StopLearnStopLearnFundamental quantities are physical quantities whose dimensions and units are not usually derived from other physical quantities. Basically, there are three fundamental quantities in mechanics. They include:
(i) Mass
(ii) Length and
(iii) Time
(i) Mass: This is a fundamental quantity with dimension ‘M’, usually written in capital letter. The S.I. unit of mass is kilogramme (kg). Mass can also be measured in gramme (g), tonne (t), etc.
(ii) Length: This is another fundamental quantity with dimension ‘L’, written in capital letter. The S.I. unit of length is metre (m). Length can also be measured in kilometre (km), centimetre (cm), inches (inch), feet (ft), etc.
(iii) Time: Time is a fundamental quantity with dimension ‘T’, also written in capital letter. The S.I. unit of time is second (s). Time can also be measured in minutes and hours.
The below table summarized the dimensions and units of the basic fundamental quantities.
| S/N | Quantity | Dimension | S.I. Unit | |
| 1 | Mass | M | Kilogramme (kg) | |
| 2 | Length | L | Metre (m) | |
| 3 | Time | T | Second (s) | |
EVALUATION
| S/N | Quantity | S.I. Unit | |
| 1 | Temperature | Kelvin (K) | |
| 2 | Current | Ampere (A) | |
| 3 | Amount of substance | Mole (mol) | |
| 4 | Luminous intensity | Candela (cd) | |
NB: The educator should carry out activities on simple measurement of current and temperature with the students.
ACTIVITY: PRACTICAL
EVALUATION
Derived quantities are physical quantities whose dimensions and units are usually derived from the fundamental quantities. E.g, force,speed, etc.
Other physical quantities apart from the fundamental quantities are derived quantities. This is because their dimensions and units are usually derived from the fundamental ones.
Derived quantities include:
EVALUATION
SOLUTION
(i) Speed =distancetime=lengthtime=LT=LT−1
∴ The dimension for speed is LT−1
The S.I. unit of length is ‘m’ and that of time is ‘s’
∴ The S.I. unit of speed is msorms−1
NB: Speed and velocity have the same dimension and S.I.unit.
Also, velocity =displacementtime
(ii) Acceleration =velocitytime=LT−1T=LT2=LT−2
∴ The S.I. unit of acceleration = =ms−1s=ms2=ms−2orms2
(iii) Force =mass×acceleration=m×LT2=MLT2=MLT−2
∴ The unit of force is kgms2
But the S.I. unit of force is Newton (N). This is the unit used in all calculations
SOLUTION
Now, pressure =force x area
∴ pressure =MLT−2L2=MT−2L=ML−1T−2
The S.I. unit of force is Newton, N; while that of area is metresquare, m2
Hence, the S.I. unit of pressure =Nm2orNm−2
SOLUTION
Work =force×distance
∴ work =MLT−2×L=ML2T−2
Unit of work =Nm
But the S.I. unit of work is Joule (J). This is the unit used in all calculations.
In summary, the table below shows the dimensions and S.I. units of some derived quantities.
| S/N | Quantity | Dimension | S.I. Unit | |
| 1 | Work & Energy | ML2T−2 | Joule (J) | |
| 2 | Momentum & Impulse | MLT−1 | Newton-Second (Ns) | |
| 3 | Volume | L3 | metre cube (m3) | |
| 4 | Area | L2 | Metre square (m2) | |
| 5 | Pressure | ML−1T−2 | Newton per metre square or Pascal metre cube (Nm2) | |
| 6 | Power | ML2T−3 | Watt (W) | |
| 7 | Density | ML−3 | Kilogramme per metre cube (kgm3) | |
| 8 | Moment | ML2T−2 | Newton-metre (Nm) | |
EVALUATION
(i) Volume (ii) Power (iii) Density.
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