ENGEN201-23H (NET)

Engineering Maths and Modelling 2

15 Points

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Division of Health Engineering Computing & Science
School of Computing and Mathematical Sciences
Department of Mathematics and Statistics

Staff

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Convenor(s)

Woei Chet Lim

Woei Chet Lim
5148
G.3.05
See Moodle
woeichet.lim@waikato.ac.nz

Lecturer(s)

Administrator(s)

: maria.admiraal@waikato.ac.nz

Placement/WIL Coordinator(s)

Tutor(s)

Student Representative(s)

Lab Technician(s)

Librarian(s)

: cheryl.ward@waikato.ac.nz

You can contact staff by:

  • Calling +64 7 838 4466 select option 1, then enter the extension.
  • Extensions starting with 4, 5, 9 or 3 can also be direct dialled:
    • For extensions starting with 4: dial +64 7 838 extension.
    • For extensions starting with 5: dial +64 7 858 extension.
    • For extensions starting with 9: dial +64 7 837 extension.
    • For extensions starting with 3: dial +64 7 2620 + the last 3 digits of the extension e.g. 3123 = +64 7 262 0123.
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What this paper is about

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The first two-thirds of ENGEN201 teaches multi-variable calculus and vector calculus, extending the one-variable calculus from ENGEN102.

The last third teaches ordinary differential equations and Laplace transform.

The learning outcomes for this paper are linked to Washington Accord graduate attributes WA1-WA11. Explanation of the graduate attributes can be found at: https://www.ieagreements.org/

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How this paper will be taught

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This is a fully online, lecture/tutorial-based paper. It uses pre-recorded lectures and tutorials from the 20B trimester. The lecturer will hold office hours on Zoom. Students with questions can email the lecturer anytime. The paper is run over the 23H study period from 4 Jan 2023 to 17 Feb 2023. The intention is to allow students to catch up, to fast track, or to lighten the load in other trimesters.
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Required Readings

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Engineering Mathematics, K. A. Stroud (with Dexter Booth), 7th Edition,

or Higher Engineering Mathematics (8th Edition), John Bird.

You should already own either of these textbooks, which was used in first year.

Advanced Engineering Mathematics, K. A. Stroud (with Dexter Booth), 5th or 6th Edition. This textbook will also be used for ENGEN301.

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Learning Outcomes

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Students who successfully complete the course should be able to:

  • Apply knowledge of multi-variable calculus, vector calculus, ODEs, and Laplace transform to solve engineering problems (WA1).
    Linked to the following assessments:
    Assignments (best 10 of 11) (1)
    Test 1 (2)
    Test 2 (3)
    Test 3 (4)
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Assessments

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How you will be assessed

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The assessment mark will consist of :

Three Tests (supervised via Zoom) each worth 25% for a total of 75%

  • Test 1 on Monday 23 January 2022
  • Test 2 on Tuesday 7 February 2022
  • Test 3 on Friday 17 February 2022
  • Test times: 8:00 pm - 9:20 pm plus 10 minutes for scanning and uploading

Assignments worth 25%

  • There will be 11 tutorial based assignments of which only the best 10 marks will be counted. Assignments should be your own work and copying may lead to referral to the university disciplinary committee.

If you are enrolled on a BE(Hons), samples of your work may be required as part of the Engineering New Zealand accreditation process for BE(Hons) degrees. Any samples taken will have the student name and ID redacted. If you do not want samples of your work collected then please email the engineering administrator, Natalie Shaw (natalie.shaw@waikato.ac.nz), to opt out.

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The internal assessment/exam ratio (as stated in the University Calendar) is 100:0. There is no final exam. The final exam makes up 0% of the overall mark.

The internal assessment/exam ratio (as stated in the University Calendar) is 100:0 or 0:0, whichever is more favourable for the student. The final exam makes up either 0% or 0% of the overall mark.

Component DescriptionDue Date TimePercentage of overall markSubmission MethodCompulsory
1. Assignments (best 10 of 11)
25
  • Online: Submit through Moodle
2. Test 1
25
  • Online: Submit through Moodle
3. Test 2
25
  • Online: Submit through Moodle
4. Test 3
25
  • Online: Submit through Moodle
Assessment Total:     100    
Failing to complete a compulsory assessment component of a paper will result in an IC grade
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