If [a, b] denotes the least common multiple of a and B, and (a, b) denotes the greatest common divisor of a and B, then [(48, 64), 24] is equal to what?

If [a, b] denotes the least common multiple of a and B, and (a, b) denotes the greatest common divisor of a and B, then [(48, 64), 24] is equal to what?

[(48,64),24]=[16,24]=48

The greatest common divisor of 24 and 6 is their least common multiple______ ．

The greatest common divisor of 24 and 6 is 6, the least common multiple is 24, 6 △ 24 = 14. So the greatest common divisor of 24 and 6 is 14 of their least common multiple

The least common multiple of two numbers is 120, the greatest common factor is 8, one of which is 24, what is the other number?

24=3X8
120=8X3X5
The other number is 8x5 = 40

The least common multiple of 96 and 130

2 /96 130
----------
48 65
I can't type the special calculation symbols, so it's clear at a glance
The least common multiple is the product of two numbers divided by the greatest common divisor
The greatest common divisor of 96 and 130 is 2
So the least common multiple is 96 * 130 / 2 = 48 * 65 * 2 = 6240