Well say I wanted to give you 2 trillion phillip. That'd mean I lose 3 tril, meaning I'd need at least 5 tril to keep it all
And cindy, when I say " keep it all", I mean keep or ending up with all the tutors that were vollied
I think I found the way to calculate this thing, I'm not 100% sure, though. First you use the following formula to calculate the tutors price after n volleys : Po.(1 0,1)^n -> Po is the initial tutor's price. It's the same formula that is being used in banks to calculate your deposit with a defined rate after n years, if you don't withdraw your money during this time period. Every time a tutor gets hired, the owner gets a profit of ~1,59%. That means that after n hirings the total profit for both volleying partners is at : 0,0159.Po.(1 0,0159)^n It would be complicated to figure out the exact amount of money each parter gets, but everyone gets about 50% of the total profit. Now if you want to calculate how much you are going to lose if you want to drop volley with someone you use the following formula : 0,60.Po.(1 0,1)^n 0.50.0,0159.Po.(1 0,1)^n It means that you get 60% of the tutor's final price and you get 50% of the volleying profit.
Strangely the pluses didn't appear in my post... So the exact formula is: Po.(1 0,1)^n -> Initial price Po multiplied by 1 plus 0,1 and the 1 plus 0,1 is in "n"th degree.
Dude.... I have tested this out. The way I gave an example for 100 bil, one losing 60 bil and other getting to 40 bil. Thats how it works
That's what they lose from the total volleyed tutor's price, that doesn't take in account the amount of profits, that the players get during volleys.
Well maybe I just don't get the volleying mechanism... I'm wondering what formula is being used for volleyes. This game is a huge financial mathematical application.