Physics 115 Christmas Exam

Physics 115 Christmas Exam - 1993

1.

A glass plate 3.00 cm thick, with an index of refraction of 1.5 and plane parallel faces, is held with its faces horizontal and its lower face 9.00 cm above a printed page. Find the position of the image of the page formed by rays making a small angle with the normal to the plate.

2.

Two springs, each with unstretched length 0.20 m but having different force constants k₁ and k₂, are attached to opposite ends of a block with mass m on a level, frictionless surface. The outer ends of the springs are now attached to two pins P₁ and P₂, 0.10 m from the original positions of the ends of the springs. Let k₁=1.00 N/m, k₂=3.00 N/m, and m=0.10 kg.

(a): Find the length of each spring when the block is in its new equilibrium position after the springs have been attached to the pins. (3 marks)
(b): Find the period of vibration of the block if it is slightly displaced from its new equilibrium position and released. (7 marks)

3.

A wire of mass density $\mu=0.18$ kg/m is stretched between a fixed support and a pulley, as shown in the figure. A mass of 14.0 kg is attached at the free end of the wire. The segment of wire between the fixed end and the pulley can vibrate.

(a): The wire vibrates with a frequency of 16.0 Hz in its fundamental mode. What is the length of the wire stretched between the fixed point and the pulley? (5 marks)
(b): What are the next two frequencies at which standing waves can be set up in the wire? Sketch the standing wave pattern corresponding to these frequencies. (2 marks)
(c): What will be the velocity of a travelling wave on the wire? (1 mark) If the attached mass is doubled, what will be the new frequency in the fundamental mode? (2 marks)

4.

A sinusoidal wave, travelling along a string, causes the displacement of the string given by the equation

$\begin{displaymath}y(x,t) \; = \; (0.1\hbox{\rm ~m}) \; \sin \left({\pi \over 3.0} x + {\pi \over 6.0} t + {\pi \over 4.0} \right) \end{displaymath}$

(a): What are the values of wavelength $\lambda$ , the frequency f and the amplitude for this wave? (2 marks)
(b): What is the direction of propagation of the moving wave? (2 marks)
(c): What is the velocity of the wave along the string? (2 marks)
(d): What is the displacement and velocity of a point on the string at position x=1.0 m at time t=2.0 s? (2 marks)
(e): Write down the equation for a wave which when superposed with the above wave will give zero displacement everywhere along the string at all times. (2 marks)

5.

A bat, moving at a speed of 5.0 m/s, is chasing a flying insect. The bat emits a 40.0 kHz sound. When this sound is reflected back from the insect, the bat hears a sound of frequency 40.4 kHz. At what velocity is the insect moving towards or away from the bat? The speed of sound in air is 343 m/s.

6.

(a): A sound technician sits 7.5 m from a loudspeaker L₁ which emits 75 Watts of power in all directions. What is the maximum sound level heard by the technician? (4 marks)
(b): Now a second loudspeaker L₂ is placed 11 m away as shown in the figure. In a hurry, the technician has connected the speakers wrongly and the speakers ended up being exactly out of phase. What are the two lowest frequencies for which he hears a maximum? The speed of sound is 343 m/s and the audible range is 20-20,000 Hz. (6 marks)

7.

Microwaves of frequency 60 GHz are normally incident on a diffraction grating comprising 10 slits cut in a metal sheet. The slits have centre-to-centre separation of 3.0 cm and an individual width of 0.7 cm.

(a): Calculate the angles of ALL the diffraction maxima assuming that the receiver is a relatively long distance from the grating. (2 marks)
(b): Calculate the location of the first diffraction minimum if all the slits are covered up except one. (2 marks)
(c): Sketch the intensity as a function of angle when only 2 slits are uncovered. (2 marks)
(d): Sketch the intensity as a function of angle when 10 slits are uncovered. (2 marks)
(e): Explain the similarities and differences of (c) and (d). (2 marks)

8.

(a): What are the two fixed points on the thermodynamic scale (constant volume ideal gas thermometer scale)? (2 marks)
(b): How much heat is required to warm 6.0 kg of ice (c=2220 J/kg-K) from $-10^\circ$ C to $0^\circ$ C (staying as ice)? (2 marks)
(c): How much heat is given off if you freeze 0.3 kg of water initially at $30^\circ$ C (c=4190 J/kg-K and L=333,000 J/kg)? (2 marks)
(d): If 0.3 kg of water is dropped onto a 6 kg block of ice at $-10^\circ$ C, what is the final temperature when equilibrium is reached, and how much ice and/or water is there? (3 marks)

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