A man sitting at a height of 20 m on a tall tree on a small island in the middle of a river observes two poles directly opposite to each other on the two banks of the river and in line with the foot of tree. If the angles of depression of the feet of the poles from a point at which the man is sitting on the tree on either side of the river are 60° and 30° respectively. Find the width of the river.
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Given is height of tree = 20
And angles are 30 and 60
So forming triangles,
Two poles with trees form 2 different traingles,
In triangle 1,
tan 30 = x/20
x = 20*0.57
x = 11.4
And in triangle 2
tan 60= y/20
y=20*1.73
y= 34.64
So total width of river = x+y
Width of river = 11.4+34.64
= 46.04
Width = 46.04
Answered by
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Answer:
Given is height of tree = 20
And angles are 30 and 60
So forming triangles,
Two poles with trees form 2 different traingles,
In triangle 1,
tan 30 = x/20
x = 20*0.57
x = 11.4
And in triangle 2
tan 60= y/20
y=20*1.73
y= 34.64
So total width of river = x+y
Width of river = 11.4+34.64
= 46.04
Width = 46.04
Step-by-step explanation:
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