Mathematics IGCSE
About The Course
Mathematics plays a vital role in several practical applications and systems, such as computer construction, aeroplane navigation, and the provision of essential medical services. It is a crucial ability that is necessary in a wide range of industries.
This course fosters highly sought-after abilities in logical and analytical reasoning, problem-solving, and proficient computing techniques. This programme equips individuals for several professional paths, including but not limited to finance, credit risk assessment, business analytics, actuarial science, education, and research.
Consisting of five modules, each accompanied by an exam, this course efficiently assesses and strengthens the student’s understanding and expertise. This strategy gives students a highly advantageous opportunity to obtain an IGCSE qualification flexibly and cost-effectively successfully.
- Full and unrestricted access to the whole IGCSE curriculum
- Assignment availability
- Admission to exams
- Granting of a diploma
| Module | Description |
|---|---|
| The Fundamentals | This module covers a range of topics, including integers, fractions, decimals, percentages, ratios, algebraic expressions, equations and formulas, coordinates and midpoints, various shapes and angles, calculation of area and perimeter, data collection, averages and range, data presentation, and an introduction to the concept of probability. |
| Progressing to the Foundation | This section covers various mathematical concepts such as factors, multiples, prime numbers, rounding and estimation, fractions and mixed numbers, proportionality, indices, algebraic expressions, equations, formulas, inequalities, linear sequences, graph analysis, shapes and angles, transformations, area and volume calculations, complex measures, circle properties, data interpretation, and probability. |
| Advancing to Higher Tier | This module covers various mathematical concepts, including percentages, indices, and standard form; complex algebraic expressions, equations, formulae, and inequalities; non-linear sequences; in-depth analysis of graphs and functions; construction and loci, circles, cylinders, cones, spheres, similarity and congruence, Pythagoras’ theorem, trigonometry, vectors, bias and sampling techniques, grouped frequency tables, and probability concepts. |
| Mastering the Higher Tier | This segment encompasses a broad spectrum of subjects, such as decimals and their positional values, operations involving roots, sophisticated algebraic expressions, quadratic equations and inequalities, quadratic and other non-linear sequences, in-depth examination of graphs and functions, circle theorems, analysis of similar shapes, transformations, Pythagoras theorem and trigonometry, vectors, comprehension of inter-quartile range, histograms, and probability. |
| Exam Preparation | This module is designed to equip students with the necessary skills and knowledge to excel in examinations. It offers a wide range of exam papers for practice and covers both Foundation and Higher Tier levels. |
How to Apply?
- You Apply
Provide a little introduction about yourself, and we will assist you with the remaining tasks. The utilisation of our online application tool is straightforward and requires only 10 minutes to complete.
- We Connect
After you submit your application, an admissions representative will contact you and will help you to complete the process.
- You Get Ready
Once you’ve completed your application and connected with an admissions representative, you’re ready to create your schedule.