Does 0.02^(365) REALLY make that big of a difference?

Does 0.02^(365) REALLY make that big of a difference?

what's supposed to be motivational about that?

The difference between 1.01^365 and 0.99^365 is not 0.02^365.

That is, a^n - b^n != (a - b)^n in general.

slacking off gives you shit, working hard gets you a lot.

i am very good at interpreting things, i scored a 138 iq in that other thread

wow i scored only 92, thanks for explaining
people are really smart here :D

no problem! with a bit elbow grease, you'll be like us in no time

Actually that's very motivational.

Yes but the moral of this story is if you do only half your shit for half the year, but complete everything the other half of the year. You can still accomplish something in its entirety, AND you can kinda chill for half the year. That's the way to do it, why bother being extordinary and 36xbetter than your peers when 1 and done is good enough?

What? No, [math]a^n - b^n ! \neq (a-b)^n[/math]. Why would you think that?

!= means not equal to