Class 9 Linear Equations In Two Variables Elimination Method

Solving Linear Equations In Two Variables By Elimination Method.

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₹149

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  • 3 Students Enrolled

  • Created by: Rajendra Khandekar

  • Last updated: 2023-02-04 18:50:09

  • English

 What is an Equation

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 Content of Simultaneous Equation

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 How elimination method is used to solve simultaneous equation

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 Master Problem 1

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 Master Problem 2

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 Master Problem 3

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 Master Problem 1

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 Master Problem 2

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 Word Problem 1

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 Word Problem 2

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 Word Problem 3

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 Word Problem 4

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 Word Problem 5

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Description

Linear Equations in Two Variables Elimination Method is a comprehensive course that focuses on the solution of linear equations using the elimination method. This method involves adding or subtracting equations to eliminate one of the variables and find the solution for the other. The course is designed for students who want to master the technique and understand the underlying concepts behind this powerful mathematical tool.

Throughout the course, students will learn to identify and apply the elimination method to real-world problems, and develop their skills in working with linear equations in two variables. Topics covered include:

  1. The basics of linear equations and the elimination method
  2. Solving linear equations using elimination and substitution methods
  3. Understanding the steps involved in solving linear equations with elimination method
  4. Applying elimination method to solve systems of linear equations
  5. Graphing and interpreting the solutions of linear equations

By the end of the course, students will have a solid understanding of the elimination method and its applications, and will be able to use it to solve real-world problems with confidence. This course is ideal for students studying mathematics at the high school or college level, and will provide a strong foundation for further study in related areas.


Who is this Course for?

Beginner


What Student Will Learn

Upon completion of the Linear Equations in Two Variables Elimination Method course, students will:

  1. Understand the basics of linear equations and the elimination method.
  2. Be able to solve linear equations using both elimination and substitution methods.
  3. Be able to identify and apply the elimination method to real-world problems.
  4. Have a solid understanding of the steps involved in solving linear equations with the elimination method.
  5. Be able to graph and interpret the solutions of linear equations.
  6. Have developed a strong foundation for further study in related areas.

By mastering the elimination method, students will be equipped with a powerful tool for solving real-world problems and advancing their careers in mathematics and related fields. Whether for personal or professional purposes, this course will provide a valuable addition to students' skills and knowledge.


Requirement of the Course

The requirements for enrolling in the Linear Equations in Two Variables Elimination Method course may vary depending on the institution offering the course. However, here are some common requirements that students should meet to enroll in this course:

  1. A strong foundation in algebra: Students should have a solid understanding of algebraic concepts, including solving linear equations and graphing linear functions..
  2. A high school diploma or equivalent: Most institutions require students to have completed high school or equivalent education before enrolling in this course.
  3. Basic knowledge of mathematical functions and their properties: Students should have a basic understanding of mathematical functions, including linear, quadratic, and exponential functions..
  4. Basic computer skills: Students should have basic computer skills, including proficiency in using a word processing program and spreadsheet software.
  5. Access to a computer with an internet connection: Students will need access to a computer with an internet connection to participate in online course materials and assessments.

Please note that these are general requirements and may vary depending on the specific institution offering the course. Students should check with the institution for specific requirements and recommendations.


Rajendra Khandekar

With 40 years of experience in the field of education, Rajendra Khandekar has trained over 25,000 students, making a lasting impact on their lives and careers. Specializing in Mathematics and Science, Rajendra Khandekar has a proven track record of success, having helped countless students achieve academic excellence and reach their full potential. Rajendra's expertise and dedication to teaching have made them one of the most sought-after educators in their field, with a reputation for delivering engaging and effective lessons that leave a lasting impression on students. Whether in the classroom, as a mentor, or through innovative teaching methods, Mr. Rajendra Khandekar has dedicated their career to improving the lives and futures of their students, and the results speak for themselves.

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