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Dimensional Analysis

Dimensions of a physical quantity are the power to which the fundamental quantities must be raised to represent the given physical quantity.

Dimensional AnalysisDimensional AnalysisFor example, density  = (mass/volume) = mass/(length)3
or density = (mass) (length)-3  
Thus, the dimensions of density are 1 in mass and -3 in length. The dimensions of all other fundamental quantities are zero.
For convenience, the fundamental quantities are represented by one-letter symbols. 

  • Generally, mass is denoted by M, length by L, time by T, and electric current by A.
  • The thermodynamic temperature, the amount of substance, and the luminous intensity are denoted by the symbols of their units K, mol, and cd respectively.
  • The physical quantity that is expressed in terms of the base quantities is enclosed in square brackets.
    [sinθ] = [cosθ] = [tanθ] = [ex] = [M0L0T0]

Dimensional Formula

It is an expression that shows how and which of the fundamental units are required to represent the unit of physical quantity.

For example:

By definition, Velocity is a derived quantity. We can write its dimensional formula using:

Velocity = Displacement/Time

Now, displacement is measured in Length, [L1], and time is measured in [T1] which are both fundamental quantities. Hence, we can represent the dimensional formula of velocity as:

[v] = [s/t] = [L/T] = [LT-1]

Question for Dimensional Analysis & Formulas
Try yourself:What is the dimensional formula for velocity?
View Solution

Similarly, we can evaluate the dimensional formula of all physically derived quantities. The table given below shows some of the most occurring physical quantities and their dimensions.

Different quantities with units, symbols, and dimensional formulas

Dimensional Analysis & Formulas | Physics Class 11 - NEET

Dimensional Analysis & Formulas | Physics Class 11 - NEET

Dimensional Analysis & Formulas | Physics Class 11 - NEET

Dimensional Analysis & Formulas | Physics Class 11 - NEET
Dimensional Analysis & Formulas | Physics Class 11 - NEET

Dimensional Analysis & Formulas | Physics Class 11 - NEET

 Dimensional Analysis & Formulas | Physics Class 11 - NEET

Dimensional Analysis & Formulas | Physics Class 11 - NEET

Dimensional Analysis & Formulas | Physics Class 11 - NEET

Dimensional Analysis & Formulas | Physics Class 11 - NEET


Applications of Dimensional Analysis

Conversion of units

This is based on the fact that the product of the numerical value (n) and its corresponding unit (u) is a constant, i.e.,

n[u] = constant

or n1[u1] = n2 [u2]

Suppose the dimensions of a physical quantity are a in mass, b in length, and c in time. If the fundamental units in one system are M1, L1, and T1 and in the other system are M2, L2, and T2 respectively. Then we can write.

Dimensional Analysis & Formulas | Physics Class 11 - NEETHere n1 and n2 are the numerical values in two systems of units respectively. 

Using Eq. (i), we can convert the numerical value of a physical quantity from one system of units into the other system.

Example 1.  The value of the gravitation constant is G = 6.67 × 10-11 Nm2/kg2 in SI units. Convert it into CGS system of units. 
Solution. The dimensional formula of G is [M-1 L3 T-2].
Using equation number (i), i.e.,
Dimensional Analysis & Formulas | Physics Class 11 - NEET
Here, n1 = 6.67 x 10-11
M1 = 1 kg, M2 = 1 g = 10-3 kg, L1  = 1 m, L2 = 1 cm = 10-2 m, T1 = T2 = 1s
Substituting in the above equation, we get
Dimensional Analysis & Formulas | Physics Class 11 - NEET

or n2 = 6.67 x 10-8
Thus, the value of G in the CGS system of units is 6.67 x 10-8 dyne cm2/g2.

To check the dimensional correctness of a given physical equation

  • Every physical equation should be dimensionally balanced. This is called the 'Principle of Homogeneity'
  • The dimensions of each term on both sides of an equation must be the same. On this basis, we can judge whether a given equation is correct or not. However, a dimensionally correct equation may or may not be physically correct.

Question for Dimensional Analysis & Formulas
Try yourself:
Which principle states that every physical equation should be dimensionally balanced?
View Solution

Example 2. Show that the expression of the time period T of a simple pendulum of length l given by
Dimensional Analysis & Formulas | Physics Class 11 - NEET
is dimensionally correct.  
Solution. 
Dimensional Analysis & Formulas | Physics Class 11 - NEET
Dimensional Analysis & Formulas | Physics Class 11 - NEETAs in the above equation, the dimensions of both sides are the same. The given formula is dimensionally correct.

Principle of Homogeneity of Dimensions

This principle states that the dimensions of all the terms in a physical expression should be the same. For example, in the physical expression s = ut + 1/2 at2,  the dimensions of s, ut, and 1/2 at2 all are the same.

Note: The physical quantities separated by the symbols +, -, =, >, <, etc., have the same dimensions.

Example 3. The velocity v of a particle depends upon the time t according to the equation 
Dimensional Analysis & Formulas | Physics Class 11 - NEET
Write the dimensions of a, b, c, and d. 
Solution.
From the principle of homogeneity
Dimensional Analysis & Formulas | Physics Class 11 - NEET
Dimensional Analysis & Formulas | Physics Class 11 - NEET

To establish the relation among various physical quantities

If we know the factors on which a given physical quantity may depend, we can find a formula relating the quantity to those factors. Let us take an example.

Example.4. The frequency (f) of a stretched string depends upon the tension F (dimensions of force), length l of the string, and the mass per unit length m of string. Derive the formula for frequency. 
Solution. Suppose, that the frequency f depends on the tension raised to the power a, length raised to the power b, and mass per unit length raised to the power c. Then.
f ∝ [F]a[l]b[μ]c
or f = k[F]a[l]b[μ]c
Here, k is a dimensionless constant. Thus,
[f] = [F]0[l]b[μ]c
or [M0L0T-1] = [MLT-2]a[L]b[ML-1]c
or [M0L0T-1] = [Ma+c La+b-c T-2a]
For dimensional balance, the dimensions on both sides should be the same.
Thus,    a + c = 0    ...(ii)
a + b - c = 0    ...(iii)
and    - 2a = - 1    ...(iv)
Solving these three equations, we get
a = 1/2, c = (-1/2) and b = -1
Substituting these values in Eq. (i), we get
f = k(F)1/2(l)-1(μ)-1/2
or
Dimensional Analysis & Formulas | Physics Class 11 - NEETExperimentally, the value of k is found to be 1/2.
Dimensional Analysis & Formulas | Physics Class 11 - NEET

Limitations of Dimensional Analysis 

LimitationsLimitationsThe method of dimensions has the following limitations:

(a) By this method the value of dimensionless constant can not be calculated.

(b) By this method the equation containing trigonometrical, exponential, and logarithmic terms cannot be analyzed.

(c) If a physical quantity depends on more than three factors, then a relation among them cannot be established because we can have only three equations by equalizing the powers of M, L, and T.

The document Dimensional Analysis & Formulas | Physics Class 11 - NEET is a part of the NEET Course Physics Class 11.
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FAQs on Dimensional Analysis & Formulas - Physics Class 11 - NEET

1. What is dimensional analysis and why is it important in physics?
Ans.Dimensional analysis is a method used to convert one set of units into another and to check the consistency of equations. It is important in physics as it helps ensure that equations are dimensionally homogeneous, meaning that the dimensions on both sides of an equation are the same, thus validating the relationships between physical quantities.
2. What are the basic dimensions used in dimensional analysis?
Ans.The basic dimensions used in dimensional analysis typically include mass (M), length (L), time (T), temperature (Θ), electric current (I), amount of substance (N), and luminous intensity (J). These dimensions serve as the foundation for expressing derived quantities like velocity, acceleration, and force.
3. How can dimensional analysis be applied to derive physical formulas?
Ans.Dimensional analysis can be used to derive physical formulas by identifying the relevant dimensions of the quantities involved and constructing an equation that balances these dimensions. For instance, by analyzing the dimensions of distance, time, and acceleration, one can derive the equation for distance traveled under constant acceleration.
4. What are some limitations of dimensional analysis?
Ans.Some limitations of dimensional analysis include its inability to provide numerical coefficients in equations and its failure to account for specific physical phenomena that may not be dimensionally related. Additionally, while dimensional analysis can indicate the form of a relationship, it cannot guarantee its validity without empirical data.
5. Can dimensional analysis be used in fields outside of physics?
Ans.Yes, dimensional analysis can be applied in various fields outside of physics, such as engineering, chemistry, and economics. It is useful for converting units, checking the consistency of equations, and modeling relationships between different physical and economic quantities across various disciplines.
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