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Factor Pairs of 360
All Factor Pairs of 360
Here are all the factor pairs of 360:
(1, 360)
(2, 180)
(3, 120)
(4, 90)
(5, 72)
(6, 60)
(8, 45)
(9, 40)
(10, 36)
(12, 30)
(15, 24)
(18, 20)
Total: 12 factor pairs
Visual Representation of Factors
These are all the factors of 360:
1
2
3
4
5
6
8
9
10
12
15
18
20
24
30
36
40
45
60
72
90
120
180
360
Properties of 360
Number Type
Abundant Number
Sum of All Factors
1,170
Sum of Proper Divisors
810
Total Factors
24
Prime Factorization
23 × 32 × 5
Perfect Square?
No
How to Calculate Factor Pairs of 360
Step-by-Step Process
To find all factor pairs of 360, we need to identify all integers that divide 360 evenly (with no remainder).
- Start with the smallest factor, which is always 1
- Check each integer from 1 up to the square root of 360 (v360 ≈ 18.97)
- For each factor found, its corresponding pair is calculated by dividing 360 by that factor
Calculation Example
Let's work through finding the factor pairs of 360:
| Factor Check | Division | Result | Factor Pair |
|---|---|---|---|
| 360 ÷ 1 | 360.00 | Integer result | (1, 360) |
| 360 ÷ 2 | 180.00 | Integer result | (2, 180) |
| 360 ÷ 3 | 120.00 | Integer result | (3, 120) |
| 360 ÷ 4 | 90.00 | Integer result | (4, 90) |
| 360 ÷ 5 | 72.00 | Integer result | (5, 72) |
| 360 ÷ 6 | 60.00 | Integer result | (6, 60) |
| 360 ÷ 7 | 51.43 | Not a divisor | - |
| 360 ÷ 8 | 45.00 | Integer result | (8, 45) |
| 360 ÷ 9 | 40.00 | Integer result | (9, 40) |
| 360 ÷ 10 | 36.00 | Integer result | (10, 36) |
| 360 ÷ 11 | 32.73 | Not a divisor | - |
| 360 ÷ 12 | 30.00 | Integer result | (12, 30) |
| 360 ÷ 13 | 27.69 | Not a divisor | - |
| 360 ÷ 14 | 25.71 | Not a divisor | - |
| 360 ÷ 15 | 24.00 | Integer result | (15, 24) |
| 360 ÷ 16 | 22.50 | Not a divisor | - |
| 360 ÷ 17 | 21.18 | Not a divisor | - |
| 360 ÷ 18 | 20.00 | Integer result | (18, 20) |
Explore More Factor Pairs
Check out factor pairs of these randomly selected numbers:
| Number | Factor Pairs | Total Pairs | Details |
|---|---|---|---|
| 10 | (1, 10), (2, 5) | 2 | View Details |
| 12 | (1, 12), (2, 6), (3, 4) | 3 | View Details |
| 37 | (1, 37) | 1 | View Details |
| 48 | (1, 48), (2, 24), (3, 16), (4, 12), (6, 8) | 5 | View Details |
| 94 | (1, 94), (2, 47) | 2 | View Details |
| 144 | (1, 144), (2, 72), (3, 48), (4, 36), (6, 24), (8, 18), (9, 16), (12, 12) | 8 | View Details |
This table refreshes with new examples each time you visit.
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More About Abundant Numbers
Abundant Numbers
An abundant number is a positive integer for which the sum of its proper divisors is greater than the number itself. The number 360 is abundant because the sum of its proper divisors (810) exceeds 360.
The smallest abundant number is 12, whose proper divisors are 1, 2, 3, 4, and 6, which sum to 16.