Squares and Cubes – Notes
🔢 1. What are Squares?
A square number is the product of a number multiplied by itself.
👉 Formula:
Square of a number = number × number = n²
✅ Examples:
- 5² = 5 × 5 = 25
- 12² = 144
- 20² = 400
👉 These are called perfect squares.
🔍 2. Properties of Square Numbers
- A square number always ends with: 0, 1, 4, 5, 6, or 9
- It never ends with: 2, 3, 7, or 8
- Number of zeros at the end is always even
- Square of even number → even
- Square of odd number → odd
📊 3. Finding Square Numbers
Method 1: Repeated Addition
👉 Example:
6² = 6 + 6 + 6 + 6 + 6 + 6 = 36
Method 2: Using Formula
👉 n² directly
✍️ 4. Square of Numbers (Shortcut Tricks)
(a + b)² Formula:
👉 (a + b)² = a² + 2ab + b²
Example:
(20 + 3)² =
= 20² + 2×20×3 + 3²
= 400 + 120 + 9 = 529
🔢 5. Square Roots
The square root of a number is the value which when multiplied by itself gives the number.
👉 √25 = 5
👉 √144 = 12
🧮 6. Finding Square Roots
Method 1: Prime Factorization
👉 Example: √36
= 2 × 2 × 3 × 3
= (2×3) = 6
Method 2: Division Method (Long Division)
- Used for large numbers
- Step-by-step grouping of digits
🔷 7. What are Cubes?
A cube number is a number multiplied by itself three times.
👉 Formula:
Cube = n × n × n = n³
✅ Examples:
- 2³ = 8
- 3³ = 27
- 10³ = 1000
🔍 8. Properties of Cube Numbers
- Cube of even number → even
- Cube of odd number → odd
- Cubes can end with any digit (0–9)
- Cubes of negative numbers are negative
🧠 9. Cube Roots
The cube root of a number is the number which when multiplied 3 times gives the original number.
👉 ∛27 = 3
👉 ∛64 = 4
🧮 10. Finding Cube Roots
Method: Prime Factorization
👉 Example: ∛216
= 2 × 2 × 2 × 3 × 3 × 3
= (2 × 3) = 6
📐 11. Patterns in Squares and Cubes
Squares:
- 1² = 1
- 2² = 4
- 3² = 9
- Pattern increases by odd numbers
Cubes:
- 1³ = 1
- 2³ = 8
- 3³ = 27
🌍 12. Uses in Real Life
- Finding area of squares
- Measuring volume of cubes
- Used in engineering and construction
- Helpful in calculations and problem solving
📝 13. Key Points to Remember
- Square = number × number
- Cube = number × number × number
- Use prime factorization for roots
- Learn squares up to 20 for quick solving
- Practice shortcuts for faster calculation
Squares and Cubes – Practice Questions with Answers
🔢 Section A: Squares (1–15)
1. Find 12²
👉 144
2. Find 25²
👉 625
3. Find 30²
👉 900
4. Find 17²
👉 289
5. Find 9²
👉 81
6. Find 50²
👉 2500
7. Find 101²
👉 (100 + 1)² = 10000 + 200 + 1 = 10201
8. Find 99²
👉 (100 − 1)² = 10000 − 200 + 1 = 9801
9. Find 45²
👉 2025
10. Find square of 1.
👉 1
11. Find square of 0.
👉 0
12. Which is a perfect square: 121, 123, 125?
👉 121
13. Find square of 200
👉 40000
14. Find 19²
👉 361
15. Find square of 11
👉 121
🔍 Section B: Square Roots (16–25)
16. √64
👉 8
17. √121
👉 11
18. √225
👉 15
19. √400
👉 20
20. √144
👉 12
21. √169
👉 13
22. √256
👉 16
23. √81
👉 9
24. √1
👉 1
25. √10000
👉 100
🔷 Section C: Cubes (26–35)
26. Find 2³
👉 8
27. Find 5³
👉 125
28. Find 10³
👉 1000
29. Find 4³
👉 64
30. Find 7³
👉 343
31. Find 3³
👉 27
32. Find 6³
👉 216
33. Find 8³
👉 512
34. Find 9³
👉 729
35. Find 1³
👉 1
🧠 Section D: Cube Roots (36–45)
36. ∛8
👉 2
37. ∛27
👉 3
38. ∛64
👉 4
39. ∛125
👉 5
40. ∛216
👉 6
41. ∛343
👉 7
42. ∛512
👉 8
43. ∛729
👉 9
44. ∛1000
👉 10
45. ∛1
👉 1
📊 Section E: Mixed Practice (46–50)
46. Is 500 a perfect square?
👉 No
47. Is 729 a perfect cube?
👉 Yes
48. Find smallest number to multiply 50 to make it a perfect square
👉 50 = 2 × 5² → multiply by 2
👉 Answer: 2
49. Find square root of 625 using prime factorization
👉 625 = 5 × 5 × 5 × 5 → √625 = 25
50. Find cube root of 1728
👉 1728 = 12³ → ∛1728 = 12