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MAT2
The MAT2 course consists of three personalised 14-credit pathways.
Standards offered in each pathway are selected from the following standards:
See the Year Planner for the different personalised pathway options offered.
What should I have already achieved?
What should I have already achieved?
Level 1 Algebraic Proficiency (MANDATORY): It is essential that students enrolling in Mathematics Level 2 have demonstrated strong algebraic skills in MAT 1 during 2025. This includes successful completion of the Level 1 Algebraic and Graphical Methods standards and a solid foundation in manipulating formulas, basic graphing, and solving linear/quadratic equations. These skills are critical for success in Calculus and advanced Algebra.
Scientific Calculator: A fully functional Scientific Calculator (such as a Casio fx-991EX or similar) is required for most in-class work and for external assessments, particularly for complex trigonometric and calculus calculations.
Access to a Personal Computing Device: To fully participate in the course, access to a personal computing device (such as a laptop or Chromebook) is recommended, as you will be using technology for graphing, modeling, and external research throughout the year.
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How will this course be assessed?
How will this course be assessed?
This course offers a maximum of 14 NCEA Level 2 credits. Students have the flexibility to choose between two pathways:
External Only Pathway: Complete 3 internal assessments (9 credits) and 2 external assessments (9 credits) to gain all 14+ credits.
Mixed Pathway: Complete 4 internal assessments (11 credits) and 1 external assessment (4 credits).
Additionally, students who passed Level 2 Algebra in 2025 with at least a Merit grade will have the opportunity to take the Complex Numbers Level 3 external standard, which is worth 5 credits.
What will I learn?
What will I learn?
In this course, you will significantly strengthen your ability to think critically, reason mathematically, and apply powerful problem-solving techniques. You will learn how to model real-world situations, select the most effective mathematical methods, and interpret your solutions in context.
You will explore a range of key mathematical areas, including:
Systems of Equations (Standard AS91269): You will master methods for solving systems of equations, including simultaneous linear and non-linear equations, which allows you to find common solutions in problems involving intersecting graphs and multiple conditions.
Algebraic Problem Solving (Standard AS91261): You will master advanced algebraic methods to solve problems involving complex numbers, polynomials, and manipulating challenging equations and expressions. This involves demonstrating a deep understanding of the structure and properties of these mathematical tools.
Graphical Methods (Standard AS91275): You will develop precision in using graphs to solve complex systems of equations, interpret functions (including parabolic, circular, and trigonometric forms), and translate between algebraic and visual representations to make informed conclusions.
Trigonometric Methods (Standard AS91259): You will apply trigonometric principles, including the sine and cosine rules, to solve practical problems involving triangles that are not right-angled. You will also use trigonometric identities and equations to model periodic phenomena.
Co-ordinate Geometry (Standard AS91256): You will use the concepts of co-ordinate geometry to investigate geometric properties and relationships, applying tools like distance, midpoint, and gradient formulas to solve problems in two dimensions.
Calculus and Modeling (Standard AS91262): You will learn the fundamental concepts of differentiation and integration. This enables you to model dynamic situations, solve problems involving rates of change, and determine optimum solutions for real-world scenarios like maximizing profits or minimizing material use.
By the end of the course, you will be able to confidently select and use advanced algebraic, trigonometric, and calculus methods, supported by co-ordinate geometry and graphical analysis, to solve a wide variety of practical and abstract problems, and clearly communicate the mathematical evidence that supports your findings.
Career Pathways
Career Pathways
Studying advanced Mathematics opens doors to a wide range of future study and career opportunities. The skills you gain—such as algebraic problem-solving, calculus-based modeling, logical reasoning, and the ability to apply complex formulas—are highly valued across many industries.
Possible career pathways include:
Engineering and Physical Sciences: Engineer (Aerospace, Civil, Mechanical), Physicist, Environmental Modeler, Control Systems Designer
Data Science and Technology: Data Scientist, Software Developer, Machine Learning Engineer, Quantitative Analyst, Algorithm Developer
Business and Finance: Actuary, Financial Analyst, Risk Manager, Economist, Portfolio Manager
Applied Research and Analysis: Operations Research Analyst, Applied Mathematician, Research Consultant, Technical Writer
Design and Spatial Analysis: Architect, Surveyor, Urban Planner, Cartographer
This course provides a strong foundation for further study in areas such as Engineering, Computer Science, Data Science, Finance, Economics, and Applied Mathematics.
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