SOLUTION: Why is it impossible to find a number from 101-200 that is divisible by four different prime numbers? (Hint: How big would such a number have to be?)
Algebra.Com
Question 116216: Why is it impossible to find a number from 101-200 that is divisible by four different prime numbers? (Hint: How big would such a number have to be?)
Answer by ankor@dixie-net.com(22740) (Show Source): You can put this solution on YOUR website!
Why is it impossible to find a number from 101-200 that is divisible by four different prime numbers? (Hint: How big would such a number have to be?)
:
As I remember 2 is a prime number so the lowest 4 prime numbers are 2,3,5,7
2*3*5*7 = 210; which is greater than 200
RELATED QUESTIONS
why is it impossible to find a number between 101 and 200 that is divisible by 4... (answered by user_dude2008)
Please help me solve this problem: Can you find a number less than 200 that is divisible (answered by longjonsilver)
is there a number less than 200 that is divisible by four different prime... (answered by jim_thompson5910)
choose the number that is divisible by four different prime numbers 77, 105, 225, and... (answered by checkley77)
can you find any numbers that are less 300 and are divisible by four different prime... (answered by Alan3354)
what is the smallest number divisible by four different prime... (answered by Alan3354)
What is the least number divisible by four prime... (answered by checkley71)
IS there a number less than 200 that is divisible by four different prime numbers? I have (answered by scott8148)
Are there any number that are less than 200 and are divisible by four prime... (answered by ankor@dixie-net.com)