## Mathematics

 Name of the Faculty Topic Vedio Link D. MADHUKAR Homogeneous Differential equations of first order and First degree Equations solvable for p & Equations solvable for y Integrating factors 3,4&5 Higher order linear differential equations (variation of parameters) Variation of parameters (Higher order linear differential equations) Higher order Non-Homogeneous linear differential equations when Q(x)=e^ax Equations solvable for x and Clairaut's equations Higher order linear differential equations (method of undetermined coefficients) Integrating factors7&8(Linear differential equations and Reducible to linear differential equations) Method of undetermined coefficients Higher order Non-Homogeneous linear differential equations by means of polynomial operators when=Q(x)=bsinax or bcosax Legender's linear differential equations Integrating factor (By inspection method)1&2 Non-Homogeneous differential equations of first order and First degree Higher order Differential equations Part:1 Non-Homogeneous linear equations with constant co-efficients by means of polynomial operators Q (x)=e^axv Integrating factor :5 Q(x)=x^ksinax or x^kcosax Theorems on first order and First degree differential equations Separation of Variables K. KANAKAIAH Integrating factor Bisection Method Equations solve for x Linear Differential Equations Equations solve for y Bernoulli equations Differential equations Secant method Equations solvable for p Equations solve for p Iteration Method Integrating factor Exact Differential Equations Newton Method All the roots are real and distinct Differentiatiol equations Homogeneous differential equations Integrating factor Reduction of order method (Higher order linear differential equations of non-Constant coefficients) All the roots are imaginary Higher order non homogeneous linear Differential Equations Higher order non homogeneous linear Differential Equations

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