9702_w21_qp_42
A paper of Physics, 9702
Questions:
12
Year:
2021
Paper:
4
Variant:
2
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1
State what is meant by centripetal acceleration. An unpowered toy car moves freely along a smooth track that is initially horizontal. The track contains a vertical circular loop around which the car travels, as shown in . 62 cm Y X loop track toy car mass 230 g The mass of the car is 230 g and the diameter of the loop is 62 cm. Assume that the resistive forces acting on the car are negligible. State what happens to the magnitude of the centripetal acceleration of the car as it moves around the loop from X to Y. Explain, if the car remains in contact with the track, why the centripetal acceleration of the car at point Y must be greater than 9.8 m s–2. The initial speed at which the car in moves along the track is 3.8 m s–1. Determine whether the car is in contact with the track at point Y. Show your working. Suggest, with a reason but without calculation, whether your conclusion in would be different for a car of mass 460 g moving with the same initial speed.
12. Motion in a circle  →  12.2. Centripetal acceleration
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2
State the relationship between gravitational potential and gravitational field strength. A moon of mass M and radius R orbits a planet of mass 3M and radius 2R. At a particular time, the distance between their centres is D, as shown in . D x P planet mass 3M radius 2R moon mass M radius R Point P is a point along the line between the centres of the planet and the moon, at a variable distance x from the centre of the planet. The variation with x of the gravitational potential φ at point P, for points between the planet and the moon, is shown in . φ 2R D – R x Explain why φ is negative throughout the entire range x = 2R to x = D – R. One of the features of is that φ is negative throughout. Describe two other features of . 1. 2. On , sketch the variation with x of the gravitational field strength g at point P between x = 2R and x = D – R. 2R x g D – R
13. Gravitational fields  →  13.4. Gravitational potential
13. Gravitational fields  →  13.3. Gravitational field of a point mass
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3
One of the assumptions of the kinetic theory of gases is that all collisions involving molecules of the gas are elastic. State what is meant by an elastic collision. State two other assumptions of the kinetic theory of gases. 1. 2. A molecule of an ideal gas has mass m and is contained in a cubic box of side length L. The molecule is moving with velocity u towards the face of the box that is shaded in . u L molecule The molecule collides elastically with the shaded face and the face opposite to it alternately. Deduce expressions, in terms of m, u and L, for: the magnitude of the change in momentum of the molecule on colliding with a face change in momentum = the time between consecutive collisions of the molecule with the shaded face time = the average force exerted by the molecule on the shaded face force = the pressure on the shaded face if the force in is exerted over the whole area of the face. pressure = When the model described in is extended to three dimensions, and to a gas containing N molecules, each of mass m, travelling with mean-square speed 〈c2〉, it can be shown that pV = 1 Nm〈c2〉 where p is the pressure exerted by the gas and V is the volume of the gas. Use this expression, together with the equation of state of an ideal gas, to show that the average translational kinetic energy EK of a molecule of an ideal gas is given by EK = 3 kT where T is the thermodynamic temperature of the gas and k is the Boltzmann constant. The mass of a hydrogen molecule is 3.34 × 10–27 kg. Use the expression for EK in to determine the root-mean-square (r.m.s.) speed of a molecule of hydrogen gas at 25 °C. r.m.s. speed = m s–1
15. Ideal gases  →  15.3. Kinetic theory of gases
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4
A trolley on a smooth surface is attached by springs to fixed blocks as shown in . springs trolley smooth surface fixed block fixed block The trolley oscillates horizontally about its equilibrium position with an amplitude of 12 cm. shows the variation of the acceleration a of the trolley with displacement x from its equilibrium position. Friction between the trolley and the surface can be assumed to be negligible. 0.8 0.4 – 0.4 –0.8 – 4 –8 –12 x / cm a / m s–2 Describe the features of the line in that demonstrate that the motion of the trolley is simple harmonic. Use to determine the period T of the oscillations of the trolley. T = s On the line of the graph of , label with the letter P one point where the kinetic energy of the trolley is zero. On the line of the graph of , label with the letter Q an approximate position of one point where the kinetic energy of the trolley is equal to the potential energy stored in the springs.
17. Oscillations  →  17.1. Simple harmonic oscillations
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5
When audio signals are transmitted over long distances, modulation of radio waves is used. Suggest a reason why modulation is used. State a technical advantage and a technical disadvantage of using frequency modulation rather than amplitude modulation. advantage: disadvantage: An audio signal of amplitude 2.0 μV and frequency 4.2 kHz is to be transmitted using a carrier wave of amplitude 10.0 mV and frequency 100 kHz. Either amplitude modulation or frequency modulation may be used. The amplitude modulation is at a rate of 1 mV μV–1. The frequency modulation is at a rate of 5 kHz μV–1. Complete Table 5.1 to show the maximum and minimum values of the amplitude and of the frequency of the modulated wave for each type of modulation. Table 5.1 amplitude / mV frequency / kHz minimum maximum minimum maximum amplitude modulation frequency modulation For the amplitude modulated wave in , determine the bandwidth. bandwidth = kHz
7. Waves  →  7.1. Progressive waves
17. Oscillations  →  17.1. Simple harmonic oscillations
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6
Define electric potential. An isolated conducting sphere in a vacuum has radius r and is initially uncharged. It is then charged by friction so that it carries a final charge Q. This charge can be considered to be acting at the centre of the sphere. By considering the electric potential at its surface, show that the capacitance C of the sphere is given by C = 4πε0r where ε0 is the permittivity of free space. The dome of an electrostatic generator is a spherical conductor of radius 13 cm. It is initially charged so that the electric potential at the surface is 4.5 kV. A smaller isolated sphere of radius 5.2 cm, initially uncharged, is brought near to the dome. Sparking causes a current between the two spheres until they reach the same potential. Assume that any charge on a sphere may be considered to act as a point charge at its centre. Calculate the charge that is transferred between the two spheres. charge = C
18. Electric fields  →  18.3. Electric force between point charges
18. Electric fields  →  18.5. Electric potential
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7
An operational amplifier (op-amp) has two input terminals and one output terminal. State what is meant by the gain of an op-amp. State two effects of negative feedback on the gain of an amplifier circuit that uses an op-amp. 1. 2. shows an op-amp circuit that uses negative feedback. VOUT VIN 0 V 0 V –8.0 V +8.0 V 480 Ω 1.2 kΩ – + State the name of the type of circuit shown in . On , label with the letter X a point in the circuit that is considered to be a virtual earth. Calculate the gain of the circuit in . gain = Determine the value of VIN when VOUT is +6.5 V. VIN = V Determine the value of VOUT when VIN is –5.4 V. VOUT = V
10. D.C. circuits  →  10.1. Practical circuits
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8
Two long straight parallel wires P and Q carry currents into the plane of the paper, as shown in . P current I Q current 2I The current in P is I and the current in Q is 2I. On , draw an arrow to show the direction of the magnetic field at wire Q due to the current in wire P. Label this arrow B. On , draw another arrow to show the direction of the force acting on wire Q due to the current in wire P. Label this arrow F. State, with a reason, how the magnitude of the force acting on wire P compares with the magnitude of the force acting on wire Q. State how the direction of the force on wire P compares with the direction of the force on wire Q.
20. Magnetic fields  →  20.3. Force on a moving charge
20. Magnetic fields  →  20.4. Magnetic fields due to currents
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9
State what is meant by: the photoelectric effect work function energy. A polished calcium plate in a vacuum is investigated by illuminating the surface with light. It is found that no photoelectric current is produced when the frequency of the light is less than 6.93 × 1014 Hz. State the name of the frequency below which no photoelectric current is produced. Explain how the photon model of electromagnetic radiation accounts for this phenomenon. Calculate the work function energy, in eV, of calcium. work function energy = eV
22. Quantum physics  →  22.2. Photoelectric effect
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10
shows a simple laminated iron-cored transformer consisting of a primary coil of 25 000 turns and a secondary coil of 625 turns. laminated iron core 25 000 turns turns 640 Ω VOUT VIN The output potential difference (p.d.) VOUT is applied to a load resistor of resistance 640 Ω. State the function of the iron core. Explain why the iron core is laminated. The input p.d. VIN is a sinusoidal alternating voltage of peak value 12 kV and period 40 ms. Calculate the maximum value of VOUT. maximum VOUT = V Calculate the root-mean-square (r.m.s.) current in the load resistor. r.m.s. current = A On , sketch the variation with time t of the power P dissipated in the load resistor for time t = 0 to t = 40 ms. Assume that P = 0 when t = 0. –100 –200 t / ms P / W Explain, with reference to Fig.10.2, why the mean power in the load resistor is 70 W.
21. Alternating currents  →  21.1. Characteristics of alternating currents
9. Electricity  →  9.2. Potential difference and power
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12
Radioactive decay is both random and spontaneous. State what is meant by: random spontaneous. A sample of radioactive material contains atoms of an unstable nuclide X. The activity of the sample due to the atoms of X is A. The variation with time t of ln A is shown in . 35.00 35.4 35.8 36.2 36.6 In (A / Bq) t / min Use to determine the half-life, in minutes, of nuclide X. half-life = min At time t = 0, the mass of the atoms of X in the sample is 5.66 × 10–7 kg. Determine the nucleon number of X. nucleon number =
23. Nuclear physics  →  23.2. Radioactive decay
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