M427L Advanced Calculus for Applications II
Syllabus: Click Here.
- Regular Class: MWF 10:00-11:00 am @ RLP 0.130
- Discussion Session: TTh 5:00-6:00 pm @ RLP 0.130
- Dr. Shen’s Office Hour: MW 11:00-12:00 am, T 10:30-11:30 am @ RLM 13.142
- My Office Hour: W 12:00-2:00 pm @ RLM 11.130
Download handout 2018-10-23 here.
Syllabus
- THE GEOMETRY OF EUCLIDEAN SPACE (6 days)
- Vectors in two- and three-dimensional space
- The inner product, length, and distance
- Matrices, determinants, and the cross product
- Cylindrical and spherical coordinates
- n-dimensional Euclidean space
- DIFFERENTIATION (5-6 days)
- The geometry of real-valued functions
- Limits and continuity
- Differentiation
- Introduction to paths
- Properties of the derivative
- Gradients and directional derivatives
- HIGHER-ORDER DERIVATIVES (3 days)
- Iterated partial derivatives
- Taylor’s theorem
- Extrema of real-valued functions
- Constrained extrema and Lagrange multipliers
- The implicit function theorem (if time permits)
- VECTOR-VALUED FUNCTIONS (5 days)
- Acceleration and Newton’s Second Law
- Arc length
- Vector fields
- Divergence and curl
- DOUBLE AND TRIPLE INTEGRALS (3 days)
- Introduction
- The double integral over a rectangle
- The double integral over more general regions
- Changing the order of integration
- The triple integral
- THE CHANGE OF VARIABLES FORMULA (3 days)
- The geometry of maps (not crucial)
- The change of variables theorem (lightly)
- Applications of double, triple integrals (if time permits)
- INTEGRALS OVER PATHS AND SURFACES (7 days)
- The path integral
- Line integrals
- Parametrized surfaces
- Area of a surface
- Integrals of scalar functions over surfaces
- Surface integrals of vector functions
- THEOREMS OF VECTOR ANALYSIS (5-6 days)
- Green’s theorem
- Stokes’ theorem
- Conservative fields
- Gauss’ theorem