Let the natural numbers be divided into groups as (1),(2,3,4),(5,6,7,8,9),... and so on. Then the sum of the numbers in the nth group is
A
n3+(n+1)3
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B
n2−(n−1)2
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C
(2n−1)2
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D
n3+(n−1)3
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Solution
The correct option is Dn3+(n−1)3 Clearly nth group contains (2n−1) numbers. The last term in each group are 12,22,32,... So, the last term in nth group is n2. Also, the first term of each group is one more than the last term of its previous group. ∴ The first term of the nth group is (n−1)2+1. Hence, the sum of the numbers in the nth group is given by 2n−12[(n−1)2+1+n2](∵Sn=n2(a+l))=(2n−1)(n2−n+1)=(n−1)3+n3