(1) factors y and n z

Basic definitions: elements, factors and components.

For example, modern Guo Moruo's Collection of Literature and Art talks about rhythm: "The rhythm of force is inseparable from the relationship of time. The rhythm of time is objectively only a factor, and there is no difference between strength and weakness, but subjectively we distinguish between strength and weakness."

(2) factors y and y ě n shě.

Basic explanation: The quotient (b≠0) of an integer A divided by an integer B is exactly an integer with no remainder, and B is a factor of A. ..

For example, if A is a factor of B and A is a prime number, then A is a prime factor of B. ..

Extended data:

In primary school mathematics, two positive integers are multiplied, so both numbers are called factors of product, or divisors. If a*b=c(a, b and c are all integers), then a and b are called factors of c, and it should be noted that this relationship only holds when the dividend, divisor and quotient are integers and the remainder is zero. Conversely, C is called a multiple of A and B. When learning factors and multiples, primary school mathematics does not consider 0.

For example:

(1)2*6= 12, and the product of 2 and 6 is 12, so 2 and 6 are factors of 12. 12 is a multiple of 2 and also a multiple of 6.

(2)3 *(9)=-27, and 3 and -9 are all factors of -27. -27 is a multiple of 3 and -9.