Tikanga Pāngarau II

Ka whakawhanakehia ētahi mātauranga pāngarau Motuhake me ngā ariā pāngarau hei kawe i te pāngarau i roto i te ako reo Māori. Development of specific mathematical concepts and pedagogical knowledge for teaching of mathematics in the Māori medium.

Course code

Qualifications are made up of courses. Some universities call these papers. Each course is numbered using six digits.



The fourth number of the course code shows the level of the course. For example, in course 219206, the fourth number is a 2, so it is a 200-level course (usually studied in the second year of full-time study).



Each course is worth a number of credits. You combine courses (credits) to meet the total number of credits needed for your qualification.


Course planning information

Course notes

Course only available to those students selected for the Te Aho Tātairangi: Bachelor of Teaching Māori Medium/Diploma in Māori Education programme.

Prerequisite courses

Complete first

You need to complete the above course or courses before moving onto this one.

General progression requirements

You must complete at least 45 credits from 100-level before enrolling in 200-level courses.

Learning outcomes

What you will learn. Knowledge, skills and attitudes you’ll be able to show as a result of successfully finishing this course.

  • 1 Whakaatu i tōna mōhio pū, i tōna mārama pū ki ngā tukanga pāngarau, ki te hinengaro pāngarau. Demonstrate an in-depth knowledge and understanding of mathematical thinking and processes.
  • 2 Āta arohaehae i tā te tamaiti whakaaro pāngarau hei tā ngā rautaki, ngā pūnaha o te wā. Analyse children’s mathematical thinking in relation to development frameworks.
  • 3 Āhukahuka me te whakamārama i ngā mātāpono, i ngā āhuatanga huhua o te whakamahere, o te aromatawai i te pāngarau, me te whakamahi i te taiao ako. Identify and explain the principles and practices of effective planning and assessment in mathematics teaching and apply them within the learning environment.
  • 4 Whakaatu i tōna matatau ki te pāngarau mā te whakamahinga i te huhua o ngā tikanga pāngarau hei tautoko i tana ako. Demonstrate advanced knowledge and skill in mathematics through the use of a range of effective mathematical practices that support their mathematical learning.

Learning outcomes can change before the start of the semester you are studying the course in.


Assessment Learning outcomes assessed Weighting
Written Assignment 1 3 30%
Portfolio 1 2 3 45%
Test 4 25%

Assessment weightings can change up to the start of the semester the course is delivered in.

You may need to take more assessments depending on where, how, and when you choose to take this course.

Explanation of assessment types

Computer programmes
Computer animation and screening, design, programming, models and other computer work.
Creative compositions
Animations, films, models, textiles, websites, and other compositions.
Exam College or GRS-based (not centrally scheduled)
An exam scheduled by a college or the Graduate Research School (GRS). The exam could be online, oral, field, practical skills, written exams or another format.
Exam (centrally scheduled)
An exam scheduled by Assessment Services (centrally) – you’ll usually be told when and where the exam is through the student portal.
Oral or performance or presentation
Debates, demonstrations, exhibitions, interviews, oral proposals, role play, speech and other performances or presentations.
You may be assessed on your participation in activities such as online fora, laboratories, debates, tutorials, exercises, seminars, and so on.
Creative, learning, online, narrative, photographic, written, and other portfolios.
Practical or placement
Field trips, field work, placements, seminars, workshops, voluntary work, and other activities.
Technology-based or experience-based simulations.
Laboratory, online, multi-choice, short answer, spoken, and other tests – arranged by the school.
Written assignment
Essays, group or individual projects, proposals, reports, reviews, writing exercises, and other written assignments.