A barometer kept in an elevator reads $76 c m$ when the elevator is accelerating upwards. The most likely pressure inside the elevator (in $c m o f H g$ ) is

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Solution

Step 1: Given Data
Let the height of this mercuric column be $h = 76 c m$ .
Let the density of mercury be $ρ$ .
Let the acceleration due to gravity be $g$ .
Let the acceleration of the lift be $a$ .
Step 2: Atmospheric Pressure
A barometer is a tube that is dipped in mercury.
Due to the external atmospheric pressure, the mercuric column rises inside the tube to a certain height.
The atmospheric pressure can be given as
$p_{A} = h ρ g$
Step 3: Pressure inside the elevator
If the lift uniformly accelerates in the upward direction, the effective value of $g$ can be given as,
$g_{e f f} = g + a$
Therefore, the effective pressure inside the lift can be given as
$p_{e f f} = h ρ (g + a)$
Since the $g_{e f f} > g$ , in order to keep the effective pressure constant, the value of $h$ must decrease.
But it is given that the value of $h$ remains constant.
Therefore, the value of effective pressure must increase.
$∴ p_{e f f} > p_{A}$
$\Rightarrow p_{e f f} > 76 c m o f H g$
Hence, the pressure inside the elevator must be greater than $76 c m o f H g$ .

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