1,6,18,40,75,126..... is the given sequence
Now keep on keep on taking difference between the consecutive numbers and again & again for the obtained sequences
1,6,18,40,75,126...
5,12,22,35,51...
7,10,13,16...
3,3,3,3...
Stablised a relation in three steps so we can safely assume nth term as
A(n)=an^3+bn^2+cn^1+bn^0
putting one by one n=1,2,3,4 we get 4 eqn in four variables
a+b+c+d=1
8a+4b+2c+d=6
27a+9b+3c+d=18
64a+16b+4c+d=40
solve them to get a,b,c,d
hence we get nth term as
A(n)=(n^3)/2 +(n^2)/2 +n-1
By check we come to know that n-1 is not significant(i dont understand why,please add comment if anyone can)
so our new nth term is
A(n)=(n^3)/2 +(n^2)/2
and really it satisfies and returns all the values
using this we can get next any numbers of terms
196,288,549,600.....
Please inform if u find any mistake!!!!
Check this one.....
