0
What is this amount expressed as a product of primes of the number 50?
Wiki User
∙ 9y ago
50 = 2*5*5
Wiki User
∙ 9y ago
Add your answer:
Earn +20 pts
What is a composite number expressed as a product of primes?
That's known as a prime factorization.
What is 3136 expressed as a product of its primes?
3136 = 26*72
What number has the most prime factors?
Hi... Every integer can be expressed as the product of prime numbers (and these primes are it's factors). Since we can multiply any integer by 2 to create a larger integer which can also be expressed as the product of primes, and this number has more prime factors than the last, we can always get a bigger number with more prime factors. Therefore, there is no definable number with the most primes (much like there is no largest number)!
What is 24 as a product of primes?
24 can be expressed as a product of primes as 2^3 * 3^1.
The product of two primes?
Product of two prime numbers is a composite number. e.g. 2 x 3 = 6, 3 x 17 = 51 etc. But, why the result is a composite number? Definition of composite number makes it much clear: A number which can be expressed as the product of prime numbers is called a composite number. Also, it has more than two factors. So, product of two primes is a composite number.
What is the smallest 4 digit number and express it as a product of prime numbers?
1150. because product of 3 x 5 x 7 x 11=1150, which is the least 4 digit number which can be expressed as product of primes.
How do you express 10000 as product of primes?
10 000 is 100x100, 100 is 10x10, and 10 is 5x2. So, 10 00 expressed as a product of primes is ((5x2)2)2.
What is the largest number under 100 that is the product of 2 primes numbers?
95 is the product of two primes, 5 and 19.
What is the product of primes for 59?
59 is a prime number.
What does the fundamental theorem of arithmetic state?
Fundamental theorem of arithmetic :- Every composite number can be expressed (factorized) as a product of primes, and this factorization is unique . apart from the other in which factors occur.
The largest integer that is not the product of two or more different primes?
The largest integer that is not the product of two or more different primes would be the largest prime number. Because there are an infinite number of prime numbers, there is no largest integer that is not the product of two or more different primes.
How does the number 30 fit the goldbach's conjecture?
Goldbach's conjecture says that every even number greater than two can be expressed as the sum of 2 primes. If 30 could not be expressed as the sum of two primes, then this would disprove the conjecture. As it is, 30 can be expressed as the sum of two primes. You can express it as 11+19. Thus, Goldbach's conjecture holds in this case.
