C+1 if C is not composite, and C+2 if C is a composite.
Product of a prime number and a composite number results in a composite number.Now consider the product of a composite number(a) and a prime number(b) is equal to c.i.e. c = a x bIt is clear that c is divisible by both a and b.Also c is divisible by itself and 1, this means that c has more than two factors.A number having more than two factors is composite, therefore product of a prime number and a composite number results in a composite number.
None.A composite number c must have a prime factor psuch that 1 < p < c.Therefore the product of c's factors must be at least p*c which must be greater than c.
93 is a composite number, so 93A should be a composite number if A is an integer. 67B would be a composite number if B is an integer greater than 1. 47C would be a composite number if C is an integer greater than 1. 31D would be a composite number if D is an integer greater than 1. Any number that can be produced by multiplying two integers greater than 1 together will be a composite number. So, 67 x B would be a composite number, even though 67 itself is prime.
The letter that represent the composite number is letter C.
if a is bigger than b and b is bigger than c a must be bigger than c... Transitivity
Your options C and D are the same, but it is true that 51 is a composite number.
The answer depends on the value of C, which is unknown.
No...C-5 is bigger than B-52
Suppose a composite number x can be expressed as a product of primes p, q, r ... in exponential form as x = pa*qb*rc ... has (a+1)*(b+1)*(c+1) ... factors. So, the bigger a, b, c etc are, the greater the number of factors.
3, 61 and 113 are prime; the rest composite.
The A380 is bigger but the C-5 is longer
A composite number is a positive integer greater than 1 that has more than two distinct positive divisors. In this case, 63 is a composite number because it can be divided evenly by 1, 3, 7, 9, 21, and 63. The other numbers listed (13, 61, and 31) are all prime numbers because they only have two distinct positive divisors, 1 and the number itself.