N=(kg * m)/s^2
Newton, the unit of force, is defined based on Newton's Second Law (F=ma), as the force required to give a mass of one kilogram an acceleration of 1 meter/second2. Thus, it is derived from these other units.
derived units
According to second law of Newton's motion, we can relate fundamental and derived units; i.e F=ma where, 'm' is mass of body which is fundamental quantity and its unit expressed in Kg. and 'F' is the force implied on body produced acceleration which is directly proportonal to one another, whereas; force is derived quantity and its unit expressed in Kg-m/sec/sec or N. Hence in this way we can relate these two.
The fundamental units are based on specific standards for each unit. Derived units result from manipulating the fundamental units. For example, the SI unit for distance or length is the meter, and the SI unit for time is the second. If you divide meters by seconds, you get m/s, a derived unit for speed or velocity.
If you mean in the SI, it is defined to be a fundamental unit. Consider, for example, Newton's Second Law (force = mass x acceleration), used to define force as a derived unit in the SI. Acceleration is already a derived unit (derived from distance and time) - let's keep it this way, for the sake of discussion. Now, in SI units, force is defined to be derived from mass (and acceleration). Mass is the "fundamental" unit, and force is the "derived" unit. The same relationship, i.e. Newton's Second Law, could just as well have been used the other way round. That is, force could have been defined as the fundamental unit, and mass derived from force (and acceleration). The creators of SI basically defined certain units as "base units" because they could be defined with a high degree of precision.
Those are called derived units.
Derived units is obtained from a combination of fundamental units. Derived unit is a cubic centimeter or a cube that is a centimeter on each side.
Newton, the unit of force, is defined based on Newton's Second Law (F=ma), as the force required to give a mass of one kilogram an acceleration of 1 meter/second2. Thus, it is derived from these other units.
derived units
FT is a derived unit and not a fundamental unit. The fundamental unit cannot be broken down into different forms. The derived units on the other hand are made up of the fundamental units.
They can be classified into fundamental units and derived units.
According to second law of Newton's motion, we can relate fundamental and derived units; i.e F=ma where, 'm' is mass of body which is fundamental quantity and its unit expressed in Kg. and 'F' is the force implied on body produced acceleration which is directly proportonal to one another, whereas; force is derived quantity and its unit expressed in Kg-m/sec/sec or N. Hence in this way we can relate these two.
fundamental
The fundamental units are based on specific standards for each unit. Derived units result from manipulating the fundamental units. For example, the SI unit for distance or length is the meter, and the SI unit for time is the second. If you divide meters by seconds, you get m/s, a derived unit for speed or velocity.
the units that has not been assigned either to the fundamental units or to derived units.
Because.... There are two types of physical quantities. Fundamental and derived. Fundamental units cannot be derived from any of the two types of units while derived units can be derived from these two types of units. It's important to be clearly defined as there are so many indices of the base number. And no one can derive the units if they aren't properly defined
Newton in SI units