Friday 23 March 2018

discrete mathematics - Prove that a number with 30 digits cannot have more than 100 prime factors.

I know that the a number with more than 100 prime factors must be larger than



$2 ^ {100}$, so it must have more than 30 digits but i am having trouble with proof.



I was given
Hint: every prime number is $≥ 2$.

Can someone help me connect the two ideas.

-

No comments:

Post a Comment

Subscribe to: Post Comments (Atom)

real analysis - How to find $lim_{hrightarrow 0}frac{sin(ha)}{h}$

How to find $\lim_{h\rightarrow 0}\frac{\sin(ha)}{h}$ without lhopital rule? I know when I use lhopital I easy get $$ \lim_{h\rightarrow 0}...