Go Back to 618-200 (Mathematics, Faculty of Science, v4, p209)
NOTE: These differences were detected by computer program - they may or may not be substantive.
Different CONTACT
Source=[39 lectures (three a week), 13 x 1-hour tutorials and 39 hours problem solving.]
Xref = [39 lectures (three each week), 13 1-hour tutorials and 39 hours problem solving.]
Different CONTENT
Source=[Sequences and series: convergence and divergence of sequences and series; tests for convergence; Taylor's theorem and series representation of elementary functions. Linear algebra: vector spaces in general, axioms, linear independence, basis sets, dimensionality, R<sup>n</sup> and C<sup>n</sup>; inner products; linear transformations, matrix of a linear transformation, change of basis, rank, inverse, solution of linear equations; eigenvectors and eigenvalues, quadrics and conics, rotation matrices, diagonal, real-symmetric and orthogonal matrices. Multivariable calculus: functions of several variables, level curves, heights; partial derivatives, commutation of mixed partial derivatives; total derivative, gradient vector, directional derivatives and applications; chain rule; coordinate transformations, Jacobi matrix and determinant; Hessian matrix, maxima and minima of functions of several variables; surface areas and volumes of solids of revolution; introduction to double and triple integrals.]
Xref = [<i>Sequences and series</i> Convergence and divergence of sequences and series; tests for convergence; Taylor's theorem and series representation of elementary functions. <i>Linear algebra </i>Vector spaces in general, axioms, linear independence, basis sets, dimensionality, R<sup>n</sup> and C<sup>n</sup>; inner products; linear transformations, matrix of a linear transformation, change of basis, rank, inverse, solution of linear equations; eigenvectors and eigenvalues, quadrics and conics, rotation matrices, diagonal, real-
symmetric and orthogonal matrices. <i>Multivariable calculus </i>Functions of several variables, level curves, heights; partial derivatives, commutation of mixed partial derivatives; total derivative, gradient vector, directional derivatives and applications; chain rule; coordinate transformations, Jacobi matrix and determinant; Hessian matrix, maxima and minima of functions of several variables; surface areas and volumes of solids of revolution; introduction to double and triple integrals.</p>]
Different PREREQUISITES
Source=[One of Mathematics 618-101 (1995 <i>Handbook) </i>or 121 or 142.]
Xref = [Mathematics 618-101 (1995 Handbook) or 618-121 or 618-142.]
Different SEMESTER
Source=[Offered in both semesters]
Xref = [First or second semester.]
Mon Oct 9 16:30:34 1995
Generated by: ./S50-v2writeHTML.pl
What this report means.