Welcome to Collin College
Math 2415 Calendar
Spring 2019
http://faculty.collin.edu/rkhoury
1. Read the e-book and work the assigned online Lab problems in
WebAssign.
Use the online step by step solution to selected Lab problems.
2. Work suggested textbook Exam review problems by using the optional student's solution manual for
step by step solution to selected problems.
3. Take advantage of free onsite tutoring located at Collin's Math Labs or through NetTutor https://www.collin.edu/studentresources/tutoring/.
Read instructions before taking your Exams and Labs | |||
Math 2415 Online - Spring 2019 | |||
Assignment | Lab availability in WebAssign | Exam availability in Canvas | Sections covered |
Exam 1 and Lab 1 |
Lab 1 is
available
on Jan 22 - Feb 17 |
Exam 1 is available on Feb 11 - 17 | 12.1- 12.6, 13.1 - 13.4 |
Exam 2 and Lab 2 |
Lab 2 is available on |
Exam 2 is available on Mar 18- 24 Mar 22 is last day to withdraw |
14.1 - 14.8 |
Exam 3 and Lab 3 |
Lab 3 is
available
on Mar 25 - Apr 21 |
Exam 3 is available on April 15 - 21 | 15.1 - 15.9 |
Exam 4 and Lab 4 |
Lab 4 is
available on Apr 22 - May 12 |
Exam 4 is available on May 6 - 12 | 16.1 - 16.9 |
Comprehensive Final Exam is available in Canvas on May 13 -
18 in the testing
center or online through ProctorU. Sections covered 12.1- 12.6, 13.1 - 13.4, 14.1 - 14.8, 15.1 - 15.9, 16.1 - 16.9 |
|||
Suggested Weekly schedule
Date | Section # |
Section Title (Students' Learning Objectives) |
Jan 22-27 |
Introductions 12.1 12.2 12.3 12.4 |
Introductions Three-Dimensional Coordinate Systems Vectors The Dot Product The Cross Product |
Jan 28-Feb 3 |
12.5 12.6 13.1 |
Equations of Lines
and Planes Cylinders and Quadric Surfaces Vector Functions and Space Curves |
Feb 4-10 |
13.2 13.3 13.4 |
Derivatives and Integrals of Vector Functions Arc Length and Curvature Motion in Space: Velocity and Acceleration |
Feb 11-17 |
Lab 1 is Due Exam 1 |
Take Exam 1 in WebAssign through Canvas in the testing center or through ProctorU |
Feb 18-24 |
14.1 14.2 14.3 |
Functions of Several Variables Limits and Continuity Partial Derivatives |
Feb 25-Mar 3 |
14.4 14.5 14.6 |
Tangent Planes and Linear Approximations The Chain Rule Directional Derivatives and the Gradient Vector |
Mar 4-10 |
14.7 14.8 |
Maximum and Minimum Values Lagrange Multipliers |
Mar 11-17 | Spring Break | Spring Break |
Mar 18-24 |
Lab 2 is Due Exam 2 |
Take Exam 2 in WebAssign through Canvas
in the testing center or through ProctorU Last day to withdraw this class is March 22 |
Mar 25-31 |
15.1 15.2 15.3 |
Double Integrals over Rectangles Double Integrals over General Regions Double Integrals in Polar Coordinates |
Apr 1-7 | 15.4 15.5 15.6 |
Applications of Double Integrals Surface Area Triple Integrals |
Apr 8-14 |
15.7 15.8 15.9 |
Triple Integrals in Cylindrical Coordinates Triple Integrals in Spherical Coordinates Change of Variables in Multiple Integrals |
Apr 15-21 |
Lab 3 is Due Exam 3 |
Take Exam 3 in WebAssign through Canvas in the testing center or through ProctorU |
Apr 22-28 |
16.1 16.2 16.3 16.4 16.5 |
Vector Fields Line Integrals The Fundamental Theorem for Line Integrals Green’s Theorem Curl and Divergence |
Apr 29-May 5 |
16.6 16.7 16.8 16.9 |
Parametric Surfaces and Their Areas Surface Integral Stokes’ Theorem The Divergence Theorem |
May 6-12 |
Lab 4 is Due Exam 4 |
Submit Lab 4 in WebAssign Take Exam 4 WebAssign through Canvas in the testing center or through ProctorU |
May 13-18 |
Comprehensive Final |
Take Final Exam in WebAssign through Canvas in the testing center or through ProctorU |
·
Calculus I and II videos are listed below
Calculus III - Module I -
Videos
Calculus III - Module II - Videos
Calculus III - Module III - Videos
Calculus III - Module IV - Videos
Compute the Potential Function of a Conservative Vector Field |
Introduction to second-order nonhomogeneous linear equations - A |
Introduction to second-order nonhomogeneous linear equations - B |
Calculus I Review Videos
Calculus II Review Videos
Copyright © This site was last edited on
Wednesday, January 16, 2019 - Dr.
Raja Khoury - Collin College - All Rights Reserved.