The following formula shows the relationship between pressure and altitude:
where h is altitude height in meter, and the constant parameters are as described below:
Parameter
|
Description
|
Value
|
p0
|
sea level
standard atmospheric pressure
|
101325 Pa
|
L
|
temperature
lapse rate
|
0.0065 K/m
|
T0
|
sea level
standard temperature
|
288.15 K
|
g
|
Earth-surface
gravitational acceleration
|
9.80665 m/s2
|
M
|
molar mass
of dry air
|
0.0289644 kg/mol
|
R
|
universal
gas constant
|
8.31447 J/(mol•K)
|
If no barometer is available then we can use a water hose and a bucket of water to measure air pressure. Prepare a transparent water hose with about 12 meters length, with diameter 3/8 inches, greater diameter will
be expensive. Prepare a bucket, 10
liter bucket can do, fill the
bucket with water up until full. Put that bucket of water at high position, eg
on a table. Dip one end of the hose into
the bucket, put a weight at this end
of hose to make
it keep submerged in water, make sure this submerged hose end always open. Position the other end of the hose slightly lower
than the bucket, then suck this hose end to pump water
out of the hose or become a siphon. Make sure the water out smoothly, ensure there is no air bubble inside the hose.
Close the end of the hose where the water came out, can use plastic sheet and rubber bands. Lift this sealed hose end until it reaches 10 meters height. Make sure the other end of the hose remains submerged in the bucket and keep it open. Water inside the hose will go down as water is being attracted by the gravity force. But the water is also pushed up air pressure on the surface of water in the bucket, the air pressure to push water up the hose to fill the empty space on the upper end of the hose. Gravity force versus air pressure on the water will form a column of water in the hose.
Measure the height of water column of water formed in the hose that stands upright, C on the above picture. Water column height represents the air pressure at the surface of the water on the bucket, the bucket position altitude from sea level can be calculated by the formula above.
This Barometer is quite accurate as it has a very lenght scale, reaching 10
meters or 10,000 mm. For every 1 meter increase of water bucket
altitude, water column will drop about 1
mm. But because of its large size it is not practical to carry around.
The following table shows the relation between altitude and atmospheric pressure (water column), eg. if the water column
height is 9 meters H2O in the hose, then
the height (altitude) is about
1,150 meters from sea level. The above formula produces pressure in Pascal units, conversion of 1 Pascal = 0.000102 meters H2O. Please note that the Altitude in meters, whereas C in meters with 3 digits after the decimal point.
Altitude
meter
|
Pascal
|
C meter H2O
|
0
|
101,325
|
10.335
|
300
|
97,773
|
9.973
|
600
|
94,322
|
9.621
|
900
|
90,970
|
9.279
|
1,150
|
88,252
|
9.002
|
1,500
|
84,556
|
8.625
|
1,800
|
81,490
|
8.312
|
2,100
|
78,513
|
8.008
|
2,400
|
75,626
|
7.714
|
2,700
|
72,825
|
7.428
|
3,000
|
70,109
|
7.151
|
3,300
|
67,475
|
6.882
|
3,600
|
64,922
|
6.622
|
3,900
|
62,448
|
6.370
|
4,200
|
60,051
|
6.125
|
4,500
|
57,729
|
5.888
|
4,800
|
55,480
|
5.659
|
5,100
|
53,303
|
5.437
|
5,400
|
51,195
|
5.222
|
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