Given that 200<S9<220
As we know sum of n terms of A.P whose first term is a and common difference d is Sn=2n[2a+(n−1)d]
⇒200<29(2a+8d)<220
⇒9200<a+4d<9220
As we know nth term of A.P is Tn=a+(n−1)d
Also T2=a+d=12
⇒4d=48−4a
∴9200<a+48−4a<9220
⇒9200−48<−3a<9220−48
⇒9−232<−3a<−9212
OR 27212<a<27232
i.e. 72723<a<82716
⇒a=8
⇒d=4
T4=a+3d=8+12=20