Are those square brackets a FLOOR and not Absolute Values? Well, that's a different problem. \(\displaystyle \lfloor{ne^{ax}}\rfloor\)I just can't start.I don't know how.
For example L(0)=limit(n->00) 1/n*[n].If [n]=n then L(0)=1, right?
How to find for all a ?
Is it correct to take n out from floor function ? Like [nx]=n[x] ?
An off-topic question: For example if I have a limit from an integral.Is it correct to take n out from integral ? Like \(\displaystyle \int 5nx=n\int 5x\)
Oh, you meant the greatest integer function. My eye sight is starting to fail!I would solve such a simple integral. I would also factor out n (note that in this case |n| = n)
Oh, you meant the greatest integer function. My eye sight is starting to fail!