2n[2a+(n−1)6]=(n−2)180∘ and an+3n2−3n=3n(n−2)180∘...(i) $\begin{aligned}
& \therefore \quad \text { Given } a+(n-1) 6^{\circ}=219^{\circ} \
& \Rightarrow a=225^{\circ}-6 n^{\circ}
\end{aligned}Puttingvalueofain(i)\begin{aligned}
& \text { We get }\left(225-6 n^2\right)+3 n^2-3 n=180 n-360^{\circ} \
& \Rightarrow 2 n^2-42 n-360=0 \
& \Rightarrow n^2-14 n-120=0 \
& \Rightarrow(n-20)(n+6)=0 \
& \Rightarrow n=20,-6 \text { (Rejected) } \
& \therefore n=20
\end{aligned}$