Find the sum of the following series up to n terms:
`1^3/1+(1^3+2^3)/(1+3)+(1^3+2^3+3^3)/(1+3+5)+.......`

Let `T_(n)` be the nth term of the given series. Then,
`T_(n)=(1^(3)+2^(3)+3^(3)+"..."n^(3))/((1+3+5+"...."+(2n-1)))={(n(n+1))/(2)}^(2)/((n)/(2)(1+2n-1))`
`((n+1)^(2))/(4)=(1)/(4)(n^(2)+2n+1)`
Let `S_(n)` denotes the sum of n terms of the given series. Then,
`S_(n)=sumT_(n)=(1)/(4)sum(n^(2)+2n+1)`
`=(1)/(4)(sumn^(2)+sum2n+sum1)`
`=(1)/(4){n(n+1)(2n+1))/(6)+(2n(n+1))/(2)+n}`
`=(n)/(24){2n^(2)+3n+1+6n+6+6}`
Hence, `S_(n)=(n(2n^(2)+9n+13))/(24)`