Solution - Geometric Sequences

To find the general form of the series, plug the first term: $$a=-11$$ and the common ratio: $$r=10.181818181818182$$ into the formula for geometric series:

$$a_1=-11$$

$$a_2=a_1·r^{n-1}=-11\cdot {10.181818181818182}^{2-1}=-11\cdot {10.181818181818182}^1=-11\cdot 10.181818181818182=-112$$

$$a_3=a_1·r^{n-1}=-11\cdot {10.181818181818182}^{3-1}=-11\cdot {10.181818181818182}^2=-11\cdot 103.6694214876033=-1140.3636363636363$$

$$a_4=a_1·r^{n-1}=-11\cdot {10.181818181818182}^{4-1}=-11\cdot {10.181818181818182}^3=-11\cdot 1055.5432006010517=-11610.975206611569$$

$$a_5=a_1·r^{n-1}=-11\cdot {10.181818181818182}^{5-1}=-11\cdot {10.181818181818182}^4=-11\cdot 10747.348951574346=-118220.83846731781$$

$$a_6=a_1·r^{n-1}=-11\cdot {10.181818181818182}^{6-1}=-11\cdot {10.181818181818182}^5=-11\cdot 109427.55296148424=-1203703.0825763266$$

$$a_7=a_1·r^{n-1}=-11\cdot {10.181818181818182}^{7-1}=-11\cdot {10.181818181818182}^6=-11\cdot 1114171.4483351123=-12255885.931686236$$

$$a_8=a_1·r^{n-1}=-11\cdot {10.181818181818182}^{8-1}=-11\cdot {10.181818181818182}^7=-11\cdot 11344291.110321144=-124787202.21353258$$

$$a_9=a_1·r^{n-1}=-11\cdot {10.181818181818182}^{9-1}=-11\cdot {10.181818181818182}^8=-11\cdot 115505509.48690619=-1270560604.355968$$

$$a_{10}=a_1·r^{n-1}=-11\cdot {10.181818181818182}^{10-1}=-11\cdot {10.181818181818182}^9=-11\cdot 1176056096.5939538=-12936617062.533493$$