Find the difference in the height of the liquid between the centre and the edge (in cm), if the fluid is rotated in a container as shown in figure. [Take π2=10,g=10m/s2]
A
0.1
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B
1.2
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C
0.4
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D
2.0
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Solution
The correct option is D2.0 Let the difference in the height between the liquid level at the centre and the edge be h.
For rotating fluid, difference in pressure PB−PO provides centripetal force. i.e ΔP=PB−PO=12ρω2x2...(1) Also, in vertical direction, we can write: ΔP=PB−PA=ρgh [since PA=PO= Atmospheric Pressure] ⇒PB−PO=ρgh...(2) From Eq. (1) and (2), ⇒ρgh=12ρω2x2 ⇒h=ω2x22g ∵x=0.05m ⇒h=(4π)2×(0.05)22×10 ∴h=0.02m=2.0cm The difference in the height of liquid between the centre and the edge is 2.0cm