Syllabus For MECH

Linear Algebra
Matrix algebra
System of Linear Equations
Eigen values and Eigen Vectors

Calculus
Functions Of single Variables
limits, Continuity and differentiability
Indeterminate Forms
Mean Value Theoram
Evaluation of Definite and Improper Integrals
Double and triple Integrals
Partial Derivative
Total derivative
Taylor Seires(in one and two variables)
Maxima and Minima
Fourier Series
Gradient
Divergence and Curl
vector Identities
Directional derivative
Line, Surface and Volume Integrals
Application of Gauss,Sokes and Greens theoram

Differential Equations
First Order Equations (Linear and non-linear)
Higher Order linear differntial equations with constant coefficients
Euler-Cauchy Eqation
Initial and Boundry Value Problems
Laplace Transforms
Solutions of heat wave and Laplace Equations

Complex Variables
Analytic Functions
Cauchy- Rieman Equations
Cauchy's Integral Theoram and Integral formula
Taylor and Laurent Series

Probability and statistics
Definations of Probability
Sampling Theorams
Conditional Probability
Mean , Median and Mode and Standard deviation
Random variables
Binomial,Poison and Normal Distributions

Numerical Methods
Numerical solutions of Linear and Non-linear algebraic Equations
Integration by trapezoidal and Simpsons rule
Single and Multi-steps Method for for differential equations