ = 0 Consider three momentum components caused by the hydrostatic force F, the cable tension T, and the gate weight W. β ππ = ππ × 4 × sin(60°) β ππ × 2 × cos(60°) β πΉπΉ × 1 = 0 ππ = ππππππππππ = ππ. ππ × ππππππ [π΅π΅] Deduction: 1. Without gate weight (-2 points) β ππ = ππ × 4 × sin(60°) β πΉπΉ × 1 = 0 , πΉπΉ = 22050 = 2.2 × 104 [ππ] 2. Use miscalculated F(from(a)) or CP(from(b)) (-2 points) NAME _____________________________ ID Number__________________________ (d) (5 points) Upward buoyant force by the buoy: 4 πΉπΉππ = πππππππ π π π π π π π π π π π π π π π π π = 1000 × 9.8 × 0.5 × 3 ππ(0.5)3 = 2566 = 2.6 × 103 [ππ] Net upward force by the buoy (ππππ : weight of the buoy): πΉπΉπ’π’ = πΉπΉππ β ππππ = 2.6 × 103 β 300 = 2.3 × 103 [ππ] Momentum equilibrium: β ππ = ππ × 4 × sin(60°) β ππ × 2 × cos(60°) β πΉπΉ × 1 = 0 (without the buoy) β ππ = (ππ β 200) × 4 × sin(60°) β ππ × 2 × cos(60°) β πΉπΉ × 1 + πΉπΉπ’π’ × ππ × cos(60°) = 0 (d: the distance between the hinge and the string) Form the above two equations, 200 × 4 × sin(60°) β Fb × ππ × cos(60°) = 0 ππ = 200×4×π π π π π π (60) πΉπΉπ’π’ ×ππππππ(60°) = ππ. ππππ [ππ] Partial point: buoyance force πΉπΉππ = 2.6 × 103 [ππ] (+1 point) Deduction: 1. Without buoy weight (-2 points), if you use full equation. (β ππ = β200 × 4 × sin(60°) + πΉπΉπ’π’ × ππ × cos(60°) = 0, there is no deduction.) 2. Use miscalculated F(from(a)) or CP(from(b)) (-2 points) NAME _____________________________ ID Number__________________________ Problem 3 (25 points) (a) (10 points) Fy Fx Fixed, stationary CV 1) mass conservation mο¦= mο¦ 2 + mο¦ 3 1 +1 +1 Ο= Ο A2V2 + Ο A3V3 AV 1 1 D2 D12 D22 = V1 V2 + 3 V3 4 4 4 2 2 D1 V1 β D2 V2 0.122 × 5 β 0.062 × 5 = = 33.75m / s V3 = D32 0.042 +1 2) momentum conservation Fx mο¦ 2V2 β mο¦ 1V1 = 2 Fx Ο A2V22 β Ο AV = 1 1 +1 + 1.5  0.062 β 0.122 ο£Ά D22 D2 2 2 1000 × ο£¬ Ο V22 β Ο 1 Ο V1= ο£· ×Ο × 5 4 4 4 ο£ ο£Έ Fx = β212.0575 N +1 F= Ο x NAME _____________________________ ID Number__________________________ Fy β ( ΟVwater g + mg ) = βmο¦ 3V3 +1 Fy = β Ο A V + ( ΟVwater g + mg ) 2 3 3 Fy =β Ο + 1.5  0.042 ο£Ά D32 2 Ο V32 + ( ΟVwater g + mg ) =β1000 × ο£¬ ο£· × Ο × 33.75 + 1000 ×1× 9.8 + 10 × 9.8 4 ο£ 4 ο£Έ Fy = 8466.6 N +1 (b) (15 points) moving, stationary CV (IRF on the ground) a) mass conservation +1 mο¦= mο¦ 2 + mο¦ 3 1 Ο= Ο A2V2 + Ο A3V3 AV 1 1 2 1 2 2 +2 +2 2 3 D D D = V1 V2 + V3 4 4 4 D12V1 β D22V2 0.122 × 5 β 0.062 × 5 = = 33.75m / s V3 = D32 0.042 +1 2) momentum conservation F= mο¦ 2 (V2 + Vc ) β mο¦ 1 (V1 + Vc ) + mο¦ 3Vc x +3 = Fx ( Ο A2V2 )(V2 + Vc ) β ( Ο AV 1 1 )(V1 + Vc ) + ( Ο A3V3 )Vc 2 2 2 1 2 3 +4 D D D Ο V2 (V2 + Vc ) β Ο Ο V1 (V1 + Vc ) + Ο Ο V3Vc 4 4 4  0.062 × 5 × 6 β 0.122 × 5 × 6 + 0.042 × 33.75 ×1 ο£Ά = 1000 × ο£¬ ο£· ×Ο 4 ο£ ο£Έ = Fx Ο Fx = β212.0575 N +2 moving, stationary CV (IRF on the pipe) = Fx mο¦ 2V2 β mο¦ 1V1 = Fx ( Ο A2V2 )(V2 ) β ( Ο AV 1 1 )(V1 ) D22 D2 Ο V2 2 β Ο 1 Ο V12 4 4 2  0.06 β 0.122 ο£Ά 2 = 1000 × ο£¬ ο£· ×Ο × 5 4 ο£ ο£Έ = Fx Ο Fx = β212.0575 N NAME _____________________________ ID Number__________________________ 1) Without specifications of the CV and IRF β1, respectively. 2) Wrong velocity direction (sign) in the momentum equation β0.5 3) Consider the pressure force in the momentum equation β0.5 4) Omit the gravity terms, mass of water and pipe + plate, β0.5, respectively NAME _____________________________ ID Number__________________________ Problem 4 (25 points) Solution) (a) = t0 2m / (0.5 × 9.8m / s 2 ) = = v2 15 m / t0 23.48m / s 0.5 ×1000kg / m3 × v2 2 + 1000kg / m3 × 9.8m / s 2 × 2m + 101.3kPa = 1000kg / m3 × 9.8m / s 2 ×15m + P1 P1 = 249.53kPa (b) Q= A2 × v2 2 A2 (2.5cm) 2 × Ο = Q2 = 0.0461m3 / s 1 Q2 99 0.5 ×1000kg / m3 × v2 2 + 1000kg / m3 × 9.8m / s 2 × 2m + 101.3kPa Q3 = = 1000kg / m3 × 9.8m / s 2 ×10m + 101.3kPa + 0.5 ×1000kg / m3 × v32 v3 = 19.86m / s / v3 2.34 ×10β5 m 2 A3 Q3 = = (c) = t0 2m / (0.5 × 9.8m / s 2 ) = = v2 20 m / t0 31.30m / s = kPa 1000kg / m3 × 9.8m / s × h1 + P1 0.5 × 1000kg / m3 × v2 2 + 1000kg / m3 × 9.8m / s 2 × 2m + 101.3 P1 = 249.53kPa h1 = 36.87 m : -4 points subtraction when the mistakes happens in the Bernoulli equation part. When the mistaken in the physical quantities (likes t0, Qβ¦β¦) make a different answer. The score of correct process is counted. (ex. Prob 4 in (c), Wrong answer h1 is got due to the selection of wrong v2. Only -1.5 points subtraction is counted. If the other processes are correct.)
