A textbook of engineering mathematics - I /
Arora, Hari
A textbook of engineering mathematics - I / Hari Arora - India Katson Books 2018 - 563 p.
This book contains ;
Evolutes and involutes; evaluation of definite and improper integrals; Beta and Gamma functions and their properties; Applications of definite integrals to evaluate surface areas and volumes of revolutions.
Rolle's theorem, mean value theorem's, Taylor's and Maclaurin theorems with remainders; intermediate forms and L'Hospital's rule; Maxima and Minima.
the convergence of sequence and series, tests for convergence; Power series, Taylor's series, series for exponential, trigonometric and logarithm functions; Fourier series: Half range sine and cosine series, Parseval's theorem.
Limit, continuity and partial derivatives, directional derivatives, total derivative; Tangent plane and normal line; Maxima, minima and saddle points; Method of Lagrange multipliers; Gradient, curl and convergence.
Inverse and rank of a matrix, rank-nullity theorem; System of linear equations; Symmetric, skew-symmetric and orthogonal matrices; determinants; eigenvalues and eigenvectors; Diagonalization of matrices; Cayley-Hamilton Theorem, and Orthogonal transformation.
9789350146743
Engineering mathematics
Mathematics
620.00151 ARO-H
A textbook of engineering mathematics - I / Hari Arora - India Katson Books 2018 - 563 p.
This book contains ;
Evolutes and involutes; evaluation of definite and improper integrals; Beta and Gamma functions and their properties; Applications of definite integrals to evaluate surface areas and volumes of revolutions.
Rolle's theorem, mean value theorem's, Taylor's and Maclaurin theorems with remainders; intermediate forms and L'Hospital's rule; Maxima and Minima.
the convergence of sequence and series, tests for convergence; Power series, Taylor's series, series for exponential, trigonometric and logarithm functions; Fourier series: Half range sine and cosine series, Parseval's theorem.
Limit, continuity and partial derivatives, directional derivatives, total derivative; Tangent plane and normal line; Maxima, minima and saddle points; Method of Lagrange multipliers; Gradient, curl and convergence.
Inverse and rank of a matrix, rank-nullity theorem; System of linear equations; Symmetric, skew-symmetric and orthogonal matrices; determinants; eigenvalues and eigenvectors; Diagonalization of matrices; Cayley-Hamilton Theorem, and Orthogonal transformation.
9789350146743
Engineering mathematics
Mathematics
620.00151 ARO-H