Elastic distortion of the cylinder, Gravity, Buoyant effect of the air – Fluke RUSKA 2470 User Manual

RUSKA 2470

Users Manual

2-4

Elastic Distortion of the Cylinder

As the pressure is increased within a piston pressure gauge, the resulting stress produces

a temporary and reversible deformation of the cylinder. The net effect is a change in the

effective area of the piston-cylinder combination. If the change in the area is a linear

function of the applied pressure, the relationship may be described by the equation:

(

)

2

2

1

0

1

P

b

P

b

A

A

e

+

+

=

Where:

P

is the nominal pressure

e

A

is the effective area at a pressure, P

0

A

is the area of the piston-cylinder assembly at a reference pressure level

2

1

& b

b

are coefficients of elastic distortion which are determined experimentally

Gravity

Since pressure is defined as force per unit area, anything that changes the force applied to

the piston of a piston pressure gauge also changes the pressure produced by that gauge.

Therefore, the effects of gravity on the masses loaded on the piston must be considered.

The gravity correction is usually very significant and must be used during calculations to

achieve the advertised accuracy of the piston pressure gauge.
Confusion has resulted from the English System of units concerning the terms, mass and

weight. The International System of units does not leave room for ambiguity and should

be used whenever possible.
It is recognized that some facilities still operate under the English System of units.

Therefore, this manual provides calibration data and calculation instructions in both the

English and the International System of units.
Corrections for local gravity can vary by as much as 0.5% thus it is very important to

have a reliable value for the local acceleration of gravity. A gravity survey with an

uncertainty better than 0.00001 m/s

2

is recommended.

Buoyant Effect of the Air

According to Archimedes's principle, the weight of a body in a fluid is diminished by an

amount equal to the weight of the fluid displaced. The weight of an object (in air) that has

had its mass corrected for the effects of local gravity is actually less than that corrected

value indicates. This reduction in weight is equal to the weight of the quantity of air

displaced by the object, or the volume of an object multiplied by the density of the air.

But the volume of an irregular shaped object is difficult to compute from direct

measurement. Buoyancy corrections are usually made by using the density of the material

from which the object is made. If the value of mass is reported in units of apparent mass

vs. brass standards rather than of true mass, the density of the brass standards must be

used. Apparent mass is described as the value the mass appears to have, as determined in

air having a density of 0.0012 g/cm³, against brass standards of a density of 8.4 g/cm³,

whose coefficient of cubical expansion is 5.4 x 10

-5

/ ºC, and whose value is based on true

mass in value (see reference 4).