If the second number is a multiple of the first, then the first number
is the greatest common factor of both numbers.
The first number.
The GCF is the first number.
The first number is a multiple of the second.
It asks for the next multiple which is times two from that number like 6 times 2 which equals 12
Every second number greater than 2 is an even number.
the group of numbers on the left are the routing id, this tells the banks what branch your account was created in, the second set of number sis the account number for that bank.
If the second number is a multiple of the prime number, than the LCM is the second number. If the second number is not a multiple of the prime number, then the two numbers are relatively prime, and the LCM is the product of the two numbers.
The GCF is the first number.
Unfortunately, we will need that second number to determine an LCM.
There is no such thing, because you didn't give a second number. You can have a common multiple of 2 or more numbers, but not of one number by itself.
Yes because you could divide it by the first number and get the second number and vise versa i was also id1147693934
The first number is a multiple of the second.
IF they are integers, then the first number is a multiple of the second and the second is a factor of the first.
In that event, the first number is called a "multiple" of the second number.
= The sum of two numbers is -42 the first number minus the second number is 52 Find the numbers? =
The first is a multiple of the second. The second is a factor of the first.
If you mean consecutive numbers that are prime? than the answer is 2,3 are consecutive numbers which are prime. except for this pair it is impossible for consecutive numbers to be prime because every second number is multiple of 2
If the number can be expressed as a ratio of two integer (the second not zero) then the number is rational. However, it is not always a simple matter to prove that if you cannot find such a representation, then the number is not rational: it is possible that you have not looked hard enough!