IB 2011 paper2

IB 2011 PAPER 2
At the IB exam, you must answer all questions from section A and one from section B.
You will have 75 minutes.

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(a) State one piece of evidence that shows that “D” is not proportional to “n”
(b) On the graph above, draw the line of best-fit for the data points.
(c) Theory suggest that D2 = k x n. A graph of “D2”againts “n” is shown below. Error bars are
shown for the first and last data points only.
(i) Using the graph on page 1, calculate the percentage uncertainties in D2, of the ring n=7.
(ii) Base on the graph below, state one piece of evidence that supports the relationship
D2 = k x n.
(iii) Use the graph below to determine the value of the constant “k” as well as the uncertainty.
(iv) State the unit for the constant “k”

A2. This question is about motion in a magnetic field.

An electron that has been accelerated from rest by a potential difference of 250V, enters a region of
magnetic field of strength 0.12 T that is directed into the plane of the page.

(a) The electron’s path while in the region of magnetic field is a quarter circle. Show that the
(i) speed of the electron after acceleration is 9.4 x 106 m/sec
(ii) radius of the circle is 4.5 x 10-4 m

2

(b) The diagram 0n the right shows the momentum P initial
of the electron as it enters and leaves the region of
magnetic field. The magnitude of the initial and
final momentum is 8.6 x 10-24 N sec.
(i) On the diagram, draw an arrow to indicate the
vector representing the change in momentum
of the electron.
(ii) Show that the magnitude of the change in the
momentum of the electron is 1.2 x 10-23 N sec.
(iii) The time the electron spend in the region of magnetic P final
field is 7.4 x 10-11 s. Estimate the magnitude of the average force on the electron.

A3. A ball of mass 0.25 kg is attached to a string and is made to rotate with constant speed “v” along
a horizontal circle of radius r = 0.33 m. The string is attached to the ceiling and makes an angle
of 300 with the vertical.

(a) (i) On the diagram above, draw and label arrows to represent the forces on the ball in the
position shown.
(ii) State and explain whether the ball is in equilibrium.

(b) Determine the speed of rotation of the ball.

SECTION B

This section consist of three questions: B1, B2 and B3. Answer one question.

B1. This question is in two parts. Part 1 is about a nuclear reactor. Part 2 is about a simple harmonic oscillations.

Part 1. Nuclear reactor
235
(a) Uranium is used as a fuel in a small research nuclear reactor. The concentration of Uranium 92 U in a sample of
uranium must be increased before it can be used as a fuel.
235
State the name of the process by which the concentration of 92 U is increased.

3

(b) The reactor produces 24 MW of power/ The efficiency of the reactor is 32%. In the fission of one uranium 235
nucleus 3.2 x 10-11 J of energy is released. Determine the mass of uranium 235 that undergoes fission in one year
in this reactor.

(c) Explain what would happen if the moderator of this reactor were to be removed.

(d) During its normal operation, the following set of reactions take place in the reactor.

(i) State the name of the process represented by the reaction (II)
(ii) Comment on the international implications of the product of these reactions.

B1 - Part 2 Simple harmonic oscillations

A longitudinal wave travels through a medium from left to right. Graph 1 shows the variation with time “t” of the
displacement “x” of a particle “P” in the medium.

(a) For particle “P”,
(i) state how graph 1 shows that its oscillation are not damped.
(ii) calculate the magnitude of the maximum acceleration
(iii) calculate itrs speed at t = 0.12
(iv) state its direction of motion at t= 0.12 s

(b) Graph 2 shows the variation with position “d” of the displacement “x” of a particle in the medium at a
particular instant of time.

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Determine for the longitudinal wave, using graph 1 and graph 2,
(i) the frequency
(ii) the speed

(c) The diagram shows the equilibrium positions of six particles in the medium
(i) On the diagram above, draw crosses to indicate the position of these six particles at the instant of time
when the displacement is given by graph 2.
(ii) On the diagram above, label with the letter “C” a particle that is at the center of a compression.

B2: Thos question is in two parts. Part1 is about mechanics and thermal physics. Part 2 is about nuclear physics.

Part 1 Mechanics and thermal physics

The graph shows the variation with time “t” of the speed “v” of a ball of mass 0.50 kg. that has been released
from rest above the Earth’s surface.

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The force of air resistance is not negligible. Assume that the acceleration of the free fall is g = 9.81 m/sec2.

(a) State, without any calculations, how the graph could be used to determine the distance fallen.

(b) (i) Draw and label arrows to represent the forces on the ball at t=2 sec.
(ii) Use the graph to show that the acceleration of the ball at 2.0 s is approximately 4 m/sec2
(iii) Calculate the magnitude of the force of air resistance on the ball at 2.0 s.
(iv) State and explain whether the air resistance on the ball at t=5.0 s is smaller than, equal to or grater than
the air resistance at t=2.0 s

(c) After 10 sec the ball has fallen 190m
(i) Show hat the sum of the potential and kinetic energies of the ball has decreased by 780J
(ii) The specific heat capacity of the ball is 480 J / (kg K). Estimate the increase in the temperature of the
ball.
(iii) State the assumption made in the estimate in (C)(ii)

Part 2. Nuclear physics

(a) (i) Define binding energy of a nucleus. 239
(ii) The mass of a nucleus of plutonium 94 Pu is 238.990396 u. Deduce that the binding energy per
nucleon for plutonium is 7.6 MeV.

(b) The graph shows the variation with nucleon number “A” of the binding energy per nucleon.

239
Plutonium ( Pu) undergoes nuclear fission according to the reaction given below
94

(b) (i) Calculate the number “x” of neutrons produced.
(ii) Use the graph to estimate the energy released in the reaction.

(C) Stable nuclei with a mass number greater that about 20, contains more neutrons than protons. By
reference to the properties of the nuclear force and of the electrostatic force, suggest an explanation for
this observation.

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B3 This question is in two parts. Part 1 is about electrical circuits. Part 2 is about the energy balance of the
Earth.

Part 1 Electrical circuits
(a) Define
(i) electromotive force (emf) of a battery.
(ii) electrical resistance of a conductor.

(b) A battery of emf “ε” and negligible internal resistance is connected in series to two resistors. The current
in the circuit is “I”.

(i) State the equation giving the total power delivered by the battery.
(ii) The potential difference across resistor “R1” is “V1” and that across resistor “R2” is “V2”. Using the
law of conservation of energy deduce the equation below.

ε = V1 + V2

(C) The graph shows the I-V characteristics of two conductors, “X” and “Y”

On the axis below, sketch graphs to show the variation with potential difference “V” of the resistance
of conductor “X” (label this graph “X”) and conductor “Y” (label this graph “Y”). You do not need to put
any number on the vertical axis.

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(d) The conductors in (C) are connected in series to a battery of emf ε and negligible internal resistance.

The power dissipated in each of the two resistors is the same. Using the graph given in (C),
(i) determine the emf of the battery
(ii) calculate the total power dissipated in the circuit.

Part 2. Energy balance of the Earth

(a) The intensity of the Sun radiation at the position of the Earth is approximately 1400 W/m2

Suggest why the average power received per unit of area of the Earth is 350 W/m2

(b) The diagram shows a simplified model of the energy balance of the Earth’s surface. The diagram shows
radiation entering or leaving the Earth’s surface only.

The average equilibrium temperature of the earth’s surface is “TE” and that of the atmosphere is
TA = 242K

(i) Using the data from the diagram, state the emisivity of the atmosphere.
(ii) Show that the intensity of the radiation by the atmosphere toward the Earth’s surface is 136 W/m2
(iii) By reference to the energy balance of the Earth’s surface calculate “TE”

(c) (i) Outline a mechanism by which part of the radiation radiated by the Earth’s surface is absorbed by
greenhouse gases in the atmosphere.
(ii) Suggest by the incoming solar radiation is not affected by the mechanism you outlined in (C)(i).
(iii) Carbon dioxide (CO2) is a greenhouse gas. State one source and one sink (object that remove CO2)
of this gas

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IB 2011 paper2

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IB 2011 paper2