Practice Problems on Area of Quadrant
Problem 1: Given a circle shaped rope with a radius of 8 meters, find the area of quadrant.
Problem 2: If the circumference of the circle is 10 units. Calculate its area of quadrant.
Problem 3: Calculate the area of quadrant area of a sector of a circle with a central angle of 45 degrees and a radius of 6 inches.
Problem 4: Calculate the area of quadrant by using the area of sector of a circle that subtends 50° angle at the center, and its radius is 12 cm.
Problem 5: If the plate is in a circular shape and its diameter is 5 units. Calculate the area of quadrant?
Area of a Quadrant
Area of a Quadrant is defined as the one-fourth space of a circle as a Quadrant is the one-fourth part of a circle. A circle is defined as the locus of a considerable number of focuses that are equidistant from the inside of the circle. When a circle is partitioned equally by drawing two perpendicular diameters, it results in making four parts of a circle. Each Part of a circle is called a Quadrant. The Areas of all four quadrants of a circle are equal, and the sum of the areas of the four quadrants is again equal to the area of the circle.
In this article, we will learn what is a Quadrant, what is an Area of Quadrant, Area of Quadrant Formula, and solve some problems based on it. So Let’s start learning about quadrants with a clear definition of the Area of Quadrant fundamental concept in mathematics.
Table of Content
- What is Quadrant of a Circle?
- Area of Quadrant Formula
- How to Find the Area of Quadrant?
- Solved Examples
- Practice Problems