Perimeter - Fifth Grade
Complete Notes & Formulas
What is Perimeter?
Perimeter is the total distance around the outside of a shape. It is the length of the boundary or outline of any closed shape.
Perimeter = Sum of All Side Lengths
P = side₁ + side₂ + side₃ + ...
Key Points About Perimeter
1. Perimeter is a LENGTH
Measured in linear units: cm, m, ft, in, etc.
2. Add ALL sides
Include every side of the shape
3. Works for ANY polygon
Triangles, squares, rectangles, pentagons, etc.
4. Think of it as walking around
If you walk around the outside, perimeter is the total distance traveled
Common Shape Formulas
| Shape | Perimeter Formula |
|---|---|
| Square | P = 4 × side or P = 4s |
| Rectangle | P = 2 × (length + width) or P = 2l + 2w |
| Triangle | P = side₁ + side₂ + side₃ |
| Any Polygon | P = sum of all sides |
1. Perimeter with Whole Number Side Lengths
What are Whole Numbers?
Whole numbers are numbers without fractions or decimals: 0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10...
How to Find Perimeter
Step 1: Identify all the side lengths
Step 2: Add all the side lengths together
Step 3: Write the answer with the correct unit
Example 1: Square
Problem: Find the perimeter of a square with side length 7 cm.
Method 1 (Add all sides):
P = 7 + 7 + 7 + 7 = 28 cm
Method 2 (Use formula):
P = 4 × side
P = 4 × 7 = 28 cm
Answer: 28 cm
Example 2: Rectangle
Problem: Find the perimeter of a rectangle with length 12 m and width 8 m.
Method 1 (Add all sides):
P = 12 + 8 + 12 + 8 = 40 m
Method 2 (Use formula):
P = 2(l + w)
P = 2(12 + 8)
P = 2(20) = 40 m
Answer: 40 m
Example 3: Triangle
Problem: Find the perimeter of a triangle with sides 5 in, 6 in, and 7 in.
P = side₁ + side₂ + side₃
P = 5 + 6 + 7 = 18 in
Answer: 18 inches
Example 4: Irregular Polygon
Problem: Find the perimeter of a pentagon with sides: 3 ft, 5 ft, 4 ft, 6 ft, 5 ft.
P = 3 + 5 + 4 + 6 + 5 = 23 ft
Answer: 23 feet
Tip: With whole numbers, simply add them up! No need for complicated calculations.
2. Perimeter with Decimal Side Lengths
What are Decimals?
Decimals are numbers that include a decimal point: 2.5, 3.75, 10.8, etc.
How to Add Decimals for Perimeter
Step 1: Line up the decimal points vertically
Step 2: Add zeros if needed to make same number of decimal places
Step 3: Add like regular numbers
Step 4: Keep the decimal point in the answer
Example 1: Square with Decimals
Problem: Find the perimeter of a square with side length 4.5 cm.
Method 1: P = 4 × side
P = 4 × 4.5 = 18.0 cm
Method 2: P = 4.5 + 4.5 + 4.5 + 4.5
4.5
4.5
4.5
+ 4.5
-----
18.0 cm
Answer: 18 cm (or 18.0 cm)
Example 2: Rectangle with Decimals
Problem: Find the perimeter of a rectangle with length 16.2 m and width 9.4 m.
Method 1: Add all sides
P = 16.2 + 9.4 + 16.2 + 9.4
16.2
9.4
16.2
+ 9.4
------
51.2 m
Method 2: Use formula
P = 2(l + w)
P = 2(16.2 + 9.4)
P = 2(25.6) = 51.2 m
Answer: 51.2 m
Example 3: Triangle with Decimals
Problem: Find the perimeter of a triangle with sides 3.5 cm, 4.2 cm, and 5.8 cm.
P = 3.5 + 4.2 + 5.8
3.5
4.2
+5.8
----
13.5 cm
Answer: 13.5 cm
Important Rule for Decimals:
Always line up the decimal points!
3. Perimeter with Fractional Side Lengths
What are Fractions?
Fractions represent parts of a whole: 1/2, 3/4, 2/3, 5/8, etc.
How to Add Fractions for Perimeter
Step 1: Find a common denominator (if needed)
Step 2: Convert fractions to equivalent fractions with same denominator
Step 3: Add the numerators, keep the denominator
Step 4: Simplify if possible
Step 5: Convert improper fractions to mixed numbers
Example 1: Square with Fractions
Problem: Find the perimeter of a square with side length 3/4 inch.
P = 4 × side
P = 4 × 3/4
P = 12/4 = 3 inches
Or add all sides:
P = 3/4 + 3/4 + 3/4 + 3/4
P = (3 + 3 + 3 + 3)/4 = 12/4 = 3 inches
Answer: 3 inches
Example 2: Rectangle with Fractions
Problem: Find the perimeter of a rectangle with length 2 1/2 ft and width 1 3/4 ft.
Step 1: Convert to improper fractions
Length = 2 1/2 = 5/2
Width = 1 3/4 = 7/4
Step 2: Add all sides
P = 5/2 + 7/4 + 5/2 + 7/4
Step 3: Find common denominator (4)
P = 10/4 + 7/4 + 10/4 + 7/4
P = 34/4 = 8 2/4 = 8 1/2 ft
Answer: 8 1/2 feet
Example 3: Triangle with Fractions
Problem: Find the perimeter of a triangle with sides 1/2 m, 3/4 m, and 5/8 m.
Step 1: Find common denominator (8)
1/2 = 4/8
3/4 = 6/8
5/8 = 5/8
Step 2: Add the fractions
P = 4/8 + 6/8 + 5/8
P = 15/8 = 1 7/8 m
Answer: 1 7/8 meters
Quick Fraction Addition Review
Same Denominator:
1/4 + 2/4 = 3/4
(Add numerators, keep denominator)
Different Denominators:
1/2 + 1/4 = 2/4 + 1/4 = 3/4
(Find common denominator first)
4. Perimeter of Figures on Grids
What is a Grid?
A grid is made up of squares. Each square has the same size (like graph paper). The perimeter is found by counting the unit lengths around the outside of the shape.
Steps to Find Perimeter on a Grid
Step 1: Check the scale of the grid
Example: Each square = 1 cm, 1 m, 1 unit, etc.
Step 2: Count the unit lengths around the OUTSIDE of the shape
Count the edges (lines), NOT the squares!
Step 3: Start at one corner and go around clockwise or counterclockwise
Mark each edge as you count to avoid counting twice
Step 4: Write your answer with the correct unit
Example 1: Rectangle on Grid
Problem: Find the perimeter of a rectangle on a 1 cm grid.
The rectangle is 4 squares long and 3 squares wide.
Visual:
□ □ □ □ (top = 4 units)
□ □ □ □ (middle)
□ □ □ □ (bottom = 4 units)
(left = 3) (right = 3)
Method 1: Count around
Top: 4 units
Right: 3 units
Bottom: 4 units
Left: 3 units
Total: 4 + 3 + 4 + 3 = 14 units
Method 2: Use formula
P = 2(l + w) = 2(4 + 3) = 2(7) = 14 units
Answer: 14 cm (since each unit = 1 cm)
Example 2: L-Shaped Figure on Grid
Problem: Find the perimeter of an L-shaped figure on a 1 meter grid.
Visual:
□ □ □
□ □ □
□
Count the edges around the outside:
Start at top-left corner, go clockwise:
3 → 2 → 2 → 1 → 1 → 3 = 12 units
Answer: 12 meters
Example 3: Irregular Shape on Grid
Problem: Find the perimeter of this shape on a grid (each square = 1 unit).
Visual:
□ □
□ □ □
□
Count carefully around all edges:
Total edges counted: 14 units
Answer: 14 units
Important Tips for Grid Counting
✓ Count LINES (edges), not squares
✓ Mark edges as you count (to avoid double counting)
✓ Always check the grid scale (1 cm, 1 m, etc.)
✓ Only count the OUTSIDE edges
✓ Start at a corner and go all the way around
Quick Reference: Perimeter Formulas
| Shape | Formula | Example |
|---|---|---|
| Square | P = 4s | s=5 → P=20 |
| Rectangle | P = 2(l + w) | l=6, w=4 → P=20 |
| Triangle | P = a + b + c | 3+4+5 → P=12 |
| Any Polygon | P = sum of all sides | Add them all! |
💡 Important Tips to Remember
✓ Perimeter = Distance around the outside
✓ Always use same units for all measurements
✓ For whole numbers: Just add them up!
✓ For decimals: Line up decimal points before adding
✓ For fractions: Find common denominator first
✓ On grids: Count the edges (lines), not squares
✓ Perimeter is measured in linear units (cm, m, ft, in)
✓ Square: All 4 sides equal, so multiply by 4
✓ Rectangle: Opposite sides equal, use 2(l+w)
✓ Always include the unit in your answer!
🧠 Memory Tricks
Perimeter:
"Peri-meter = Peri-meter around the shape"
Think of the periphery (outside edge)
Square Formula:
"A square has 4 equal sides, so multiply by 4"
Rectangle Formula:
"2 lengths + 2 widths = 2(l + w)"
Decimals:
"Line up the dots (decimal points)!"
Fractions:
"Common denominator = Common ground for adding"
Grid Counting:
"Count the lines, not the squares!"
"Mark as you count, so you don't lose count!"
Master Perimeter! 📏📐
Perimeter is all around us - practice finding the distance around shapes!