Learning Area Mathematics (Additional) 1
Subject EDUC90459 (2013)
Note: This is an archived Handbook entry from 2013.
Credit Points: | 12.50 |
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Level: | 9 (Graduate/Postgraduate) |
Dates & Locations: | This subject is not offered in 2013. |
Time Commitment: | Contact Hours: 36 hours Total Time Commitment: 125 hours total commitment. Attendance at all classes (tutorial/seminars/practical classes/lectures/labs) is obligatory. Failure to attend 80% of classes will normally result in failure in the subject. |
Prerequisites: |
Teacher Candidates must meet the minimum academic study requirements for teaching in specialist areas, in accordance with the Victorian Institute of Teaching's Specialist Area Guidelines, for entry into this subject. |
Corequisites: | You must take the following subject in the same study period (co or pre-req) Subject Study Period Commencement: Credit Points: |
Recommended Background Knowledge: | None |
Non Allowed Subjects: | None |
Core Participation Requirements: |
For the purposes of considering request for Reasonable Adjustments under the Disability Standards for Education (Cwth 2005), and Students Experiencing Academic Disadvantage Policy, academic requirements for this subject are articulated in the Subject Description, Subject Objectives, Generic Skills and Assessment Requirements of this entry. The University is dedicated to provide support to those with special requirements. Further details on the disability support scheme can be found at the HDisability Liaison Unit websiteH: Hhttp://www.services.unimelb.edu.au/disability/H |
Contact
Education Student Centre
234 Queensberry Street
Phone: +61 3 8344 8285
Subject Overview: |
This subject complements the co-requisite subject (EDUC90457 Learning Area Mathematics 1). Teacher candidates will deepen their pedagogical content knowledge for the effective teaching and learning of the following mathematics strands in the Australian curriculum for Years 7 -10:
Teacher candidates will analyse the development of key mathematical concepts, and identify critical progression points for school students’ learning. Teacher candidates will consider typical conceptions and misconceptions held by school students, and the likely causes for these. Teacher candidates will investigate the design and use of targeted diagnostic assessments to evaluate mathematical understanding, and recognise the advantages and limitations of particular assessment items for monitoring school students’ procedural and conceptual knowledge. In addition, they will learn to interpret school students’ mathematical solutions, and devise appropriate responses. Teacher candidates will examine the role of cognitive conflict in learning, teaching strategies that focus on changing conceptions, and develop strategies for motivating learning and engagement. They will investigate the importance of appropriate examples for learning, and the changes in opportunities afforded as the parameters of examples are varied. Characteristics of the middle years of schooling will be considered. |
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Objectives: |
On completion of this subject teacher candidates will be able to:
The subject covers a range of the National Professional Standards for Teachers (for Graduate Teachers). In particular, the subject will contribute to students attaining the following standards: 1.2 Understand how students learn 2.1 Content and teaching strategies of the teaching area 5.1 Assess student learning 5.4 Interpret student data
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Assessment: |
There are 2 assessment tasks:
There is 1 hurdle requirement:
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Prescribed Texts: | None |
Breadth Options: | This subject is not available as a breadth subject. |
Fees Information: | Subject EFTSL, Level, Discipline & Census Date |
Generic Skills: |
On completion of this subject, teacher candidates will have the knowledge, skills and understanding to enable them to:
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Related Course(s): |
Master of Teaching (Secondary) Master of Teaching (Secondary) |
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