Metric system, symbols & units
The metric system, and especially that part of it called the SI (le Systéme International d'Unités or, in plain English, the International System of Units), is by far the simplest and most rational system of units devised.
One of the main reasons for this is the simple compatibility of the metric system with our worldwide numerals and arithmetic based on the 10 digits and their position relative to a decimal point. This results from the practical system of attaching to unit names (symbols) standard prefixes that stand for some of the powers of 10 such as 0.001 (milli), 1000 (kilo). For instance, since the prefix kilo (k) stands for 1000, 1 kilometre (km) equals 1000 metres (m), and any change from metres to kilometres or vice versa simply involves a decimal point or zeros as shown below.
The Common Prefixes and Units
Prefix & Symbol 
Meaning 
Value  Factor 
micro (μ) 
one millionth 
0.000 001 
10^{6} 
milli (m) 
one thousandth 
0.001 
10^{3} 
centi (c)* 
one hundredth 
0.01 
10^{2} 
deci (d)* 
one tenth 
0.1 
10^{1} 
kilo (k) 
a thousand 
1000 
10^{3} 
mega (M) 
a million 
1,000,000 
10^{6} 
giga (G) 
a thousand million 
1,000,000,000 
10^{9} 
* The prefixes `centi' and `deci' are only used with the metre. Centimetre is a recognised unit of length but centigram is not a recognised unit of mass.
Tables of measures for mass, length, area and volume are set out below
MASS SI Base unit: kilogram (kg)
1000 micrograms (μg) 
= 1 milligram (mg) 
1000 milligram (mg) 
= 1 gram 
1000 grams (g) 
= 1 kilogram (kg) 
1000 kilograms (kg) 
= 1 megagram (Mg) 

= 1 tonne (t) 
LENGTH SI Base unit: metre (m)
1000 micrometres (μm) 
= 1 millimetre (mm) 
10 millimetres (mm) 
= 1 centimetre (cm) 
10 centimetres (cm) 
= 1 decimetre (dm) 
100 centimetres (cm) 
= 1 metre (m) 
1000 millimetres (mm) 
= 1 metre (m) 
1000 metres (m) 
= 1 kilometre (km) 
AREA SI unit: square metre (m²)
100 square millimetres (mm²) 
= 1 square centimetre (cm²) 
10 000 square centimetres (cm²) 
= 1 square metre (m²) 
1000 000 square millimetres (mm²) 
= 1 square metre (m²) 
10 000 square metres (m²) 
= 1 hectare (ha) 
100 hectares (ha) 
= 1 square kilometre (km²) 
VOLUME SI unit: cubic metre (m³)
1000 cubic centimetres (cm³) 
= 1 cubic decimetre (dm³) 
1 cubic decimetre (dm³) 
= 1 litre (L) 
1000 cubic decimetres (dm³) 
= 1 cubic metre (m³) 

= 1 kilolitre (kL) 
Or alternatively, for use with liquids and gases: 
1 cubic centimetre (cm³) 
= 1 millilitre (mL) 
1000 millilitres (mL) 
= 1 litre (L) 
1000 litres (L) 
= 1 kilolitre (kL) 
 = 1 cubic metre (m³) 
1000 kilolitres (kL) 
= 1 megalitre (ML) 
Students need to familiarise themselves with quantities, symbols and units. Try to learn them by heart as they will be referred to in different units of competency.
The following will emphasize the importance of the units:
If someone borrowed 10 dollars from you and the borrower settles his debt with 10 cents you wouldn't be happy about it, although the number is identical. If someone borrows 10 dollars from you, you would insist of the same unit, wouldn't you? This simple example points out that the unit is of great important.
MPa (Strength of material). The following relationship must be learned by heart:
1 Pa  =  1 N/m^{2}

1 kPa  =  1 kN/m^{2}

1 MPa  =  1 MN/m^{2} 
=  1 N/mm^{2} 

The meaning of kP and MPa is very important because you'll need to understand the concept of stress and strenght. Look for prefixes like k and M in the table above.
Formulae
However, the most common formulae are listed below:
Force 
= mass × acceleration (F = m ×
a) 
Weight

= mass × gravitational acceleration
(W = m × g) 
Stresses (tension and compression)

= force / area ( = F
/ A) 
Density for major structural material
Material  Mass density (kg/m^{3})  Weight density (kN/m^{3}) 
Concrete (reinforced)  2500 kg/m^{3}  25 kN/m^{3} 
Concrete (unreinforced)  2300 kg/m^{3}  23 kN/m^{3} 
Brickwork  1900 kg/m^{3}  19 kN/m^{3} 
Timber (Softwood)  600 to 800 kg/m^{3}  6 to 8 kN/m^{3} 
Timber (Hardwood)  800 to 1100 kg/m^{3}  8 to 11 kN/m^{3} 
Steel  7850 kg/m^{3}  78.5 kN/m^{3} 
By closely looking at the units we can easily work out the correct answer of a propblem by substituting the units into the formula.
Consider the following example to work out the weight of a structural component or member:
To calculate the weight of a component or member we use the formula:
Weight (W) = Density × Volume
Remember unit for density is kg/m^{3} and the unit for volume is m^{3} but the unit for weight is measured in newton.
We need to convert the mass into a weight figure.
Weight  =  mass × gravitational acceleration 
W  =  m × g 
(g = 9.81 m/s^{2} but we use 10 m/s^{2})
Having converted the mass unit into a weight figure we can now calculate the weight of any structural component or member in newtons by using:
W = kN/m^{3} × m^{3}
Example 1:
Calculate the dead load (DL) for a concrete slab, size 4.0 m × 3.5 m of 172 mm thickness . Density of concrete is 2500 kg/m^{3}
Solution:
First convert mass density in weight density. 2,500 kg/m^{3} = 25,000 N/m^{3} = 25 kN/m^{3}
Now we can calculate the weight of the slab:
W  =  4.0 × 3.5 × 0.172 × 25 
=  60 kN 
Example 2:
Calculate the live load (LL) for a room of a residential building, size 5.5 m × 3.8 m. The LL according to AS 1170 Part 1 (Dead and live load) is 1.5 kPa).
Remember 1 kPa = 1 kN/m^{2}
Solution:
Using the formula LL = m (length) × m (width) × kN/m^{2}
LL  =  5.5 × 3.8 × 1.5 
=  31.35 kN 
