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Question

A round balloon of radius r subtends an angle α at the eye of the observer while the angle of elevation of its centre is β. Prove that the height of the centre of the balloon is

(r sin β cosecα2) [3 MARKS]

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Solution

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 CDOX

AOB=α,DOC=β and

AOC=BOC=α2

From right ΔOAC, we have [1 MARK]



OCAC=cosecα2

OCr=cosecα2

OC=r cosec α2

From right ΔODC, we have

CDOC=sin βCD=(OC)×sin β

CD=r sin β cosec α2 [using (i)]

Hence, the height of the centre of the balloon from the ground is r sin β cosec α2

Let the height of the centre of the balloon be h

Let the distance between the eye of observer and centre of balloon be L

In ΔOBC [1 MARK]

sin α2=rL

L=rsin α2=r cosec α2(1) [1 MARK]

In ΔOCA

sin β=hL

sin β=hr cosec α2

h=r sin β cosec α2 [1 MARK]


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