Question

A round balloon of radius r subtends an angle $\alpha$ at the eye of the observer while the angle of elevation of its centre is $\beta$. Prove that the height of the centre of the balloon is

$\left(rsin\beta cosec\frac{\alpha }{2}\right)$ [4 MARKS]

Answer 1

Diagram: 1 Mark
Concept: 1 Mark
Application: 2 Marks

Let us represent the balloon by a circle with centre C and radius r. Let OX be the horizontal ground and let O be the point of observation. From O, draw tangents OA and OB to the circle. Join CA, CB and CO. Draw $CD\perp OX$

$\therefore \angle AOB=\alpha ,\angle DOC=\beta$ and

$\angle AOC=\angle BOC=\frac{\alpha }{2}$

From right $\Delta OAC$, we have



$\frac{OC}{AC}=cosec\frac{\alpha }{2}$

$\Rightarrow \frac{OC}{r}=cosec\frac{\alpha }{2}$

$\Rightarrow OC=rcosec\frac{\alpha }{2}$

From right $\Delta ODC$, we have

$\frac{CD}{OC}=sin\beta \Rightarrow CD=\left(OC\right)\times sin\beta$

$\Rightarrow CD=rsin\beta cosec\frac{\alpha }{2}$ [using (i)]

Hence, the height of the centre of the balloon from the ground is $rsin\beta cosec\frac{\alpha }{2}$