Show that the angular acceleration of the merry-go-round is 0.2 rad s^–2.

Calculate, for the merry-go-round after one revolution, the angular speed. 

Calculate, for the merry-go-round after one revolution, the angular momentum.

Calculate the new angular speed of the rotating system.

Explain why the angular speed will increase.

Calculate the work done by the child in moving from the edge to the centre.

Γ «= Fr = 50 × 2» = 100 «Nm»

α « \( = \frac{\Gamma }{I} = \frac{{100}}{{450}}\) » =0.22 «rads^–2»

Final value to at least 2 sig figs, OR clear working with substitution required for mark.

[2 marks]

«\(\omega _t^2 - \omega _0^2 = 2\alpha \Delta \theta \)»

«\(\omega _t^2 - 0 = 2 \times 0.22 \times 2\pi \)»

\({\omega _t} = 1.7\) «rads^–1»

Accept BCA, values in the range: 1.57 to 1.70.

[1 mark]

«L = Iω = 450 × 1.66»

= 750 «kgm² rads^–1»

Accept BCA, values in the range: 710 to 780.

[1 mark]

«I = 450 + mr²»

I «= 450 + 30 × 2²» = 570 «kgm²»

«L = 570 × ω = 747»

ω = 1.3 «rads^–1»

Watch for ECF from (a) and (b).

Accept BCA, values in the range: 1.25 to 1.35.

[2 marks]

moment of inertia will decrease

angular momentum will be constant «as the system is isolated»

«so the angular speed will increase»

[2 marks]

ω_t = 1.66 from bi AND W = ΔE_k

W = \(\frac{1}{2}\) × 450 × 1.66² – \(\frac{1}{2}\) × 570 × 1.31² = 131 «J»

ECF from 8bi

Accept BCA, value depends on the answers in previous questions.

[2 marks]