课程名称︰普通物理学甲上
课程性质︰大一必修
课程教师︰李庆德
开课学院:电资学院
开课系所︰电机工程学系
考试日期(年月日)︰2015/1/15
考试时限(分钟):110分钟
试题 :
===============================================================================
General Physics A0 ── Final Exam( January 15, 2015 )
1 Multiple-choice Problems: (5 points each)
1. The displacement of an object oscillating on a spring is given by X(t) =
Xm cos(ωt+ψ). If the object is initially displaced in the negative x
direction and given a negative initial velocity, then the phase constant ψ
is between:
(A) 0 and π/2 radians
(B) π/2 and π radians
(C) π and 3π/2 radians
(D) 3π/2 and 2π radians
(E) none of the above ( ψ is exactly 0,π/2,π,or 3π/2 radians )
2. A window washer attemps to lean a ladder against a frictionless wall. He
finds that the ladder slips on the ground when it is placed at an angle of
less than 75°to the ground but remains in place when the angle is greater
than 75°. The coefficient of static friction between the ladder and the
ground:
(A) is about 0.13
(B) is about 0.27
(C) is about 1.3
(D) depends on the mass of the ladder
(E) depends on the length of the ladder
3. A stationary source S generates circular outgoing waves on a lake. The
wave speed is 5.0 m/s and the crest-to-crest distance is 2.0 m. A person
in a motor boat heads directly toward S at 3.0 m/s. To this person, the
frequency of these waves is:
(A) 1.0 Hz (B) 1.5 Hz (C) 2.0 Hz (D) 4.0 Hz (E) 8.0 Hz
4. The orbit of a certain satellite has a semi-major axis of 1.5 * 10^7 m
and an eccentricity of 0.20. Its perigee( minimum distance from Earth ) and
apogee( maximum distance from Earth ) are respectively:
(A) 1.2 * 10^7 m, 1.8 * 10^7 m
(B) 3.0 * 10^6 m, 1.2 * 10^7 m
(C) 9.6 * 10^6 m, 1.0 * 10^7 m
(D) 1.0 * 10^7 m, 1.2 * 10^7 m
(E) 9.6 * 10^6 m, 1.8 * 10^7 m
5. Two pipes are each open at one end and closed at the other. Pipe A has
length L and pipe B has length 2L. Which harmonic of pipe B matches in
frequency the fundamental of pipe A?
(A) The fundamental
(B) The second
(C) The third
(D) The fourth
(E) There are none
6. Take the mechanical equivalent of heat as 4 J/cal. A 10-gram bullet
moving at 2000 m/s plunges into 1 kg of paraffin wax( specific heat 0.7
cal/g°C ). The wax was initially at 20°C. Assuming that all the bullet's
energy heats the wax, its final temperature( °C ) is:
(A) 20.14 (B) 23.5 (C) 20.006 (D) 27.1 (E) 30.23
7. Ten grams of ice at -20°C is to be changed to steam at 130°C. The
specific heat of both ice and steam is 0.5 cal/g°C. The heat of fusion is
80 cal/g and the heat of vaporization is 540 cal/g. The entire process
requires:
(A) 750 cal (B) 1250 cal (C) 6950 cal (D) 7450 cal (E) 7700 cal
8. In a certain process a gas ends in its original thermodynamic state. Of
the following, which is possible as the net result of the process?
(A) It is adiabatic and the gas does 50 J of work
(B) The gas does no work but absorbs 50 J of energy as heat
(C) The gas does no work but rejects 50 J of energy as heat
(D) The gas rejects 50 J of heat and does 50 J of work
(E) The gas absorbs 50 J of energy as heat and does 50 J of work
2 Calculation Problems: (20 points each)
1. Comet Halley orbits the Sun with a period of 76 years. and in 1986, had a
distance of closet approach to the Sun, its perihelion distance Rp of
8.9 * 10^10 m. This shows the comet was between the orbits of Mercury and
Venus then.
(a) Use a circular orbit to find the relation between the period of a
planet and the radius of its orbit. The relation holds also for elliptical
orbits provided you replace the radius of the circular orbit with the
semi-major axis of the ellipse.
(b) Find the comet's farthest distance from the Sun, which is called its
aphelion distance Ra.
(c) What is the eccentricity e of the orbit of comet Halley?
Note that the mass M of the Sun is 1.99 * 10^30 kg and the gravitational
constant is G = 6.67 * 10^(-11) N m^2/(kg^2).
2. A harmonic oscillator consisting of a block with mass m and a spring with
spring constant k is damped by a damping force that is proportional to the
velocity v, i.e., Fd = -bv. Thus, the displacement function x(t) satisfies
the equation
2
d x dx
m ─── + b ── + kx = 0
2 dt
dt
The solution of this equation is
2
-bt/2m k b
X(t) = Xm e cos(ω't+ψ), with ω' = √( ─ - ── )
m 2
4m
where Xm is the amplitude and ω' is the angular frequency of the damped
oscillator. Assume that m = 250 g, k = 81 N/m, and b = 50 g/s for this
damped oscillator.
(a) What is the period of the motion?
(b) How long does it take for the amplitude of the damped oscillator to
half its initial value?
(c) How long does it take for the mechanical energy to drop to half its
initial value?
3. The temperature of 4.00 moles of an ideal monatomic gas is raised 24.0 K
at constant volume.
(a) What is the work done by the gas?
(b) What is the energy transferred as heat?
(c) What is the change ΔEint in the internal energy of the gas?
(d) What is the change ΔK in the average kinetic energy per atom?
Note that the Boltzmann constant k = R / NA = 1.38 * 10^(-23) J/K and the
Avogadro's number NA = 6.02 * 10^23 mol^(-1).
=============================== 试题完 ====================================
备注:
试卷分A0、A1两份,仅选择题顺序不同,此份为A0卷。