Describe the conditions required for an object to perform simple harmonic motion (SHM).

Calculate the mass of the wooden block.

In carrying out the experiment the student displaced the block horizontally by 4.8 cm from the equilibrium position. Determine the total energy in the oscillation of the wooden block.

A second identical spring is placed in parallel and the experiment in (b) is repeated. Suggest how this change affects the fractional uncertainty in the mass of the block.

State the direction of motion of P on the spring.

Explain whether P is at the centre of a compression or the centre of a rarefaction.

acceleration/restoring force is proportional to displacement
and in the opposite direction/directed towards equilibrium

ALTERNATIVE 1

\(\frac{{T_1^2}}{{T_2^2}} = \frac{{{m_1}}}{{{m_2}}}\)

mass = 0.38 / 0.39 «kg»

ALTERNATIVE 2

«use of T \( = 2\pi \sqrt {\frac{m}{k}} \)» k = 28 «Nm^–1»

«use of T \( = 2\pi \sqrt {\frac{m}{k}} \)» m = 0.38 / 0.39 «kg»

Allow ECF from MP1.

ω = «\(\frac{{2\pi }}{{0.74}}\)» = 8.5 «rads^–1»

total energy = \(\frac{1}{2} \times 0.39 \times {8.5^2} \times {(4.8 \times {10^{ - 2}})^2}\)

= 0.032 «J»

Allow ECF from (b) and incorrect ω.

Allow answer using k from part (b).

spring constant/k/stiffness would increase
T would be smaller
fractional uncertainty in T would be greater, so fractional uncertainty of mass of block would be greater

left

coils to the right of P move right and the coils to the left move left

hence P at centre of rarefaction

Do not allow a bald statement of rarefaction or answers that don’t include reference to the movement of coils.

Allow ECF from MP1 if the movement of the coils imply a compression.