Wednesday, 14 December 2011

Study Material M2


Unit Wise

Unit I (Fourier Series and Fourier Transform)

Fourier Series 
  • Introduction of Fourier series.
  • Fourier series for Discontinuous functions.
  • Fourier series for even and odd function.
  • Half range series
Fourier Transform 
  • Definition and properties of Fourier transform.
  • Sine and Cosine transform.
               




Unit II (Laplace Transform and Application)

Laplace Transform       
  • Introduction of Laplace Transform.
  • Laplace Transform of elementary functions.
  • Properties of Laplace Transform.
  • Change of scale property, second shifting property.
  • Laplace transform of the derivative.
  • Inverse Laplace transform & its properties.
  • Convolution theorem.
  • Applications of L.T. to solve the ordinary differential equations.




Unit III (Second order differential equation and series solution)

Second order differential equation
  • Second Order linear differential equation with variable coefficients
  • Methods one integral is known.
  • Removal of first derivative.
  • Changing of independent variable and variation of parameter.
  •  Series solution
  • Solution by Series Method.

Unit Iv (Partial Differential Equation and Application of PDE)

Partial Differential Equation 
  • Linear and Non Linear partial differential equation of first order.
  • Formulation of  partial differential equations.
  • Solution of equation by direct integration.
  • Lagrange’s Linear equation.
  • Charpit’s method.
 Application of PDE
  • Linear partial differential equation of second and higher order.
  • Linear homogeneous and Non homogeneous partial diff.
  • Equation of nth order with constant coefficients.
  • Separation of variable method for the solution of wave and heat equations.

Unit V (Vector and Application of Vector)

Vector Calculus 
  • Differentiation of vectors.
  • scalar and vector point function.
  • Geometrical meaning of Gradient.
  • Unit normal vector and directional derivative.
  • Physical interpretation of divergence and Curl.
  • Line integral.
  • Surface integral and volume integral.
  • Green’s, Stoke’s and Gauss divergence theorem.






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