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Chapter 11: Problem 45

For the geometric sequence \(3,12,48,192, \ldots,\) find the indicated term. 14 th term

Short Answer

Expert verified
The 14th term is \(3 * 4^{13}\), or 3221225472.

Step by step solution

01

Identify the First Term and Ratio

From the provided sequence, the first term \(a_1\) is 3 and the ratio \(r\) is 4. You can find the ratio by dividing any term by its preceding term.
02

Use the Geometric Sequence Formula

Next, use the formula for the nth term of a geometric sequence:\[a_n = a_1 * r^{(n-1)}\]Substitute \(a_1 = 3\), \(r = 4\), and \(n = 14\) into the formula.
03

Calculate the 14th Term

Perform the calculation:\[a_{14} = 3 * 4^{(14-1)}\]This will give the 14th term of the sequence.

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Geometric Sequences Formula
A geometric sequence is a sequence of numbers where each term after the first is found by multiplying the previous one by a fixed, non-zero number called the common ratio. One of the key aspects of understanding geometric sequences is the geometric sequences formula. This formula is used to find any term in the sequence without listing out all the terms before it.

The formula for finding the nth term of a geometric sequence is given by:
  • \[ a_n = a_1 \cdot r^{(n-1)} \]
Here,:
  • \( a_n \) represents the nth term you want to find.
  • \( a_1 \) is the first term of the sequence.
  • \( r \) is the common ratio.
  • \( n \) is the term number.
Using this formula, you can efficiently calculate any term in the sequence directly, which can be much quicker than repeatedly multiplying by the common ratio.
Common Ratio
The common ratio is a vital component in the structure of a geometric sequence. It is a constant value that you multiply by in order to get from one term to the next in the sequence. Understanding the concept of the common ratio allows for a better grasp of how sequences progress.

You can find the common ratio \( r \) by taking any term in the sequence and dividing it by the previous term. For example, in the sequence: 3, 12, 48, 192, ...:
  • \( r = \frac{12}{3} = 4 \)
  • \( r = \frac{48}{12} = 4 \)
  • \( r = \frac{192}{48} = 4 \)
As demonstrated above, the common ratio remains constant throughout the sequence, confirming that it is indeed a geometric sequence with a ratio of 4. This constant multiplication factor is what distinguishes geometric sequences from other types, such as arithmetic sequences.
Nth Term of a Sequence
The nth term of a sequence indicates a specific term's position in the sequence. For geometric sequences, determining the nth term is particularly straightforward thanks to the established formula. This allows you to find any term in the sequence without iterating through every prior term.

To find the nth term, use the formula:
  • \[ a_n = a_1 \cdot r^{(n-1)} \]
In practical application, such as finding the 14th term in the sequence 3, 12, 48, 192, ..., you would substitute:
  • \( a_1 = 3 \)
  • \( r = 4 \)
  • \( n = 14 \)
This results in:
  • \[ a_{14} = 3 \cdot 4^{13} \]
This calculation provides the 14th term directly, showcasing the powerful utility of the formula for efficiently navigating through the sequence.

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Most popular questions from this chapter

Writing Suppose you are to receive an allowance each week for the next 26 weeks. Would you rather receive (a) \(\$ 1000\) per week or (b) 2\(c\) the first week, 4\(c\) the second week, 8\(c\) the third week, and so on for the 26 weeks?

Determine whether each series is arithmetic or geometric. Then evaluate the finite series for the specified number of terms. \(2+4+8+16+\ldots ; n=10\)

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Approximate the area under the curve \(f(x)=x^{2}\) for the interval \(0 \leq x \leq 4\) by evaluating each sum. Use inscribed rectangles. a. \(\sum_{n=1}^{8}(0.5) f\left(a_{n}\right) \quad\) b. \(\sum_{n=1}^{4}(1) f\left(a_{n}\right)\) c. Which estimate is closer to the actual area under the curve? Explain.

Write and evaluate a sum to estimate the area under each curve for the domain \(0 \leq x \leq 2\) . a. Use inscribed rectangles 1 unit wide. b. Use eircumscribed rectangles 1 unit wide. $$ y=4-\frac{1}{4} x^{2} $$
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