Perimeter and Area of Polygons
Selected Reading
- Finding the perimeter or area of a rectangle in the coordinate plane
- Area of a trapezoid
- Area of a parallelogram
- Area involving rectangles and triangles
- Finding the area of a trapezoid on a grid by using triangles and rectangles
- Area of a triangle
- Finding the area of a right triangle or its corresponding rectangle
- Finding the area of a right triangle on a grid
- Area between two rectangles
- Area of a piecewise rectangular figure
- Finding the side length of a rectangle given its perimeter or area
- Word problem involving the area of a square or a rectangle
- Areas of rectangles with the same perimeter
- Distinguishing between the area and perimeter of a rectangle
- Area of a rectangle involving fractions
- Perimeter of a piecewise rectangular figure
- Finding the missing length in a figure
- Sides of polygons having the same perimeter
- Home
Selected Reading
- Who is Who
- Computer Glossary
- HR Interview Questions
- Effective Resume Writing
- Questions and Answers
- UPSC IAS Exams Notes
Area of a piecewise rectangular figure
Area of a piecewise rectangular figure
In this lesson we find the area of given piecewise rectangular figures. The figures are broken down into two or more rectangles and their areas are found. The sum of the areas of these rectangles gives the area of the piecewise rectangular figure.
Consider the following piecewise rectangular figure. We have to find its area.
This figure can be considered as being made of two rectangles of dimensions 7 × 2 and 3 × 3 or 5 × 3 and 4 × 2
Finding the areas of the set of two rectangles gives the area of the piecewise rectangular figure.
Area = 7 × 2 + 3 × 3 14 + 9 = 23 square units
Area = 5 × 3 + 4 × 2 = 15 + 8 = 23 square units
Find the area of piecewise rectangular figure given below.
Solution
Step 1:
Area of a rectangle = l × w; l = length; w = width
Step 2:
Area of 2 piecewise rectangles = 3 × 3 + 7 × 2 = 23 square units
Find the area of piecewise rectangular figure given below.
Solution
Step 1:
Area of a rectangle = l × w; l = length; w = width
Step 2:
Area of 2 piecewise rectangles = 4 × 9 + 10 × 4 = 76 square units