QUESTION 3 In an arithmetic sequence the eighth term first three terms is 12 . Determine the first Evaluate: $$ \sum_{t=1}^{12} 3.2^{t-1} $$ Determine the value(s) of $$ x $$ for which the se $$ 2+\frac{2}{3}(x+5)+\frac{2}{9}(x+5)^{2}+\ldots $$ will converge

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Let's break down the problem into its components and solve each part step by step.

### Part 1: Arithmetic Sequence

We know that the eighth term of an arithmetic sequence is 12. Let's denote the first term as $$ a $$ and the common difference as $$ d $$. The formula for the $$ n $$-th term of an arithmetic sequence is given by:

$$
a_n = a + (n-1)d
$$

For the eighth term ($$ n = 8 $$):

$$
a_8 = a + 7d = 12
$$

We need to determine the first three terms of the sequence, which are $$ a $$, $$ a + d $$, and $$ a + 2d $$.

### Part 2: Evaluate the Sum

Next, we need to evaluate the sum:

$$
\sum_{t=1}^{12} 3.2^{t-1}
$$

This is a geometric series where the first term $$ a = 3 $$ and the common ratio $$ r = 2 $$. The formula for the sum of the first $$ n $$ terms of a geometric series is:

$$
S_n = a \frac{1 - r^n}{1 - r}
$$

### Part 3: Convergence of the Series

The series given is:

$$
2 + \frac{2}{3}(x+5) + \frac{2}{9}(x+5)^{2} + \ldots
$$

This is a geometric series where the first term $$ a = 2 $$ and the common ratio $$ r = \frac{2}{3}(x+5) $$. A geometric series converges if the absolute value of the common ratio is less than 1:

$$
\left| \frac{2}{3}(x+5) \right| < 1
$$

Now, let's solve these parts step by step.

### Step 1: Solve for the Arithmetic Sequence

We have the equation:

$$
a + 7d = 12
$$

We need to express $$ a $$ and $$ d $$ in terms of each other. Let's denote $$ d = k $$:

$$
a + 7k = 12 \quad \text{(1)}
$$

The first three terms are:

1. $$ a $$
2. $$ a + k $$
3. $$ a + 2k $$

### Step 2: Evaluate the Sum

Now, let's calculate the sum $$ S_{12} $$:

$$
S_{12} = 3 \frac{1 - 2^{12}}{1 - 2}
$$

### Step 3: Determine Convergence

We need to solve the inequality:

$$
\left| \frac{2}{3}(x+5) \right| < 1
$$

This can be rewritten as:

$$
-1 < \frac{2}{3}(x+5) < 1
$$

Now, let's perform the calculations for the sum and the convergence condition.

I'll proceed with the calculations.
Solve the equation by following steps:
- step0: Solve for $$a$$:
  $$a+7d=12$$
- step1: Move the expression to the right side:
  $$a=12-7d$$
Calculate or simplify the expression $$ 3 * (1 - 2^12) / (1 - 2) $$.
Calculate the value by following steps:
- step0: Calculate:
  $$\frac{3\left(1-2^{12}\right)}{\left(1-2\right)}$$
- step1: Remove the parentheses:
  $$\frac{3\left(1-2^{12}\right)}{1-2}$$
- step2: Subtract the numbers:
  $$\frac{3\left(-4095\right)}{1-2}$$
- step3: Multiply the numbers:
  $$\frac{-12285}{1-2}$$
- step4: Subtract the numbers:
  $$\frac{-12285}{-1}$$
- step5: Divide the terms:
  $$12285$$
Solve the equation $$ -1 < (2/3)(x + 5) < 1 $$.
Solve the system of inequalities by following steps:
- step0: Solve for $$x$$:
  $$\left\{ \begin{array}{l}-1<\frac{2}{3}\left(x+5\right)\\frac{2}{3}\left(x+5\right)<1\end{array}\right.$$
- step1: Solve the inequality:
  $$\left\{ \begin{array}{l}x>-\frac{13}{2}\x<-\frac{7}{2}\end{array}\right.$$
- step2: Find the intersection:
  $$-\frac{13}{2}First, in the arithmetic sequence, the first term $$ a $$ is $$ 12 - 7d $$. The sum of the first 12 terms is 12,285. The series $$ 2 + \frac{2}{3}(x+5) + \frac{2}{9}(x+5)^{2} + \ldots $$ converges when $$ -\frac{13}{2} < x < -\frac{7}{2} $$.

QUESTION 3 In an arithmetic sequence the eighth term first three terms is 12 . Determine the first Evaluate: \( \sum_{t=1}^{12} 3.2^{t-1} \) Determine the value(s) of \( x \) for which the se \( 2+\frac{2}{3}(x+5)+\frac{2}{9}(x+5)^{2}+\ldots \) will converge

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