Given series is 1+2×3+3×5+4×7+5×9+…
Thus, the general term is Tr=r(2r−1)
Hence, the sum of 11 terms of the series is S11=r=1∑11r(2r−1)
⇒S11=2∑r2−∑r
Using the formulae for \displaystyle \sum {r}^{2}_{r=1}^{n}=\frac{n(n+1)(2n+1)}{6} and ∑rr=1n=2n(n+1), we get
S11=2⋅611(11+1)(22+1)−211(11+1)
⇒S11=44×23−66
⇒S11=1012−66=946.