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Question 5
A metallic right circular cone 20 cm high and whose vertical angle is
60 is cut into two parts at the middle of its height by a plane parallel to its base. If the frustum so obtained be drawn into a wire of diameter 116 cm, find the length of the wire.

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Solution

Volume of frustum will be equal to the volume of wire and by using this relation we can calculate the length of the wire.


In the given figure; AO = 20 cm and hence height of frustum PO = 10 cm
In triangle AOC we have angle CAO = 30 (halft of vertical angle of cone BAC)
Therefore;
tan 30=OCAO
Or,13=OC20
Or,OC=203
Using similarity criteria in triangles AOC and ADE it can be shown that DE=103 (because DE bisects the cone through its height)
Similarly, PO = 10 cm
Volume of frustum can be calculated as follows:
V=13πh(r21+r22+r1r2)
=13π×π10[(203)2+(103)2+203×103]
=13π×10(4003+1003+2003)
=70009π cm3
Volume of cylinder = πr2h
Or,π×(132)2×h
=70009π
Or,h=70009×1024
=796444.44 cm

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