Worked Example 1: Elimination
Part of Simultaneous Equations · GCSE GCSE Mathematics revision
This study notes covers Worked Example 1: Elimination within Simultaneous Equations for GCSE Mathematics. Revise Simultaneous Equations in Algebra for GCSE Mathematics with 15 exam-style questions and 12 flashcards. This is a high-frequency topic, so it is worth revising until the explanation feels precise and repeatable. It is section 5 of 8 in this topic. Use this study notes to connect the idea to the wider topic before moving on to questions and flashcards.
Topic position
Section 5 of 8
Practice
15 questions
Recall
12 flashcards
Worked Example 1: Elimination
Solve: 3x + 2y = 19 and x + 2y = 13
Step 1 Label equations
3x + 2y = 19 ... (1)
x + 2y = 13 ... (2)
Step 2 Subtract to eliminate y
(1) - (2): 3x - x + 2y - 2y = 19 - 13
2x = 6
x = 3
Step 3 Substitute x = 3 into (2)
3 + 2y = 13
2y = 10
y = 5
Step 4 Check in (1)
3(3) + 2(5) = 9 + 10 = 19 ✓
Keep building this topic
Read this section alongside the surrounding pages in Simultaneous Equations. That gives you the full topic sequence instead of a single isolated revision point.
Practice Questions for Simultaneous Equations
Which method is most efficient for solving the following simultaneous equations? 5x + 2y = 14 3x + 2y = 10
Ali solves the simultaneous equations 5x + y = 17 and x - y = 1 by elimination. Ben says he can also use substitution by rearranging x - y = 1 to get x = y + 1. Explain how elimination works for these two equations and state one advantage of Ben's substitution approach.
Quick Recall Flashcards
15 questions on Simultaneous Equations — practise free
Instant marking, adaptive difficulty, and 12 spaced repetition flashcards. Free until your GCSEs.
Try PrepWise Free