A and B are non-zero natural numbers. If a △ B = 5, then the greatest common factor of a and B is (), and the least common multiple is (), if a and B A and B are non-zero natural numbers. If a △ B = 5, then the greatest common factor of a and B is () and the least common multiple is (). If the common factor of a and B is only 1, then the least common multiple of a and B is ()

A and B are non-zero natural numbers. If a △ B = 5, then the greatest common factor of a and B is (), and the least common multiple is (), if a and B A and B are non-zero natural numbers. If a △ B = 5, then the greatest common factor of a and B is () and the least common multiple is (). If the common factor of a and B is only 1, then the least common multiple of a and B is ()

b. Because A. or B

A / b = 0.2, (A and B are non-zero natural numbers. What is the greatest common factor of a and B and what is the least common multiple of a and B

According to the expression, B = 5A
So the greatest common factor is a and the least common multiple is B

a. B is two adjacent non-zero natural numbers, then the greatest common factor of a and B is (), and the least common multiple of a and B is (). Why do you do this?

The greatest common factor is 1. You can give an example
The greatest common factors of 8 and 9 are 1, and the greatest common factors of 3 and 4 are 1
It's all 1
The least common multiple is the product of the two of them
I think your teachers should have something to say in class
As long as it is a continuous number, the least common multiple is their product
You can also give an example of this
The least common multiple of 8 and 9 is 72
The least common multiple of 3 and 4 is 12