Practice Problems on Perpendicular Bisector
Q1. Draw a 5 cm line and construct a perpendicular bisector on it.
Q2. Draw a 9 cm line and construct a perpendicular bisector on it.
Q3. Draw an equilateral triangle and draw perpendicular bisector for the sides of triangle.
Q4. Draw a line segment of 10 cm and construct a perpendicular bisector on on it.
Q5. Draw a line segment of 6 cm and construct a perpendicular bisector on on it.
Perpendicular Bisector
Perpendicular Bisectors are the lines that bisect the other line at right angles. Perpendicular bisectors are a fundamental building block in Euclidean geometry. The perpendicular bisector divides a line into two halves and is equidistant from the endpoints. The concept of a perpendicular bisector is fundamental for constructing various geometric shapes and solving problems involving lines and segments. Perpendicular bisectors are often represented as a dashed line with a right angle symbol to indicate their perpendicular nature.
In this article, we will discuss what is perpendicular bisector, the equation for a perpendicular bisector, the construction of a perpendicular bisector, and the perpendicular bisector theorem in detail.
Table of Content
- What is a Perpendicular Bisector?
- Equation for a Perpendicular Bisector
- How to Draw a Perpendicular Bisector?
- Perpendicular Bisector Theorem
- Construction of a Perpendicular Bisector
- Perpendicular bisector in a Triangle