Given the Number 24,545,430 Calculate (Find) All Its Factors (Divisors – the Proper, the Improper and the Prime Factors). Online Calculator

All the factors (divisors) of the number 24,545,430

1. Carry out the prime factorization of the number 24,545,430:

The prime factorization of a number: finding the prime numbers that multiply together to make that number.


24,545,430 = 2 × 36 × 5 × 7 × 13 × 37
24,545,430 is not a prime number but a composite one.


* Prime number: a natural number that is divisible (divided evenly) only by 1 and itself. A prime number has exactly two factors: 1 and the number itself.
* Composite number: a natural number that has at least one other factor than 1 and itself.


2. Multiply the prime factors of the number 24,545,430

Multiply the prime factors involved in the prime factorization of the number in all their unique combinations, that give different results.


Also consider the exponents of these prime factors.

Also add 1 to the list of factors (divisors). All the numbers are divisible by 1.


All the factors (divisors) are listed below - in ascending order

The list of factors (divisors):

neither prime nor composite = 1
prime factor = 2
prime factor = 3
prime factor = 5
2 × 3 = 6
prime factor = 7
32 = 9
2 × 5 = 10
prime factor = 13
2 × 7 = 14
3 × 5 = 15
2 × 32 = 18
3 × 7 = 21
2 × 13 = 26
33 = 27
2 × 3 × 5 = 30
5 × 7 = 35
prime factor = 37
3 × 13 = 39
2 × 3 × 7 = 42
32 × 5 = 45
2 × 33 = 54
32 × 7 = 63
5 × 13 = 65
2 × 5 × 7 = 70
2 × 37 = 74
2 × 3 × 13 = 78
34 = 81
2 × 32 × 5 = 90
7 × 13 = 91
3 × 5 × 7 = 105
3 × 37 = 111
32 × 13 = 117
2 × 32 × 7 = 126
2 × 5 × 13 = 130
33 × 5 = 135
2 × 34 = 162
2 × 7 × 13 = 182
5 × 37 = 185
33 × 7 = 189
3 × 5 × 13 = 195
2 × 3 × 5 × 7 = 210
2 × 3 × 37 = 222
2 × 32 × 13 = 234
35 = 243
7 × 37 = 259
2 × 33 × 5 = 270
3 × 7 × 13 = 273
32 × 5 × 7 = 315
32 × 37 = 333
33 × 13 = 351
2 × 5 × 37 = 370
2 × 33 × 7 = 378
2 × 3 × 5 × 13 = 390
34 × 5 = 405
5 × 7 × 13 = 455
13 × 37 = 481
2 × 35 = 486
2 × 7 × 37 = 518
2 × 3 × 7 × 13 = 546
3 × 5 × 37 = 555
34 × 7 = 567
32 × 5 × 13 = 585
2 × 32 × 5 × 7 = 630
2 × 32 × 37 = 666
2 × 33 × 13 = 702
36 = 729
3 × 7 × 37 = 777
2 × 34 × 5 = 810
32 × 7 × 13 = 819
2 × 5 × 7 × 13 = 910
33 × 5 × 7 = 945
2 × 13 × 37 = 962
33 × 37 = 999
34 × 13 = 1,053
2 × 3 × 5 × 37 = 1,110
2 × 34 × 7 = 1,134
2 × 32 × 5 × 13 = 1,170
35 × 5 = 1,215
5 × 7 × 37 = 1,295
3 × 5 × 7 × 13 = 1,365
3 × 13 × 37 = 1,443
2 × 36 = 1,458
2 × 3 × 7 × 37 = 1,554
2 × 32 × 7 × 13 = 1,638
32 × 5 × 37 = 1,665
35 × 7 = 1,701
33 × 5 × 13 = 1,755
2 × 33 × 5 × 7 = 1,890
2 × 33 × 37 = 1,998
2 × 34 × 13 = 2,106
32 × 7 × 37 = 2,331
5 × 13 × 37 = 2,405
2 × 35 × 5 = 2,430
33 × 7 × 13 = 2,457
2 × 5 × 7 × 37 = 2,590
2 × 3 × 5 × 7 × 13 = 2,730
34 × 5 × 7 = 2,835
2 × 3 × 13 × 37 = 2,886
34 × 37 = 2,997
35 × 13 = 3,159
2 × 32 × 5 × 37 = 3,330
7 × 13 × 37 = 3,367
2 × 35 × 7 = 3,402
2 × 33 × 5 × 13 = 3,510
36 × 5 = 3,645
3 × 5 × 7 × 37 = 3,885
32 × 5 × 7 × 13 = 4,095
32 × 13 × 37 = 4,329
2 × 32 × 7 × 37 = 4,662
2 × 5 × 13 × 37 = 4,810
2 × 33 × 7 × 13 = 4,914
This list continues below...

... This list continues from above
33 × 5 × 37 = 4,995
36 × 7 = 5,103
34 × 5 × 13 = 5,265
2 × 34 × 5 × 7 = 5,670
2 × 34 × 37 = 5,994
2 × 35 × 13 = 6,318
2 × 7 × 13 × 37 = 6,734
33 × 7 × 37 = 6,993
3 × 5 × 13 × 37 = 7,215
2 × 36 × 5 = 7,290
34 × 7 × 13 = 7,371
2 × 3 × 5 × 7 × 37 = 7,770
2 × 32 × 5 × 7 × 13 = 8,190
35 × 5 × 7 = 8,505
2 × 32 × 13 × 37 = 8,658
35 × 37 = 8,991
36 × 13 = 9,477
2 × 33 × 5 × 37 = 9,990
3 × 7 × 13 × 37 = 10,101
2 × 36 × 7 = 10,206
2 × 34 × 5 × 13 = 10,530
32 × 5 × 7 × 37 = 11,655
33 × 5 × 7 × 13 = 12,285
33 × 13 × 37 = 12,987
2 × 33 × 7 × 37 = 13,986
2 × 3 × 5 × 13 × 37 = 14,430
2 × 34 × 7 × 13 = 14,742
34 × 5 × 37 = 14,985
35 × 5 × 13 = 15,795
5 × 7 × 13 × 37 = 16,835
2 × 35 × 5 × 7 = 17,010
2 × 35 × 37 = 17,982
2 × 36 × 13 = 18,954
2 × 3 × 7 × 13 × 37 = 20,202
34 × 7 × 37 = 20,979
32 × 5 × 13 × 37 = 21,645
35 × 7 × 13 = 22,113
2 × 32 × 5 × 7 × 37 = 23,310
2 × 33 × 5 × 7 × 13 = 24,570
36 × 5 × 7 = 25,515
2 × 33 × 13 × 37 = 25,974
36 × 37 = 26,973
2 × 34 × 5 × 37 = 29,970
32 × 7 × 13 × 37 = 30,303
2 × 35 × 5 × 13 = 31,590
2 × 5 × 7 × 13 × 37 = 33,670
33 × 5 × 7 × 37 = 34,965
34 × 5 × 7 × 13 = 36,855
34 × 13 × 37 = 38,961
2 × 34 × 7 × 37 = 41,958
2 × 32 × 5 × 13 × 37 = 43,290
2 × 35 × 7 × 13 = 44,226
35 × 5 × 37 = 44,955
36 × 5 × 13 = 47,385
3 × 5 × 7 × 13 × 37 = 50,505
2 × 36 × 5 × 7 = 51,030
2 × 36 × 37 = 53,946
2 × 32 × 7 × 13 × 37 = 60,606
35 × 7 × 37 = 62,937
33 × 5 × 13 × 37 = 64,935
36 × 7 × 13 = 66,339
2 × 33 × 5 × 7 × 37 = 69,930
2 × 34 × 5 × 7 × 13 = 73,710
2 × 34 × 13 × 37 = 77,922
2 × 35 × 5 × 37 = 89,910
33 × 7 × 13 × 37 = 90,909
2 × 36 × 5 × 13 = 94,770
2 × 3 × 5 × 7 × 13 × 37 = 101,010
34 × 5 × 7 × 37 = 104,895
35 × 5 × 7 × 13 = 110,565
35 × 13 × 37 = 116,883
2 × 35 × 7 × 37 = 125,874
2 × 33 × 5 × 13 × 37 = 129,870
2 × 36 × 7 × 13 = 132,678
36 × 5 × 37 = 134,865
32 × 5 × 7 × 13 × 37 = 151,515
2 × 33 × 7 × 13 × 37 = 181,818
36 × 7 × 37 = 188,811
34 × 5 × 13 × 37 = 194,805
2 × 34 × 5 × 7 × 37 = 209,790
2 × 35 × 5 × 7 × 13 = 221,130
2 × 35 × 13 × 37 = 233,766
2 × 36 × 5 × 37 = 269,730
34 × 7 × 13 × 37 = 272,727
2 × 32 × 5 × 7 × 13 × 37 = 303,030
35 × 5 × 7 × 37 = 314,685
36 × 5 × 7 × 13 = 331,695
36 × 13 × 37 = 350,649
2 × 36 × 7 × 37 = 377,622
2 × 34 × 5 × 13 × 37 = 389,610
33 × 5 × 7 × 13 × 37 = 454,545
2 × 34 × 7 × 13 × 37 = 545,454
35 × 5 × 13 × 37 = 584,415
2 × 35 × 5 × 7 × 37 = 629,370
2 × 36 × 5 × 7 × 13 = 663,390
2 × 36 × 13 × 37 = 701,298
35 × 7 × 13 × 37 = 818,181
2 × 33 × 5 × 7 × 13 × 37 = 909,090
36 × 5 × 7 × 37 = 944,055
2 × 35 × 5 × 13 × 37 = 1,168,830
34 × 5 × 7 × 13 × 37 = 1,363,635
2 × 35 × 7 × 13 × 37 = 1,636,362
36 × 5 × 13 × 37 = 1,753,245
2 × 36 × 5 × 7 × 37 = 1,888,110
36 × 7 × 13 × 37 = 2,454,543
2 × 34 × 5 × 7 × 13 × 37 = 2,727,270
2 × 36 × 5 × 13 × 37 = 3,506,490
35 × 5 × 7 × 13 × 37 = 4,090,905
2 × 36 × 7 × 13 × 37 = 4,909,086
2 × 35 × 5 × 7 × 13 × 37 = 8,181,810
36 × 5 × 7 × 13 × 37 = 12,272,715
2 × 36 × 5 × 7 × 13 × 37 = 24,545,430

The final answer:
(scroll down)

24,545,430 has 224 factors (divisors):
1; 2; 3; 5; 6; 7; 9; 10; 13; 14; 15; 18; 21; 26; 27; 30; 35; 37; 39; 42; 45; 54; 63; 65; 70; 74; 78; 81; 90; 91; 105; 111; 117; 126; 130; 135; 162; 182; 185; 189; 195; 210; 222; 234; 243; 259; 270; 273; 315; 333; 351; 370; 378; 390; 405; 455; 481; 486; 518; 546; 555; 567; 585; 630; 666; 702; 729; 777; 810; 819; 910; 945; 962; 999; 1,053; 1,110; 1,134; 1,170; 1,215; 1,295; 1,365; 1,443; 1,458; 1,554; 1,638; 1,665; 1,701; 1,755; 1,890; 1,998; 2,106; 2,331; 2,405; 2,430; 2,457; 2,590; 2,730; 2,835; 2,886; 2,997; 3,159; 3,330; 3,367; 3,402; 3,510; 3,645; 3,885; 4,095; 4,329; 4,662; 4,810; 4,914; 4,995; 5,103; 5,265; 5,670; 5,994; 6,318; 6,734; 6,993; 7,215; 7,290; 7,371; 7,770; 8,190; 8,505; 8,658; 8,991; 9,477; 9,990; 10,101; 10,206; 10,530; 11,655; 12,285; 12,987; 13,986; 14,430; 14,742; 14,985; 15,795; 16,835; 17,010; 17,982; 18,954; 20,202; 20,979; 21,645; 22,113; 23,310; 24,570; 25,515; 25,974; 26,973; 29,970; 30,303; 31,590; 33,670; 34,965; 36,855; 38,961; 41,958; 43,290; 44,226; 44,955; 47,385; 50,505; 51,030; 53,946; 60,606; 62,937; 64,935; 66,339; 69,930; 73,710; 77,922; 89,910; 90,909; 94,770; 101,010; 104,895; 110,565; 116,883; 125,874; 129,870; 132,678; 134,865; 151,515; 181,818; 188,811; 194,805; 209,790; 221,130; 233,766; 269,730; 272,727; 303,030; 314,685; 331,695; 350,649; 377,622; 389,610; 454,545; 545,454; 584,415; 629,370; 663,390; 701,298; 818,181; 909,090; 944,055; 1,168,830; 1,363,635; 1,636,362; 1,753,245; 1,888,110; 2,454,543; 2,727,270; 3,506,490; 4,090,905; 4,909,086; 8,181,810; 12,272,715 and 24,545,430
out of which 6 prime factors: 2; 3; 5; 7; 13 and 37
24,545,430 and 1 are sometimes called improper factors, the others are called proper factors (proper divisors).

A quick way to find the factors (the divisors) of a number is to break it down into prime factors.


Then multiply the prime factors and their exponents, if any, in all their different combinations.


Factors (divisors), common factors (common divisors), the greatest common factor, GCF (also called the greatest common divisor, GCD, or the highest common factor, HCF)

  • If the number "t" is a factor (divisor) of the number "a" then in the prime factorization of "t" we will only encounter prime factors that also occur in the prime factorization of "a".
  • If there are exponents involved, the maximum value of an exponent for any base of a power that is found in the prime factorization of "t" (powers, or multiplicities) is at most equal to the exponent of the same base that is involved in the prime factorization of "a".
  • Hint: 23 = 2 × 2 × 2 = 8. 2 is called the base and 3 is the exponent. 23 is the power and 8 is the value of the power. We sometimes say that the number 2 is raised to the power of 3.
  • For example, 12 is a factor (divisor) of 120 - the remainder is zero when dividing 120 by 12.
  • Let's look at the prime factorization of both numbers and notice the bases and the exponents that occur in the prime factorization of both numbers:
  • 12 = 2 × 2 × 3 = 22 × 3
  • 120 = 2 × 2 × 2 × 3 × 5 = 23 × 3 × 5
  • 120 contains all the prime factors of 12, and all its bases' exponents are higher than those of 12.
  • If "t" is a common factor (divisor) of "a" and "b", then the prime factorization of "t" contains only the common prime factors involved in the prime factorizations of both "a" and "b".
  • If there are exponents involved, the maximum value of an exponent for any base of a power that is found in the prime factorization of "t" is at most equal to the minimum of the exponents of the same base that is involved in the prime factorization of both "a" and "b".
  • For example, 12 is the common factor of 48 and 360.
  • The remainder is zero when dividing either 48 or 360 by 12.
  • Here there are the prime factorizations of the three numbers, 12, 48 and 360:
  • 12 = 22 × 3
  • 48 = 24 × 3
  • 360 = 23 × 32 × 5
  • Please note that 48 and 360 have more factors (divisors): 2, 3, 4, 6, 8, 12, 24. Among them, 24 is the greatest common factor, GCF (or the greatest common divisor, GCD, or the highest common factor, HCF) of 48 and 360.
  • The greatest common factor, GCF, of two numbers, "a" and "b", is the product of all the common prime factors involved in the prime factorizations of both "a" and "b", taken by the lowest exponents.
  • Based on this rule it is calculated the greatest common factor, GCF, (or the greatest common divisor GCD, HCF) of several numbers, as shown in the example below...
  • GCF, GCD (1,260; 3,024; 5,544) = ?
  • 1,260 = 22 × 32
  • 3,024 = 24 × 32 × 7
  • 5,544 = 23 × 32 × 7 × 11
  • The common prime factors are:
  • 2 - its lowest exponent (multiplicity) is: min.(2; 3; 4) = 2
  • 3 - its lowest exponent (multiplicity) is: min.(2; 2; 2) = 2
  • GCF, GCD (1,260; 3,024; 5,544) = 22 × 32 = 252
  • Coprime numbers:
  • If two numbers "a" and "b" have no other common factors (divisors) than 1, gfc, gcd, hcf (a; b) = 1, then the numbers "a" and "b" are called coprime (or relatively prime).
  • Factors of the GCF
  • If "a" and "b" are not coprime, then every common factor (divisor) of "a" and "b" is a also a factor (divisor) of the greatest common factor, GCF (greatest common divisor, GCD, highest common factor, HCF) of "a" and "b".