- #1
Hill
- 836
- 644
- Homework Statement
- In the Olympic finals, only three teams are represented; USA, England, and China. Svetlana believes the USA will win and offers even odds of 1:1. Roberto is supporting England and is offering 2:1 odds. (So, if England wins, Roberto keeps his money. If one of the other teams wins, Roberto pays $2 for each dollar bet.) Finally, Jeff supports China as given by his 5:4 odds. Determine the optimal way of dividing $100 to bet that ensures the largest winning.
- Relevant Equations
- earnings=gain-loss
If I bet ##s## with Svetlana, ##r## with Roberto, and ##j## with Jeff, my earnings would be,
if USA wins, ##-s+2r+ \frac 5 4 j##,
if England wins, ##s-r+\frac 5 4 j##,
if China wins, ## s+2r-j##,
where ##s+r+j=$100##.
I think that "the optimal way ... that ensures the largest winning" is to make the earning independent of the result of the final. Then, I get three equations with three unknowns,
##-s+2r+ \frac 5 4 j=s-r+\frac 5 4 j##
##-s+2r+ \frac 5 4 j=s+2r-j##
##s+r+j=$100##.
The solution is to bet $17.65 with Svetlana, $35.29 with Roberto, and $47.06 with Jeff.
if USA wins, ##-s+2r+ \frac 5 4 j##,
if England wins, ##s-r+\frac 5 4 j##,
if China wins, ## s+2r-j##,
where ##s+r+j=$100##.
I think that "the optimal way ... that ensures the largest winning" is to make the earning independent of the result of the final. Then, I get three equations with three unknowns,
##-s+2r+ \frac 5 4 j=s-r+\frac 5 4 j##
##-s+2r+ \frac 5 4 j=s+2r-j##
##s+r+j=$100##.
The solution is to bet $17.65 with Svetlana, $35.29 with Roberto, and $47.06 with Jeff.