I have tried to solve the following recurrence relation using Iteration method,

```
T(1) = 8
T(n) = 3T(n-1) - 15
```

Iterations:

**i=1**

```
T(n) = 3(3T(n-2) - 15) -15
```

**i=2**

```
3(3(3T(n-3) - 15) -15) - 15
```

**i=3**

```
3(3(3(3T(n-4) - 15) -15) - 15) - 15
```

**i=4**

```
3(3(3(3(3T(n-5) - 15) -15) - 15) - 15) - 15
```

From the iteration pattern I found that

**T(n) = 3 ^{(i+1)} * T(n-(i+1)) - 15**

Now I need to find the summation for this recurrence relation and obtain the closed form. I'm just not sure how to proceed.

Can someone guide me to solving this problem?