1.3 DIMENSIONS DIMENSIONAL FORMULA Dimension (Definition) : The dimensions of physical quantity are the powers to which fundamental (base) units must be raised to obtain the unit of a given physical quantity. Dimension : The exponent of a base quantity which enters into the expression, is called dimension of the quantity in that base. To decide the dimensions of physical quantity, the units of fundamental quantities are expressed by the following : length can be expressed by 'L' mass by 'M' time by 'T'
1.3.1 Dimensional Formula (Equation) Dimensional formula (equation) (Definition) : An equation, which gives the relation between fundamental units and derived units in terms of dimensions is called dimensional formula (equation). In mechanics the length, mass and time are taken as three base dimensions and are represented by letters L, M, T respectively. The derived unit of all physical quantities can be represented in terms of the base (fundamental) unit of length, mass and time raised to some power (exponent). Examples : (i)
Dimensional formula (equation) for area : We have, Area = length breadth = length length = [L] [L] = [L2]
Dimensional formula (equation) for area (A) = [L2 M0 T0]
Thus, [L2 M0 T0] is called dimensional formula (equation) [2, 0, 0] are called dimensions. Thus, dimensions of area are 2 in length 0 in mass and
0 in time
Physical quantities with formula, dimensional formula and SI unit symbols :
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