Parallel Lines

In this section, we will learn about parallel lines, how they relate to slope, and how to spot them on a graph. Understanding parallel lines is important in co-ordinate geometry, and we'll break it down step by step.

What Are Parallel Lines?

Parallel lines are lines that never meet or cross, no matter how far you extend them. Imagine two straight train tracks that run side by side—they don't get closer or farther apart as you follow them. That's exactly what parallel lines do on a graph.

So, the key points are:

• Parallel lines never cross each other.
• They always stay the same distance apart.

Parallel Lines and Slope

To understand why parallel lines never meet, we need to talk about slope. The slope of a line tells us how steep the line is—whether it rises or falls as you move along it.

Here's the important rule to remember:

• Parallel lines have the same slope. This means that if two lines are parallel, they tilt the same way—they rise and fall at the same rate. However, they start from different points on the graph.

If you see two lines with the same slope but different $y-intercepts$ (starting points on the $y-axis$), those lines are parallel.

How to Spot Parallel Lines on a Graph

There are two main ways to recognise parallel lines:

1. Check the Slopes:

• If you know the equations of the lines, you can calculate their slopes. If the slopes are the same, the lines are parallel.

2. Look at the Graph:

• If you have a graph, look at the direction the lines are moving. Do they go in the same direction and never touch? If they do, then they are parallel.

Key Points to Remember

• Same Slope: Parallel lines always have the same slope. If the slopes of two lines are equal, and their y-intercepts are different, those lines are parallel.
• Never Cross: On a graph, parallel lines never meet. They stay the same distance apart.
• Visual Cues: When looking at a graph, think of parallel lines as train tracks—always side by side, never crossing.