**How to Convert Weights to be used as Force Standards from Mass and Force Transducers to Mass**

The

*mass*of a body relates to the amount of material it contains.
"Forces are defined
by Newton's second law of motion as expressed in the equation:

F
= kma

Since it is impractical
to make an accurate determination of force directly from this equation - at
least as a routine procedure - it is customary to establish force standards
directly from the attraction of the earth on known masses." - D.R.
Tate, scientist at N.I.S.T

The concept of a pound
force (lbf) requires determination of gravity at a fixed location.

**Gravity Determination for a Fixed Location**

**The actual value of gravity varies over the surface of the Earth from around 983.2 cm/s**

^{2 }over the poles to 978.0 cm/s^{2}^{ }

**at the equator.**

**To find gravity for a fixed location firms or universities can be hired to come to your location to measure gravity. Typically this will result in a measurement of g accurate to +/- 0.5 mgals. Alternatively, gravity for your location can be calculated free of charge using online resources. These values are typically accurate to 5 ppm for anywhere in the US.**

**Steps to find gravity using online resources:**

1. Find your longitude, latitude and elevation here http://www.geoplaner.com/

2. Calculate your local gravity http://geodesy.noaa.gov/cgi-bin/grav_pdx.prl

*Note: The expanded uncertainty from this calculation is likely to be within 5 ppm anywhere in the US. This uncertainty value (as a maximum), or the actual reported value, belongs in any uncertainty budget for force, etc., . Of course, the mean value of g reported must also be applied to the actual measurement data as a correction.*

**Weight adjustment formula for weights used as force standards**

Because gravity is not a
constant over the surface of the earth, weights used as force standards must be
adjusted using the gravity value at a fixed location where they are to be
used. They are adjusted so the mass of
the weight will produce the required force.

**The formula to determine the mass needed to obtain the required force is as follows:**

Where:

m = mass
of the weight (true mass)

g = gravity at fixed location, m/s

^{2}. The force that attracts a body toward the center of the earth, or toward any other physical body having mass. For most purposes Newton's laws of gravity apply, with minor modifications to take the general theory of relativity into account.

*It is very important the gravity value for the location where the weight is to be used be established. Not using the correct gravity for the location will result in significant errors, up to twenty times the 0.005% allowed by ASTM E74-13a**.*

a = air density - Mass per unit volume of air (kg/m

? = material density - A quantitative expression of the amount of mass contained per unit volume. The standard unit is the kilogram per meter cubed (kg/m

^{3) }? = material density - A quantitative expression of the amount of mass contained per unit volume. The standard unit is the kilogram per meter cubed (kg/m

^{3}or kg)
f = required
force

*note: Air Buoyancy is an upward force exerted by pressure in air that opposes the weight of an object*.

Calculation Example

1 newton = 101.971621
grams-force

mass = (9.80665/g)(1 +
(a/?)f

g = local gravity in m/s

^{2}
a = air density = 0.0012 g/cm

^{3}
? = density of weight material = 7.9 g/cm

^{3}
f = force

mass
=(9.80665/9.79957)(1+(0.0012/7.9)*101.971621 =

102.0607941 grams

Note: This example calculation was performed using a standard value for air density and material density. To minimize uncertainty, the actual value for the air density at the place of use and the density of the material should be used.

**Converting Force to Mass**

**(Force Transducers)**

Converting Force to Mass requires knowing the local gravity where the weighing takes place.

A
mass correction factor can be calculated to convert force to mass when
the transfer standard is used at a location where the gravity is known
as follows:

Mass Correction Factor = (9.80665/g)

where:

g = gravity at place of weighing, m/s

^{2 }- The gravity value at the place of weighing can be obtained from NOAA as described at the beginning of this article.
To determine Mass when a weighing is performed at the known gravity value

^{ }multiply the applied force by the Mass Correction Factor as follows:
Mass = Force x Mass Correction Factor

Note:
This formula works well for force transfer standards. This formula is
for true or apparent mass. Most calibration service providers provide
certificates using conventional mass. Weights require a different
formula to determine the mass needed to produce a required force.

**True Mass**

The international prototype kilogram, on which the mass scale throughout the world is realized, is defined asa true mass of exactly 1 kilogram.
Most high accuracy comparisons are performed on a true mass basis but
the values are usually converted to conventional mass values when quoted
on a certificate.

**Conventional Mass**

When a weight is calibrated the mass value quoted on its certificate of calibration is normally a conventional mass value -
appropriate where the value is determined by weighing the item in air
in accordance with International Recommendation OIML R 33. This
Recommendation says formally: For a weight at 20 °C, the conventional mass is the mass of a reference weight of a density of 8 000 kg/m

^{3}that it balances in air of density 1.2 kg/m^{3}.
The conventional mass value of an artifact can be calculated from its true mass value using the equation:

where:

M_{c}is the conventional mass of the artefact in grams (g)

M_{t}is the true mass of the artefact in grams (g)

p is the density of the artefact in grams per centimetre cubed (g/cm^{3})

written by Harry & Henry Zumbrun