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Question

A siphon tube is discharging a liquid of specific gravity 0.9 from a reservoir as shown in the figure. The velocity of the liquid coming out through the siphon is
(Take g=10 m/s2)


A
8 m/s
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B
7 m/s
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C
10 m/s
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D
9 m/s
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Solution

The correct option is C 10 m/s

From Bernoulli's theorem, we know that,

P+12ρv2+ρgh=constant

where P is the pressure, ρ is the density of the liquid, v is the velocity, g is acceleration due to gravity and h is vertical height.

On applying Bernoulli's theorem between points A and B and taking reference at point B we obtain,

PA+12ρv2A+ρghA=PB+12ρv2B+ρghB

Here PA and PB are both equal to atmospheric pressure.

PA=PB=P0

Also, the velocity of liquid at point A can be assumed to be 0.
[since area ratio, aBaA is small, therefore using continuity equation it can be said that VAVB will also be very small]

P0+12ρ×(0)2+ρg×5=P0+12ρ×v2+ρg×0

12ρv2=5ρg

The density on both sides are equal as the liquid is the same and they cancel out.

v2=2×5×g

v=2×5×10

v=10 m/s

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