DP Physics (last assessment 2024)

Question 18M.2.HL.TZ2.3

Date	May 2018	Marks available	[Maximum mark: 9]	Reference code	18M.2.HL.TZ2.3
Level	HL	Paper	2	Time zone	TZ2
Command term	Calculate, Determine, Draw, Label, Outline	Question number	3	Adapted from	N/A

[Maximum mark: 9]

18M.2.HL.TZ2.3

A loudspeaker emits sound towards the open end of a pipe. The other end is closed. A standing wave is formed in the pipe. The diagram represents the displacement of molecules of air in the pipe at an instant of time.

(a.i)

Outline how the standing wave is formed.

[1]

Markscheme

the incident wave «from the speaker» and the reflected wave «from the closed end»

superpose/combine/interfere

Allow superimpose/add up

Do not allow meet/interact

[1 mark]

X and Y represent the equilibrium positions of two air molecules in the pipe. The arrow represents the velocity of the molecule at Y.

(a.ii)

Draw an arrow on the diagram to represent the direction of motion of the molecule at X.

[1]

Markscheme

Horizontal arrow from X to the right

MP2 is dependent on MP1

Ignore length of arrow

[1 mark]

(a.iii)

Label a position N that is a node of the standing wave.

[1]

Markscheme

P at a node

M18/4/PHYSI/SP2/ENG/TZ2/03.a.iii/M

[1 mark]

(a.iv)

The speed of sound is 340 m s^–1 and the length of the pipe is 0.30 m. Calculate, in Hz, the frequency of the sound.

[2]

Markscheme

wavelength is λ = « $\frac{{4 \times 0.30}}{3}$ =» 0.40 «m»

f = « $\frac{{340}}{{0.40}}$ » 850 «Hz»

Award [2] for a bald correct answer

Allow ECF from MP1

[2 marks]

The loudspeaker in (a) now emits sound towards an air–water boundary. A, B and C are parallel wavefronts emitted by the loudspeaker. The parts of wavefronts A and B in water are not shown. Wavefront C has not yet entered the water.

(b.i)

The speed of sound in air is 340 m s^–1 and in water it is 1500 m s^–1.

The wavefronts make an angle θ with the surface of the water. Determine the maximum angle, θ_max, at which the sound can enter water. Give your answer to the correct number of significant figures.

[2]

Markscheme

$\frac{{\sin {\theta _c}}}{{340}} = \frac{1}{{1500}}$