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Deepak Bora
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The height of a cone is 30 cm. A small cone is cut off at the top by a plane parallel to its base. If its volume be 1/27 of the volume of the given cone, at what height above the base is the section cut?

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This question is Based on Mensuration Chapter of M.L Aggarwal book for ICSE BOARD for class 10.
Here the height of a cone is given. A small cone is cut off at the top by a plane parallel to its base. If its volume be 1/27 of the volume of the given cone, at what height above the base is the section cut?
This is the Question Number 18, Exercise 17.2 of M.L Aggarwal.

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1 Answer

  1. Given height of the cone, H = 30 cm

    Let R be the radius of the given cone and r be radius of small cone.

    Let h be the height of small cone.

    ML Aggarwal Sol Class 10 Maths chapter 17-5

    Volume of the given cone = (1/3)R2H

    Volume of the small cone = 1/27 th of the volume of the given cone.

    (1/3)r2h = (1/27)× (1/3)R2H

    Substitute H = 30

    (1/3)r2h = (1/27)× (1/3)R2×30

    r2h/R2 = 30/27

    r2h/R2 = 10/9 ….(i)

    From figure, r/R = h/H

    r/R = h/30 ….(ii)

    Substitute (ii) in (i)

    (h/30)2×h = 10/9

    h3/900 = 10/9

    h3 = 900×10/9 = 1000

    Taking cube root on both sides.

    h = 10 cm

    H-h = 30-10 = 20

    The small cone is cut at a height of 20 cm above the base.

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