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Date May 2015 Marks available 6 Reference code 15M.2.SL.TZ1.5
Level Standard level Paper Paper 2 Time zone Time zone 1
Command term Calculate and Describe Question number 5 Adapted from N/A

Question

This question is in two parts. Part 1 is about a thermistor circuit. Part 2 is about vibrations and waves.

Part 1 Thermistor circuit
The circuit shows a negative temperature coefficient (NTC) thermistor X and a 100 kΩ fixed resistor R connected across a battery.


The battery has an electromotive force (emf) of 12.0 V and negligible internal resistance.

Part 2 Vibrations and waves

The cone and dust cap D of a loudspeaker L vibrates with a frequency of 1.25 kHz with simple harmonic motion (SHM).

(i) Define electromotive force (emf).

(ii) State how the emf of the battery can be measured.

[2]
a.

The graph below shows the variation with temperature T of the resistance RX of the thermistor.

(i) Determine the temperature of X when the potential difference across R is 4.5V.

(ii) State the range of temperatures for which the change in the resistance of the thermistor is most sensitive to changes in temperature.

(iii) State and explain the effect of a decrease in temperature on the ratio

\[\frac{{{\rm{voltage across X}}}}{{{\rm{voltage across R}}}}\].

[7]
b.

Define simple harmonic motion (SHM).

[2]
c.

D has mass 6.5 \( \times \) 10−3 kg and vibrates with amplitude 0.85 mm.

(i) Calculate the maximum acceleration of D.

(ii) Determine the total energy of D.

[4]
d.

The sound waves from the loudspeaker travel in air with speed 330 ms−1.

(i) Calculate the wavelength of the sound waves.

(ii) Describe the characteristics of sound waves in air.

[2]
e.

A second loudspeaker S emits the same frequency as L but vibrates out of phase with L. The graph below shows the variation with time t of the displacement x of the waves emitted by S and L.

(i) Deduce the relationship between the phase of L and the phase of S.

(ii) On the graph, sketch the variation with t of x for the wave formed by the superposition of the two waves.

[6]
f.

Markscheme

(i) the work done per unit charge in moving a quantity of charge completely around a circuit / the power delivered per unit current / work done per unit charge made available by a source;

(ii) place voltmeter across battery;

a.

(i) VX = 7.5 V;

\(I\left( { = \frac{{4.5}}{{100 \times {{10}^3}}}} \right) = 4.5 \times {10^{ - 5}}{\rm{A}}\) or \(\frac{{{V_X}}}{{{V_R}}} = \frac{{{R_x}}}{{{R_R}}}\);

\({R_x}\left( { = \frac{{7.5}}{{4.5 \times {{10}^{ - 5}}}}} \right) = 1.67 \times {10^5}\Omega \) or \({R_x}\left( { = \frac{{7.5}}{{4.5}} \times 100 \times {{10}^3}} \right) = 1.67 \times {10^5}\Omega \);

T= 37 or 38ºC

(ii) 50 to (up to) 30 °C / at low temperatures;

(iii) as the temperature decreases Rx increases;

same current through R and X so the ratio increases or VX increases and VR decreases so the ratio increases;

 

b.

(periodic) motion in which acceleration/restoring force is proportional to the displacement from a fixed point;

directed towards the fixed point / in the opposite direction to the displacement;

c.

(i) ω=(2πf = 2π×1250)7854 rad s–1;

a0 =(ω2x0 = 78542 ×0.85×10–3 =) ()5.2×104 ms2 ;

(ii) correct substitution into \({E_T} = \frac{1}{2}m{\omega ^2}{x_0}^2\) irrespective of powers of 10;

0.14 to 0.15 J;

d.

(i) 0.264 m;

(ii) longitudinal;

progressive / propagate (through the air) / travels with constant speed (through the air);

series of compressions and rarefactions / high and low (air) pressure;

e.

(i) S leads L / idea that the phase of L is the phase of S minus an angle;

\(\frac{1}{8}\) period / 1×10–4 s / 0.1 ms;

\(\frac{{\rm{\pi }}}{4}\) / 0.79 rad / 45 degrees;

(ii) agreement at all zero displacements;

maxima and minimum at correct times;

constant amplitude of 1.60 mm;

f.

Examiners report

[N/A]
a.
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b.
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c.
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d.
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e.
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f.

Syllabus sections

Core » Topic 4: Waves » 4.2 – Travelling waves
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