A step – by – Step Approaches to Solve Simultaneous Equations
This course offers an in-depth study of simultaneous equations, providing learners with the essential tools and techniques to solve systems involving two or three unknowns. It begins by reinforcing foundational algebraic skills through the application of substitution and elimination methods to solve linear simultaneous equations. Students will first master these techniques in the context of two-variable systems and gradually progress to solving more complex systems involving three unknown variables.
What you’ll learn
- Students will learn how to use Elimination method to Solve two unknown variables Simultaneous Equation.
- Students will learn how to use Substitution Method to Solve two unknown variables Simultaneous Equation.
- Students will learn how to use Elimination Method to Solve three unknown variables Simultaneous Equation.
- Students will learn how to solve the simultaneous equation whose equation is quadratic equation method.
- Students will learn how to solve the simultaneous equation whose equation is product equation method.
Course Content
- Introduction –> 1 lecture • 2min.
- Solving two unknown Simultaneous Equation by Elimination Method –> 1 lecture • 7min.
- Solving two unknown Simultaneous Equation by Substitution Method –> 1 lecture • 5min.
- Using Quadratic method to Solve Simultaneous Equation of two unknown variables –> 1 lecture • 9min.
- Using product method to Solve Simultaneous Equation of two unknown variables –> 1 lecture • 8min.
- Simultaneous Equation of three unknown variables by using Elimination Method –> 1 lecture • 9min.
Requirements
This course offers an in-depth study of simultaneous equations, providing learners with the essential tools and techniques to solve systems involving two or three unknowns. It begins by reinforcing foundational algebraic skills through the application of substitution and elimination methods to solve linear simultaneous equations. Students will first master these techniques in the context of two-variable systems and gradually progress to solving more complex systems involving three unknown variables.
As learners gain confidence in linear systems, the course introduces non-linear simultaneous equations, specifically focusing on quadratic and product equations. These advanced topics enable students to tackle a broader range of real-world problems and enhance their mathematical versatility. Emphasis is placed on recognizing the structure and type of equations in order to select the most appropriate solving method.
A combination of step-by-step examples, guided practice, and real-life application scenarios will help learners develop a deep understanding of both the techniques and the underlying mathematical principles. By the end of the course, students will be able to analyze systems of equations, choose suitable strategies, and solve them accurately and efficiently.
This course builds a strong algebraic foundation, which is critical for further studies in mathematics and allied fields such as engineering, physics, computer science, and economics. Whether preparing for advanced coursework or seeking to strengthen analytical problem-solving skills, students will find this course both practical and empowering.