36 may be the smallest multiple of which two numbers, try to write it out______ And______ ，______ And______ ，______ And______ ，______ And______ ，______ And______ ．

36 may be the smallest multiple of which two numbers, try to write it out______ And______ ，______ And______ ，______ And______ ，______ And______ ，______ And______ ．

36 = 2 × 2 × 3 × 3, 36 = 4 × 9, 4 and 9 are coprime, the least common multiple is 36, 9 × 2 = 18, 4 and 18 share prime factor 2, 4 and 18 share prime factor 2 × 2 × 9 = 36, 4 × 3 = 12, 12 and 9 share prime factor 3, 12 and 9 share prime factor 3, 12 and 9 share prime factor 3, 12 and 9 share prime factor 3, 12 and 9 share prime factor 3, 36 = 1 × 36 The least common multiple of 3 and 36, 4 and 36, 6 and 36, 9 and 36, 12 and 36, 18 and 36 is 36; so the answer is: 1 and 36, 4 and 9, 4 and 18, 12 and 9, 2 and 36

Two general relations, the least common multiple is a number of 36
[a, b] = 36 A, B have a general relationship. What numbers can they be? How can I find them

36=1*36=2*18=3*12=4*9=6*6
From 1, 2, 3, 4, 6, 9, 12, 18, 36, you can find any two numbers that are not coprime and not multiple, such as 18 and 12

24 is the least common multiple of which two numbers? How many groups of such two numbers?

24 is the least common multiple of 1 and 24, 3 and 8