Wiki User
∙ 2014-09-28 00:58:44Composite numbers can be written that way.
Wiki User
∙ 2014-09-28 00:58:44according to the Fundamental theorem of Arithmetic all numbers can be written as a product of prime numbers. so 34= 2 x 17 both 2 and 17 are prime numbers
It is simply the whole number written as the product of its prime factors.It is simply the whole number written as the product of its prime factors.It is simply the whole number written as the product of its prime factors.It is simply the whole number written as the product of its prime factors.
Composite numbers can be written as product of prime factors.
1000 as a product of its prime factors is written as: 2 x 5 = 10
123 written as a product of prime factors is: 123 = 3 X 41.
Yes. Composite numbers can be written as the product of prime factors.
the numbers are odd
Yes.
30 cannot be written as the product of 6 prime numbers. 30 has three prime factors: 2 x 3 x 5 = 30
As for example 98 as a product of its prime factors is: 2*7*7 = 98
Exactly.
according to the Fundamental theorem of Arithmetic all numbers can be written as a product of prime numbers. so 34= 2 x 17 both 2 and 17 are prime numbers
It is simply the whole number written as the product of its prime factors.It is simply the whole number written as the product of its prime factors.It is simply the whole number written as the product of its prime factors.It is simply the whole number written as the product of its prime factors.
70 written as a product of prime numbers: 2 x 5 x 7
Prime numbers form the basis of most encryption algorithms, which are used to protect sensitive data such as credit card information, passwords, etc. Any natural number greater than one can be written as a product of prime numbers. The prime factorization is unambiguous, that is, for any natural number N, there is exactly one product of prime numbers. Multiplying prime factors is quick and easy. For example, the product of the two prime numbers 29 and 31 is 899. It is much harder to take 899, and find its prime factors. For very large numbers, such as 150-digit prime numbers, finding the prime factorisation is near impossible - and it is this difficulty that forms the basis of encryption algorithms.
6 = 2 x 3 is an example of a whole number written as a product of its prime factors.
Composite numbers can be written as product of prime factors.