Physics, asked by balijeet58, 11 months ago

Toricelli’s barometer used mercury. Pascal duplicated it using French wine of density 984 kg m–3. Determine the height of the wine column for normal atmospheric pressure.

Answers

Answered by BibonBeing01
8

 \huge {\bold {\underline{Answer : }}}

Density of mercury, ρ1 = 13.6 × 103 kg/m3

Height of the mercury column, h1 = 0.76 m

Density of French wine, ρ2 = 984 kg/m3

Height of the French wine column = h2

Acceleration due to gravity, g = 9.8 m/s2

The pressure in both the columns is equal, i.e.,

Pressure in the mercury column = Pressure in the French wine column

ρ1h1g = ρ2h2g

h2 = ρ1h1 / ρ2

= 13.6 × 103 × 0.76 / 984 = 10.5 m

Hence, the height of the French wine column for normal atmospheric pressure is 10.5 m.

Answered by Riya1045
0

Explanation:

Density of mercury, ρ1 = 13.6 × 103 kg/m3

Height of the mercury column, h1 = 0.76 m

Density of French wine, ρ2 = 984 kg/m3

Height of the French wine column = h2

Acceleration due to gravity, g = 9.8 m/s2

The pressure in both the columns is equal, i.e.,

Pressure in the mercury column = Pressure in the French wine column

ρ1h1g = ρ2h2g

h2 = ρ1h1 / ρ2

= 13.6 × 103 × 0.76 / 984 = 10.5 m

Hence, the height of the French wine column for normal atmospheric pressure is 10.5 m.

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