Kinematics of Fluids free study note for Diploma / BTech.

1. Introduction

Kinematics of fluids is the branch of fluid mechanics that deals with the motion of fluids (liquids and gases) without considering the forces that cause the motion. It focuses on describing how fluid particles move in space and time.

It is different from fluid dynamics, which studies motion along with forces.

2. Types of Fluid Flow

Fluid flow can be classified based on different criteria:

(a) Steady and Unsteady Flow

Steady Flow: Fluid properties (velocity, pressure, density) at a point do not change with time. $\frac{\partial V}{\partial t} = 0$
Unsteady Flow: Fluid properties change with time.

(b) Uniform and Non-Uniform Flow

Uniform Flow: Velocity is the same at every point in space at a given time.
Non-uniform Flow: Velocity varies from point to point.

(c) Laminar and Turbulent Flow

Laminar Flow: Fluid moves in smooth layers (low velocity).
Turbulent Flow: Irregular motion with eddies and vortices (high velocity).

(d) Compressible and Incompressible Flow

Compressible Flow: Density changes significantly (e.g., gases).
Incompressible Flow: Density remains constant (e.g., liquids).

(e) Rotational and Irrotational Flow

Rotational Flow: Fluid particles rotate about their axis.
Irrotational Flow: No rotation of fluid particles.

3. Methods of Describing Fluid Motion

(a) Lagrangian Method

Tracks individual fluid particles.
Properties expressed as functions of time.
Difficult for practical problems.

(b) Eulerian Method

Observes fluid motion at fixed points in space.
Most commonly used in fluid mechanics.

4. Velocity Field

The velocity of fluid at any point is defined as:

$V = V(x, y, z, t)$ V=V(x,y,z,t)

This means velocity depends on:

Spatial coordinates (x, y, z)
Time (t)

Velocity has three components: $V = u\hat{i} + v\hat{j} + w\hat{k}$

Where:

$u, v, w$ u,v,w are velocity components in x, y, z directions.

5. Acceleration of Fluid Particle

Acceleration is the rate of change of velocity: $a = \frac{dV}{dt}$

It has two components:

(a) Local Acceleration

Due to change in velocity with time at a point.

$\frac{\partial V}{\partial t}$

(b) Convective Acceleration

Due to change in velocity with position.

$V \cdot \nabla V$

Total Acceleration

$a = \frac{\partial V}{\partial t} + (V \cdot \nabla)V$

6. Types of Fluid Flow Lines

(a) Streamline

A line tangent to the velocity vector at every point.
No fluid crosses a streamline.

(b) Pathline

Actual path followed by a fluid particle.

(c) Streakline

Locus of all particles passing through a point.

7. Continuity Equation (Mass Conservation)

For incompressible flow:

$A_1 V_1 = A_2 V_2$ A1V1=A2V2

General form: $\frac{\partial \rho}{\partial t} + \nabla (\rho V) = 0$

Where:

$\rho$ ρ = density
$V$ V = velocity

8. Rotation and Vorticity

Rotation: Angular motion of fluid particles.
Vorticity (ω): Measure of rotation.

$\omega = \nabla \times V$

If $\omega = 0$ ω=0 → Irrotational flow
If $\omega \neq 0$ ω=0 → Rotational flow

9. Circulation

Circulation is defined as the line integral of velocity around a closed path: $\Gamma = \oint V \cdot dl$

It represents the net rotation effect in a flow field.

10. Stream Function (ψ)

For 2D incompressible flow: $u = \frac{\partial \psi}{\partial y}, \quad v = -\frac{\partial \psi}{\partial x}$

Automatically satisfies continuity equation.
Lines of constant ψ are streamlines.

11. Velocity Potential Function (ϕ)

For irrotational flow: $V = \nabla \phi$

Flow is irrotational if velocity can be expressed as gradient of scalar potential.
Satisfies Laplace equation:

$\nabla^2 \phi = 0$

12. Importance of Fluid Kinematics

Helps understand flow patterns without force analysis
Used in:
- Pipe flow analysis
- Aerodynamics
- Hydraulics
- CFD (Computational Fluid Dynamics)
Forms the foundation for advanced topics like fluid dynamics and turbulence