Vertical Line Definition
We define a vertical line as a line in which all points have the same x-coordinate. In other words, a line that is perpendicular to the x-axis and parallel to the y-axis is called Vertical Line.
In real life, we observe various examples of vertical lines such as a long tower, the legs of a table and a chair, a long tree, etc. The slope of the vertical line is undefined as it makes a 90° angle with the x-axis. The vertical line goes from top to bottom in the Cartesian plane.
The image added below shows the vertical line,
Vertical Line
Vertical line is a line that is perpendicular to the base of any geometrical object and generally, we state the bottom of the object as a base. In simple words, we define a vertical line as a line that is perpendicular to the horizontal line. In context to the cartesian coordinate system, vertical lines are defined as lines that are parallel to the y-axis or perpendicular to the x-axis. A vertical line always goes from top to bottom and is also called a standing line.
Various examples where we observe vertical lines are the lines joining the base of the rectangle, square, etc. The vertical lines are very useful for solving and explaining various geometrical problems. This article explores the topic of Vertical Lines including its subtopics like its definition, diagram, relation with other lines, etc. So, let’s learn about the vertical lines in detail in this article.
Table of Content
- Vertical Line Definition
- Vertical Line on Coordinate Plane
- Equation of Vertical Line
- Example of Vertical Lines
- Slope of Vertical Line
- Properties of Vertical Lines
- Difference between Horizontal Line and Vertical Line
- Vertical Line Test
- Vertical Line of Symmetry
- Vertical Line Summary
- Vertical Line Examples
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