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15. The angle of elevation of the top of a tower as observed from a point in a horizontal plane through the foot of the tower is 32°. When the observer moves towards the tower a distance of 100 m, he finds the angle of elevation of the top to be 63°. Find the height of the tower and the distance of the first position from the tower. [Take tan 32° = 0.6248 and tan 63° = 1.9626]

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Answer the following questions, using trigonometry rules.

Class 10th CBSE, Rd Sharma, some applications of trigonometry

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  1. Solution:

    RD Sharma Solutions For Class 10 Maths Chapter 12 Solutions

    Let the height of the tower = h m

    And the distance BC = x m

    Then, from the fig.

    In ΔABC

    tan 63o = AB/BC

    1.9626 = h/x

    x = h/ 1.9626

    x = 0.5095 h …. (i)

    Next, in ΔABD

    tan 32o = AB/ BD

    0.6248 = h/ (100 + x)

    h = 0.6248(100 + x)

    h = 62.48 + 0.6248x

    h = 62.48 + 0.6248(0.5095 h) ….. [using (i)]

    h = 62.48 + 0.3183h

    0.6817h = 62.48

    h = 62.48/0.6817 = 91.65

    Using h in (i), we have

    x = 0.5095(91.65) = 46.69

    Therefore,

    the height of the tower is 91.65 m

    Distance of the first position from the tower = 100 + x = 146.69 m

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