User:Contribution/Limit: Difference between revisions

Line 21:

==Minimal factor limit==

A positive rational number q belongs to the fmin-factor-limit, called the '''minimal factor limit''', for a given positive integer f if and only if the sum of the exponent absolutes of its factorization into primes is more than or equal to fmin.

A positive rational number q belongs to the fmin-factor-limit, called the '''minimal factor limit''', for a given positive integer fmin if and only if the sum of the exponent absolutes of its factorization into primes is more than or equal to fmin.

In other words, a positive rational number q belongs to the fmin-limit if and only if the sum of the exponent absolutes of its factorization into primes is left-bounded to fmin.

Line 27:

==Maximal factor limit==

A positive rational number q belongs to the fmax-factor-limit, called the '''maximal factor limit''', for a given positive integer f if and only if the sum of the exponent absolutes of its factorization into primes is less than or equal to fmax.

A positive rational number q belongs to the fmax-factor-limit, called the '''maximal factor limit''', for a given positive integer fmax if and only if the sum of the exponent absolutes of its factorization into primes is less than or equal to fmax.

In other words, a positive rational number q belongs to the fmax-limit if and only if the sum of the exponent absolutes of its factorization into primes is right-bounded to fmax.

@@ Line 21: / Line 21: @@
 ==Minimal factor limit==
-A positive rational number q belongs to the fmin-factor-limit, called the '''minimal factor limit''', for a given positive integer f if and only if the sum of the exponent absolutes of its factorization into primes is more than or equal to fmin.
+A positive rational number q belongs to the fmin-factor-limit, called the '''minimal factor limit''', for a given positive integer fmin if and only if the sum of the exponent absolutes of its factorization into primes is more than or equal to fmin.
 In other words, a positive rational number q belongs to the fmin-limit if and only if the sum of the exponent absolutes of its factorization into primes is left-bounded to fmin.
@@ Line 27: / Line 27: @@
 ==Maximal factor limit==
-A positive rational number q belongs to the fmax-factor-limit, called the '''maximal factor limit''', for a given positive integer f if and only if the sum of the exponent absolutes of its factorization into primes is less than or equal to fmax.
+A positive rational number q belongs to the fmax-factor-limit, called the '''maximal factor limit''', for a given positive integer fmax if and only if the sum of the exponent absolutes of its factorization into primes is less than or equal to fmax.
 In other words, a positive rational number q belongs to the fmax-limit if and only if the sum of the exponent absolutes of its factorization into primes is right-bounded to fmax.