Let Tn=n(n+1)(n+2)528
Tn=2528(n(n+1)(n+2)(n+2)−n)
Tn=264(n(n+1)1−(n+1)(n+2)1)
The sum of the first 10 terms is given by:
S10=n=1∑10Tn=264n=1∑10(n(n+1)1−(n+1)(n+2)1)
This is a telescoping series, so most terms cancel out:
S10=264((1⋅21−2⋅31)+(2⋅31−3⋅41)+⋯+(10⋅111−11⋅121))
S10=264(21−11⋅121)
S10=264(21−1321)
S10=264(13266−1)
S10=264×13265
S10=2×65=130
Answer: 130