Perimeter and Area

1. Perimeter — The Distance Around

The PERIMETER of a closed shape is the TOTAL LENGTH of its boundary.

'Think of perimeter as WALKING around the edge of a shape. The distance you walk is the perimeter.'

Perimeter of a Square

A square has FOUR equal sides.

Perimeter = 4 × side

SidePerimeter (4 × side)
5 cm20 cm
12 m48 m
8.5 cm34 cm
25 mm100 mm

Perimeter of a Rectangle

A rectangle has TWO pairs of equal sides (length and breadth).

Perimeter = 2 × (length + breadth) = 2(l + b)

Example: length = 8 cm, breadth = 5 cm P = 2 × (8 + 5) = 2 × 13 = 26 cm

LengthBreadthPerimeter 2(l + b)
10 cm6 cm32 cm
15 m12 m54 m
7.5 cm4.5 cm24 cm

'To find the perimeter of a rectangle, add the length and breadth first, then DOUBLE the result. Do NOT double each side separately and then add.'

Perimeter of a Triangle

Perimeter = side₁ + side₂ + side₃

TriangleSidesPerimeter
Equilateral (all equal)6 cm each18 cm
Isosceles (2 equal)5 cm, 5 cm, 8 cm18 cm
Scalene (all different)4 cm, 7 cm, 9 cm20 cm

Finding a Missing Side

If perimeter and other sides are given, subtract the known sides from the perimeter.

A rectangle has perimeter 30 cm and length 10 cm. Find breadth.

30 = 2 × (10 + b) 15 = 10 + b b = 5 cm

'Working BACKWARDS from the perimeter to find a missing side is an important skill. Use the INVERSE operation.'

2. Area — The Space Inside

The AREA of a shape is the TOTAL SPACE enclosed within its boundary.

'Area is measured in SQUARE units. Imagine covering a table with square tiles — the number of tiles is the area.'

Area of a Square

Area = side × side = s²

SideArea
4 cm16 cm²
10 m100 m²
6.5 cm42.25 cm²

Area of a Rectangle

Area = length × breadth = l × b

Example: length = 8 cm, breadth = 5 cm A = 8 × 5 = 40 cm²

LengthBreadthArea
12 cm7 cm84 cm²
15 m10 m150 m²
6.5 cm4 cm26 cm²

'Area is written as SQUARE units — cm², m², km². The small ² means 'squared' — it is NOT the same as centimetres multiplied by 2.'

Area of Irregular Shapes

Count the number of FULL squares inside the shape. If more than half a square is covered, count it as ONE. If less than half, IGNORE it.

'For irregular shapes drawn on a grid, this counting method gives a REASONABLE estimate of the area.'

3. Difference Between Perimeter and Area

PerimeterArea
Distance AROUND the shapeSpace INSIDE the shape
One-dimensional (length)Two-dimensional (length × width)
Measured in m, cm, mmMeasured in m², cm², mm²
Formula: add all sidesFormula: multiply sides
Example: Fencing a gardenExample: Carpeting a room

'Perimeter is a LENGTH. Area is a SURFACE. They are DIFFERENT concepts — a small shape can have a large perimeter, and a large shape can have a small area.'

4. Word Problems

Example 1: Fencing

A rectangular garden is 25 m long and 15 m wide. What length of wire is needed to fence it?

Perimeter = 2 × (25 + 15) = 2 × 40 = 80 m.

Wire needed = 80 m.

Example 2: Tiling

A room is 6 m long and 4 m wide. How many square tiles of side 1 m are needed?

Area of room = 6 × 4 = 24 m². Area of one tile = 1 × 1 = 1 m². Number of tiles = 24 ÷ 1 = 24 tiles.

Example 3: Cost Calculation

Find the cost of carpeting a rectangular floor 8 m by 5 m at ₹120 per square metre.

Area = 8 × 5 = 40 m². Cost = 40 × 120 = ₹4,800.

ProblemGivenFindOperationAnswer
Fence a square field of side 30 mSide = 30 mPerimeter4 × 30120 m
Tile a floor 10 m × 8 m with 1 m² tilesl = 10 m, b = 8 mNumber of tiles(10 × 8) ÷ 180 tiles
Paint a wall 12 m × 3 m at ₹50/m²l = 12 m, b = 3 m, rate = ₹50/m²Cost of painting12 × 3 × 50₹1,800

'Read the problem carefully. Is it asking for FENCING (perimeter) or CARPETING (area)? Fencing runs around the boundary. Carpeting covers the surface.'

5. Application — Cost and Rate Problems

Formula

Total Cost = Area × Rate per unit area

Example

A rectangular plot is 50 m by 30 m. Find the cost of levelling it at ₹15 per m².

Area = 50 × 30 = 1500 m². Cost = 1500 × 15 = ₹22,500.

Key Facts to Remember

  • Perimeter is a LENGTH — measured in m, cm, mm.
  • Area is a SURFACE — measured in square units (m², cm², mm²).
  • 'A square is a special rectangle. So the rectangle formula works for squares too (l and b would be equal).'
  • Two shapes can have the same perimeter but DIFFERENT areas, and vice versa.
  • Always write the CORRECT unit (m or m²) in the answer.

Common Mistakes

MistakeWhy It Is WrongCorrect Approach
Confusing perimeter and area formulasP = l × b is WRONG — that is areaP = 2(l + b) for rectangle
Forgetting to double in rectangle perimeterP = l + b gives only HALF the distanceP = 2 × (l + b)
Writing cm instead of cm² for areaArea is two-dimensionalArea is in square units: cm²
Adding all sides for rectangle when formula worksYou can add all 4 sides, but 2(l+b) is fasterUse the formula to save time

Exam Focus (ICSE Class 5)

TopicMarks (Typical)Question Type
Perimeter of square and rectangle3-4 marksDirect computation and missing side
Area of square and rectangle3-4 marksDirect computation
Word problems — fencing/carpeting4-5 marksReal-life application with cost
Find missing side given perimeter/area3 marksInverse operations
Compare perimeter and area2 marksTrue/False or fill in blanks

Self-Test: 5 Questions

Q1. Find the perimeter of a rectangle with length 14 cm and breadth 9 cm.

Q2. A square has perimeter 48 m. What is the length of each side?

Q3. A rectangular hall is 12 m long and 8 m wide. Find the cost of tiling it at ₹180 per m².

Q4. A triangle has sides 9 cm, 12 cm, and 15 cm. Find its perimeter.

Q5. The area of a rectangle is 96 cm². If its length is 12 cm, find its breadth and perimeter.

Answers

A1. P = 2 × (14 + 9) = 2 × 23 = 46 cm.

A2. Side = Perimeter ÷ 4 = 48 ÷ 4 = 12 m.

A3. Area = 12 × 8 = 96 m². Cost = 96 × 180 = ₹17,280.

A4. P = 9 + 12 + 15 = 36 cm.

A5. Breadth = Area ÷ Length = 96 ÷ 12 = 8 cm. Perimeter = 2 × (12 + 8) = 2 × 20 = 40 cm.

Verified by the tuition.in editorial team
Written and reviewed by subject-matter experts — read about our process.
Editorial process →
Header Logo