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TNEB TANGEDCO AE Syllabus 2020 – Download Exam Pattern PDF. TNEB TANGEDCO  Limited  is conducting Written Exam (Technical) for Assistant Engineer (Electrical) and (Civil). TNEB TANGEDCO AE Syllabus is given below go through the topics, to have an idea of the difficult subjects. Then candidates can plan a schedule for your preparation as per the TNEB TANGEDCO AE (Technical) Syllabus. Here is the Syllabus for TNEB TANGEDCO AE Written Exam.

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 Name of the Board Tamilnadu Electricity Board TANGEDCO (Tamilnadu Generation and Distribution Corporation) Post Name Assistant Engineer Vacancy 600 Start Date to Apply 24.01.2020 Last Date to Apply 24.02.2020 Status Notification Released

## TNEB TANGEDCO AE Exam Pattern

 Sl. No. Name of the Post Duration of the EXAMINATION Syllabi Assistant Engineer/ Electrical Assistant Engineer/ Civil Assistant Engineer (Mechanical) 2 Hours The Question paper will have three parts. Part I and Part II are compulsory and under Part III, the candidates have to answer the section which has been chosen at the time of registration. If a candidate appears for a different section, Part III will not be evaluated. The questions will be set at Under Graduate level.

## ANNEXURE – ISYLLABI FOR THE ENTRANCE TESTPART – I (‘20’ Marks)

ENGINEERING MATHEMATICS (Common to all Candidates)
i) Determinants and Matrices: Solving system of equations – Rank of the Matrix – Eigenvalues and eigenvectors – Reduction of quadratic form to canonical form. ii) Calculus and Differential Equations: Partial derivatives – Jacobians – Taylor’s expansion – Maxima and Minima. Linear ordinary differential equations with constant coefficients – Simultaneous first order linear equations with constant coefficients. Formation of partial differential equation (PDE) – Solution of first order PDE – Solution of linear higher order PDE with constant coefficients.
iii) Vector Calculus: Double and triple integrations and their applications – Gradient, Divergence, Curl and Laplacian – Green’s, Gauss divergence and Stroke’s theorem. iv) Functions of Complex Variables and Complex Integration : Analytic functions – Conformal Mapping – Bilinear transformation – Cauchy’s integral theorem and integral formula – Taylor and Laurent Series – Singularities – Residues – Residue theorem and its applications.
v) Transforms: Laplace Transform – Inverse transforms – Application to solution of linear ordinary differential equations with constant coefficients. Fourier integral theorem – Fourier transform pair – Sine and Cosine transforms. -transform – Inverse Z– transform – Solution of difference equations using Z– transform.
vi) Numerical Methods: Solution of linear system by direct and iterative methods – Interpolation and approximation – Numerical Differentiation and Integration – Solving Ordinary Differential Equations.
vii) Applied Probability: Probability and Random variables – Standard Discrete and Continuous distribution – Moments – Moment generating function and their properties. Two-Dimensional Random Variables – Covariance – Correlation and Regression