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Question

A window of a house is h m above the ground. Form the window, the angles of elevation and depression of the top and the bottom of another house situated on the opposite side of the lane are found to be α and β, respectively. Prove that the height of the other house is h(1+tan α cot β)m.

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Solution

Let the height of the other house = OQ = H

And, OB = MW = x m

Given that, height of the first house = WB = h = MO

And QWM=α, OWM=β=WOB

[alternate angle]

Now, in ΔWOB,tan β=WBOB=hx (window)

x=htan β(i)

And in ΔQWM, tan α=QMWM=OQMOWM

tan α=Hhx

x=Hhtan α ...(ii)
From Eq. (i) and (ii),

htan β=Hhtan α

h tan α=(Hh)tan β

h tan α=H tan βh tan β

H tan β=h(tan α+tan β)

H=h(tan α+tan βtan β)

=h(1+tan α.1tan β)=h(1+tan α.cot β) [cot θ=1tan θ]

Hence, the required height of the other house is h(1+tan α.cot β)

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