Physics, asked by ramkic872002, 4 months ago

Derive poiseuilles formula in the method of dimension

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Answered by shaziafaisalshamsi14
1

Poiseuille's Formula DiagramPoiseuille studied the streamline flow of a liquid in capillary tubes as shown in the figure. He concluded that the volume, V of the liquid flowing per second through a capillary tube is Directly proportional to the difference of pressure, P between the two ends of the tube. i.e; V α P

Directly proportional to the fourth power of the radius, r of the capillary tube. i.e; V α r4

Inversely proportional to the coefficient of viscosity, η of the liquid. i.e; V α 1/η

Inversely proportional to the length, l of the capillary tube. i.e;V α 1/l

Combining these factors, we get

V α P r4 / η l

or, V = K P r4 / η l

Where k = π/8, a constant of proportionality.

.: V= π P r4 / 8 η l

This equation is called Poiseuille’s equation.

Derivation of Poiseuille’s Formula by Dimensional Analysis-

Poiseuille found that the volume of a liquid flowing through a capillary tube per second depends upon:

The pressure gradient (P/l) (i.e. the rate of change of pressure with length)

Radius of the capillary tube, r

Coefficient of the viscosity of liquid, η

That is, the volume of liquid flowing per second V α (P/l)arbηc, where a, b and c are constants to be determined

.: V = K (P/l)arbηc …… (i)

Where K is proportionality constant.

The dimension of V per second = [L3 T-1]

The dimension of P/l = [M L-1 T-2] / [L] = [M L-2 T-2]

The dimension of r = [L]

The dimension of η = [M L-1 T-1]

Putting the dimensions of the quantities in Equation (i), we get

[L3 T-1] = [M L-2 T-2]a [L]b [M L-1 T-1]c

or, [M0 L3 T-1] = [Ma+c L-2a+b-c T2a-c]

Applying the principle of homogeneity of dimensions, we get

Powers of M, a+c = 0 ….... (ii)

Powers of L, -2a+b-c = 3 ….... (iii)

Powers of T, -2a-c = -1 …..... (iv)

Solving these three equations, we get a = 1, b = 4 and c = -1 and substituting the values of a, b and c in Equation (i), we get

V = K (P/l)1 (r)4η-1

= K P r4/ η l

The value of K is found experimentally to be π/8 and the above equation changes to

V= π P r4 / 8 η l

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