Consider a rectangular block of wood moving with a velocity v_0 in gas at temperature T and mass density rho

Name: Consider a rectangular block of wood moving with a velocity v_0 in gas at temperature T and mass density rho
Uploaded: Wed, 2020-08-26 13:47
Description: Consider a rectangular block of wood moving with a velocity v_0 in gas at temperature T and mass density rho

Consider a rectangular block of wood moving with a velocity v0 in gas at temperature T and mass density $\rho$ . Assume the velocity is along the x-axis and the area of cross-section of the block perpendicular to $v_{0}$ is A. Show that the drag force on the block is $4\rho Av_{0}\sqrt{\frac{KT}{m}}$ , where m is the mass of the gas molecule.

Answers (1)

We assume ‘p’ to be the number of molecules per unit volume. Hence ‘p’ is the per unit volume molecular density. Let v be the velocity of gas molecules.

The molecules of the gas strike the front face and the back face of the box when it moves. The back face relative velocity = $(v-v_0)$

Change in momentum on the front face of the box = $2m(v+v_{0})$ and the change in momentum on the back face of the box = $2m(v-v _0).$

Nf =Total number of molecules striking the box’s front face = $\frac{1}{2}[A.(v+v_{0}) \Delta t] p$

$Nf = \frac{1}{2}(v+v_{0}) A.p. \Delta t$

Nb = Total number of molecules striking the box’s back face

$=\frac{1}{2}[A.(v+v_{0}) \Delta t] p$

$=\frac{1}{2}(v+v_{0}) A.p. \Delta t$

Total change in momentum at the front face can be calculated s below:

$Pf = 2m(v+v_{0}) \times Nf = 2m(v+v_{0}) \times \frac{1}{2}(v+v_{o}) A.p. \Delta t$

$Pf = - m(v+v_0)2 A.p. \Delta t$ in the backward direction.

Force on front end = Ff = Pf = $- m(v+v_0)2 A. p$ in the backward direction

In the same way, the force on the back face, Fb = $+ m(v-v_{0})2 A. p$

So, the net force can be calculated as:

$- m(v+v_{0})^{2} A. p+ m(v-v_{0})^{2} A. p$

It can be expanded and simplified as,

$= -m A p 4v.v_{0}$

The magnitude of the dragging force= $4m v.v _{0}.A.p$

Kinetic energy for a molecule of gas can be calculated as:

$KE = \frac{1}{2}mv^{2} = \frac{3}{2} Kb T$

Hence, $v = \sqrt{\frac{Kb T}{m}}$

So, we can write the drag force as $4m.A. p. v_o \sqrt{\frac{Kb T}{m}}$

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infoexpert24

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Consider a rectangular block of wood moving with a velocity v0 in gas at temperature T and mass density . Assume the velocity is along the x-axis and the area of cross-section of the block perpendicular to is A. Show that the drag force on the block is , where m is the mass of the gas molecule.

Answers (1)

Posted by

infoexpert24

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