1
Question
The sum of first 10 terms of the series 1⋅2⋅3+2⋅3⋅4+3⋅4⋅5+......... is
The sum of first 10 terms of the series 1⋅2⋅3+2⋅3⋅4+3⋅4⋅5+......... is
Open in App
Solution
The correct option is D 4290
The nth term of the series is given byTn=n(n+1)(n+2)If Tn is multiplication of n consecutive intergers,then we take Vn as multiplication of n+1 consecutiveintegers.Let Vn=n(n+1)(n+2)(n+3)Vn−Vn−1=(n(n+1)(n+2)(n+3)] −((n−1)(n−1+1)(n−1+2)(n−1+3)]⇒Vn−Vn−1=n(n+1)(n+2)((n+3)−(n−1)]⇒Vn−Vn−1=4n(n+1)(n+2)⇒Vn−Vn−14=n(n+1)(n+2)⇒Vn−Vn−14=TnSum of n tems of the given sequence will beSn=∑nk=1Tn⇒Sn=∑nk=1(Vn−Vn−1)4⇒Sn=14(V1−V0+V2−V1+V3−V2+.....+Vn−Vn−1)⇒Sn=14(Vn−V0)⇒Sn=14Vn (As V0=0)⇒Sn=14n(n+1)(n+2)(n+3)For n=10S10=1410(10+1)(10+2)(10+3)⇒S10=4290
The nth term of the series is given byTn=n(n+1)(n+2)If Tn is multiplication of n consecutive intergers,then we take Vn as multiplication of n+1 consecutiveintegers.Let Vn=n(n+1)(n+2)(n+3)Vn−Vn−1=(n(n+1)(n+2)(n+3)] −((n−1)(n−1+1)(n−1+2)(n−1+3)]⇒Vn−Vn−1=n(n+1)(n+2)((n+3)−(n−1)]⇒Vn−Vn−1=4n(n+1)(n+2)⇒Vn−Vn−14=n(n+1)(n+2)⇒Vn−Vn−14=TnSum of n tems of the given sequence will beSn=∑nk=1Tn⇒Sn=∑nk=1(Vn−Vn−1)4⇒Sn=14(V1−V0+V2−V1+V3−V2+.....+Vn−Vn−1)⇒Sn=14(Vn−V0)⇒Sn=14Vn (As V0=0)⇒Sn=14n(n+1)(n+2)(n+3)For n=10S10=1410(10+1)(10+2)(10+3)⇒S10=4290
Suggest Corrections
0
Similar questions