Mathematics 2 Pdf Notes – M2 Notes | Free Lecture Notes download


Mathematics 2 Pdf Notes – M2 Notes Pdf

Mathematics 2 Pdf Notes – M2 Notes Pdf – Mathematics 2 Notes Pdf – M2 Pdf Notes file to download are listed below please check it –

Link: Complete Notes

Note :- These notes are according to the R09 Syllabus book of JNTU.In R13 and R15,8-units of R09 syllabus are combined into 5-units in R13 and R15 syllabus. If you have any doubts please refer to the JNTU Syllabus Book.


Objectives,Vector differentiation,Vector operator,Gradient,Geometric meaning of gradient,Divergence,Solenoidal function,Curl,Irrational field,Properties of gradient, divergence and curl,Let Us Sum Up,Unit End Exercise,Learn vector differentiation,Operators, del, grad and curl,Properties of operators,Vector is a physical quantity which required magnitude and direction both,DEFINITION OF FOURIER SERIES,EVEN FUNCTION,ODD FUNCTION,FOURIER SERIES OF EVEN AND ODD FUNCTIONS,INTEGRAL TRANSFORM,Linearity Property,Change of Scale Property,Shifting Property ( Shifting in x )Shifting in respect of sModulation TheoremConjugate Symmetry Property,Transform of Derivatives,Derivatives of the Transform,Convolution Theorem,Find the finite Fourier sine and cosine transforms of f (x) x in (0 , ),Forward Differences,Backward Differences,Central Differences,Shifting Operator,The D Operator,The Mean Operator,Some Important Relations,Interpolations:Unequally Spaced Points,Lagranges Interpolation,Newton’s Divided Difference Interpolation Formula,Divided difference,Newton’s General Interpolation Formula,Fitting of A Straight:Line,Polynomials Least-Squares Fitting,Fitting A Power Function,Rate of Convergence,Convergence oa a Sequence,Convergence speed for iterative methods,Bisection Method,Convergence of Bisection Method,Regula Falsi Method.

How useful was this post?

Click on a star to rate it!

Average rating 4.4 / 5. Vote count: 72

No votes so far! Be the first to rate this post.

Leave a Reply

Your email address will not be published. Required fields are marked *