|
|
вернуться в форумI understand test Let n=4 and i-1=2. Why ans is 0.687500? We have 6 variants: (carousel moves to the "left") 0011 => Waiting time = 0+0+2+1=3 Conditional expectation(0011) = 0*(1/4)+0*(1/4)+2*(1/4)+1*(1/4)=3/4 Probality(0011)=(1/4)*(2/4)+(1/4)*(1/4)=3/16 0101 => Waiting time = 0+1+0+1=2 Conditional expectation(0101) = 0*(1/4)+1*(1/4)+0*(1/4)+1*(1/4)=2/4 Probality(0101)=(1/4)*(1/4)+(1/4)*(1/4)=2/16 0110 => Waiting time = 0+2+1+0=3 Conditional expectation(0110) = 0*(1/4)+2*(1/4)+1*(1/4)+0*(1/4)=3/4 Probality(0110)=(1/4)*(1/4)+(1/4)*(2/4)=3/16 1001 => Waiting time = 1+0+0+2=3 Conditional expectation(1001) = 1*(1/4)+0*(1/4)+0*(1/4)+2*(1/4)=3/4 Probality(1001)=(1/4)*(1/4)+(1/4)*(2/4)=3/16 1010 => Waiting time = 1+0+1+0=2 Conditional expectation(1010) = 1*(1/4)+0*(1/4)+1*(1/4)+0*(1/4)=2/4 Probality(1010)=(1/4)*(1/4)+(1/4)*(1/4)=2/16 1100 => Waiting time = 2+1+0+0=3 Conditional expectation(1100) = 2*(1/4)+1*(1/4)+0*(1/4)+0*(1/4)=3/4 Probality(1100)=(1/4)*(2/4)+(1/4)*(1/4)=3/16 ans = Expected value = Sum(Conditional expectation(mask) * Probality(mask)) ans = (3/4)*(3/16)+(2/4)*(2/16)+(3/4)*(3/16)+(3/4)*(3/16)+(2/4)*(2/16)+(3/4)*(3/16)=(3/4)*(3/16)*4+(2/4)*(2/16)*2=3*(3/16)+2*(2/16)=11/16. Edited by author 21.06.2017 12:40 |
|
|