Math, asked by Anonymous, 4 months ago

The elevation of the top of a temple from a point A situated in south is 45° and B is a point to the west of the point A. Also if the elevation of the top of the temple from B is 15° and AB = 2a, then find the height of the temple? ​

Answers

Answered by vyasanleo
1

Answer:

Height of the temple = h = a[2/√(6 + 4√3)]

Answered by mashikhan419
1

Step-by-step explanation:

Given,

the angle of elevation of the top of the tower from two points P & Q is at a distance of a & b.

Also given, to prove that the tower

height=

ab

(∵ complementary angle =(90

o

−θ))

From ΔABP

tanθ=

BP

AB

=

a

AB

……..(1)

From ΔABQ

tan(90−θ)=

BQ

AB

(∵tan(90−θ)=cotθ)

(cotθ=

tanθ

1

)

We get,

cotθ=

AB

BQ

=

AB

b

……..(2)

by equation (1) & (2) we get,

a

AB

=

AB

b

⇒AB

2

=ab⇔AB=

ab

∴AB=height=

ab

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