The given sequence : 0,4,18,48,100,180,......
We can write the terms of the sequence as :
[tex]\text{Ist term }:a_1=1(1^2-1)=0\\\\\text{IInd term }: a_2=2^2(2-1)=4(2-1)=4\\\\\text{IIIrd term }:a_3=3^2(3-1)=9(2)=18\\\\\text{IVth term }:a_4=4^2(4-1)=(16)(3)=48\\\\\text{Vth term }:a_5=5^2(5-1)=25(4)=100\\\\\text{VIth term }:a_6=6^2(6-1)=36(5)=180[/tex]
From the above presentation of the terms, the explicit formula in terms of n for the nth term will be :-
[tex]a_n=n^2(n-1)[/tex]
Put n= 7 , we get
[tex]a_7=7^2(7-1)=49(6)=294[/tex]
Therefore, the seventh term of the given sequence = 294
