Arrangement of pipes carrying fluids of densities ρ1,ρ2&ρ3 is shown in the figure below. If the pipe carrying fluid of density ρ1 makes an angle θ with the horizontal, then what is the value of ′h′ ?
A
h=(ρ1+ρ1)ρ2lsinθ
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B
h=(ρ3ρ2)lsinθ
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C
h=(ρ3−ρ1ρ2)lsinθ
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D
h=(ρ2ρ3)tan θ
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Solution
The correct option is Ch=(ρ3−ρ1ρ2)lsinθ The vertical height of the left end of pipe from point A is h1=lsinθ ⇒PA=P0−ρ1gh1 ⇒PA=P0−ρ1glsinθ...(i)
Similarly, the vertical height of the right end of the pipe from point B is h.
Pressure at point B is given by, PB=P0+ρ2gh...(ii)
Also, pressure difference between A and B can be given as: PA=PB−ρ3g(lsinθ)...(iii)
From Eq(i),(ii),(iii) equating the difference (PA−PB): P0−ρ1glsinθ−P0−ρ2gh=−ρ3glsinθ ⇒(ρ3−ρ1)glsinθ=ρ2gh ∴h=(ρ3−ρ1)lsinθρ2