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Question
A tree (TS) of height 30 m stands in front of a tall building (AB). Two friends Rohit and Neha are standing at R and N respectively, along the same straight line joining the tree and the building (as shown in the diagram). Rohit, standing at a distance of 150 m from the foot of the building, observes the angle of elevation of the top of the building as 30°. Neha from her position observes that the top of the building and the tree has the same elevation of 60°. Find the:
- height of the building
- distance between
- Neha and the foot of the building
- Rohit and Neha
- Neha and the tree
- building and the tree.
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Solution
a. From figure,
`tan 30^circ = (AB)/(AR)`
Substituting values, we get:
⇒ `1/sqrt(3) = (AB)/150`
⇒ `AB = 150/sqrt(3)`
⇒ AB = `150/1.732`
⇒ AB = 86.6 m
Hence, height of the building = 86.6 m.
b.
i. From figure,
`tan 60^circ = (AB)/(AN)`
Substituting values, we get:
⇒ `sqrt(3) = (150/sqrt(3))/(AN)`
⇒ `AN = 150/sqrt(3) xx 1/sqrt(3)`
⇒ `AN = 150/3`
⇒ AN = 50 m
Hence, distance between Neha and foot of the building = 50 m.
ii. From figure,
RN = AR – AN
= 150 – 50
= 100 m
Hence, distance between Rohit and Neha = 100 m.
iii. From figure,
`tan 60^circ = (ST)/(NT)`
Substituting values, we get:
⇒ `sqrt(3) = 30/(NT)`
⇒ `NT = 30/sqrt(3)`
⇒ `NT = 30/sqrt(3) xx sqrt(3)/sqrt(3)`
⇒ `NT = (30sqrt(3))/3`
⇒ `NT = 10sqrt(3)`
⇒ NT = 10 × 1.732
⇒ NT = 17.32 m
Hence, distance between Neha and the tree = 17.32 m.
iv. From figure,
AT = AN – NT
= 50 – 17.32
= 32.68 m
Hence, distance between building and tree = 32.68 m.
