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The information below will be relevant from Term 1 2019.

General Information

Unit Synopsis

In this unit, you will study topics in multivariable calculus - differential and integral calculus as applied to scalar and vector functions of more than one variable. After reviewing vectors and the geometry of space, you will investigate derivatives and integrals of vector functions with applications to arc length, curvature of space curves and motion in space. Partial differentiation is studied by defining limits and continuity in two dimensions, and is used to define tangent planes, linear approximations and differentials. The chain rule is developed for functions of more than one variable as well as directional derivatives and the gradient vector, which leads into multivariate optimisation with and without constraints. You will study multiple integrals by expanding the concept of single variable integrals to double and triple integrals which are evaluated as iterated integrals. These ideas are further developed to show you how to calculate volumes, surface areas, masses and centroids of very general regions in two and three dimensional space as well as probability for bivariate distributions. Finally you will investigate the calculus of vector fields, line integrals and surface integrals. The connection between these new types of integrals and multiple integrals is given in three theorems - Green’s Theorem, Stokes’ Theorem and the Divergence Theorem - which turn out to be higher-dimensional versions of the Fundamental Theorem of Calculus. Mathematical software is used to investigate and solve most problems in the unit.

Details

Level Undergraduate 3 6 2 0.125 Prerequisite: MATH12224  Anti-requisite: MATH12172 View Unit Timetable No Residential School

Unit Availabilities from Term 1 - 2019

Term 1 - 2019 Profile
Online

Attendance Requirements

All on-campus students are expected to attend scheduled classes – in some units, these classes are identified as a mandatory (pass/fail) component and attendance is compulsory. International students, on a student visa, must maintain a full time study load and meet both attendance and academic progress requirements in each study period (satisfactory attendance for International students is defined as maintaining at least an 80% attendance record).

Assessment Overview

Recommended Student Time Commitment

Each 6-credit Undergraduate unit at CQUniversity requires an overall time commitment of an average of 12.5 hours of study per week, making a total of 150 hours for the unit.

1. Written Assessment 25%
2. Written Assessment 25%
3. Examination 50%

Past Exams

Policies

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This list is not an exhaustive list of all University policies. The full list of policies are available on the Policy web site .

Previous Feedback

Term 1 - 2018 : The overall satisfaction for students in the last offering of this course was 4.4 (on a 5 point Likert scale), based on a 35.71% response rate.

Feedback, Recommendations and Responses

Every unit is reviewed for enhancement each year. At the most recent review, the following staff and student feedback items were identified and recommendations were made.

Source: student feedback
Feedback
Students commented favourably upon : texkbook, the take-home exam and feedback on assignments
Recommendation
Continue to offer a positively supported resources
Action Taken
The resources such as textbook, the take-home exam and feedback on assignments continued.
Source: Student evaluation
Feedback
Zoom sessions close to assessment due dates for any questions/struggles on coursework would be useful.
Recommendation
Open Zoom sessions to support students.
Action Taken
Nil.
Source: Student evaluation
Feedback
Lots of material is available to support learning, along with textbook.
Recommendation
Keep the textbook for this unit.
Action Taken
Nil.
Source: Student evaluation
Feedback
The University of Missouri video lectures were helpful.
Recommendation
Keep the University of Missouri video lectures.
Action Taken
Nil.
Unit learning Outcomes

On successful completion of this unit, you will be able to:

1. Solve geometric problems in three dimensional space using vectors and their operators
2. Differentiate and integrate of vector functions to solve problems involving arc length and curvature of space curves
3. Apply the concept of the limit, continuity and partial derivative of a function of many variables to calculate tangent planes, linear approximations and differentials
4. Optimise multivariable problems, either with or without constraints, using the chain rule, directional derivatives and the gradient vector
5. Calculate double and triple integrals over general regions, and also in polar, cylindrical and spherical coordinates
6. Simplify the evaluation of a double or triple integral by applying the change of variables technique
7. Solve problems involving the curl and divergence of a vector field
8. Investigate the calculus of vector fields, line integrals and surface integrals through Green’s theorem, Stokes’ Theorem and the Divergence Theorem
9. Use mathematical software to visualise, analyse and solve problems in multivariable calculus.

Alignment of Assessment Tasks to Learning Outcomes
1 2 3 4 5 6 7 8 9
1 - Written Assessment
2 - Written Assessment
3 - Examination
Alignment of Graduate Attributes to Learning Outcomes
Introductory Level
Intermediate Level
1 2 3 4 5 6 7 8 9
1 - Communication
2 - Problem Solving
3 - Critical Thinking
4 - Information Literacy
6 - Information Technology Competence
8 - Ethical practice