Course description
A-Level Further Mathematics for Year 12 - Course 2: 3 x 3 Matrices, Mathematical Induction, Calculus Methods and Applications, Maclaurin Series, Complex Numbers and Polar Coordinates
This course by Imperial College London is designed to help you develop the skills you need to succeed in your A-level further maths exams.
You will investigate key topic areas to gain a deeper understanding of the skills and techniques that you can apply throughout your A-level study. These skills include:
- Fluency selecting and applying correct methods to answer with speed and efficiency
- Confidence critically assessing mathematical methods and investigating ways to apply them
- Problem solving analysing the ‘unfamiliar’ and identifying which skills and techniques you require to answer questions
- Constructing mathematical argument using mathematical tools such as diagrams, graphs, logical deduction, mathematical symbols, mathematical language, construct mathematical argument and present precisely to others
- Deep reasoning analysing and critiquing mathematical techniques, arguments, formulae and proofs to comprehend how they can be applied
Over eight modules, you will be introduced:
- The determinant and inverse of a 3 x 3 matrix
- Mathematical induction
- Differentiation and integration methods and some of their applications
- Maclaurin series
- DeMoivre’s Theorem for complex numbers and their applications
- Polar coordinates and sketching polar curves
- Hyperbolic functions
Your initial skillset will be extended to give a clear understanding of how background knowledge underpins the A-level further mathematics course. You’ll also, be encouraged to consider how what you know fits into the wider mathematical world.
Upcoming start dates
Who should attend?
Prerequisites:
An understanding of the content of the course A-Level Further Mathematics for Year 12: Course 1 is required
Training content
Syllabus
Module 1: Matrices - The determinant and inverse of a 3 x 3 matrix
- Moving in to three dimensions
- Conventions for matrices in 3D
- The determinant of a 3 x 3 matrix and its geometrical interpretation
- Determinant properties
- Factorising a determinant
- Transformations using 3 x 3 matrices
- The inverse of a 3 x 3 matrix
- The principle behind mathematical induction and the structure of proof by induction
- Mathematical induction and series
- Proving divisibility by induction
- Proving matrix results by induction
- The chain rule
- The product rule and the quotient rule
- Differentiation of reciprocal and inverse trigonometric functions
- Integrating trigonometric functions
- Integrating functions that lead to inverse trigonometric integrals
- Integration by inspection
- Integration using trigonometric identities
- Volumes of revolution
- The mean of a function
- Expressing functions as polynomial series from first principles
- Maclaurin series
- Adapting standard Maclaurin series
- De Moivre's theorem and it's proof
- Using de Moivre’s Theorem to establish trigonometrical results
- De Moivre’s Theorem and complex exponents
- Defining position using polar coordinates
- Sketching polar curves
- Cartesian to polar form and polar to Cartesian form
- Defining hyperbolic functions
- Graphs of hyperbolic functions
- Calculations with hyperbolic functions
- Inverse hyperbolic functions
Differentiating and integrating hyperbolic functions
Course delivery details
This course is offered through Imperial College London, a partner institute of EdX.
2-4 hours per week
Costs
- Verified Track -$49
- Audit Track - Free
Certification / Credits
What you'll learn
- How to find the determinant of a complex number without using a calculator and interpret the result geometrically.
- How to use properties of matrix determinants to simplify finding a determinant and to factorise determinants.
- How to use a 3 x 3 matrix to apply a transformation in three dimensions
- How to find the inverse of a 3 x 3 matrix without using a calculator.
- How to prove series results using mathematical induction.
- How to prove divisibility by mathematical induction.
- How to prove matrix results by using mathematical induction.
- How to use the chain, product and quotient rules for differentiation.
- How to differentiate and integrate reciprocal and inverse trigonometric functions.
- How to integrate by inspection.
- How to use trigonometric identities to integrate.
- How to use integration methods to find volumes of revolution.
- How to use integration methods to find the mean of a function.
- How to express functions as polynomial series.
- How to find a Maclaurin series.
- How to use standard Maclaurin series to define related series.
- How to use De Moivre’s Theorem.
- How to use polar coordinates to define a position in two dimensional space.
- How to sketch the graphs of functions using polar coordinates.
- How to define the hyperbolic sine and cosine of a value.
- How to sketch graphs of hyperbolic functions.
- How to differentiate and integrate hyperbolic functions.
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