(25) The diagram to the right shows a sector $A B C$ of a circle, where the angle BAC is 0.9 radians. Given that the arca of the sector is $16.2 \mathrm{~cm}^{2}$, find the arc length $s$.
(Q6) A circle of radius $r$ contains a sector of area $80 \pi \mathrm{cm}^{2}$. Given that the arc length of the sector is $16 \pi \mathrm{cm}$, find the angle of the sector $(\theta)$ and the value of $r$, giving your answers to 3 s.f.
(77) The diagram to the left shows a semicircle of radius $2 \mathrm{~cm}$, with a smaller sector of radius $1 \mathrm{~cm}$ removed. Given that the area of the sector $A$ and the area of $B$ are equal, find the exact value of $\theta$.
Q8 Use the small angle approximations to estimate the following values, then calculate the actual values:
(a) $\sin 0.23$
b) $\sin 0.12$
(c) $\cos 0.01$
d) $\cos 0.24$
(e) $\tan 0.18$
Q9. For the values of $\theta$ below, use the small angle approximations to estimate the value of $f(\theta)=\sin \theta+\cos \theta$, then use a calculator to find the actual answer:
(a) $\theta=0.3$
b) $\theta=0.5$
(c) $\theta=0.25$
d) $\theta=0.01$
(e) $\theta=0.03$
(Q10) Find an approximation for the following if $\theta$ is small:
a) $\sin \theta \cos \theta$
b) $\theta \tan 5 \theta \sin \theta$
c) $\frac{\sin 4 \theta \cos 3 \theta}{2 \theta}$
d) $3 \tan \theta+\cos 2 \theta$
e) $\sin \frac{1}{2} \theta-\cos \theta$
f) $\frac{\cos \theta-\cos 2 \theta}{1-(\cos 3 \theta+3 \sin \theta \tan \theta)}$
(Qi1)
A pendulum of length $6 \mathrm{~cm}$ follows the arc of a circle. Its straight-line displacement as a vector is given by: $\mathbf{d}=6 \sin \theta \mathbf{i}+6(1-\cos \theta) \mathbf{j}$.
a) Show that the magnitude of the displacement is $6 \sqrt{2(1-\cos \theta)}$.
b) Show that, when $\theta$ is small, the magnitude of the displacement can be approximated by the arc length $s$.
(12) Solve the following guabrans for the unorals gwan $(x$ \& 3 sf $)$ :
(a) $4 \cos x-3=0 \quad 0 \leqslant x \leqslant 2 \pi$ (b) $\sin 3 x=-\frac{1}{\sqrt{2}}$ for $-\pi \leqslant x \leqslant \pi$
(c) $5 \cos ^{2} x-9 \sin x=3 \quad 0 \leqslant x \leqslant 2 \pi$