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15th September 2016, 12:20 PM
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Join Date: Aug 2012
Re: RGPV Syllabus 3rd Sem Electrical

Rajiv Gandhi Proudyogiki Vishwavidyalaya was established in the year 1998, by Madhya Pradesh Vidhan Sabha Act 13, 1998. This university is invited candidates for engineering admission. This university is offering various courses.

As you want here I’m giving you RGPV Syllabus 3rd Sem Electrical:

Get all syllabuses from RGPV:



RGPV Syllabus 3rd Sem Electrical:

RGPV Syllabus Electrical Engineering 3rd Sem

B.E. 301 – ENGINEERING MATHEMATICS II

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: 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 linear differential equation with variable coefficients : Methods one integral is known, removal of first derivative, changing of independent variable and variation of parameter, Solution by Series Method

Unit IV

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, char pit’s method. 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 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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