Mathematics becomes an exciting adventure with the Essential Algebra Course, designed to elevate your understanding of algebra from the basics to advanced concepts! This comprehensive program covers everything from the fundamental principles of algebra to intricate topics like quadratic equations and polynomials. Each section builds seamlessly upon the last, ensuring a smooth progression through essential algebraic theories. With engaging modules, you’ll delve into core concepts such as algebraic expressions, linear equations, and the BODMAS rule, while practicing with varied problem sets that enhance your skills. The Essential Algebra Course provides a rich curriculum that deepens your knowledge of algebraic identities and factorization techniques. Whether you’re tackling simultaneous linear equations or mastering indices, this course offers a solid foundation necessary to excel in your academic journey. Experience a structured approach that introduces theoretical knowledge while instilling confidence in applying algebra in various scenarios. Join countless learners who have successfully navigated their way through mathematics by enrolling in the Essential Algebra Course today!
Learning Outcomes
After studying the course materials of the Essential Algebra Course there will be a written assignment test which you can take either during or at the end of the course. After successfully passing the test you will be able to claim the pdf certificate for £4.99. Original Hard Copy certificates need to be ordered at an additional cost of £8.
This Essential Algebra Course does not require you to have any prior qualifications or experience. You can just enrol and start learning.This Essential Algebra Course was made by professionals and it is compatible with all PC’s, Mac’s, tablets and smartphones. You will be able to access the course from anywhere at any time as long as you have a good enough internet connection.
Section 01: Introduction | |||
Module 01: Promotional Video | 00:02:00 | ||
Module 02: Quick guide | 00:01:00 | ||
Section 02: Fundamental Concepts of Algebra | |||
Module 01: What is Algebra? | 00:04:00 | ||
Module 02: Constructing Algebraic Expressions | 00:06:00 | ||
Section 03: Revision Section 0on Integers | |||
Module 01: Negative numbers and operations on Integers | 00:14:00 | ||
Section 04: Rules of Ordering- BODMAS | |||
Module 01: BODMAS Rule – Basics | 00:11:00 | ||
Module 02: Practice Problems BODMAS Part 1 | 00:10:00 | ||
Module 03: Practice Problems BODMAS Part 2 | 00:08:00 | ||
Section 05: A complete Section on Indices (Exponent) | |||
Module 01: The Laws of Indices | 00:11:00 | ||
Module 02: Application of Indices Part 1 | 00:10:00 | ||
Module 03: Application of Indices Part 2 | 00:08:00 | ||
Module 04: Fractional Indices | 00:12:00 | ||
Module 05: Practice Problems | 00:09:00 | ||
Module 06: Problems from IGCSE Last year’s papers | 00:06:00 | ||
Section 06: Algebraic Expressions | |||
Module 01: Algebraic Expressions | 00:08:00 | ||
Module 02: Terms, Coefficients, Degree, Like and Unlike Expressions | 00:13:00 | ||
Module 03: Arrangements of the Terms | 00:09:00 | ||
Module 04: Distributive Property in Algebraic expressions | 00:08:00 | ||
Module 05: Addition of Algebraic expressions | 00:13:00 | ||
Module 06: Subtraction of Algebraic expressions | 00:12:00 | ||
Section 07: Brackets in Algebra | |||
Module 01: Rules of brackets | 00:12:00 | ||
Module 02: Simplification by removing brackets | 00:11:00 | ||
Section 08: Multiplication and division of Algebraic expressions | |||
Module 01: Multiplication of Algebraic Expressions Part 1 | 00:05:00 | ||
Module 02: Multiplication of Algebraic Expressions Part 2 | 00:07:00 | ||
Module 03: Multiplication of Algebraic Expressions Part 3 | 00:06:00 | ||
Module 04: Division of Algebraic expressions Part 1 | 00:11:00 | ||
Module 05: Division of Algebraic expressions Part 2 | 00:10:00 | ||
Module 06: Division of Algebraic expressions Part 3 | 00:07:00 | ||
Section 09: Linear Equations in one variable | |||
Module 01: Simple Equations | 00:08:00 | ||
Module 02: Solving an Equation Part 1 | 00:10:00 | ||
Module 03: Solving an Equation Part 2 | 00:07:00 | ||
Module 04: Practice Problems | 00:10:00 | ||
Module 05: Word Problems based on Linear equations 1 | 00:13:00 | ||
Module 06: Word Problems based on Linear equations 2 | 00:09:00 | ||
Section 10: Linear Inequalities | |||
Module 01: Linear Inequalities | 00:09:00 | ||
Module 02: How to plot inequalities on a number line | 00:07:00 | ||
Module 03: Solving Linear Inequalities Part 1 | 00:10:00 | ||
Module 04: Solving Linear Inequalities Part 2 | 00:06:00 | ||
Section 11: Formula: change of subject of a formula | |||
Module 01: Changing Subject of a Formula Part 1 | 00:06:00 | ||
Module 02: Changing Subject of a Formula Part 2 | 00:06:00 | ||
Module 03: Evaluate and write formulae of word problems | 00:09:00 | ||
Module 04: Substitutions in given Formulae Part 1 | 00:06:00 | ||
Module 05: Substitutions in given Formulae Part 2 | 00:08:00 | ||
Module 06: Substitutions in given Formulae Part 3 | 00:06:00 | ||
Section 12: Algebraic Identities | |||
Module 01: What are Identities? | 00:06:00 | ||
Module 02: Identity 1 (a + b) ²=a²+2ab+b² | 00:13:00 | ||
Module 03: Identity 2 (a – b) ²=a²-2ab+b² | 00:08:00 | ||
Module 04: Identity 3 a² – b² = (a-b) (a +b) | 00:07:00 | ||
Module 05: Identity 4 (x+ a) (x+ b) =x²+ (a+ b) x+ ab | 00:09:00 | ||
Module 06: Pascal’s Triangle | 00:06:00 | ||
Module 07: Identity 5 (a+ b) ³=a ³ + 3a²b+3ab²+b ³ | 00:13:00 | ||
Section 13: Factorisation | |||
Module 01: Factorisation by method of common factor | 00:13:00 | ||
Module 02: Factorisation by regrouping the terms | 00:10:00 | ||
Module 03: Factorisation by difference of two squares | 00:10:00 | ||
Module 04: Factorisation using identity (a + b) ² and (a – b) ² | 00:13:00 | ||
Module 05: Factorisation using identity (a + b + c) ² | 00:05:00 | ||
Module 06: Factorisation by middle term split Part 1 | 00:12:00 | ||
Module 07: Factorisation by middle term split Part 2 | 00:09:00 | ||
Section 14: How to draw a Line graph? | |||
Module 01: Cartesian Coordinate system Part 1 | 00:10:00 | ||
Module 02: Cartesian Coordinate system Part 2 | 00:09:00 | ||
Module 03: Some Important facts | 00:08:00 | ||
Module 04: Drawing Line Graph | 00:07:00 | ||
Section 15: Simultaneous Linear Equations | |||
Module 01: Simultaneous Linear Equations | 00:07:00 | ||
Module 02: Graphical Method | 00:06:00 | ||
Module 03: Graphical method Continues…. | 00:11:00 | ||
Module 04: Elimination by substitution Method | 00:09:00 | ||
Module 05: Equating the coefficients Method | 00:11:00 | ||
Module 06: Cross Multiplication | 00:10:00 | ||
Module 07: Equations Reducible to Linear Equations-1 | 00:08:00 | ||
Module 08: Equations Reducible to Linear Equations-2 | 00:14:00 | ||
Module 09: Linear equations Conditions | 00:05:00 | ||
Module 10: Problems Based on Conditions | 00:08:00 | ||
Section 16: Polynomials | |||
Module 01: Polynomials and Zeros of Polynomials | 00:10:00 | ||
Module 02: Remainder Theorem | 00:05:00 | ||
Module 03: Factor Theorem | 00:10:00 | ||
Module 04: Practice problems on Remainder and Factor Theorem | 00:09:00 | ||
Module 05: Factorisation using Factor Theorem | 00:10:00 | ||
Module 06: Zeros of polynomials α, β & γ | 00:10:00 | ||
Module 07: Relation between zeros and coefficients of a polynomials | 00:13:00 | ||
Module 08: Writing polynomials if zeros are given | 00:06:00 | ||
Module 09: Practice problems on zeros of polynomials | 00:10:00 | ||
Module 10: Problems solving with α and β (part 1) | 00:11:00 | ||
Module 11: Problems solving with α and β (part 2) | 00:11:00 | ||
Section 17: Quadratic Equations | |||
Module 01: Introduction to Quadratic Equations | 00:05:00 | ||
Module 02: Solving Quadratic Equations by Factorisation method | 00:09:00 | ||
Module 03: Writing in completed square form | 00:07:00 | ||
Module 04: Solving by completing the square method | 00:10:00 | ||
Module 05: Sketching of Quadratic Graphs by completing the square method | 00:12:00 | ||
Module 06: Quadratic graphs using Transformations | 00:06:00 | ||
Module 07: Solving Quadratic inequalities by graphical method (vertex) | 00:13:00 | ||
Module 08: Deriving Quadratic formula | 00:05:00 | ||
Module 09: Solving problems using Quadratic formula | 00:06:00 | ||
Module 10: Nature of roots 1 | 00:04:00 | ||
Module 11: Nature of roots 2 | 00:12:00 |
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