课程名称︰动力学 课程性质︰必修 课程教师︰阳毅平 开课学院：工学院 开课系所︰机械系 考试日期（年月日）︰2008/6/17 考试时限（分钟）：180 是否需发放奖励金：是 （如未明确表示，则不予发放） 试题 : 1. A uniform bar of length L mass m is suspended horizontally at its ends A and B by inextensible strings of equal length b. When one of the strings is cut, what is the resulting angular acceleration of the bar and the tension of string? (10%) 2. The two blades of radius R rotate counterclockwise with a constant angular velocity ω about the shaft at O mounted in the sliding block. the block is moving to the right with an acceleration of a0. (a) Determine the acceleration of the tip A of the blade when θ=90 in terms of inertial coordinates.(5%) (b) If the mass moment of inertia of each blade is (1/3)mR^2 with respect to its end, what is the mechanical energy of the system?(5%) (c) Is the mechanical energy conserved? Why?(5%) 3. A metal hoop with a radius r and mass m is projected along the incline of angle θ with an inertial speed v0 and angular velocity ω0, where rω0 > v0. The cofficient of kinetic friction is μk, and the mass moment of inertia about its center is mr^2. (a) Define the inertial frame and a body-fixed corradinate system on the hoop.(2%) (b) Write the displacement, velocity and acceleration vectorsof the conter of mass.(3%) (c) Plot the free body diagram with all the forces acting on the hoop before it rolls without slip.(4%) (d) Write the equations of motino of the hoop before it rolls with slip.(4%) (e) How long will it take for the hoop to rotate without slip?(9%) 4. A bowl with a circular cross section of radius R and mass M lies on a frictionless horizontal surface. initially the system is stationary. A small block of mass m startsat point A (θ=0) and slides down the inside of the frictionless bowl. (a) Define the inertial frame and a body-fixed coordinate system on the small block m.(4%) (b) Find the equations of motion of the small mass along the axes of inertial frame.(6%) (c) Find the equations of motion of the bowl along the axes of inertial frame.(6%) (d) What are unknowns in your eq. of motion obtained in (b) and (c)?(4%) (e) What is the velocity of the bowl as the small masss reaches the bottom of the bowl?(10%) 5. A uniform slender bar of mass m is released from rest in the horizontal position, where x = (2√3) (注：质心 与接触点的距离). The cofficient of friction between the bar and edge is μ. (a) Define the inertial frame and a body-fixed coordinate syster on the bar. (2%) (b) Write the general exprassions of position, velocity, and acceleration of the center of mass before the bar slips.(5%) (c) Write the general exprassions of position, velocity, and acceleration of the center of mass after the bar slips.(3%) (d) What is the inertial angular acceleration of the bar just when it is released?(extra7%) (e) Write the eq. of motion of the bar before it slips.(extra6%) (f) Determine the angle θ at which the cilinder starts to slip.(extra12%) 6. A uniform slender bar of length L and mass m is sliding to the left on the horizontal surface with velocity v0 when srikes the small step at O. assume negligible rebond at the step. (a) What is the angular velocity of the bar immediately after impact?(10%) (b) What is the percentage energy loss afer impact?(extra5%) (c) Computethe minimum value of v0 which will permit the bar to pivot freely about O and just reach the standing position A with no velocity.(5%) -- ██████████████████ ▏ ▏O ▏ ▏ ▏ ▏ 剪 ＠/ ▏ ▏ 刀 ＠\ ▏ ▏ ▏ ▏ ▏ ▏ A ▆▆▆▆▆▆▆▆▆▆▆▆▆ B Problem 1 -- Y ◢◤ A ▉ ◢◤ ▉ ▁▁▁▁ O ◢◤▁▁▁▁ ▉▁▁X ▁▁▁▁ ███ ▁▁▁▁▁ ◢◤ ◢◤ B ◢◤ Problem 2 -- ▁ ω0 m / \ ▏ G ▏V0 → \ / ▁▁ ▇▇▆▆▅▅▄▄▃▃▂▂▁▁▁ θ Problem 3 -- A ┌─┐ ┌─┐ │ │ │ B \˙ / │ g↓ │ ▁ │ │ M │ └────────┘ Problem 4 -- ｜←──────l──────→︳ O←x→G ▇▇▇▇▇▇▇▇▇▇▇▇▇▇▇ ▁▁▁▁▁▁▁◢◣ ▉ ▉ ▉ Problem 5 -- A ． ． ． v0 ． ←─ ◢◤ ． ◢◤ ． ◢◤ ． ◢◤ ． ◢◤ 60。 █████████▃▃▃▃▃▃▃▃▃ O Problem 6 ψcccwccc -- 推 a41626416:发文不附图 加油!好吗!! 有图有真相 ※ 编辑: cccWccc 来自: 218.166.232.83 (06/24 09:58)